#NEXUS [!Carrano, M. T. and Sampson, S. D., 2008. The phylogeny of Ceratosauria (Dinosauria: Theropoda). Journal of Systematic Palaeontology, 6, 183-236.] BEGIN DATA; DIMENSIONS NTAX=21 NCHAR=151; FORMAT SYMBOLS= " 0 1 2" MISSING=? GAP=- ; MATRIX Herrerasaurus 0000000001000000000000000000000000000?00000000000000000001000000000000000000000000000000000100000000000010000000000000000000000000000000000000000000000 Syntarsus 0000010010000000000000000000000000000000000000010000000010000000000000001000010000001110100010001000010000100000000110110000000000101100000000100001000 Allosaurus 0000010000000000000100000000000000000000001110110001101010011000001000001111100010010000000110000000000010000001000000001011001000010001200121011000001 Spinostropheus ???????????????????????????????????????????????????????????????????????12????1001000010111102??111???000????01?????????????1?????0?????1??????????????? Elaphrosaurus ???????????????????????????????????????????????????????????????????????1(12)????1001000?111110021011?00?1??011101111001111010110?0100?10?0121?1101??011??? Deltadromeus ??????????????????????????????????????????????????????????????????????????????????????????????????0??????101011?0??????????????1?0?1100121?111?110110?? Ceratosaurus 0000121000000100000001000000000000000000?11?1100001110111001111001100011211112?0100120001101210?1?0001000001011111?111?010?11111101(01)11111101111100010?? Ekrixinatosaurus 1??1?0??001?????100?1?11????1???????1????1??????????????????????1??0?0?1?????21?0011?01????1(12)???0?0?10?????????????1??111111?????0?11?11???1??1?00????? Rugops 11111010011111010001110??????111111???????????????????????????????10101??????????????????????????????0????????????????????????????????????????????????? Ilokelesia ?1?????????????????????111101???????????????1??????????????????????????1?????21010112010?111????????1011????????????????????????????????????????????11? Aucasaurus 11?1121?011??1??1?2????0?????110?1?????????????????????????????????0??????????1???????1?????(12)?????111???01011111111?1111?111???1?0?1?111?1?1111??001111 Carnotaurus 1111121?01101101112111111111111011111110111???100111?111?1111111111010112111121011112010111121111111101101011111111111111111?11110?111??11????1???0???? Abelisaurus 1111121?01?101111021111101011?111?11?111?10???10011??1???1??1???????101???????????????????????????????????????????????????????????????????????????????? Rajasaurus 11????????????1?1111111??????????1???????1111??01???????211????1011010112????21?1????0?01111210?11???0?????????????0?0??1???1???11?1111111?1?????00???? Indosaurus ??????????????111111111??????????????????11?????1?????????????????????????????????????????????????????????????????????????????????????????????????????? Majungatholus 11111210011101111111111111001111011111111111111011111111211111111110101121111210101120101111(12)11111110011010111111?1?1111111?11??11?1??1111111111100111? Genusaurus ???????????????????????????????????????????????????????????????????????????????????????????0(12)??????????????????????1?1?11?1??????0?12?1?11????????????? Laevisuchus ???????????????????????????????????????????????????????????????????????1??????11?001?010???0?????????0????????????????????????????????????????????????? Masiakasaurus 01?1?01110????000000???001000?001??????????11?1001???????11?1110011101112111121110011010???0(12)0111101001?01?11?1?1?0111?????1111?1011211111111111111111? Noasaurus 0??1?01110??????????????????????????????1??????????????????????????10111(12)?????11?10110?0?????????????010?????????????????????????0???????????????1????? Velocisaurus ?????????????????????????????????????????????????????????????????????????????????????????????????????????????????????????????????0?????1???11111?111??? ; END; BEGIN ASSUMPTIONS; OPTIONS DEFTYPE=unord PolyTcount=MINSTEPS ; TYPESET * UNTITLED = unord: 1-140 142-151, ord: 141; END; BEGIN TREES; Translate 1 Herrerasaurus, 2 Syntarsus, 3 Allosaurus, 4 Spinostropheus, 5 Elaphrosaurus, 6 Deltadromeus, 7 Ceratosaurus, 8 Ekrixinatosaurus, 9 Rugops, 10 Ilokelesia, 11 Aucasaurus, 12 Carnotaurus, 13 Abelisaurus, 14 Rajasaurus, 15 Indosaurus, 16 Majungatholus, 17 Genusaurus, 18 Laevisuchus, 19 Masiakasaurus, 20 Noasaurus, 21 Velocisaurus ; tree MPT_1 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((((17,19),18),20),21)))),6)))); tree MPT_2 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,19),18),(20,21))))),6)))); tree MPT_3 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((((17,19),18),21),20)))),6)))); tree MPT_4 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,19),18,21),20)))),6)))); tree MPT_5 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((((17,19),21),18),20)))),6)))); tree MPT_6 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,19,21),18),20)))),6)))); tree MPT_7 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,(19,21)),18),20)))),6)))); tree MPT_8 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,19),18,20),21)))),6)))); tree MPT_9 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,19),18,20,21)))),6)))); tree MPT_10 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,19),18,(20,21))))),6)))); tree MPT_11 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,19),21),18,20)))),6)))); tree MPT_12 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,19,21),18,20)))),6)))); tree MPT_13 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,(19,21)),18,20)))),6)))); tree MPT_14 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((((17,19),20),18),21)))),6)))); tree MPT_15 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,19),20),18,21)))),6)))); tree MPT_16 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((((17,19),20),21),18)))),6)))); tree MPT_17 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,19),(20,21)),18)))),6)))); tree MPT_18 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((((17,19),21),20),18)))),6)))); tree MPT_19 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,19,21),20),18)))),6)))); tree MPT_20 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,(19,21)),20),18)))),6)))); tree MPT_21 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((((17,20),19),18),21)))),6)))); tree MPT_22 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,20),19),18,21)))),6)))); tree MPT_23 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((((17,20),19),21),18)))),6)))); tree MPT_24 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((((17,20),21),19),18)))),6)))); tree MPT_25 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,(20,21)),19),18)))),6)))); tree MPT_26 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,20,21),19),18)))),6)))); tree MPT_27 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,20),(19,21)),18)))),6)))); tree MPT_28 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,(19,20)),18),21)))),6)))); tree MPT_29 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,(19,20)),18,21)))),6)))); tree MPT_30 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,(19,20)),21),18)))),6)))); tree MPT_31 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,(19,20),21),18)))),6)))); tree MPT_32 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,((19,20),21)),18)))),6)))); tree MPT_33 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,(19,(20,21))),18)))),6)))); tree MPT_34 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,((19,21),20)),18)))),6)))); tree MPT_35 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,18,19),20),21)))),6)))); tree MPT_36 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,18,19),(20,21))))),6)))); tree MPT_37 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,18,19),21),20)))),6)))); tree MPT_38 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,18,19,21),20)))),6)))); tree MPT_39 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,18,(19,21)),20)))),6)))); tree MPT_40 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,18,19,20),21)))),6)))); tree MPT_41 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,18,19,20,21)))),6)))); tree MPT_42 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,18,19,(20,21))))),6)))); tree MPT_43 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,18,(19,21),20)))),6)))); tree MPT_44 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,20),18,19),21)))),6)))); tree MPT_45 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,20),18,19,21)))),6)))); tree MPT_46 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,20),21),18,19)))),6)))); tree MPT_47 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,(20,21)),18,19)))),6)))); tree MPT_48 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,20,21),18,19)))),6)))); tree MPT_49 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,20),18,(19,21))))),6)))); tree MPT_50 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,18,(19,20)),21)))),6)))); tree MPT_51 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,18,(19,20),21)))),6)))); tree MPT_52 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,18,((19,20),21))))),6)))); tree MPT_53 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,18,(19,(20,21)))))),6)))); tree MPT_54 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,18,((19,21),20))))),6)))); tree MPT_55 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,(18,19)),20),21)))),6)))); tree MPT_56 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,(18,19)),(20,21))))),6)))); tree MPT_57 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,(18,19)),21),20)))),6)))); tree MPT_58 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,(18,19),21),20)))),6)))); tree MPT_59 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,((18,19),21)),20)))),6)))); tree MPT_60 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,(18,19,21)),20)))),6)))); tree MPT_61 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,(18,(19,21))),20)))),6)))); tree MPT_62 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,20),(18,19)),21)))),6)))); tree MPT_63 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,20),21),(18,19))))),6)))); tree MPT_64 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,(20,21)),(18,19))))),6)))); tree MPT_65 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,20,21),(18,19))))),6)))); tree MPT_66 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,20),((18,19),21))))),6)))); tree MPT_67 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,20),(18,19,21))))),6)))); tree MPT_68 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,20),(18,(19,21)))))),6)))); tree MPT_69 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,((18,19),20)),21)))),6)))); tree MPT_70 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,((18,19),20),21)))),6)))); tree MPT_71 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,(((18,19),20),21))))),6)))); tree MPT_72 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,((18,19),(20,21)))))),6)))); tree MPT_73 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,(((18,19),21),20))))),6)))); tree MPT_74 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,((18,19,21),20))))),6)))); tree MPT_75 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,((18,(19,21)),20))))),6)))); tree MPT_76 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,(18,19,20)),21)))),6)))); tree MPT_77 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,(18,19,20),21)))),6)))); tree MPT_78 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,((18,19,20),21))))),6)))); tree MPT_79 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,(18,19,20,21))))),6)))); tree MPT_80 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,(18,19,(20,21)))))),6)))); tree MPT_81 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,(18,(19,21),20))))),6)))); tree MPT_82 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,(18,(19,20))),21)))),6)))); tree MPT_83 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,(18,(19,20)),21)))),6)))); tree MPT_84 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,((18,(19,20)),21))))),6)))); tree MPT_85 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,(18,(19,20),21))))),6)))); tree MPT_86 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,(18,((19,20),21)))))),6)))); tree MPT_87 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,(18,(19,(20,21))))))),6)))); tree MPT_88 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,(18,((19,21),20)))))),6)))); tree MPT_89 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((((17,19),18),20),21)))),6)))); tree MPT_90 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,19),18),(20,21))))),6)))); tree MPT_91 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((((17,19),18),21),20)))),6)))); tree MPT_92 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,19),18,21),20)))),6)))); tree MPT_93 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((((17,19),21),18),20)))),6)))); tree MPT_94 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,19,21),18),20)))),6)))); tree MPT_95 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,(19,21)),18),20)))),6)))); tree MPT_96 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,19),18,20),21)))),6)))); tree MPT_97 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,19),18,20,21)))),6)))); tree MPT_98 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,19),18,(20,21))))),6)))); tree MPT_99 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,19),21),18,20)))),6)))); tree MPT_100 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,19,21),18,20)))),6)))); tree MPT_101 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,(19,21)),18,20)))),6)))); tree MPT_102 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((((17,19),20),18),21)))),6)))); tree MPT_103 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,19),20),18,21)))),6)))); tree MPT_104 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((((17,19),20),21),18)))),6)))); tree MPT_105 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,19),(20,21)),18)))),6)))); tree MPT_106 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((((17,19),21),20),18)))),6)))); tree MPT_107 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,19,21),20),18)))),6)))); tree MPT_108 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,(19,21)),20),18)))),6)))); tree MPT_109 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((((17,20),19),18),21)))),6)))); tree MPT_110 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,20),19),18,21)))),6)))); tree MPT_111 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((((17,20),19),21),18)))),6)))); tree MPT_112 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((((17,20),21),19),18)))),6)))); tree MPT_113 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,(20,21)),19),18)))),6)))); tree MPT_114 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,20,21),19),18)))),6)))); tree MPT_115 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,20),(19,21)),18)))),6)))); tree MPT_116 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,(19,20)),18),21)))),6)))); tree MPT_117 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,(19,20)),18,21)))),6)))); tree MPT_118 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,(19,20)),21),18)))),6)))); tree MPT_119 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,(19,20),21),18)))),6)))); tree MPT_120 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,((19,20),21)),18)))),6)))); tree MPT_121 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,(19,(20,21))),18)))),6)))); tree MPT_122 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,((19,21),20)),18)))),6)))); tree MPT_123 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,18,19),20),21)))),6)))); tree MPT_124 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,18,19),(20,21))))),6)))); tree MPT_125 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,18,19),21),20)))),6)))); tree MPT_126 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,18,19,21),20)))),6)))); tree MPT_127 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,18,(19,21)),20)))),6)))); tree MPT_128 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,18,19,20),21)))),6)))); tree MPT_129 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,18,19,20,21)))),6)))); tree MPT_130 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,18,19,(20,21))))),6)))); tree MPT_131 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,18,(19,21),20)))),6)))); tree MPT_132 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,20),18,19),21)))),6)))); tree MPT_133 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,20),18,19,21)))),6)))); tree MPT_134 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,20),21),18,19)))),6)))); tree MPT_135 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,(20,21)),18,19)))),6)))); tree MPT_136 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,20,21),18,19)))),6)))); tree MPT_137 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,20),18,(19,21))))),6)))); tree MPT_138 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,18,(19,20)),21)))),6)))); tree MPT_139 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,18,(19,20),21)))),6)))); tree MPT_140 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,18,((19,20),21))))),6)))); tree MPT_141 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,18,(19,(20,21)))))),6)))); tree MPT_142 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,18,((19,21),20))))),6)))); tree MPT_143 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,(18,19)),20),21)))),6)))); tree MPT_144 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,(18,19)),(20,21))))),6)))); tree MPT_145 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,(18,19)),21),20)))),6)))); tree MPT_146 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,(18,19),21),20)))),6)))); tree MPT_147 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,((18,19),21)),20)))),6)))); tree MPT_148 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,(18,19,21)),20)))),6)))); tree MPT_149 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,(18,(19,21))),20)))),6)))); tree MPT_150 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,20),(18,19)),21)))),6)))); tree MPT_151 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,20),21),(18,19))))),6)))); tree MPT_152 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,(20,21)),(18,19))))),6)))); tree MPT_153 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,20,21),(18,19))))),6)))); tree MPT_154 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,20),((18,19),21))))),6)))); tree MPT_155 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,20),(18,19,21))))),6)))); tree MPT_156 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,20),(18,(19,21)))))),6)))); tree MPT_157 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,((18,19),20)),21)))),6)))); tree MPT_158 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,((18,19),20),21)))),6)))); tree MPT_159 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,(((18,19),20),21))))),6)))); tree MPT_160 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,((18,19),(20,21)))))),6)))); tree MPT_161 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,(((18,19),21),20))))),6)))); tree MPT_162 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,((18,19,21),20))))),6)))); tree MPT_163 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,((18,(19,21)),20))))),6)))); tree MPT_164 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,(18,19,20)),21)))),6)))); tree MPT_165 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,(18,19,20),21)))),6)))); tree MPT_166 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,((18,19,20),21))))),6)))); tree MPT_167 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,(18,19,20,21))))),6)))); tree MPT_168 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,(18,19,(20,21)))))),6)))); tree MPT_169 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,(18,(19,21),20))))),6)))); tree MPT_170 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,(18,(19,20))),21)))),6)))); tree MPT_171 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,(18,(19,20)),21)))),6)))); tree MPT_172 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,((18,(19,20)),21))))),6)))); tree MPT_173 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,(18,(19,20),21))))),6)))); tree MPT_174 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,(18,((19,20),21)))))),6)))); tree MPT_175 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,(18,(19,(20,21))))))),6)))); tree MPT_176 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,(18,((19,21),20)))))),6)))); tree MPT_177 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((((17,19),18),20),21)))),6)))); tree MPT_178 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,19),18),(20,21))))),6)))); tree MPT_179 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((((17,19),18),21),20)))),6)))); tree MPT_180 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,19),18,21),20)))),6)))); tree MPT_181 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((((17,19),21),18),20)))),6)))); tree MPT_182 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,19,21),18),20)))),6)))); tree MPT_183 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,(19,21)),18),20)))),6)))); tree MPT_184 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,19),18,20),21)))),6)))); tree MPT_185 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,19),18,20,21)))),6)))); tree MPT_186 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,19),18,(20,21))))),6)))); tree MPT_187 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,19),21),18,20)))),6)))); tree MPT_188 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,19,21),18,20)))),6)))); tree MPT_189 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,(19,21)),18,20)))),6)))); tree MPT_190 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((((17,19),20),18),21)))),6)))); tree MPT_191 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,19),20),18,21)))),6)))); tree MPT_192 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((((17,19),20),21),18)))),6)))); tree MPT_193 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,19),(20,21)),18)))),6)))); tree MPT_194 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((((17,19),21),20),18)))),6)))); tree MPT_195 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,19,21),20),18)))),6)))); tree MPT_196 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,(19,21)),20),18)))),6)))); tree MPT_197 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((((17,20),19),18),21)))),6)))); tree MPT_198 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,20),19),18,21)))),6)))); tree MPT_199 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((((17,20),19),21),18)))),6)))); tree MPT_200 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((((17,20),21),19),18)))),6)))); tree MPT_201 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,(20,21)),19),18)))),6)))); tree MPT_202 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,20,21),19),18)))),6)))); tree MPT_203 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,20),(19,21)),18)))),6)))); tree MPT_204 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,(19,20)),18),21)))),6)))); tree MPT_205 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,(19,20)),18,21)))),6)))); tree MPT_206 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,(19,20)),21),18)))),6)))); tree MPT_207 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,(19,20),21),18)))),6)))); tree MPT_208 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,((19,20),21)),18)))),6)))); tree MPT_209 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,(19,(20,21))),18)))),6)))); tree MPT_210 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,((19,21),20)),18)))),6)))); tree MPT_211 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,18,19),20),21)))),6)))); tree MPT_212 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,18,19),(20,21))))),6)))); tree MPT_213 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,18,19),21),20)))),6)))); tree MPT_214 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,18,19,21),20)))),6)))); tree MPT_215 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,18,(19,21)),20)))),6)))); tree MPT_216 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,18,19,20),21)))),6)))); tree MPT_217 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,18,19,20,21)))),6)))); tree MPT_218 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,18,19,(20,21))))),6)))); tree MPT_219 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,18,(19,21),20)))),6)))); tree MPT_220 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,20),18,19),21)))),6)))); tree MPT_221 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,20),18,19,21)))),6)))); tree MPT_222 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,20),21),18,19)))),6)))); tree MPT_223 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,(20,21)),18,19)))),6)))); tree MPT_224 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,20,21),18,19)))),6)))); tree MPT_225 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,20),18,(19,21))))),6)))); tree MPT_226 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,18,(19,20)),21)))),6)))); tree MPT_227 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,18,(19,20),21)))),6)))); tree MPT_228 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,18,((19,20),21))))),6)))); tree MPT_229 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,18,(19,(20,21)))))),6)))); tree MPT_230 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,18,((19,21),20))))),6)))); tree MPT_231 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,(18,19)),20),21)))),6)))); tree MPT_232 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,(18,19)),(20,21))))),6)))); tree MPT_233 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,(18,19)),21),20)))),6)))); tree MPT_234 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,(18,19),21),20)))),6)))); tree MPT_235 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,((18,19),21)),20)))),6)))); tree MPT_236 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,(18,19,21)),20)))),6)))); tree MPT_237 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,(18,(19,21))),20)))),6)))); tree MPT_238 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,20),(18,19)),21)))),6)))); tree MPT_239 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,20),21),(18,19))))),6)))); tree MPT_240 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,(20,21)),(18,19))))),6)))); tree MPT_241 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,20,21),(18,19))))),6)))); tree MPT_242 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,20),((18,19),21))))),6)))); tree MPT_243 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,20),(18,19,21))))),6)))); tree MPT_244 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,20),(18,(19,21)))))),6)))); tree MPT_245 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,((18,19),20)),21)))),6)))); tree MPT_246 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,((18,19),20),21)))),6)))); tree MPT_247 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,(((18,19),20),21))))),6)))); tree MPT_248 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,((18,19),(20,21)))))),6)))); tree MPT_249 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,(((18,19),21),20))))),6)))); tree MPT_250 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,((18,19,21),20))))),6)))); tree MPT_251 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,((18,(19,21)),20))))),6)))); tree MPT_252 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,(18,19,20)),21)))),6)))); tree MPT_253 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,(18,19,20),21)))),6)))); tree MPT_254 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,((18,19,20),21))))),6)))); tree MPT_255 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,(18,19,20,21))))),6)))); tree MPT_256 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,(18,19,(20,21)))))),6)))); tree MPT_257 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,(18,(19,21),20))))),6)))); tree MPT_258 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,(18,(19,20))),21)))),6)))); tree MPT_259 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,(18,(19,20)),21)))),6)))); tree MPT_260 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,((18,(19,20)),21))))),6)))); tree MPT_261 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,(18,(19,20),21))))),6)))); tree MPT_262 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,(18,((19,20),21)))))),6)))); tree MPT_263 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,(18,(19,(20,21))))))),6)))); tree MPT_264 = [&R] (1,(2,(3,(((4,5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,(18,((19,21),20)))))),6)))); tree MPT_265 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((((17,19),18),20),21)))),6)))); tree MPT_266 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,19),18),(20,21))))),6)))); tree MPT_267 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((((17,19),18),21),20)))),6)))); tree MPT_268 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,19),18,21),20)))),6)))); tree MPT_269 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((((17,19),21),18),20)))),6)))); tree MPT_270 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,19,21),18),20)))),6)))); tree MPT_271 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,(19,21)),18),20)))),6)))); tree MPT_272 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,19),18,20),21)))),6)))); tree MPT_273 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,19),18,20,21)))),6)))); tree MPT_274 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,19),18,(20,21))))),6)))); tree MPT_275 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,19),21),18,20)))),6)))); tree MPT_276 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,19,21),18,20)))),6)))); tree MPT_277 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,(19,21)),18,20)))),6)))); tree MPT_278 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((((17,19),20),18),21)))),6)))); tree MPT_279 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,19),20),18,21)))),6)))); tree MPT_280 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((((17,19),20),21),18)))),6)))); tree MPT_281 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,19),(20,21)),18)))),6)))); tree MPT_282 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((((17,19),21),20),18)))),6)))); tree MPT_283 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,19,21),20),18)))),6)))); tree MPT_284 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,(19,21)),20),18)))),6)))); tree MPT_285 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((((17,20),19),18),21)))),6)))); tree MPT_286 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,20),19),18,21)))),6)))); tree MPT_287 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((((17,20),19),21),18)))),6)))); tree MPT_288 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((((17,20),21),19),18)))),6)))); tree MPT_289 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,(20,21)),19),18)))),6)))); tree MPT_290 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,20,21),19),18)))),6)))); tree MPT_291 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,20),(19,21)),18)))),6)))); tree MPT_292 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,(19,20)),18),21)))),6)))); tree MPT_293 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,(19,20)),18,21)))),6)))); tree MPT_294 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,(19,20)),21),18)))),6)))); tree MPT_295 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,(19,20),21),18)))),6)))); tree MPT_296 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,((19,20),21)),18)))),6)))); tree MPT_297 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,(19,(20,21))),18)))),6)))); tree MPT_298 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,((19,21),20)),18)))),6)))); tree MPT_299 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,18,19),20),21)))),6)))); tree MPT_300 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,18,19),(20,21))))),6)))); tree MPT_301 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,18,19),21),20)))),6)))); tree MPT_302 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,18,19,21),20)))),6)))); tree MPT_303 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,18,(19,21)),20)))),6)))); tree MPT_304 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,18,19,20),21)))),6)))); tree MPT_305 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,18,19,20,21)))),6)))); tree MPT_306 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,18,19,(20,21))))),6)))); tree MPT_307 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,18,(19,21),20)))),6)))); tree MPT_308 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,20),18,19),21)))),6)))); tree MPT_309 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,20),18,19,21)))),6)))); tree MPT_310 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,20),21),18,19)))),6)))); tree MPT_311 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,(20,21)),18,19)))),6)))); tree MPT_312 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,20,21),18,19)))),6)))); tree MPT_313 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,20),18,(19,21))))),6)))); tree MPT_314 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,18,(19,20)),21)))),6)))); tree MPT_315 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,18,(19,20),21)))),6)))); tree MPT_316 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,18,((19,20),21))))),6)))); tree MPT_317 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,18,(19,(20,21)))))),6)))); tree MPT_318 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,18,((19,21),20))))),6)))); tree MPT_319 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,(18,19)),20),21)))),6)))); tree MPT_320 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,(18,19)),(20,21))))),6)))); tree MPT_321 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,(18,19)),21),20)))),6)))); tree MPT_322 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,(18,19),21),20)))),6)))); tree MPT_323 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,((18,19),21)),20)))),6)))); tree MPT_324 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,(18,19,21)),20)))),6)))); tree MPT_325 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,(18,(19,21))),20)))),6)))); tree MPT_326 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,20),(18,19)),21)))),6)))); tree MPT_327 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,20),21),(18,19))))),6)))); tree MPT_328 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,(20,21)),(18,19))))),6)))); tree MPT_329 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,20,21),(18,19))))),6)))); tree MPT_330 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,20),((18,19),21))))),6)))); tree MPT_331 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,20),(18,19,21))))),6)))); tree MPT_332 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,20),(18,(19,21)))))),6)))); tree MPT_333 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,((18,19),20)),21)))),6)))); tree MPT_334 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,((18,19),20),21)))),6)))); tree MPT_335 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,(((18,19),20),21))))),6)))); tree MPT_336 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,((18,19),(20,21)))))),6)))); tree MPT_337 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,(((18,19),21),20))))),6)))); tree MPT_338 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,((18,19,21),20))))),6)))); tree MPT_339 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,((18,(19,21)),20))))),6)))); tree MPT_340 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,(18,19,20)),21)))),6)))); tree MPT_341 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,(18,19,20),21)))),6)))); tree MPT_342 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,((18,19,20),21))))),6)))); tree MPT_343 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,(18,19,20,21))))),6)))); tree MPT_344 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,(18,19,(20,21)))))),6)))); tree MPT_345 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,(18,(19,21),20))))),6)))); tree MPT_346 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,(18,(19,20))),21)))),6)))); tree MPT_347 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,(18,(19,20)),21)))),6)))); tree MPT_348 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,((18,(19,20)),21))))),6)))); tree MPT_349 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,(18,(19,20),21))))),6)))); tree MPT_350 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,(18,((19,20),21)))))),6)))); tree MPT_351 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,(18,(19,(20,21))))))),6)))); tree MPT_352 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,(18,((19,21),20)))))),6)))); tree MPT_353 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((((17,19),18),20),21)))),6)))); tree MPT_354 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,19),18),(20,21))))),6)))); tree MPT_355 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((((17,19),18),21),20)))),6)))); tree MPT_356 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,19),18,21),20)))),6)))); tree MPT_357 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((((17,19),21),18),20)))),6)))); tree MPT_358 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,19,21),18),20)))),6)))); tree MPT_359 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,(19,21)),18),20)))),6)))); tree MPT_360 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,19),18,20),21)))),6)))); tree MPT_361 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,19),18,20,21)))),6)))); tree MPT_362 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,19),18,(20,21))))),6)))); tree MPT_363 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,19),21),18,20)))),6)))); tree MPT_364 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,19,21),18,20)))),6)))); tree MPT_365 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,(19,21)),18,20)))),6)))); tree MPT_366 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((((17,19),20),18),21)))),6)))); tree MPT_367 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,19),20),18,21)))),6)))); tree MPT_368 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((((17,19),20),21),18)))),6)))); tree MPT_369 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,19),(20,21)),18)))),6)))); tree MPT_370 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((((17,19),21),20),18)))),6)))); tree MPT_371 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,19,21),20),18)))),6)))); tree MPT_372 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,(19,21)),20),18)))),6)))); tree MPT_373 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((((17,20),19),18),21)))),6)))); tree MPT_374 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,20),19),18,21)))),6)))); tree MPT_375 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((((17,20),19),21),18)))),6)))); tree MPT_376 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((((17,20),21),19),18)))),6)))); tree MPT_377 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,(20,21)),19),18)))),6)))); tree MPT_378 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,20,21),19),18)))),6)))); tree MPT_379 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,20),(19,21)),18)))),6)))); tree MPT_380 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,(19,20)),18),21)))),6)))); tree MPT_381 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,(19,20)),18,21)))),6)))); tree MPT_382 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,(19,20)),21),18)))),6)))); tree MPT_383 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,(19,20),21),18)))),6)))); tree MPT_384 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,((19,20),21)),18)))),6)))); tree MPT_385 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,(19,(20,21))),18)))),6)))); tree MPT_386 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,((19,21),20)),18)))),6)))); tree MPT_387 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,18,19),20),21)))),6)))); tree MPT_388 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,18,19),(20,21))))),6)))); tree MPT_389 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,18,19),21),20)))),6)))); tree MPT_390 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,18,19,21),20)))),6)))); tree MPT_391 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,18,(19,21)),20)))),6)))); tree MPT_392 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,18,19,20),21)))),6)))); tree MPT_393 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,18,19,20,21)))),6)))); tree MPT_394 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,18,19,(20,21))))),6)))); tree MPT_395 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,18,(19,21),20)))),6)))); tree MPT_396 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,20),18,19),21)))),6)))); tree MPT_397 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,20),18,19,21)))),6)))); tree MPT_398 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,20),21),18,19)))),6)))); tree MPT_399 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,(20,21)),18,19)))),6)))); tree MPT_400 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,20,21),18,19)))),6)))); tree MPT_401 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,20),18,(19,21))))),6)))); tree MPT_402 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,18,(19,20)),21)))),6)))); tree MPT_403 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,18,(19,20),21)))),6)))); tree MPT_404 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,18,((19,20),21))))),6)))); tree MPT_405 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,18,(19,(20,21)))))),6)))); tree MPT_406 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,18,((19,21),20))))),6)))); tree MPT_407 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,(18,19)),20),21)))),6)))); tree MPT_408 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,(18,19)),(20,21))))),6)))); tree MPT_409 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,(18,19)),21),20)))),6)))); tree MPT_410 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,(18,19),21),20)))),6)))); tree MPT_411 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,((18,19),21)),20)))),6)))); tree MPT_412 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,(18,19,21)),20)))),6)))); tree MPT_413 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,(18,(19,21))),20)))),6)))); tree MPT_414 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,20),(18,19)),21)))),6)))); tree MPT_415 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,20),21),(18,19))))),6)))); tree MPT_416 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,(20,21)),(18,19))))),6)))); tree MPT_417 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,20,21),(18,19))))),6)))); tree MPT_418 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,20),((18,19),21))))),6)))); tree MPT_419 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,20),(18,19,21))))),6)))); tree MPT_420 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,20),(18,(19,21)))))),6)))); tree MPT_421 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,((18,19),20)),21)))),6)))); tree MPT_422 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,((18,19),20),21)))),6)))); tree MPT_423 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,(((18,19),20),21))))),6)))); tree MPT_424 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,((18,19),(20,21)))))),6)))); tree MPT_425 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,(((18,19),21),20))))),6)))); tree MPT_426 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,((18,19,21),20))))),6)))); tree MPT_427 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,((18,(19,21)),20))))),6)))); tree MPT_428 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,(18,19,20)),21)))),6)))); tree MPT_429 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,(18,19,20),21)))),6)))); tree MPT_430 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,((18,19,20),21))))),6)))); tree MPT_431 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,(18,19,20,21))))),6)))); tree MPT_432 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,(18,19,(20,21)))))),6)))); tree MPT_433 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,(18,(19,21),20))))),6)))); tree MPT_434 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,(18,(19,20))),21)))),6)))); tree MPT_435 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,(18,(19,20)),21)))),6)))); tree MPT_436 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,((18,(19,20)),21))))),6)))); tree MPT_437 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,(18,(19,20),21))))),6)))); tree MPT_438 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,(18,((19,20),21)))))),6)))); tree MPT_439 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,(18,(19,(20,21))))))),6)))); tree MPT_440 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,(18,((19,21),20)))))),6)))); tree MPT_441 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((((17,19),18),20),21)))),6)))); tree MPT_442 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,19),18),(20,21))))),6)))); tree MPT_443 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((((17,19),18),21),20)))),6)))); tree MPT_444 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,19),18,21),20)))),6)))); tree MPT_445 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((((17,19),21),18),20)))),6)))); tree MPT_446 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,19,21),18),20)))),6)))); tree MPT_447 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,(19,21)),18),20)))),6)))); tree MPT_448 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,19),18,20),21)))),6)))); tree MPT_449 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,19),18,20,21)))),6)))); tree MPT_450 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,19),18,(20,21))))),6)))); tree MPT_451 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,19),21),18,20)))),6)))); tree MPT_452 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,19,21),18,20)))),6)))); tree MPT_453 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,(19,21)),18,20)))),6)))); tree MPT_454 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((((17,19),20),18),21)))),6)))); tree MPT_455 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,19),20),18,21)))),6)))); tree MPT_456 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((((17,19),20),21),18)))),6)))); tree MPT_457 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,19),(20,21)),18)))),6)))); tree MPT_458 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((((17,19),21),20),18)))),6)))); tree MPT_459 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,19,21),20),18)))),6)))); tree MPT_460 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,(19,21)),20),18)))),6)))); tree MPT_461 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((((17,20),19),18),21)))),6)))); tree MPT_462 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,20),19),18,21)))),6)))); tree MPT_463 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((((17,20),19),21),18)))),6)))); tree MPT_464 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((((17,20),21),19),18)))),6)))); tree MPT_465 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,(20,21)),19),18)))),6)))); tree MPT_466 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,20,21),19),18)))),6)))); tree MPT_467 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,20),(19,21)),18)))),6)))); tree MPT_468 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,(19,20)),18),21)))),6)))); tree MPT_469 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,(19,20)),18,21)))),6)))); tree MPT_470 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,(19,20)),21),18)))),6)))); tree MPT_471 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,(19,20),21),18)))),6)))); tree MPT_472 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,((19,20),21)),18)))),6)))); tree MPT_473 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,(19,(20,21))),18)))),6)))); tree MPT_474 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,((19,21),20)),18)))),6)))); tree MPT_475 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,18,19),20),21)))),6)))); tree MPT_476 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,18,19),(20,21))))),6)))); tree MPT_477 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,18,19),21),20)))),6)))); tree MPT_478 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,18,19,21),20)))),6)))); tree MPT_479 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,18,(19,21)),20)))),6)))); tree MPT_480 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,18,19,20),21)))),6)))); tree MPT_481 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,18,19,20,21)))),6)))); tree MPT_482 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,18,19,(20,21))))),6)))); tree MPT_483 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,18,(19,21),20)))),6)))); tree MPT_484 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,20),18,19),21)))),6)))); tree MPT_485 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,20),18,19,21)))),6)))); tree MPT_486 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,20),21),18,19)))),6)))); tree MPT_487 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,(20,21)),18,19)))),6)))); tree MPT_488 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,20,21),18,19)))),6)))); tree MPT_489 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,20),18,(19,21))))),6)))); tree MPT_490 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,18,(19,20)),21)))),6)))); tree MPT_491 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,18,(19,20),21)))),6)))); tree MPT_492 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,18,((19,20),21))))),6)))); tree MPT_493 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,18,(19,(20,21)))))),6)))); tree MPT_494 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,18,((19,21),20))))),6)))); tree MPT_495 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,(18,19)),20),21)))),6)))); tree MPT_496 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,(18,19)),(20,21))))),6)))); tree MPT_497 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,(18,19)),21),20)))),6)))); tree MPT_498 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,(18,19),21),20)))),6)))); tree MPT_499 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,((18,19),21)),20)))),6)))); tree MPT_500 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,(18,19,21)),20)))),6)))); tree MPT_501 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,(18,(19,21))),20)))),6)))); tree MPT_502 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,20),(18,19)),21)))),6)))); tree MPT_503 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,20),21),(18,19))))),6)))); tree MPT_504 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,(20,21)),(18,19))))),6)))); tree MPT_505 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,20,21),(18,19))))),6)))); tree MPT_506 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,20),((18,19),21))))),6)))); tree MPT_507 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,20),(18,19,21))))),6)))); tree MPT_508 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,20),(18,(19,21)))))),6)))); tree MPT_509 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,((18,19),20)),21)))),6)))); tree MPT_510 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,((18,19),20),21)))),6)))); tree MPT_511 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,(((18,19),20),21))))),6)))); tree MPT_512 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,((18,19),(20,21)))))),6)))); tree MPT_513 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,(((18,19),21),20))))),6)))); tree MPT_514 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,((18,19,21),20))))),6)))); tree MPT_515 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,((18,(19,21)),20))))),6)))); tree MPT_516 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,(18,19,20)),21)))),6)))); tree MPT_517 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,(18,19,20),21)))),6)))); tree MPT_518 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,((18,19,20),21))))),6)))); tree MPT_519 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,(18,19,20,21))))),6)))); tree MPT_520 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,(18,19,(20,21)))))),6)))); tree MPT_521 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,(18,(19,21),20))))),6)))); tree MPT_522 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,(18,(19,20))),21)))),6)))); tree MPT_523 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,(18,(19,20)),21)))),6)))); tree MPT_524 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,((18,(19,20)),21))))),6)))); tree MPT_525 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,(18,(19,20),21))))),6)))); tree MPT_526 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,(18,((19,20),21)))))),6)))); tree MPT_527 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,(18,(19,(20,21))))))),6)))); tree MPT_528 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,(18,((19,21),20)))))),6)))); tree MPT_529 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((((17,19),18),20),21)))),6)))); tree MPT_530 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,19),18),(20,21))))),6)))); tree MPT_531 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((((17,19),18),21),20)))),6)))); tree MPT_532 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,19),18,21),20)))),6)))); tree MPT_533 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((((17,19),21),18),20)))),6)))); tree MPT_534 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,19,21),18),20)))),6)))); tree MPT_535 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,(19,21)),18),20)))),6)))); tree MPT_536 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,19),18,20),21)))),6)))); tree MPT_537 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,19),18,20,21)))),6)))); tree MPT_538 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,19),18,(20,21))))),6)))); tree MPT_539 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,19),21),18,20)))),6)))); tree MPT_540 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,19,21),18,20)))),6)))); tree MPT_541 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,(19,21)),18,20)))),6)))); tree MPT_542 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((((17,19),20),18),21)))),6)))); tree MPT_543 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,19),20),18,21)))),6)))); tree MPT_544 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((((17,19),20),21),18)))),6)))); tree MPT_545 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,19),(20,21)),18)))),6)))); tree MPT_546 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((((17,19),21),20),18)))),6)))); tree MPT_547 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,19,21),20),18)))),6)))); tree MPT_548 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,(19,21)),20),18)))),6)))); tree MPT_549 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((((17,20),19),18),21)))),6)))); tree MPT_550 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,20),19),18,21)))),6)))); tree MPT_551 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((((17,20),19),21),18)))),6)))); tree MPT_552 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((((17,20),21),19),18)))),6)))); tree MPT_553 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,(20,21)),19),18)))),6)))); tree MPT_554 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,20,21),19),18)))),6)))); tree MPT_555 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,20),(19,21)),18)))),6)))); tree MPT_556 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,(19,20)),18),21)))),6)))); tree MPT_557 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,(19,20)),18,21)))),6)))); tree MPT_558 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,(19,20)),21),18)))),6)))); tree MPT_559 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,(19,20),21),18)))),6)))); tree MPT_560 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,((19,20),21)),18)))),6)))); tree MPT_561 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,(19,(20,21))),18)))),6)))); tree MPT_562 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,((19,21),20)),18)))),6)))); tree MPT_563 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,18,19),20),21)))),6)))); tree MPT_564 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,18,19),(20,21))))),6)))); tree MPT_565 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,18,19),21),20)))),6)))); tree MPT_566 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,18,19,21),20)))),6)))); tree MPT_567 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,18,(19,21)),20)))),6)))); tree MPT_568 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,18,19,20),21)))),6)))); tree MPT_569 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,18,19,20,21)))),6)))); tree MPT_570 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,18,19,(20,21))))),6)))); tree MPT_571 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,18,(19,21),20)))),6)))); tree MPT_572 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,20),18,19),21)))),6)))); tree MPT_573 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,20),18,19,21)))),6)))); tree MPT_574 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,20),21),18,19)))),6)))); tree MPT_575 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,(20,21)),18,19)))),6)))); tree MPT_576 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,20,21),18,19)))),6)))); tree MPT_577 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,20),18,(19,21))))),6)))); tree MPT_578 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,18,(19,20)),21)))),6)))); tree MPT_579 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,18,(19,20),21)))),6)))); tree MPT_580 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,18,((19,20),21))))),6)))); tree MPT_581 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,18,(19,(20,21)))))),6)))); tree MPT_582 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,18,((19,21),20))))),6)))); tree MPT_583 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,(18,19)),20),21)))),6)))); tree MPT_584 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,(18,19)),(20,21))))),6)))); tree MPT_585 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,(18,19)),21),20)))),6)))); tree MPT_586 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,(18,19),21),20)))),6)))); tree MPT_587 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,((18,19),21)),20)))),6)))); tree MPT_588 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,(18,19,21)),20)))),6)))); tree MPT_589 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,(18,(19,21))),20)))),6)))); tree MPT_590 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,20),(18,19)),21)))),6)))); tree MPT_591 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,20),21),(18,19))))),6)))); tree MPT_592 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,(20,21)),(18,19))))),6)))); tree MPT_593 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,20,21),(18,19))))),6)))); tree MPT_594 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,20),((18,19),21))))),6)))); tree MPT_595 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,20),(18,19,21))))),6)))); tree MPT_596 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,20),(18,(19,21)))))),6)))); tree MPT_597 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,((18,19),20)),21)))),6)))); tree MPT_598 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,((18,19),20),21)))),6)))); tree MPT_599 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,(((18,19),20),21))))),6)))); tree MPT_600 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,((18,19),(20,21)))))),6)))); tree MPT_601 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,(((18,19),21),20))))),6)))); tree MPT_602 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,((18,19,21),20))))),6)))); tree MPT_603 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,((18,(19,21)),20))))),6)))); tree MPT_604 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,(18,19,20)),21)))),6)))); tree MPT_605 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,(18,19,20),21)))),6)))); tree MPT_606 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,((18,19,20),21))))),6)))); tree MPT_607 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,(18,19,20,21))))),6)))); tree MPT_608 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,(18,19,(20,21)))))),6)))); tree MPT_609 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,(18,(19,21),20))))),6)))); tree MPT_610 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,(18,(19,20))),21)))),6)))); tree MPT_611 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,(18,(19,20)),21)))),6)))); tree MPT_612 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,((18,(19,20)),21))))),6)))); tree MPT_613 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,(18,(19,20),21))))),6)))); tree MPT_614 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,(18,((19,20),21)))))),6)))); tree MPT_615 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,(18,(19,(20,21))))))),6)))); tree MPT_616 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,(18,((19,21),20)))))),6)))); tree MPT_617 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((((17,19),18),20),21)))),6)))); tree MPT_618 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,19),18),(20,21))))),6)))); tree MPT_619 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((((17,19),18),21),20)))),6)))); tree MPT_620 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,19),18,21),20)))),6)))); tree MPT_621 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((((17,19),21),18),20)))),6)))); tree MPT_622 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,19,21),18),20)))),6)))); tree MPT_623 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,(19,21)),18),20)))),6)))); tree MPT_624 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,19),18,20),21)))),6)))); tree MPT_625 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,19),18,20,21)))),6)))); tree MPT_626 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,19),18,(20,21))))),6)))); tree MPT_627 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,19),21),18,20)))),6)))); tree MPT_628 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,19,21),18,20)))),6)))); tree MPT_629 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,(19,21)),18,20)))),6)))); tree MPT_630 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((((17,19),20),18),21)))),6)))); tree MPT_631 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,19),20),18,21)))),6)))); tree MPT_632 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((((17,19),20),21),18)))),6)))); tree MPT_633 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,19),(20,21)),18)))),6)))); tree MPT_634 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((((17,19),21),20),18)))),6)))); tree MPT_635 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,19,21),20),18)))),6)))); tree MPT_636 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,(19,21)),20),18)))),6)))); tree MPT_637 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((((17,20),19),18),21)))),6)))); tree MPT_638 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,20),19),18,21)))),6)))); tree MPT_639 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((((17,20),19),21),18)))),6)))); tree MPT_640 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((((17,20),21),19),18)))),6)))); tree MPT_641 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,(20,21)),19),18)))),6)))); tree MPT_642 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,20,21),19),18)))),6)))); tree MPT_643 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,20),(19,21)),18)))),6)))); tree MPT_644 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,(19,20)),18),21)))),6)))); tree MPT_645 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,(19,20)),18,21)))),6)))); tree MPT_646 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,(19,20)),21),18)))),6)))); tree MPT_647 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,(19,20),21),18)))),6)))); tree MPT_648 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,((19,20),21)),18)))),6)))); tree MPT_649 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,(19,(20,21))),18)))),6)))); tree MPT_650 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,((19,21),20)),18)))),6)))); tree MPT_651 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,18,19),20),21)))),6)))); tree MPT_652 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,18,19),(20,21))))),6)))); tree MPT_653 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,18,19),21),20)))),6)))); tree MPT_654 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,18,19,21),20)))),6)))); tree MPT_655 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,18,(19,21)),20)))),6)))); tree MPT_656 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,18,19,20),21)))),6)))); tree MPT_657 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,18,19,20,21)))),6)))); tree MPT_658 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,18,19,(20,21))))),6)))); tree MPT_659 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,18,(19,21),20)))),6)))); tree MPT_660 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,20),18,19),21)))),6)))); tree MPT_661 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,20),18,19,21)))),6)))); tree MPT_662 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,20),21),18,19)))),6)))); tree MPT_663 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,(20,21)),18,19)))),6)))); tree MPT_664 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,20,21),18,19)))),6)))); tree MPT_665 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,20),18,(19,21))))),6)))); tree MPT_666 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,18,(19,20)),21)))),6)))); tree MPT_667 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,18,(19,20),21)))),6)))); tree MPT_668 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,18,((19,20),21))))),6)))); tree MPT_669 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,18,(19,(20,21)))))),6)))); tree MPT_670 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,18,((19,21),20))))),6)))); tree MPT_671 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,(18,19)),20),21)))),6)))); tree MPT_672 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,(18,19)),(20,21))))),6)))); tree MPT_673 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,(18,19)),21),20)))),6)))); tree MPT_674 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,(18,19),21),20)))),6)))); tree MPT_675 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,((18,19),21)),20)))),6)))); tree MPT_676 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,(18,19,21)),20)))),6)))); tree MPT_677 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,(18,(19,21))),20)))),6)))); tree MPT_678 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,20),(18,19)),21)))),6)))); tree MPT_679 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,20),21),(18,19))))),6)))); tree MPT_680 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,(20,21)),(18,19))))),6)))); tree MPT_681 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,20,21),(18,19))))),6)))); tree MPT_682 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,20),((18,19),21))))),6)))); tree MPT_683 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,20),(18,19,21))))),6)))); tree MPT_684 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,20),(18,(19,21)))))),6)))); tree MPT_685 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,((18,19),20)),21)))),6)))); tree MPT_686 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,((18,19),20),21)))),6)))); tree MPT_687 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,(((18,19),20),21))))),6)))); tree MPT_688 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,((18,19),(20,21)))))),6)))); tree MPT_689 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,(((18,19),21),20))))),6)))); tree MPT_690 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,((18,19,21),20))))),6)))); tree MPT_691 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,((18,(19,21)),20))))),6)))); tree MPT_692 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,(18,19,20)),21)))),6)))); tree MPT_693 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,(18,19,20),21)))),6)))); tree MPT_694 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,((18,19,20),21))))),6)))); tree MPT_695 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,(18,19,20,21))))),6)))); tree MPT_696 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,(18,19,(20,21)))))),6)))); tree MPT_697 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,(18,(19,21),20))))),6)))); tree MPT_698 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,(18,(19,20))),21)))),6)))); tree MPT_699 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,(18,(19,20)),21)))),6)))); tree MPT_700 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,((18,(19,20)),21))))),6)))); tree MPT_701 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,(18,(19,20),21))))),6)))); tree MPT_702 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,(18,((19,20),21)))))),6)))); tree MPT_703 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,(18,(19,(20,21))))))),6)))); tree MPT_704 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,(18,((19,21),20)))))),6)))); tree MPT_705 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((((17,19),18),20),21)))),6)))); tree MPT_706 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,19),18),(20,21))))),6)))); tree MPT_707 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((((17,19),18),21),20)))),6)))); tree MPT_708 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,19),18,21),20)))),6)))); tree MPT_709 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((((17,19),21),18),20)))),6)))); tree MPT_710 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,19,21),18),20)))),6)))); tree MPT_711 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,(19,21)),18),20)))),6)))); tree MPT_712 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,19),18,20),21)))),6)))); tree MPT_713 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,19),18,20,21)))),6)))); tree MPT_714 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,19),18,(20,21))))),6)))); tree MPT_715 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,19),21),18,20)))),6)))); tree MPT_716 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,19,21),18,20)))),6)))); tree MPT_717 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,(19,21)),18,20)))),6)))); tree MPT_718 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((((17,19),20),18),21)))),6)))); tree MPT_719 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,19),20),18,21)))),6)))); tree MPT_720 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((((17,19),20),21),18)))),6)))); tree MPT_721 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,19),(20,21)),18)))),6)))); tree MPT_722 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((((17,19),21),20),18)))),6)))); tree MPT_723 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,19,21),20),18)))),6)))); tree MPT_724 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,(19,21)),20),18)))),6)))); tree MPT_725 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((((17,20),19),18),21)))),6)))); tree MPT_726 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,20),19),18,21)))),6)))); tree MPT_727 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((((17,20),19),21),18)))),6)))); tree MPT_728 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((((17,20),21),19),18)))),6)))); tree MPT_729 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,(20,21)),19),18)))),6)))); tree MPT_730 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,20,21),19),18)))),6)))); tree MPT_731 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,20),(19,21)),18)))),6)))); tree MPT_732 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,(19,20)),18),21)))),6)))); tree MPT_733 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,(19,20)),18,21)))),6)))); tree MPT_734 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,(19,20)),21),18)))),6)))); tree MPT_735 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,(19,20),21),18)))),6)))); tree MPT_736 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,((19,20),21)),18)))),6)))); tree MPT_737 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,(19,(20,21))),18)))),6)))); tree MPT_738 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,((19,21),20)),18)))),6)))); tree MPT_739 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,18,19),20),21)))),6)))); tree MPT_740 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,18,19),(20,21))))),6)))); tree MPT_741 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,18,19),21),20)))),6)))); tree MPT_742 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,18,19,21),20)))),6)))); tree MPT_743 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,18,(19,21)),20)))),6)))); tree MPT_744 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,18,19,20),21)))),6)))); tree MPT_745 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,18,19,20,21)))),6)))); tree MPT_746 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,18,19,(20,21))))),6)))); tree MPT_747 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,18,(19,21),20)))),6)))); tree MPT_748 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,20),18,19),21)))),6)))); tree MPT_749 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,20),18,19,21)))),6)))); tree MPT_750 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,20),21),18,19)))),6)))); tree MPT_751 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,(20,21)),18,19)))),6)))); tree MPT_752 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,20,21),18,19)))),6)))); tree MPT_753 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,20),18,(19,21))))),6)))); tree MPT_754 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,18,(19,20)),21)))),6)))); tree MPT_755 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,18,(19,20),21)))),6)))); tree MPT_756 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,18,((19,20),21))))),6)))); tree MPT_757 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,18,(19,(20,21)))))),6)))); tree MPT_758 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,18,((19,21),20))))),6)))); tree MPT_759 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,(18,19)),20),21)))),6)))); tree MPT_760 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,(18,19)),(20,21))))),6)))); tree MPT_761 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,(18,19)),21),20)))),6)))); tree MPT_762 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,(18,19),21),20)))),6)))); tree MPT_763 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,((18,19),21)),20)))),6)))); tree MPT_764 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,(18,19,21)),20)))),6)))); tree MPT_765 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,(18,(19,21))),20)))),6)))); tree MPT_766 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,20),(18,19)),21)))),6)))); tree MPT_767 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,20),21),(18,19))))),6)))); tree MPT_768 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,(20,21)),(18,19))))),6)))); tree MPT_769 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,20,21),(18,19))))),6)))); tree MPT_770 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,20),((18,19),21))))),6)))); tree MPT_771 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,20),(18,19,21))))),6)))); tree MPT_772 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,20),(18,(19,21)))))),6)))); tree MPT_773 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,((18,19),20)),21)))),6)))); tree MPT_774 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,((18,19),20),21)))),6)))); tree MPT_775 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,(((18,19),20),21))))),6)))); tree MPT_776 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,((18,19),(20,21)))))),6)))); tree MPT_777 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,(((18,19),21),20))))),6)))); tree MPT_778 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,((18,19,21),20))))),6)))); tree MPT_779 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,((18,(19,21)),20))))),6)))); tree MPT_780 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,(18,19,20)),21)))),6)))); tree MPT_781 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,(18,19,20),21)))),6)))); tree MPT_782 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,((18,19,20),21))))),6)))); tree MPT_783 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,(18,19,20,21))))),6)))); tree MPT_784 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,(18,19,(20,21)))))),6)))); tree MPT_785 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,(18,(19,21),20))))),6)))); tree MPT_786 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,(18,(19,20))),21)))),6)))); tree MPT_787 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,(18,(19,20)),21)))),6)))); tree MPT_788 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,((18,(19,20)),21))))),6)))); tree MPT_789 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,(18,(19,20),21))))),6)))); tree MPT_790 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,(18,((19,20),21)))))),6)))); tree MPT_791 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,(18,(19,(20,21))))))),6)))); tree MPT_792 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,(18,((19,21),20)))))),6)))); tree MPT_793 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),((((17,19),18),20),21)))),6)))); tree MPT_794 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(((17,19),18),(20,21))))),6)))); tree MPT_795 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),((((17,19),18),21),20)))),6)))); tree MPT_796 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(((17,19),18,21),20)))),6)))); tree MPT_797 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),((((17,19),21),18),20)))),6)))); tree MPT_798 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(((17,19,21),18),20)))),6)))); tree MPT_799 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(((17,(19,21)),18),20)))),6)))); tree MPT_800 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(((17,19),18,20),21)))),6)))); tree MPT_801 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),((17,19),18,20,21)))),6)))); tree MPT_802 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),((17,19),18,(20,21))))),6)))); tree MPT_803 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(((17,19),21),18,20)))),6)))); tree MPT_804 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),((17,19,21),18,20)))),6)))); tree MPT_805 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),((17,(19,21)),18,20)))),6)))); tree MPT_806 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),((((17,19),20),18),21)))),6)))); tree MPT_807 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(((17,19),20),18,21)))),6)))); tree MPT_808 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),((((17,19),20),21),18)))),6)))); tree MPT_809 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(((17,19),(20,21)),18)))),6)))); tree MPT_810 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),((((17,19),21),20),18)))),6)))); tree MPT_811 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(((17,19,21),20),18)))),6)))); tree MPT_812 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(((17,(19,21)),20),18)))),6)))); tree MPT_813 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),((((17,20),19),18),21)))),6)))); tree MPT_814 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(((17,20),19),18,21)))),6)))); tree MPT_815 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),((((17,20),19),21),18)))),6)))); tree MPT_816 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),((((17,20),21),19),18)))),6)))); tree MPT_817 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(((17,(20,21)),19),18)))),6)))); tree MPT_818 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(((17,20,21),19),18)))),6)))); tree MPT_819 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(((17,20),(19,21)),18)))),6)))); tree MPT_820 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(((17,(19,20)),18),21)))),6)))); tree MPT_821 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),((17,(19,20)),18,21)))),6)))); tree MPT_822 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(((17,(19,20)),21),18)))),6)))); tree MPT_823 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),((17,(19,20),21),18)))),6)))); tree MPT_824 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),((17,((19,20),21)),18)))),6)))); tree MPT_825 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),((17,(19,(20,21))),18)))),6)))); tree MPT_826 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),((17,((19,21),20)),18)))),6)))); tree MPT_827 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),((((17,19),18),20),21)))),6)))); tree MPT_828 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),(((17,19),18),(20,21))))),6)))); tree MPT_829 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),((((17,19),18),21),20)))),6)))); tree MPT_830 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),(((17,19),18,21),20)))),6)))); tree MPT_831 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),((((17,19),21),18),20)))),6)))); tree MPT_832 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),(((17,19,21),18),20)))),6)))); tree MPT_833 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),(((17,(19,21)),18),20)))),6)))); tree MPT_834 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),(((17,19),18,20),21)))),6)))); tree MPT_835 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),((17,19),18,20,21)))),6)))); tree MPT_836 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),((17,19),18,(20,21))))),6)))); tree MPT_837 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),(((17,19),21),18,20)))),6)))); tree MPT_838 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),((17,19,21),18,20)))),6)))); tree MPT_839 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),((17,(19,21)),18,20)))),6)))); tree MPT_840 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),((((17,19),20),18),21)))),6)))); tree MPT_841 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),(((17,19),20),18,21)))),6)))); tree MPT_842 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),((((17,19),20),21),18)))),6)))); tree MPT_843 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),(((17,19),(20,21)),18)))),6)))); tree MPT_844 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),((((17,19),21),20),18)))),6)))); tree MPT_845 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),(((17,19,21),20),18)))),6)))); tree MPT_846 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),(((17,(19,21)),20),18)))),6)))); tree MPT_847 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),((((17,20),19),18),21)))),6)))); tree MPT_848 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),(((17,20),19),18,21)))),6)))); tree MPT_849 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),((((17,20),19),21),18)))),6)))); tree MPT_850 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),((((17,20),21),19),18)))),6)))); tree MPT_851 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),(((17,(20,21)),19),18)))),6)))); tree MPT_852 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),(((17,20,21),19),18)))),6)))); tree MPT_853 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),(((17,20),(19,21)),18)))),6)))); tree MPT_854 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),(((17,(19,20)),18),21)))),6)))); tree MPT_855 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),((17,(19,20)),18,21)))),6)))); tree MPT_856 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),(((17,(19,20)),21),18)))),6)))); tree MPT_857 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),((17,(19,20),21),18)))),6)))); tree MPT_858 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),((17,((19,20),21)),18)))),6)))); tree MPT_859 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),((17,(19,(20,21))),18)))),6)))); tree MPT_860 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),((17,((19,21),20)),18)))),6)))); tree MPT_861 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),((((17,19),18),20),21)))),6)))); tree MPT_862 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),(((17,19),18),(20,21))))),6)))); tree MPT_863 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),((((17,19),18),21),20)))),6)))); tree MPT_864 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),(((17,19),18,21),20)))),6)))); tree MPT_865 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),((((17,19),21),18),20)))),6)))); tree MPT_866 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),(((17,19,21),18),20)))),6)))); tree MPT_867 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),(((17,(19,21)),18),20)))),6)))); tree MPT_868 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),(((17,19),18,20),21)))),6)))); tree MPT_869 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),((17,19),18,20,21)))),6)))); tree MPT_870 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),((17,19),18,(20,21))))),6)))); tree MPT_871 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),(((17,19),21),18,20)))),6)))); tree MPT_872 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),((17,19,21),18,20)))),6)))); tree MPT_873 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),((17,(19,21)),18,20)))),6)))); tree MPT_874 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),((((17,19),20),18),21)))),6)))); tree MPT_875 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),(((17,19),20),18,21)))),6)))); tree MPT_876 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),((((17,19),20),21),18)))),6)))); tree MPT_877 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),(((17,19),(20,21)),18)))),6)))); tree MPT_878 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),((((17,19),21),20),18)))),6)))); tree MPT_879 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),(((17,19,21),20),18)))),6)))); tree MPT_880 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),(((17,(19,21)),20),18)))),6)))); tree MPT_881 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),((((17,20),19),18),21)))),6)))); tree MPT_882 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),(((17,20),19),18,21)))),6)))); tree MPT_883 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),((((17,20),19),21),18)))),6)))); tree MPT_884 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),((((17,20),21),19),18)))),6)))); tree MPT_885 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),(((17,(20,21)),19),18)))),6)))); tree MPT_886 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),(((17,20,21),19),18)))),6)))); tree MPT_887 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),(((17,20),(19,21)),18)))),6)))); tree MPT_888 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),(((17,(19,20)),18),21)))),6)))); tree MPT_889 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),((17,(19,20)),18,21)))),6)))); tree MPT_890 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),(((17,(19,20)),21),18)))),6)))); tree MPT_891 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),((17,(19,20),21),18)))),6)))); tree MPT_892 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),((17,((19,20),21)),18)))),6)))); tree MPT_893 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),((17,(19,(20,21))),18)))),6)))); tree MPT_894 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),((17,((19,21),20)),18)))),6)))); tree MPT_895 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),((((17,19),18),20),21)))),6)))); tree MPT_896 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),(((17,19),18),(20,21))))),6)))); tree MPT_897 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),((((17,19),18),21),20)))),6)))); tree MPT_898 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),(((17,19),18,21),20)))),6)))); tree MPT_899 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),((((17,19),21),18),20)))),6)))); tree MPT_900 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),(((17,19,21),18),20)))),6)))); tree MPT_901 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),(((17,(19,21)),18),20)))),6)))); tree MPT_902 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),(((17,19),18,20),21)))),6)))); tree MPT_903 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),((17,19),18,20,21)))),6)))); tree MPT_904 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),((17,19),18,(20,21))))),6)))); tree MPT_905 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),(((17,19),21),18,20)))),6)))); tree MPT_906 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),((17,19,21),18,20)))),6)))); tree MPT_907 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),((17,(19,21)),18,20)))),6)))); tree MPT_908 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),((((17,19),20),18),21)))),6)))); tree MPT_909 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),(((17,19),20),18,21)))),6)))); tree MPT_910 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),((((17,19),20),21),18)))),6)))); tree MPT_911 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),(((17,19),(20,21)),18)))),6)))); tree MPT_912 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),((((17,19),21),20),18)))),6)))); tree MPT_913 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),(((17,19,21),20),18)))),6)))); tree MPT_914 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),(((17,(19,21)),20),18)))),6)))); tree MPT_915 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),((((17,20),19),18),21)))),6)))); tree MPT_916 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),(((17,20),19),18,21)))),6)))); tree MPT_917 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),((((17,20),19),21),18)))),6)))); tree MPT_918 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),((((17,20),21),19),18)))),6)))); tree MPT_919 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),(((17,(20,21)),19),18)))),6)))); tree MPT_920 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),(((17,20,21),19),18)))),6)))); tree MPT_921 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),(((17,20),(19,21)),18)))),6)))); tree MPT_922 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),(((17,(19,20)),18),21)))),6)))); tree MPT_923 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),((17,(19,20)),18,21)))),6)))); tree MPT_924 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),(((17,(19,20)),21),18)))),6)))); tree MPT_925 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),((17,(19,20),21),18)))),6)))); tree MPT_926 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),((17,((19,20),21)),18)))),6)))); tree MPT_927 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),((17,(19,(20,21))),18)))),6)))); tree MPT_928 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),((17,((19,21),20)),18)))),6)))); tree MPT_929 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),((((17,19),18),20),21)))),6)))); tree MPT_930 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),(((17,19),18),(20,21))))),6)))); tree MPT_931 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),((((17,19),18),21),20)))),6)))); tree MPT_932 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),(((17,19),18,21),20)))),6)))); tree MPT_933 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),((((17,19),21),18),20)))),6)))); tree MPT_934 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),(((17,19,21),18),20)))),6)))); tree MPT_935 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),(((17,(19,21)),18),20)))),6)))); tree MPT_936 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),(((17,19),18,20),21)))),6)))); tree MPT_937 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),((17,19),18,20,21)))),6)))); tree MPT_938 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),((17,19),18,(20,21))))),6)))); tree MPT_939 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),(((17,19),21),18,20)))),6)))); tree MPT_940 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),((17,19,21),18,20)))),6)))); tree MPT_941 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),((17,(19,21)),18,20)))),6)))); tree MPT_942 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),((((17,19),20),18),21)))),6)))); tree MPT_943 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),(((17,19),20),18,21)))),6)))); tree MPT_944 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),((((17,19),20),21),18)))),6)))); tree MPT_945 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),(((17,19),(20,21)),18)))),6)))); tree MPT_946 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),((((17,19),21),20),18)))),6)))); tree MPT_947 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),(((17,19,21),20),18)))),6)))); tree MPT_948 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),(((17,(19,21)),20),18)))),6)))); tree MPT_949 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),((((17,20),19),18),21)))),6)))); tree MPT_950 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),(((17,20),19),18,21)))),6)))); tree MPT_951 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),((((17,20),19),21),18)))),6)))); tree MPT_952 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),((((17,20),21),19),18)))),6)))); tree MPT_953 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),(((17,(20,21)),19),18)))),6)))); tree MPT_954 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),(((17,20,21),19),18)))),6)))); tree MPT_955 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),(((17,20),(19,21)),18)))),6)))); tree MPT_956 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),(((17,(19,20)),18),21)))),6)))); tree MPT_957 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),((17,(19,20)),18,21)))),6)))); tree MPT_958 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),(((17,(19,20)),21),18)))),6)))); tree MPT_959 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),((17,(19,20),21),18)))),6)))); tree MPT_960 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),((17,((19,20),21)),18)))),6)))); tree MPT_961 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),((17,(19,(20,21))),18)))),6)))); tree MPT_962 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),((17,((19,21),20)),18)))),6)))); tree MPT_963 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(((17,18,19),20),21)))),6)))); tree MPT_964 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),((17,18,19),(20,21))))),6)))); tree MPT_965 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(((17,18,19),21),20)))),6)))); tree MPT_966 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),((17,18,19,21),20)))),6)))); tree MPT_967 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),((17,18,(19,21)),20)))),6)))); tree MPT_968 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),((17,18,19,20),21)))),6)))); tree MPT_969 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(17,18,19,20,21)))),6)))); tree MPT_970 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(17,18,19,(20,21))))),6)))); tree MPT_971 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(17,18,(19,21),20)))),6)))); tree MPT_972 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(((17,20),18,19),21)))),6)))); tree MPT_973 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),((17,20),18,19,21)))),6)))); tree MPT_974 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(((17,20),21),18,19)))),6)))); tree MPT_975 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),((17,(20,21)),18,19)))),6)))); tree MPT_976 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),((17,20,21),18,19)))),6)))); tree MPT_977 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),((17,20),18,(19,21))))),6)))); tree MPT_978 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),((17,18,(19,20)),21)))),6)))); tree MPT_979 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(17,18,(19,20),21)))),6)))); tree MPT_980 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(17,18,((19,20),21))))),6)))); tree MPT_981 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(17,18,(19,(20,21)))))),6)))); tree MPT_982 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(17,18,((19,21),20))))),6)))); tree MPT_983 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),(((17,18,19),20),21)))),6)))); tree MPT_984 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),((17,18,19),(20,21))))),6)))); tree MPT_985 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),(((17,18,19),21),20)))),6)))); tree MPT_986 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),((17,18,19,21),20)))),6)))); tree MPT_987 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),((17,18,(19,21)),20)))),6)))); tree MPT_988 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),((17,18,19,20),21)))),6)))); tree MPT_989 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),(17,18,19,20,21)))),6)))); tree MPT_990 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),(17,18,19,(20,21))))),6)))); tree MPT_991 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),(17,18,(19,21),20)))),6)))); tree MPT_992 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),(((17,20),18,19),21)))),6)))); tree MPT_993 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),((17,20),18,19,21)))),6)))); tree MPT_994 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),(((17,20),21),18,19)))),6)))); tree MPT_995 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),((17,(20,21)),18,19)))),6)))); tree MPT_996 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),((17,20,21),18,19)))),6)))); tree MPT_997 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),((17,20),18,(19,21))))),6)))); tree MPT_998 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),((17,18,(19,20)),21)))),6)))); tree MPT_999 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),(17,18,(19,20),21)))),6)))); tree MPT_1000 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),(17,18,((19,20),21))))),6)))); tree MPT_1001 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),(17,18,(19,(20,21)))))),6)))); tree MPT_1002 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),(17,18,((19,21),20))))),6)))); tree MPT_1003 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),(((17,18,19),20),21)))),6)))); tree MPT_1004 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),((17,18,19),(20,21))))),6)))); tree MPT_1005 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),(((17,18,19),21),20)))),6)))); tree MPT_1006 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),((17,18,19,21),20)))),6)))); tree MPT_1007 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),((17,18,(19,21)),20)))),6)))); tree MPT_1008 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),((17,18,19,20),21)))),6)))); tree MPT_1009 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),(17,18,19,20,21)))),6)))); tree MPT_1010 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),(17,18,19,(20,21))))),6)))); tree MPT_1011 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),(17,18,(19,21),20)))),6)))); tree MPT_1012 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),(((17,20),18,19),21)))),6)))); tree MPT_1013 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),((17,20),18,19,21)))),6)))); tree MPT_1014 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),(((17,20),21),18,19)))),6)))); tree MPT_1015 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),((17,(20,21)),18,19)))),6)))); tree MPT_1016 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),((17,20,21),18,19)))),6)))); tree MPT_1017 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),((17,20),18,(19,21))))),6)))); tree MPT_1018 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),((17,18,(19,20)),21)))),6)))); tree MPT_1019 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),(17,18,(19,20),21)))),6)))); tree MPT_1020 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),(17,18,((19,20),21))))),6)))); tree MPT_1021 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),(17,18,(19,(20,21)))))),6)))); tree MPT_1022 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),(17,18,((19,21),20))))),6)))); tree MPT_1023 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),(((17,18,19),20),21)))),6)))); tree MPT_1024 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),((17,18,19),(20,21))))),6)))); tree MPT_1025 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),(((17,18,19),21),20)))),6)))); tree MPT_1026 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),((17,18,19,21),20)))),6)))); tree MPT_1027 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),((17,18,(19,21)),20)))),6)))); tree MPT_1028 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),((17,18,19,20),21)))),6)))); tree MPT_1029 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),(17,18,19,20,21)))),6)))); tree MPT_1030 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),(17,18,19,(20,21))))),6)))); tree MPT_1031 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),(17,18,(19,21),20)))),6)))); tree MPT_1032 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),(((17,20),18,19),21)))),6)))); tree MPT_1033 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),((17,20),18,19,21)))),6)))); tree MPT_1034 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),(((17,20),21),18,19)))),6)))); tree MPT_1035 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),((17,(20,21)),18,19)))),6)))); tree MPT_1036 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),((17,20,21),18,19)))),6)))); tree MPT_1037 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),((17,20),18,(19,21))))),6)))); tree MPT_1038 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),((17,18,(19,20)),21)))),6)))); tree MPT_1039 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),(17,18,(19,20),21)))),6)))); tree MPT_1040 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),(17,18,((19,20),21))))),6)))); tree MPT_1041 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),(17,18,(19,(20,21)))))),6)))); tree MPT_1042 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),(17,18,((19,21),20))))),6)))); tree MPT_1043 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),(((17,18,19),20),21)))),6)))); tree MPT_1044 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),((17,18,19),(20,21))))),6)))); tree MPT_1045 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),(((17,18,19),21),20)))),6)))); tree MPT_1046 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),((17,18,19,21),20)))),6)))); tree MPT_1047 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),((17,18,(19,21)),20)))),6)))); tree MPT_1048 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),((17,18,19,20),21)))),6)))); tree MPT_1049 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),(17,18,19,20,21)))),6)))); tree MPT_1050 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),(17,18,19,(20,21))))),6)))); tree MPT_1051 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),(17,18,(19,21),20)))),6)))); tree MPT_1052 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),(((17,20),18,19),21)))),6)))); tree MPT_1053 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),((17,20),18,19,21)))),6)))); tree MPT_1054 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),(((17,20),21),18,19)))),6)))); tree MPT_1055 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),((17,(20,21)),18,19)))),6)))); tree MPT_1056 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),((17,20,21),18,19)))),6)))); tree MPT_1057 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),((17,20),18,(19,21))))),6)))); tree MPT_1058 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),((17,18,(19,20)),21)))),6)))); tree MPT_1059 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),(17,18,(19,20),21)))),6)))); tree MPT_1060 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),(17,18,((19,20),21))))),6)))); tree MPT_1061 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),(17,18,(19,(20,21)))))),6)))); tree MPT_1062 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),(17,18,((19,21),20))))),6)))); tree MPT_1063 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(((17,(18,19)),20),21)))),6)))); tree MPT_1064 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),((17,(18,19)),(20,21))))),6)))); tree MPT_1065 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(((17,(18,19)),21),20)))),6)))); tree MPT_1066 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),((17,(18,19),21),20)))),6)))); tree MPT_1067 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),((17,((18,19),21)),20)))),6)))); tree MPT_1068 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),((17,(18,19,21)),20)))),6)))); tree MPT_1069 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),((17,(18,(19,21))),20)))),6)))); tree MPT_1070 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(((17,20),(18,19)),21)))),6)))); tree MPT_1071 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(((17,20),21),(18,19))))),6)))); tree MPT_1072 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),((17,(20,21)),(18,19))))),6)))); tree MPT_1073 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),((17,20,21),(18,19))))),6)))); tree MPT_1074 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),((17,20),((18,19),21))))),6)))); tree MPT_1075 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),((17,20),(18,19,21))))),6)))); tree MPT_1076 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),((17,20),(18,(19,21)))))),6)))); tree MPT_1077 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),((17,((18,19),20)),21)))),6)))); tree MPT_1078 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(17,((18,19),20),21)))),6)))); tree MPT_1079 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(17,(((18,19),20),21))))),6)))); tree MPT_1080 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(17,((18,19),(20,21)))))),6)))); tree MPT_1081 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(17,(((18,19),21),20))))),6)))); tree MPT_1082 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(17,((18,19,21),20))))),6)))); tree MPT_1083 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(17,((18,(19,21)),20))))),6)))); tree MPT_1084 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),((17,(18,19,20)),21)))),6)))); tree MPT_1085 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(17,(18,19,20),21)))),6)))); tree MPT_1086 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(17,((18,19,20),21))))),6)))); tree MPT_1087 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(17,(18,19,20,21))))),6)))); tree MPT_1088 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(17,(18,19,(20,21)))))),6)))); tree MPT_1089 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(17,(18,(19,21),20))))),6)))); tree MPT_1090 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),((17,(18,(19,20))),21)))),6)))); tree MPT_1091 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(17,(18,(19,20)),21)))),6)))); tree MPT_1092 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(17,((18,(19,20)),21))))),6)))); tree MPT_1093 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(17,(18,(19,20),21))))),6)))); tree MPT_1094 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(17,(18,((19,20),21)))))),6)))); tree MPT_1095 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(17,(18,(19,(20,21))))))),6)))); tree MPT_1096 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(17,(18,((19,21),20)))))),6)))); tree MPT_1097 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),(((17,(18,19)),20),21)))),6)))); tree MPT_1098 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),((17,(18,19)),(20,21))))),6)))); tree MPT_1099 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),(((17,(18,19)),21),20)))),6)))); tree MPT_1100 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),((17,(18,19),21),20)))),6)))); tree MPT_1101 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),((17,((18,19),21)),20)))),6)))); tree MPT_1102 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),((17,(18,19,21)),20)))),6)))); tree MPT_1103 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),((17,(18,(19,21))),20)))),6)))); tree MPT_1104 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),(((17,20),(18,19)),21)))),6)))); tree MPT_1105 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),(((17,20),21),(18,19))))),6)))); tree MPT_1106 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),((17,(20,21)),(18,19))))),6)))); tree MPT_1107 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),((17,20,21),(18,19))))),6)))); tree MPT_1108 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),((17,20),((18,19),21))))),6)))); tree MPT_1109 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),((17,20),(18,19,21))))),6)))); tree MPT_1110 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),((17,20),(18,(19,21)))))),6)))); tree MPT_1111 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),((17,((18,19),20)),21)))),6)))); tree MPT_1112 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),(17,((18,19),20),21)))),6)))); tree MPT_1113 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),(17,(((18,19),20),21))))),6)))); tree MPT_1114 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),(17,((18,19),(20,21)))))),6)))); tree MPT_1115 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),(17,(((18,19),21),20))))),6)))); tree MPT_1116 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),(17,((18,19,21),20))))),6)))); tree MPT_1117 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),(17,((18,(19,21)),20))))),6)))); tree MPT_1118 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),((17,(18,19,20)),21)))),6)))); tree MPT_1119 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),(17,(18,19,20),21)))),6)))); tree MPT_1120 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),(17,((18,19,20),21))))),6)))); tree MPT_1121 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),(17,(18,19,20,21))))),6)))); tree MPT_1122 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),(17,(18,19,(20,21)))))),6)))); tree MPT_1123 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),(17,(18,(19,21),20))))),6)))); tree MPT_1124 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),((17,(18,(19,20))),21)))),6)))); tree MPT_1125 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),(17,(18,(19,20)),21)))),6)))); tree MPT_1126 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),(17,((18,(19,20)),21))))),6)))); tree MPT_1127 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),(17,(18,(19,20),21))))),6)))); tree MPT_1128 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),(17,(18,((19,20),21)))))),6)))); tree MPT_1129 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),(17,(18,(19,(20,21))))))),6)))); tree MPT_1130 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),(17,(18,((19,21),20)))))),6)))); tree MPT_1131 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),(((17,(18,19)),20),21)))),6)))); tree MPT_1132 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),((17,(18,19)),(20,21))))),6)))); tree MPT_1133 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),(((17,(18,19)),21),20)))),6)))); tree MPT_1134 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),((17,(18,19),21),20)))),6)))); tree MPT_1135 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),((17,((18,19),21)),20)))),6)))); tree MPT_1136 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),((17,(18,19,21)),20)))),6)))); tree MPT_1137 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),((17,(18,(19,21))),20)))),6)))); tree MPT_1138 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),(((17,20),(18,19)),21)))),6)))); tree MPT_1139 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),(((17,20),21),(18,19))))),6)))); tree MPT_1140 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),((17,(20,21)),(18,19))))),6)))); tree MPT_1141 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),((17,20,21),(18,19))))),6)))); tree MPT_1142 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),((17,20),((18,19),21))))),6)))); tree MPT_1143 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),((17,20),(18,19,21))))),6)))); tree MPT_1144 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),((17,20),(18,(19,21)))))),6)))); tree MPT_1145 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),((17,((18,19),20)),21)))),6)))); tree MPT_1146 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),(17,((18,19),20),21)))),6)))); tree MPT_1147 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),(17,(((18,19),20),21))))),6)))); tree MPT_1148 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),(17,((18,19),(20,21)))))),6)))); tree MPT_1149 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),(17,(((18,19),21),20))))),6)))); tree MPT_1150 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),(17,((18,19,21),20))))),6)))); tree MPT_1151 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),(17,((18,(19,21)),20))))),6)))); tree MPT_1152 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),((17,(18,19,20)),21)))),6)))); tree MPT_1153 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),(17,(18,19,20),21)))),6)))); tree MPT_1154 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),(17,((18,19,20),21))))),6)))); tree MPT_1155 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),(17,(18,19,20,21))))),6)))); tree MPT_1156 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),(17,(18,19,(20,21)))))),6)))); tree MPT_1157 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),(17,(18,(19,21),20))))),6)))); tree MPT_1158 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),((17,(18,(19,20))),21)))),6)))); tree MPT_1159 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),(17,(18,(19,20)),21)))),6)))); tree MPT_1160 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),(17,((18,(19,20)),21))))),6)))); tree MPT_1161 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),(17,(18,(19,20),21))))),6)))); tree MPT_1162 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),(17,(18,((19,20),21)))))),6)))); tree MPT_1163 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),(17,(18,(19,(20,21))))))),6)))); tree MPT_1164 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,16),15)))),9),(17,(18,((19,21),20)))))),6)))); tree MPT_1165 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),(((17,(18,19)),20),21)))),6)))); tree MPT_1166 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),((17,(18,19)),(20,21))))),6)))); tree MPT_1167 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),(((17,(18,19)),21),20)))),6)))); tree MPT_1168 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),((17,(18,19),21),20)))),6)))); tree MPT_1169 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),((17,((18,19),21)),20)))),6)))); tree MPT_1170 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),((17,(18,19,21)),20)))),6)))); tree MPT_1171 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),((17,(18,(19,21))),20)))),6)))); tree MPT_1172 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),(((17,20),(18,19)),21)))),6)))); tree MPT_1173 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),(((17,20),21),(18,19))))),6)))); tree MPT_1174 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),((17,(20,21)),(18,19))))),6)))); tree MPT_1175 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),((17,20,21),(18,19))))),6)))); tree MPT_1176 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),((17,20),((18,19),21))))),6)))); tree MPT_1177 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),((17,20),(18,19,21))))),6)))); tree MPT_1178 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),((17,20),(18,(19,21)))))),6)))); tree MPT_1179 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),((17,((18,19),20)),21)))),6)))); tree MPT_1180 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),(17,((18,19),20),21)))),6)))); tree MPT_1181 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),(17,(((18,19),20),21))))),6)))); tree MPT_1182 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),(17,((18,19),(20,21)))))),6)))); tree MPT_1183 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),(17,(((18,19),21),20))))),6)))); tree MPT_1184 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),(17,((18,19,21),20))))),6)))); tree MPT_1185 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),(17,((18,(19,21)),20))))),6)))); tree MPT_1186 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),((17,(18,19,20)),21)))),6)))); tree MPT_1187 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),(17,(18,19,20),21)))),6)))); tree MPT_1188 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),(17,((18,19,20),21))))),6)))); tree MPT_1189 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),(17,(18,19,20,21))))),6)))); tree MPT_1190 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),(17,(18,19,(20,21)))))),6)))); tree MPT_1191 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),(17,(18,(19,21),20))))),6)))); tree MPT_1192 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),((17,(18,(19,20))),21)))),6)))); tree MPT_1193 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),(17,(18,(19,20)),21)))),6)))); tree MPT_1194 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),(17,((18,(19,20)),21))))),6)))); tree MPT_1195 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),(17,(18,(19,20),21))))),6)))); tree MPT_1196 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),(17,(18,((19,20),21)))))),6)))); tree MPT_1197 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),(17,(18,(19,(20,21))))))),6)))); tree MPT_1198 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,16),15)))),9),(17,(18,((19,21),20)))))),6)))); tree MPT_1199 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),(((17,(18,19)),20),21)))),6)))); tree MPT_1200 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),((17,(18,19)),(20,21))))),6)))); tree MPT_1201 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),(((17,(18,19)),21),20)))),6)))); tree MPT_1202 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),((17,(18,19),21),20)))),6)))); tree MPT_1203 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),((17,((18,19),21)),20)))),6)))); tree MPT_1204 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),((17,(18,19,21)),20)))),6)))); tree MPT_1205 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),((17,(18,(19,21))),20)))),6)))); tree MPT_1206 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),(((17,20),(18,19)),21)))),6)))); tree MPT_1207 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),(((17,20),21),(18,19))))),6)))); tree MPT_1208 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),((17,(20,21)),(18,19))))),6)))); tree MPT_1209 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),((17,20,21),(18,19))))),6)))); tree MPT_1210 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),((17,20),((18,19),21))))),6)))); tree MPT_1211 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),((17,20),(18,19,21))))),6)))); tree MPT_1212 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),((17,20),(18,(19,21)))))),6)))); tree MPT_1213 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),((17,((18,19),20)),21)))),6)))); tree MPT_1214 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),(17,((18,19),20),21)))),6)))); tree MPT_1215 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),(17,(((18,19),20),21))))),6)))); tree MPT_1216 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),(17,((18,19),(20,21)))))),6)))); tree MPT_1217 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),(17,(((18,19),21),20))))),6)))); tree MPT_1218 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),(17,((18,19,21),20))))),6)))); tree MPT_1219 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),(17,((18,(19,21)),20))))),6)))); tree MPT_1220 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),((17,(18,19,20)),21)))),6)))); tree MPT_1221 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),(17,(18,19,20),21)))),6)))); tree MPT_1222 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),(17,((18,19,20),21))))),6)))); tree MPT_1223 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),(17,(18,19,20,21))))),6)))); tree MPT_1224 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),(17,(18,19,(20,21)))))),6)))); tree MPT_1225 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),(17,(18,(19,21),20))))),6)))); tree MPT_1226 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),((17,(18,(19,20))),21)))),6)))); tree MPT_1227 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),(17,(18,(19,20)),21)))),6)))); tree MPT_1228 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),(17,((18,(19,20)),21))))),6)))); tree MPT_1229 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),(17,(18,(19,20),21))))),6)))); tree MPT_1230 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),(17,(18,((19,20),21)))))),6)))); tree MPT_1231 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),(17,(18,(19,(20,21))))))),6)))); tree MPT_1232 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,16),15))))),9),(17,(18,((19,21),20)))))),6)))); tree MPT_1233 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),((((17,19),18),20),21)))),6)))); tree MPT_1234 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),(((17,19),18),(20,21))))),6)))); tree MPT_1235 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),((((17,19),18),21),20)))),6)))); tree MPT_1236 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),(((17,19),18,21),20)))),6)))); tree MPT_1237 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),((((17,19),21),18),20)))),6)))); tree MPT_1238 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),(((17,19,21),18),20)))),6)))); tree MPT_1239 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),(((17,(19,21)),18),20)))),6)))); tree MPT_1240 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),(((17,19),18,20),21)))),6)))); tree MPT_1241 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),((17,19),18,20,21)))),6)))); tree MPT_1242 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),((17,19),18,(20,21))))),6)))); tree MPT_1243 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),(((17,19),21),18,20)))),6)))); tree MPT_1244 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),((17,19,21),18,20)))),6)))); tree MPT_1245 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),((17,(19,21)),18,20)))),6)))); tree MPT_1246 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),((((17,19),20),18),21)))),6)))); tree MPT_1247 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),(((17,19),20),18,21)))),6)))); tree MPT_1248 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),((((17,19),20),21),18)))),6)))); tree MPT_1249 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),(((17,19),(20,21)),18)))),6)))); tree MPT_1250 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),((((17,19),21),20),18)))),6)))); tree MPT_1251 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),(((17,19,21),20),18)))),6)))); tree MPT_1252 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),(((17,(19,21)),20),18)))),6)))); tree MPT_1253 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),((((17,20),19),18),21)))),6)))); tree MPT_1254 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),(((17,20),19),18,21)))),6)))); tree MPT_1255 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),((((17,20),19),21),18)))),6)))); tree MPT_1256 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),((((17,20),21),19),18)))),6)))); tree MPT_1257 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),(((17,(20,21)),19),18)))),6)))); tree MPT_1258 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),(((17,20,21),19),18)))),6)))); tree MPT_1259 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),(((17,20),(19,21)),18)))),6)))); tree MPT_1260 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),(((17,(19,20)),18),21)))),6)))); tree MPT_1261 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),((17,(19,20)),18,21)))),6)))); tree MPT_1262 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),(((17,(19,20)),21),18)))),6)))); tree MPT_1263 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),((17,(19,20),21),18)))),6)))); tree MPT_1264 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),((17,((19,20),21)),18)))),6)))); tree MPT_1265 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),((17,(19,(20,21))),18)))),6)))); tree MPT_1266 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),((17,((19,21),20)),18)))),6)))); tree MPT_1267 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),((((17,19),18),20),21)))),6)))); tree MPT_1268 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),(((17,19),18),(20,21))))),6)))); tree MPT_1269 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),((((17,19),18),21),20)))),6)))); tree MPT_1270 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),(((17,19),18,21),20)))),6)))); tree MPT_1271 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),((((17,19),21),18),20)))),6)))); tree MPT_1272 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),(((17,19,21),18),20)))),6)))); tree MPT_1273 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),(((17,(19,21)),18),20)))),6)))); tree MPT_1274 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),(((17,19),18,20),21)))),6)))); tree MPT_1275 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),((17,19),18,20,21)))),6)))); tree MPT_1276 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),((17,19),18,(20,21))))),6)))); tree MPT_1277 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),(((17,19),21),18,20)))),6)))); tree MPT_1278 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),((17,19,21),18,20)))),6)))); tree MPT_1279 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),((17,(19,21)),18,20)))),6)))); tree MPT_1280 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),((((17,19),20),18),21)))),6)))); tree MPT_1281 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),(((17,19),20),18,21)))),6)))); tree MPT_1282 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),((((17,19),20),21),18)))),6)))); tree MPT_1283 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),(((17,19),(20,21)),18)))),6)))); tree MPT_1284 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),((((17,19),21),20),18)))),6)))); tree MPT_1285 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),(((17,19,21),20),18)))),6)))); tree MPT_1286 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),(((17,(19,21)),20),18)))),6)))); tree MPT_1287 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),((((17,20),19),18),21)))),6)))); tree MPT_1288 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),(((17,20),19),18,21)))),6)))); tree MPT_1289 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),((((17,20),19),21),18)))),6)))); tree MPT_1290 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),((((17,20),21),19),18)))),6)))); tree MPT_1291 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),(((17,(20,21)),19),18)))),6)))); tree MPT_1292 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),(((17,20,21),19),18)))),6)))); tree MPT_1293 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),(((17,20),(19,21)),18)))),6)))); tree MPT_1294 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),(((17,(19,20)),18),21)))),6)))); tree MPT_1295 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),((17,(19,20)),18,21)))),6)))); tree MPT_1296 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),(((17,(19,20)),21),18)))),6)))); tree MPT_1297 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),((17,(19,20),21),18)))),6)))); tree MPT_1298 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),((17,((19,20),21)),18)))),6)))); tree MPT_1299 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),((17,(19,(20,21))),18)))),6)))); tree MPT_1300 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),((17,((19,21),20)),18)))),6)))); tree MPT_1301 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),((((17,19),18),20),21)))),6)))); tree MPT_1302 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),(((17,19),18),(20,21))))),6)))); tree MPT_1303 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),((((17,19),18),21),20)))),6)))); tree MPT_1304 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),(((17,19),18,21),20)))),6)))); tree MPT_1305 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),((((17,19),21),18),20)))),6)))); tree MPT_1306 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),(((17,19,21),18),20)))),6)))); tree MPT_1307 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),(((17,(19,21)),18),20)))),6)))); tree MPT_1308 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),(((17,19),18,20),21)))),6)))); tree MPT_1309 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),((17,19),18,20,21)))),6)))); tree MPT_1310 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),((17,19),18,(20,21))))),6)))); tree MPT_1311 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),(((17,19),21),18,20)))),6)))); tree MPT_1312 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),((17,19,21),18,20)))),6)))); tree MPT_1313 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),((17,(19,21)),18,20)))),6)))); tree MPT_1314 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),((((17,19),20),18),21)))),6)))); tree MPT_1315 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),(((17,19),20),18,21)))),6)))); tree MPT_1316 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),((((17,19),20),21),18)))),6)))); tree MPT_1317 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),(((17,19),(20,21)),18)))),6)))); tree MPT_1318 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),((((17,19),21),20),18)))),6)))); tree MPT_1319 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),(((17,19,21),20),18)))),6)))); tree MPT_1320 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),(((17,(19,21)),20),18)))),6)))); tree MPT_1321 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),((((17,20),19),18),21)))),6)))); tree MPT_1322 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),(((17,20),19),18,21)))),6)))); tree MPT_1323 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),((((17,20),19),21),18)))),6)))); tree MPT_1324 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),((((17,20),21),19),18)))),6)))); tree MPT_1325 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),(((17,(20,21)),19),18)))),6)))); tree MPT_1326 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),(((17,20,21),19),18)))),6)))); tree MPT_1327 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),(((17,20),(19,21)),18)))),6)))); tree MPT_1328 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),(((17,(19,20)),18),21)))),6)))); tree MPT_1329 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),((17,(19,20)),18,21)))),6)))); tree MPT_1330 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),(((17,(19,20)),21),18)))),6)))); tree MPT_1331 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),((17,(19,20),21),18)))),6)))); tree MPT_1332 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),((17,((19,20),21)),18)))),6)))); tree MPT_1333 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),((17,(19,(20,21))),18)))),6)))); tree MPT_1334 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),((17,((19,21),20)),18)))),6)))); tree MPT_1335 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),((((17,19),18),20),21)))),6)))); tree MPT_1336 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),(((17,19),18),(20,21))))),6)))); tree MPT_1337 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),((((17,19),18),21),20)))),6)))); tree MPT_1338 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),(((17,19),18,21),20)))),6)))); tree MPT_1339 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),((((17,19),21),18),20)))),6)))); tree MPT_1340 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),(((17,19,21),18),20)))),6)))); tree MPT_1341 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),(((17,(19,21)),18),20)))),6)))); tree MPT_1342 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),(((17,19),18,20),21)))),6)))); tree MPT_1343 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),((17,19),18,20,21)))),6)))); tree MPT_1344 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),((17,19),18,(20,21))))),6)))); tree MPT_1345 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),(((17,19),21),18,20)))),6)))); tree MPT_1346 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),((17,19,21),18,20)))),6)))); tree MPT_1347 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),((17,(19,21)),18,20)))),6)))); tree MPT_1348 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),((((17,19),20),18),21)))),6)))); tree MPT_1349 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),(((17,19),20),18,21)))),6)))); tree MPT_1350 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),((((17,19),20),21),18)))),6)))); tree MPT_1351 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),(((17,19),(20,21)),18)))),6)))); tree MPT_1352 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),((((17,19),21),20),18)))),6)))); tree MPT_1353 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),(((17,19,21),20),18)))),6)))); tree MPT_1354 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),(((17,(19,21)),20),18)))),6)))); tree MPT_1355 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),((((17,20),19),18),21)))),6)))); tree MPT_1356 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),(((17,20),19),18,21)))),6)))); tree MPT_1357 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),((((17,20),19),21),18)))),6)))); tree MPT_1358 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),((((17,20),21),19),18)))),6)))); tree MPT_1359 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),(((17,(20,21)),19),18)))),6)))); tree MPT_1360 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),(((17,20,21),19),18)))),6)))); tree MPT_1361 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),(((17,20),(19,21)),18)))),6)))); tree MPT_1362 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),(((17,(19,20)),18),21)))),6)))); tree MPT_1363 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),((17,(19,20)),18,21)))),6)))); tree MPT_1364 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),(((17,(19,20)),21),18)))),6)))); tree MPT_1365 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),((17,(19,20),21),18)))),6)))); tree MPT_1366 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),((17,((19,20),21)),18)))),6)))); tree MPT_1367 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),((17,(19,(20,21))),18)))),6)))); tree MPT_1368 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),((17,((19,21),20)),18)))),6)))); tree MPT_1369 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),((((17,19),18),20),21)))),6)))); tree MPT_1370 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),(((17,19),18),(20,21))))),6)))); tree MPT_1371 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),((((17,19),18),21),20)))),6)))); tree MPT_1372 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),(((17,19),18,21),20)))),6)))); tree MPT_1373 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),((((17,19),21),18),20)))),6)))); tree MPT_1374 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),(((17,19,21),18),20)))),6)))); tree MPT_1375 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),(((17,(19,21)),18),20)))),6)))); tree MPT_1376 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),(((17,19),18,20),21)))),6)))); tree MPT_1377 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),((17,19),18,20,21)))),6)))); tree MPT_1378 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),((17,19),18,(20,21))))),6)))); tree MPT_1379 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),(((17,19),21),18,20)))),6)))); tree MPT_1380 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),((17,19,21),18,20)))),6)))); tree MPT_1381 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),((17,(19,21)),18,20)))),6)))); tree MPT_1382 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),((((17,19),20),18),21)))),6)))); tree MPT_1383 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),(((17,19),20),18,21)))),6)))); tree MPT_1384 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),((((17,19),20),21),18)))),6)))); tree MPT_1385 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),(((17,19),(20,21)),18)))),6)))); tree MPT_1386 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),((((17,19),21),20),18)))),6)))); tree MPT_1387 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),(((17,19,21),20),18)))),6)))); tree MPT_1388 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),(((17,(19,21)),20),18)))),6)))); tree MPT_1389 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),((((17,20),19),18),21)))),6)))); tree MPT_1390 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),(((17,20),19),18,21)))),6)))); tree MPT_1391 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),((((17,20),19),21),18)))),6)))); tree MPT_1392 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),((((17,20),21),19),18)))),6)))); tree MPT_1393 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),(((17,(20,21)),19),18)))),6)))); tree MPT_1394 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),(((17,20,21),19),18)))),6)))); tree MPT_1395 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),(((17,20),(19,21)),18)))),6)))); tree MPT_1396 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),(((17,(19,20)),18),21)))),6)))); tree MPT_1397 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),((17,(19,20)),18,21)))),6)))); tree MPT_1398 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),(((17,(19,20)),21),18)))),6)))); tree MPT_1399 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),((17,(19,20),21),18)))),6)))); tree MPT_1400 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),((17,((19,20),21)),18)))),6)))); tree MPT_1401 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),((17,(19,(20,21))),18)))),6)))); tree MPT_1402 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),((17,((19,21),20)),18)))),6)))); tree MPT_1403 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),(((17,18,19),20),21)))),6)))); tree MPT_1404 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),((17,18,19),(20,21))))),6)))); tree MPT_1405 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),(((17,18,19),21),20)))),6)))); tree MPT_1406 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),((17,18,19,21),20)))),6)))); tree MPT_1407 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),((17,18,(19,21)),20)))),6)))); tree MPT_1408 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),((17,18,19,20),21)))),6)))); tree MPT_1409 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),(17,18,19,20,21)))),6)))); tree MPT_1410 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),(17,18,19,(20,21))))),6)))); tree MPT_1411 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),(17,18,(19,21),20)))),6)))); tree MPT_1412 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),(((17,20),18,19),21)))),6)))); tree MPT_1413 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),((17,20),18,19,21)))),6)))); tree MPT_1414 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),(((17,20),21),18,19)))),6)))); tree MPT_1415 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),((17,(20,21)),18,19)))),6)))); tree MPT_1416 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),((17,20,21),18,19)))),6)))); tree MPT_1417 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),((17,20),18,(19,21))))),6)))); tree MPT_1418 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),((17,18,(19,20)),21)))),6)))); tree MPT_1419 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),(17,18,(19,20),21)))),6)))); tree MPT_1420 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),(17,18,((19,20),21))))),6)))); tree MPT_1421 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),(17,18,(19,(20,21)))))),6)))); tree MPT_1422 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),(17,18,((19,21),20))))),6)))); tree MPT_1423 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),(((17,18,19),20),21)))),6)))); tree MPT_1424 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),((17,18,19),(20,21))))),6)))); tree MPT_1425 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),(((17,18,19),21),20)))),6)))); tree MPT_1426 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),((17,18,19,21),20)))),6)))); tree MPT_1427 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),((17,18,(19,21)),20)))),6)))); tree MPT_1428 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),((17,18,19,20),21)))),6)))); tree MPT_1429 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),(17,18,19,20,21)))),6)))); tree MPT_1430 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),(17,18,19,(20,21))))),6)))); tree MPT_1431 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),(17,18,(19,21),20)))),6)))); tree MPT_1432 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),(((17,20),18,19),21)))),6)))); tree MPT_1433 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),((17,20),18,19,21)))),6)))); tree MPT_1434 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),(((17,20),21),18,19)))),6)))); tree MPT_1435 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),((17,(20,21)),18,19)))),6)))); tree MPT_1436 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),((17,20,21),18,19)))),6)))); tree MPT_1437 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),((17,20),18,(19,21))))),6)))); tree MPT_1438 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),((17,18,(19,20)),21)))),6)))); tree MPT_1439 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),(17,18,(19,20),21)))),6)))); tree MPT_1440 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),(17,18,((19,20),21))))),6)))); tree MPT_1441 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),(17,18,(19,(20,21)))))),6)))); tree MPT_1442 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),(17,18,((19,21),20))))),6)))); tree MPT_1443 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),(((17,18,19),20),21)))),6)))); tree MPT_1444 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),((17,18,19),(20,21))))),6)))); tree MPT_1445 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),(((17,18,19),21),20)))),6)))); tree MPT_1446 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),((17,18,19,21),20)))),6)))); tree MPT_1447 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),((17,18,(19,21)),20)))),6)))); tree MPT_1448 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),((17,18,19,20),21)))),6)))); tree MPT_1449 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),(17,18,19,20,21)))),6)))); tree MPT_1450 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),(17,18,19,(20,21))))),6)))); tree MPT_1451 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),(17,18,(19,21),20)))),6)))); tree MPT_1452 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),(((17,20),18,19),21)))),6)))); tree MPT_1453 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),((17,20),18,19,21)))),6)))); tree MPT_1454 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),(((17,20),21),18,19)))),6)))); tree MPT_1455 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),((17,(20,21)),18,19)))),6)))); tree MPT_1456 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),((17,20,21),18,19)))),6)))); tree MPT_1457 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),((17,20),18,(19,21))))),6)))); tree MPT_1458 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),((17,18,(19,20)),21)))),6)))); tree MPT_1459 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),(17,18,(19,20),21)))),6)))); tree MPT_1460 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),(17,18,((19,20),21))))),6)))); tree MPT_1461 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),(17,18,(19,(20,21)))))),6)))); tree MPT_1462 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),(17,18,((19,21),20))))),6)))); tree MPT_1463 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),(((17,18,19),20),21)))),6)))); tree MPT_1464 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),((17,18,19),(20,21))))),6)))); tree MPT_1465 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),(((17,18,19),21),20)))),6)))); tree MPT_1466 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),((17,18,19,21),20)))),6)))); tree MPT_1467 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),((17,18,(19,21)),20)))),6)))); tree MPT_1468 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),((17,18,19,20),21)))),6)))); tree MPT_1469 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),(17,18,19,20,21)))),6)))); tree MPT_1470 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),(17,18,19,(20,21))))),6)))); tree MPT_1471 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),(17,18,(19,21),20)))),6)))); tree MPT_1472 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),(((17,20),18,19),21)))),6)))); tree MPT_1473 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),((17,20),18,19,21)))),6)))); tree MPT_1474 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),(((17,20),21),18,19)))),6)))); tree MPT_1475 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),((17,(20,21)),18,19)))),6)))); tree MPT_1476 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),((17,20,21),18,19)))),6)))); tree MPT_1477 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),((17,20),18,(19,21))))),6)))); tree MPT_1478 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),((17,18,(19,20)),21)))),6)))); tree MPT_1479 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),(17,18,(19,20),21)))),6)))); tree MPT_1480 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),(17,18,((19,20),21))))),6)))); tree MPT_1481 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),(17,18,(19,(20,21)))))),6)))); tree MPT_1482 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),(17,18,((19,21),20))))),6)))); tree MPT_1483 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),(((17,18,19),20),21)))),6)))); tree MPT_1484 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),((17,18,19),(20,21))))),6)))); tree MPT_1485 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),(((17,18,19),21),20)))),6)))); tree MPT_1486 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),((17,18,19,21),20)))),6)))); tree MPT_1487 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),((17,18,(19,21)),20)))),6)))); tree MPT_1488 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),((17,18,19,20),21)))),6)))); tree MPT_1489 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),(17,18,19,20,21)))),6)))); tree MPT_1490 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),(17,18,19,(20,21))))),6)))); tree MPT_1491 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),(17,18,(19,21),20)))),6)))); tree MPT_1492 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),(((17,20),18,19),21)))),6)))); tree MPT_1493 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),((17,20),18,19,21)))),6)))); tree MPT_1494 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),(((17,20),21),18,19)))),6)))); tree MPT_1495 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),((17,(20,21)),18,19)))),6)))); tree MPT_1496 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),((17,20,21),18,19)))),6)))); tree MPT_1497 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),((17,20),18,(19,21))))),6)))); tree MPT_1498 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),((17,18,(19,20)),21)))),6)))); tree MPT_1499 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),(17,18,(19,20),21)))),6)))); tree MPT_1500 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),(17,18,((19,20),21))))),6)))); tree MPT_1501 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),(17,18,(19,(20,21)))))),6)))); tree MPT_1502 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),(17,18,((19,21),20))))),6)))); tree MPT_1503 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),(((17,(18,19)),20),21)))),6)))); tree MPT_1504 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),((17,(18,19)),(20,21))))),6)))); tree MPT_1505 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),(((17,(18,19)),21),20)))),6)))); tree MPT_1506 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),((17,(18,19),21),20)))),6)))); tree MPT_1507 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),((17,((18,19),21)),20)))),6)))); tree MPT_1508 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),((17,(18,19,21)),20)))),6)))); tree MPT_1509 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),((17,(18,(19,21))),20)))),6)))); tree MPT_1510 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),(((17,20),(18,19)),21)))),6)))); tree MPT_1511 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),(((17,20),21),(18,19))))),6)))); tree MPT_1512 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),((17,(20,21)),(18,19))))),6)))); tree MPT_1513 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),((17,20,21),(18,19))))),6)))); tree MPT_1514 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),((17,20),((18,19),21))))),6)))); tree MPT_1515 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),((17,20),(18,19,21))))),6)))); tree MPT_1516 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),((17,20),(18,(19,21)))))),6)))); tree MPT_1517 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),((17,((18,19),20)),21)))),6)))); tree MPT_1518 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),(17,((18,19),20),21)))),6)))); tree MPT_1519 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),(17,(((18,19),20),21))))),6)))); tree MPT_1520 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),(17,((18,19),(20,21)))))),6)))); tree MPT_1521 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),(17,(((18,19),21),20))))),6)))); tree MPT_1522 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),(17,((18,19,21),20))))),6)))); tree MPT_1523 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),(17,((18,(19,21)),20))))),6)))); tree MPT_1524 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),((17,(18,19,20)),21)))),6)))); tree MPT_1525 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),(17,(18,19,20),21)))),6)))); tree MPT_1526 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),(17,((18,19,20),21))))),6)))); tree MPT_1527 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),(17,(18,19,20,21))))),6)))); tree MPT_1528 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),(17,(18,19,(20,21)))))),6)))); tree MPT_1529 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),(17,(18,(19,21),20))))),6)))); tree MPT_1530 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),((17,(18,(19,20))),21)))),6)))); tree MPT_1531 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),(17,(18,(19,20)),21)))),6)))); tree MPT_1532 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),(17,((18,(19,20)),21))))),6)))); tree MPT_1533 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),(17,(18,(19,20),21))))),6)))); tree MPT_1534 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),(17,(18,((19,20),21)))))),6)))); tree MPT_1535 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),(17,(18,(19,(20,21))))))),6)))); tree MPT_1536 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,((14,15),16))),11)),9),(17,(18,((19,21),20)))))),6)))); tree MPT_1537 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),(((17,(18,19)),20),21)))),6)))); tree MPT_1538 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),((17,(18,19)),(20,21))))),6)))); tree MPT_1539 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),(((17,(18,19)),21),20)))),6)))); tree MPT_1540 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),((17,(18,19),21),20)))),6)))); tree MPT_1541 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),((17,((18,19),21)),20)))),6)))); tree MPT_1542 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),((17,(18,19,21)),20)))),6)))); tree MPT_1543 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),((17,(18,(19,21))),20)))),6)))); tree MPT_1544 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),(((17,20),(18,19)),21)))),6)))); tree MPT_1545 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),(((17,20),21),(18,19))))),6)))); tree MPT_1546 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),((17,(20,21)),(18,19))))),6)))); tree MPT_1547 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),((17,20,21),(18,19))))),6)))); tree MPT_1548 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),((17,20),((18,19),21))))),6)))); tree MPT_1549 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),((17,20),(18,19,21))))),6)))); tree MPT_1550 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),((17,20),(18,(19,21)))))),6)))); tree MPT_1551 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),((17,((18,19),20)),21)))),6)))); tree MPT_1552 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),(17,((18,19),20),21)))),6)))); tree MPT_1553 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),(17,(((18,19),20),21))))),6)))); tree MPT_1554 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),(17,((18,19),(20,21)))))),6)))); tree MPT_1555 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),(17,(((18,19),21),20))))),6)))); tree MPT_1556 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),(17,((18,19,21),20))))),6)))); tree MPT_1557 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),(17,((18,(19,21)),20))))),6)))); tree MPT_1558 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),((17,(18,19,20)),21)))),6)))); tree MPT_1559 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),(17,(18,19,20),21)))),6)))); tree MPT_1560 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),(17,((18,19,20),21))))),6)))); tree MPT_1561 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),(17,(18,19,20,21))))),6)))); tree MPT_1562 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),(17,(18,19,(20,21)))))),6)))); tree MPT_1563 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),(17,(18,(19,21),20))))),6)))); tree MPT_1564 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),((17,(18,(19,20))),21)))),6)))); tree MPT_1565 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),(17,(18,(19,20)),21)))),6)))); tree MPT_1566 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),(17,((18,(19,20)),21))))),6)))); tree MPT_1567 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),(17,(18,(19,20),21))))),6)))); tree MPT_1568 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),(17,(18,((19,20),21)))))),6)))); tree MPT_1569 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),(17,(18,(19,(20,21))))))),6)))); tree MPT_1570 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,((14,15),16)))),9),(17,(18,((19,21),20)))))),6)))); tree MPT_1571 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),(((17,(18,19)),20),21)))),6)))); tree MPT_1572 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),((17,(18,19)),(20,21))))),6)))); tree MPT_1573 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),(((17,(18,19)),21),20)))),6)))); tree MPT_1574 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),((17,(18,19),21),20)))),6)))); tree MPT_1575 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),((17,((18,19),21)),20)))),6)))); tree MPT_1576 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),((17,(18,19,21)),20)))),6)))); tree MPT_1577 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),((17,(18,(19,21))),20)))),6)))); tree MPT_1578 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),(((17,20),(18,19)),21)))),6)))); tree MPT_1579 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),(((17,20),21),(18,19))))),6)))); tree MPT_1580 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),((17,(20,21)),(18,19))))),6)))); tree MPT_1581 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),((17,20,21),(18,19))))),6)))); tree MPT_1582 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),((17,20),((18,19),21))))),6)))); tree MPT_1583 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),((17,20),(18,19,21))))),6)))); tree MPT_1584 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),((17,20),(18,(19,21)))))),6)))); tree MPT_1585 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),((17,((18,19),20)),21)))),6)))); tree MPT_1586 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),(17,((18,19),20),21)))),6)))); tree MPT_1587 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),(17,(((18,19),20),21))))),6)))); tree MPT_1588 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),(17,((18,19),(20,21)))))),6)))); tree MPT_1589 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),(17,(((18,19),21),20))))),6)))); tree MPT_1590 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),(17,((18,19,21),20))))),6)))); tree MPT_1591 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),(17,((18,(19,21)),20))))),6)))); tree MPT_1592 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),((17,(18,19,20)),21)))),6)))); tree MPT_1593 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),(17,(18,19,20),21)))),6)))); tree MPT_1594 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),(17,((18,19,20),21))))),6)))); tree MPT_1595 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),(17,(18,19,20,21))))),6)))); tree MPT_1596 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),(17,(18,19,(20,21)))))),6)))); tree MPT_1597 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),(17,(18,(19,21),20))))),6)))); tree MPT_1598 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),((17,(18,(19,20))),21)))),6)))); tree MPT_1599 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),(17,(18,(19,20)),21)))),6)))); tree MPT_1600 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),(17,((18,(19,20)),21))))),6)))); tree MPT_1601 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),(17,(18,(19,20),21))))),6)))); tree MPT_1602 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),(17,(18,((19,20),21)))))),6)))); tree MPT_1603 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),(17,(18,(19,(20,21))))))),6)))); tree MPT_1604 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,((14,15),16)))),9),(17,(18,((19,21),20)))))),6)))); tree MPT_1605 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),(((17,(18,19)),20),21)))),6)))); tree MPT_1606 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),((17,(18,19)),(20,21))))),6)))); tree MPT_1607 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),(((17,(18,19)),21),20)))),6)))); tree MPT_1608 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),((17,(18,19),21),20)))),6)))); tree MPT_1609 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),((17,((18,19),21)),20)))),6)))); tree MPT_1610 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),((17,(18,19,21)),20)))),6)))); tree MPT_1611 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),((17,(18,(19,21))),20)))),6)))); tree MPT_1612 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),(((17,20),(18,19)),21)))),6)))); tree MPT_1613 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),(((17,20),21),(18,19))))),6)))); tree MPT_1614 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),((17,(20,21)),(18,19))))),6)))); tree MPT_1615 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),((17,20,21),(18,19))))),6)))); tree MPT_1616 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),((17,20),((18,19),21))))),6)))); tree MPT_1617 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),((17,20),(18,19,21))))),6)))); tree MPT_1618 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),((17,20),(18,(19,21)))))),6)))); tree MPT_1619 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),((17,((18,19),20)),21)))),6)))); tree MPT_1620 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),(17,((18,19),20),21)))),6)))); tree MPT_1621 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),(17,(((18,19),20),21))))),6)))); tree MPT_1622 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),(17,((18,19),(20,21)))))),6)))); tree MPT_1623 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),(17,(((18,19),21),20))))),6)))); tree MPT_1624 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),(17,((18,19,21),20))))),6)))); tree MPT_1625 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),(17,((18,(19,21)),20))))),6)))); tree MPT_1626 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),((17,(18,19,20)),21)))),6)))); tree MPT_1627 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),(17,(18,19,20),21)))),6)))); tree MPT_1628 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),(17,((18,19,20),21))))),6)))); tree MPT_1629 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),(17,(18,19,20,21))))),6)))); tree MPT_1630 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),(17,(18,19,(20,21)))))),6)))); tree MPT_1631 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),(17,(18,(19,21),20))))),6)))); tree MPT_1632 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),((17,(18,(19,20))),21)))),6)))); tree MPT_1633 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),(17,(18,(19,20)),21)))),6)))); tree MPT_1634 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),(17,((18,(19,20)),21))))),6)))); tree MPT_1635 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),(17,(18,(19,20),21))))),6)))); tree MPT_1636 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),(17,(18,((19,20),21)))))),6)))); tree MPT_1637 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),(17,(18,(19,(20,21))))))),6)))); tree MPT_1638 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,((14,15),16)))),9),(17,(18,((19,21),20)))))),6)))); tree MPT_1639 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),(((17,(18,19)),20),21)))),6)))); tree MPT_1640 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),((17,(18,19)),(20,21))))),6)))); tree MPT_1641 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),(((17,(18,19)),21),20)))),6)))); tree MPT_1642 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),((17,(18,19),21),20)))),6)))); tree MPT_1643 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),((17,((18,19),21)),20)))),6)))); tree MPT_1644 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),((17,(18,19,21)),20)))),6)))); tree MPT_1645 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),((17,(18,(19,21))),20)))),6)))); tree MPT_1646 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),(((17,20),(18,19)),21)))),6)))); tree MPT_1647 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),(((17,20),21),(18,19))))),6)))); tree MPT_1648 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),((17,(20,21)),(18,19))))),6)))); tree MPT_1649 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),((17,20,21),(18,19))))),6)))); tree MPT_1650 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),((17,20),((18,19),21))))),6)))); tree MPT_1651 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),((17,20),(18,19,21))))),6)))); tree MPT_1652 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),((17,20),(18,(19,21)))))),6)))); tree MPT_1653 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),((17,((18,19),20)),21)))),6)))); tree MPT_1654 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),(17,((18,19),20),21)))),6)))); tree MPT_1655 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),(17,(((18,19),20),21))))),6)))); tree MPT_1656 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),(17,((18,19),(20,21)))))),6)))); tree MPT_1657 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),(17,(((18,19),21),20))))),6)))); tree MPT_1658 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),(17,((18,19,21),20))))),6)))); tree MPT_1659 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),(17,((18,(19,21)),20))))),6)))); tree MPT_1660 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),((17,(18,19,20)),21)))),6)))); tree MPT_1661 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),(17,(18,19,20),21)))),6)))); tree MPT_1662 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),(17,((18,19,20),21))))),6)))); tree MPT_1663 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),(17,(18,19,20,21))))),6)))); tree MPT_1664 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),(17,(18,19,(20,21)))))),6)))); tree MPT_1665 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),(17,(18,(19,21),20))))),6)))); tree MPT_1666 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),((17,(18,(19,20))),21)))),6)))); tree MPT_1667 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),(17,(18,(19,20)),21)))),6)))); tree MPT_1668 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),(17,((18,(19,20)),21))))),6)))); tree MPT_1669 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),(17,(18,(19,20),21))))),6)))); tree MPT_1670 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),(17,(18,((19,20),21)))))),6)))); tree MPT_1671 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),(17,(18,(19,(20,21))))))),6)))); tree MPT_1672 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,((14,15),16))))),9),(17,(18,((19,21),20)))))),6)))); tree MPT_1673 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),((((17,19),18),20),21)))),6)))); tree MPT_1674 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),(((17,19),18),(20,21))))),6)))); tree MPT_1675 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),((((17,19),18),21),20)))),6)))); tree MPT_1676 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),(((17,19),18,21),20)))),6)))); tree MPT_1677 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),((((17,19),21),18),20)))),6)))); tree MPT_1678 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),(((17,19,21),18),20)))),6)))); tree MPT_1679 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),(((17,(19,21)),18),20)))),6)))); tree MPT_1680 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),(((17,19),18,20),21)))),6)))); tree MPT_1681 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),((17,19),18,20,21)))),6)))); tree MPT_1682 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),((17,19),18,(20,21))))),6)))); tree MPT_1683 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),(((17,19),21),18,20)))),6)))); tree MPT_1684 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),((17,19,21),18,20)))),6)))); tree MPT_1685 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),((17,(19,21)),18,20)))),6)))); tree MPT_1686 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),((((17,19),20),18),21)))),6)))); tree MPT_1687 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),(((17,19),20),18,21)))),6)))); tree MPT_1688 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),((((17,19),20),21),18)))),6)))); tree MPT_1689 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),(((17,19),(20,21)),18)))),6)))); tree MPT_1690 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),((((17,19),21),20),18)))),6)))); tree MPT_1691 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),(((17,19,21),20),18)))),6)))); tree MPT_1692 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),(((17,(19,21)),20),18)))),6)))); tree MPT_1693 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),((((17,20),19),18),21)))),6)))); tree MPT_1694 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),(((17,20),19),18,21)))),6)))); tree MPT_1695 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),((((17,20),19),21),18)))),6)))); tree MPT_1696 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),((((17,20),21),19),18)))),6)))); tree MPT_1697 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),(((17,(20,21)),19),18)))),6)))); tree MPT_1698 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),(((17,20,21),19),18)))),6)))); tree MPT_1699 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),(((17,20),(19,21)),18)))),6)))); tree MPT_1700 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),(((17,(19,20)),18),21)))),6)))); tree MPT_1701 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),((17,(19,20)),18,21)))),6)))); tree MPT_1702 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),(((17,(19,20)),21),18)))),6)))); tree MPT_1703 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),((17,(19,20),21),18)))),6)))); tree MPT_1704 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),((17,((19,20),21)),18)))),6)))); tree MPT_1705 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),((17,(19,(20,21))),18)))),6)))); tree MPT_1706 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),((17,((19,21),20)),18)))),6)))); tree MPT_1707 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),((((17,19),18),20),21)))),6)))); tree MPT_1708 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),(((17,19),18),(20,21))))),6)))); tree MPT_1709 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),((((17,19),18),21),20)))),6)))); tree MPT_1710 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),(((17,19),18,21),20)))),6)))); tree MPT_1711 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),((((17,19),21),18),20)))),6)))); tree MPT_1712 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),(((17,19,21),18),20)))),6)))); tree MPT_1713 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),(((17,(19,21)),18),20)))),6)))); tree MPT_1714 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),(((17,19),18,20),21)))),6)))); tree MPT_1715 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),((17,19),18,20,21)))),6)))); tree MPT_1716 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),((17,19),18,(20,21))))),6)))); tree MPT_1717 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),(((17,19),21),18,20)))),6)))); tree MPT_1718 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),((17,19,21),18,20)))),6)))); tree MPT_1719 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),((17,(19,21)),18,20)))),6)))); tree MPT_1720 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),((((17,19),20),18),21)))),6)))); tree MPT_1721 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),(((17,19),20),18,21)))),6)))); tree MPT_1722 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),((((17,19),20),21),18)))),6)))); tree MPT_1723 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),(((17,19),(20,21)),18)))),6)))); tree MPT_1724 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),((((17,19),21),20),18)))),6)))); tree MPT_1725 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),(((17,19,21),20),18)))),6)))); tree MPT_1726 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),(((17,(19,21)),20),18)))),6)))); tree MPT_1727 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),((((17,20),19),18),21)))),6)))); tree MPT_1728 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),(((17,20),19),18,21)))),6)))); tree MPT_1729 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),((((17,20),19),21),18)))),6)))); tree MPT_1730 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),((((17,20),21),19),18)))),6)))); tree MPT_1731 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),(((17,(20,21)),19),18)))),6)))); tree MPT_1732 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),(((17,20,21),19),18)))),6)))); tree MPT_1733 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),(((17,20),(19,21)),18)))),6)))); tree MPT_1734 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),(((17,(19,20)),18),21)))),6)))); tree MPT_1735 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),((17,(19,20)),18,21)))),6)))); tree MPT_1736 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),(((17,(19,20)),21),18)))),6)))); tree MPT_1737 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),((17,(19,20),21),18)))),6)))); tree MPT_1738 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),((17,((19,20),21)),18)))),6)))); tree MPT_1739 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),((17,(19,(20,21))),18)))),6)))); tree MPT_1740 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),((17,((19,21),20)),18)))),6)))); tree MPT_1741 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),((((17,19),18),20),21)))),6)))); tree MPT_1742 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),(((17,19),18),(20,21))))),6)))); tree MPT_1743 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),((((17,19),18),21),20)))),6)))); tree MPT_1744 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),(((17,19),18,21),20)))),6)))); tree MPT_1745 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),((((17,19),21),18),20)))),6)))); tree MPT_1746 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),(((17,19,21),18),20)))),6)))); tree MPT_1747 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),(((17,(19,21)),18),20)))),6)))); tree MPT_1748 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),(((17,19),18,20),21)))),6)))); tree MPT_1749 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),((17,19),18,20,21)))),6)))); tree MPT_1750 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),((17,19),18,(20,21))))),6)))); tree MPT_1751 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),(((17,19),21),18,20)))),6)))); tree MPT_1752 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),((17,19,21),18,20)))),6)))); tree MPT_1753 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),((17,(19,21)),18,20)))),6)))); tree MPT_1754 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),((((17,19),20),18),21)))),6)))); tree MPT_1755 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),(((17,19),20),18,21)))),6)))); tree MPT_1756 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),((((17,19),20),21),18)))),6)))); tree MPT_1757 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),(((17,19),(20,21)),18)))),6)))); tree MPT_1758 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),((((17,19),21),20),18)))),6)))); tree MPT_1759 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),(((17,19,21),20),18)))),6)))); tree MPT_1760 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),(((17,(19,21)),20),18)))),6)))); tree MPT_1761 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),((((17,20),19),18),21)))),6)))); tree MPT_1762 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),(((17,20),19),18,21)))),6)))); tree MPT_1763 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),((((17,20),19),21),18)))),6)))); tree MPT_1764 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),((((17,20),21),19),18)))),6)))); tree MPT_1765 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),(((17,(20,21)),19),18)))),6)))); tree MPT_1766 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),(((17,20,21),19),18)))),6)))); tree MPT_1767 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),(((17,20),(19,21)),18)))),6)))); tree MPT_1768 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),(((17,(19,20)),18),21)))),6)))); tree MPT_1769 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),((17,(19,20)),18,21)))),6)))); tree MPT_1770 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),(((17,(19,20)),21),18)))),6)))); tree MPT_1771 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),((17,(19,20),21),18)))),6)))); tree MPT_1772 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),((17,((19,20),21)),18)))),6)))); tree MPT_1773 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),((17,(19,(20,21))),18)))),6)))); tree MPT_1774 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),((17,((19,21),20)),18)))),6)))); tree MPT_1775 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),((((17,19),18),20),21)))),6)))); tree MPT_1776 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),(((17,19),18),(20,21))))),6)))); tree MPT_1777 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),((((17,19),18),21),20)))),6)))); tree MPT_1778 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),(((17,19),18,21),20)))),6)))); tree MPT_1779 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),((((17,19),21),18),20)))),6)))); tree MPT_1780 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),(((17,19,21),18),20)))),6)))); tree MPT_1781 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),(((17,(19,21)),18),20)))),6)))); tree MPT_1782 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),(((17,19),18,20),21)))),6)))); tree MPT_1783 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),((17,19),18,20,21)))),6)))); tree MPT_1784 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),((17,19),18,(20,21))))),6)))); tree MPT_1785 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),(((17,19),21),18,20)))),6)))); tree MPT_1786 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),((17,19,21),18,20)))),6)))); tree MPT_1787 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),((17,(19,21)),18,20)))),6)))); tree MPT_1788 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),((((17,19),20),18),21)))),6)))); tree MPT_1789 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),(((17,19),20),18,21)))),6)))); tree MPT_1790 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),((((17,19),20),21),18)))),6)))); tree MPT_1791 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),(((17,19),(20,21)),18)))),6)))); tree MPT_1792 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),((((17,19),21),20),18)))),6)))); tree MPT_1793 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),(((17,19,21),20),18)))),6)))); tree MPT_1794 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),(((17,(19,21)),20),18)))),6)))); tree MPT_1795 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),((((17,20),19),18),21)))),6)))); tree MPT_1796 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),(((17,20),19),18,21)))),6)))); tree MPT_1797 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),((((17,20),19),21),18)))),6)))); tree MPT_1798 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),((((17,20),21),19),18)))),6)))); tree MPT_1799 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),(((17,(20,21)),19),18)))),6)))); tree MPT_1800 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),(((17,20,21),19),18)))),6)))); tree MPT_1801 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),(((17,20),(19,21)),18)))),6)))); tree MPT_1802 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),(((17,(19,20)),18),21)))),6)))); tree MPT_1803 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),((17,(19,20)),18,21)))),6)))); tree MPT_1804 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),(((17,(19,20)),21),18)))),6)))); tree MPT_1805 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),((17,(19,20),21),18)))),6)))); tree MPT_1806 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),((17,((19,20),21)),18)))),6)))); tree MPT_1807 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),((17,(19,(20,21))),18)))),6)))); tree MPT_1808 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),((17,((19,21),20)),18)))),6)))); tree MPT_1809 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),((((17,19),18),20),21)))),6)))); tree MPT_1810 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),(((17,19),18),(20,21))))),6)))); tree MPT_1811 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),((((17,19),18),21),20)))),6)))); tree MPT_1812 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),(((17,19),18,21),20)))),6)))); tree MPT_1813 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),((((17,19),21),18),20)))),6)))); tree MPT_1814 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),(((17,19,21),18),20)))),6)))); tree MPT_1815 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),(((17,(19,21)),18),20)))),6)))); tree MPT_1816 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),(((17,19),18,20),21)))),6)))); tree MPT_1817 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),((17,19),18,20,21)))),6)))); tree MPT_1818 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),((17,19),18,(20,21))))),6)))); tree MPT_1819 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),(((17,19),21),18,20)))),6)))); tree MPT_1820 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),((17,19,21),18,20)))),6)))); tree MPT_1821 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),((17,(19,21)),18,20)))),6)))); tree MPT_1822 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),((((17,19),20),18),21)))),6)))); tree MPT_1823 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),(((17,19),20),18,21)))),6)))); tree MPT_1824 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),((((17,19),20),21),18)))),6)))); tree MPT_1825 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),(((17,19),(20,21)),18)))),6)))); tree MPT_1826 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),((((17,19),21),20),18)))),6)))); tree MPT_1827 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),(((17,19,21),20),18)))),6)))); tree MPT_1828 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),(((17,(19,21)),20),18)))),6)))); tree MPT_1829 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),((((17,20),19),18),21)))),6)))); tree MPT_1830 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),(((17,20),19),18,21)))),6)))); tree MPT_1831 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),((((17,20),19),21),18)))),6)))); tree MPT_1832 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),((((17,20),21),19),18)))),6)))); tree MPT_1833 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),(((17,(20,21)),19),18)))),6)))); tree MPT_1834 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),(((17,20,21),19),18)))),6)))); tree MPT_1835 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),(((17,20),(19,21)),18)))),6)))); tree MPT_1836 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),(((17,(19,20)),18),21)))),6)))); tree MPT_1837 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),((17,(19,20)),18,21)))),6)))); tree MPT_1838 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),(((17,(19,20)),21),18)))),6)))); tree MPT_1839 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),((17,(19,20),21),18)))),6)))); tree MPT_1840 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),((17,((19,20),21)),18)))),6)))); tree MPT_1841 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),((17,(19,(20,21))),18)))),6)))); tree MPT_1842 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),((17,((19,21),20)),18)))),6)))); tree MPT_1843 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),(((17,18,19),20),21)))),6)))); tree MPT_1844 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),((17,18,19),(20,21))))),6)))); tree MPT_1845 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),(((17,18,19),21),20)))),6)))); tree MPT_1846 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),((17,18,19,21),20)))),6)))); tree MPT_1847 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),((17,18,(19,21)),20)))),6)))); tree MPT_1848 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),((17,18,19,20),21)))),6)))); tree MPT_1849 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),(17,18,19,20,21)))),6)))); tree MPT_1850 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),(17,18,19,(20,21))))),6)))); tree MPT_1851 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),(17,18,(19,21),20)))),6)))); tree MPT_1852 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),(((17,20),18,19),21)))),6)))); tree MPT_1853 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),((17,20),18,19,21)))),6)))); tree MPT_1854 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),(((17,20),21),18,19)))),6)))); tree MPT_1855 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),((17,(20,21)),18,19)))),6)))); tree MPT_1856 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),((17,20,21),18,19)))),6)))); tree MPT_1857 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),((17,20),18,(19,21))))),6)))); tree MPT_1858 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),((17,18,(19,20)),21)))),6)))); tree MPT_1859 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),(17,18,(19,20),21)))),6)))); tree MPT_1860 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),(17,18,((19,20),21))))),6)))); tree MPT_1861 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),(17,18,(19,(20,21)))))),6)))); tree MPT_1862 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),(17,18,((19,21),20))))),6)))); tree MPT_1863 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),(((17,18,19),20),21)))),6)))); tree MPT_1864 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),((17,18,19),(20,21))))),6)))); tree MPT_1865 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),(((17,18,19),21),20)))),6)))); tree MPT_1866 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),((17,18,19,21),20)))),6)))); tree MPT_1867 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),((17,18,(19,21)),20)))),6)))); tree MPT_1868 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),((17,18,19,20),21)))),6)))); tree MPT_1869 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),(17,18,19,20,21)))),6)))); tree MPT_1870 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),(17,18,19,(20,21))))),6)))); tree MPT_1871 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),(17,18,(19,21),20)))),6)))); tree MPT_1872 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),(((17,20),18,19),21)))),6)))); tree MPT_1873 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),((17,20),18,19,21)))),6)))); tree MPT_1874 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),(((17,20),21),18,19)))),6)))); tree MPT_1875 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),((17,(20,21)),18,19)))),6)))); tree MPT_1876 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),((17,20,21),18,19)))),6)))); tree MPT_1877 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),((17,20),18,(19,21))))),6)))); tree MPT_1878 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),((17,18,(19,20)),21)))),6)))); tree MPT_1879 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),(17,18,(19,20),21)))),6)))); tree MPT_1880 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),(17,18,((19,20),21))))),6)))); tree MPT_1881 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),(17,18,(19,(20,21)))))),6)))); tree MPT_1882 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),(17,18,((19,21),20))))),6)))); tree MPT_1883 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),(((17,18,19),20),21)))),6)))); tree MPT_1884 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),((17,18,19),(20,21))))),6)))); tree MPT_1885 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),(((17,18,19),21),20)))),6)))); tree MPT_1886 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),((17,18,19,21),20)))),6)))); tree MPT_1887 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),((17,18,(19,21)),20)))),6)))); tree MPT_1888 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),((17,18,19,20),21)))),6)))); tree MPT_1889 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),(17,18,19,20,21)))),6)))); tree MPT_1890 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),(17,18,19,(20,21))))),6)))); tree MPT_1891 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),(17,18,(19,21),20)))),6)))); tree MPT_1892 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),(((17,20),18,19),21)))),6)))); tree MPT_1893 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),((17,20),18,19,21)))),6)))); tree MPT_1894 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),(((17,20),21),18,19)))),6)))); tree MPT_1895 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),((17,(20,21)),18,19)))),6)))); tree MPT_1896 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),((17,20,21),18,19)))),6)))); tree MPT_1897 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),((17,20),18,(19,21))))),6)))); tree MPT_1898 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),((17,18,(19,20)),21)))),6)))); tree MPT_1899 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),(17,18,(19,20),21)))),6)))); tree MPT_1900 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),(17,18,((19,20),21))))),6)))); tree MPT_1901 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),(17,18,(19,(20,21)))))),6)))); tree MPT_1902 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),(17,18,((19,21),20))))),6)))); tree MPT_1903 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),(((17,18,19),20),21)))),6)))); tree MPT_1904 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),((17,18,19),(20,21))))),6)))); tree MPT_1905 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),(((17,18,19),21),20)))),6)))); tree MPT_1906 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),((17,18,19,21),20)))),6)))); tree MPT_1907 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),((17,18,(19,21)),20)))),6)))); tree MPT_1908 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),((17,18,19,20),21)))),6)))); tree MPT_1909 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),(17,18,19,20,21)))),6)))); tree MPT_1910 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),(17,18,19,(20,21))))),6)))); tree MPT_1911 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),(17,18,(19,21),20)))),6)))); tree MPT_1912 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),(((17,20),18,19),21)))),6)))); tree MPT_1913 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),((17,20),18,19,21)))),6)))); tree MPT_1914 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),(((17,20),21),18,19)))),6)))); tree MPT_1915 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),((17,(20,21)),18,19)))),6)))); tree MPT_1916 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),((17,20,21),18,19)))),6)))); tree MPT_1917 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),((17,20),18,(19,21))))),6)))); tree MPT_1918 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),((17,18,(19,20)),21)))),6)))); tree MPT_1919 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),(17,18,(19,20),21)))),6)))); tree MPT_1920 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),(17,18,((19,20),21))))),6)))); tree MPT_1921 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),(17,18,(19,(20,21)))))),6)))); tree MPT_1922 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),(17,18,((19,21),20))))),6)))); tree MPT_1923 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),(((17,18,19),20),21)))),6)))); tree MPT_1924 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),((17,18,19),(20,21))))),6)))); tree MPT_1925 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),(((17,18,19),21),20)))),6)))); tree MPT_1926 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),((17,18,19,21),20)))),6)))); tree MPT_1927 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),((17,18,(19,21)),20)))),6)))); tree MPT_1928 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),((17,18,19,20),21)))),6)))); tree MPT_1929 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),(17,18,19,20,21)))),6)))); tree MPT_1930 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),(17,18,19,(20,21))))),6)))); tree MPT_1931 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),(17,18,(19,21),20)))),6)))); tree MPT_1932 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),(((17,20),18,19),21)))),6)))); tree MPT_1933 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),((17,20),18,19,21)))),6)))); tree MPT_1934 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),(((17,20),21),18,19)))),6)))); tree MPT_1935 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),((17,(20,21)),18,19)))),6)))); tree MPT_1936 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),((17,20,21),18,19)))),6)))); tree MPT_1937 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),((17,20),18,(19,21))))),6)))); tree MPT_1938 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),((17,18,(19,20)),21)))),6)))); tree MPT_1939 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),(17,18,(19,20),21)))),6)))); tree MPT_1940 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),(17,18,((19,20),21))))),6)))); tree MPT_1941 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),(17,18,(19,(20,21)))))),6)))); tree MPT_1942 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),(17,18,((19,21),20))))),6)))); tree MPT_1943 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),(((17,(18,19)),20),21)))),6)))); tree MPT_1944 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),((17,(18,19)),(20,21))))),6)))); tree MPT_1945 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),(((17,(18,19)),21),20)))),6)))); tree MPT_1946 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),((17,(18,19),21),20)))),6)))); tree MPT_1947 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),((17,((18,19),21)),20)))),6)))); tree MPT_1948 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),((17,(18,19,21)),20)))),6)))); tree MPT_1949 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),((17,(18,(19,21))),20)))),6)))); tree MPT_1950 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),(((17,20),(18,19)),21)))),6)))); tree MPT_1951 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),(((17,20),21),(18,19))))),6)))); tree MPT_1952 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),((17,(20,21)),(18,19))))),6)))); tree MPT_1953 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),((17,20,21),(18,19))))),6)))); tree MPT_1954 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),((17,20),((18,19),21))))),6)))); tree MPT_1955 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),((17,20),(18,19,21))))),6)))); tree MPT_1956 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),((17,20),(18,(19,21)))))),6)))); tree MPT_1957 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),((17,((18,19),20)),21)))),6)))); tree MPT_1958 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),(17,((18,19),20),21)))),6)))); tree MPT_1959 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),(17,(((18,19),20),21))))),6)))); tree MPT_1960 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),(17,((18,19),(20,21)))))),6)))); tree MPT_1961 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),(17,(((18,19),21),20))))),6)))); tree MPT_1962 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),(17,((18,19,21),20))))),6)))); tree MPT_1963 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),(17,((18,(19,21)),20))))),6)))); tree MPT_1964 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),((17,(18,19,20)),21)))),6)))); tree MPT_1965 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),(17,(18,19,20),21)))),6)))); tree MPT_1966 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),(17,((18,19,20),21))))),6)))); tree MPT_1967 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),(17,(18,19,20,21))))),6)))); tree MPT_1968 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),(17,(18,19,(20,21)))))),6)))); tree MPT_1969 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),(17,(18,(19,21),20))))),6)))); tree MPT_1970 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),((17,(18,(19,20))),21)))),6)))); tree MPT_1971 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),(17,(18,(19,20)),21)))),6)))); tree MPT_1972 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),(17,((18,(19,20)),21))))),6)))); tree MPT_1973 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),(17,(18,(19,20),21))))),6)))); tree MPT_1974 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),(17,(18,((19,20),21)))))),6)))); tree MPT_1975 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),(17,(18,(19,(20,21))))))),6)))); tree MPT_1976 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),(13,(14,(15,16)))),11)),9),(17,(18,((19,21),20)))))),6)))); tree MPT_1977 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),(((17,(18,19)),20),21)))),6)))); tree MPT_1978 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),((17,(18,19)),(20,21))))),6)))); tree MPT_1979 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),(((17,(18,19)),21),20)))),6)))); tree MPT_1980 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),((17,(18,19),21),20)))),6)))); tree MPT_1981 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),((17,((18,19),21)),20)))),6)))); tree MPT_1982 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),((17,(18,19,21)),20)))),6)))); tree MPT_1983 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),((17,(18,(19,21))),20)))),6)))); tree MPT_1984 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),(((17,20),(18,19)),21)))),6)))); tree MPT_1985 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),(((17,20),21),(18,19))))),6)))); tree MPT_1986 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),((17,(20,21)),(18,19))))),6)))); tree MPT_1987 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),((17,20,21),(18,19))))),6)))); tree MPT_1988 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),((17,20),((18,19),21))))),6)))); tree MPT_1989 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),((17,20),(18,19,21))))),6)))); tree MPT_1990 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),((17,20),(18,(19,21)))))),6)))); tree MPT_1991 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),((17,((18,19),20)),21)))),6)))); tree MPT_1992 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),(17,((18,19),20),21)))),6)))); tree MPT_1993 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),(17,(((18,19),20),21))))),6)))); tree MPT_1994 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),(17,((18,19),(20,21)))))),6)))); tree MPT_1995 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),(17,(((18,19),21),20))))),6)))); tree MPT_1996 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),(17,((18,19,21),20))))),6)))); tree MPT_1997 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),(17,((18,(19,21)),20))))),6)))); tree MPT_1998 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),((17,(18,19,20)),21)))),6)))); tree MPT_1999 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),(17,(18,19,20),21)))),6)))); tree MPT_2000 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),(17,((18,19,20),21))))),6)))); tree MPT_2001 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),(17,(18,19,20,21))))),6)))); tree MPT_2002 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),(17,(18,19,(20,21)))))),6)))); tree MPT_2003 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),(17,(18,(19,21),20))))),6)))); tree MPT_2004 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),((17,(18,(19,20))),21)))),6)))); tree MPT_2005 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),(17,(18,(19,20)),21)))),6)))); tree MPT_2006 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),(17,((18,(19,20)),21))))),6)))); tree MPT_2007 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),(17,(18,(19,20),21))))),6)))); tree MPT_2008 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),(17,(18,((19,20),21)))))),6)))); tree MPT_2009 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),(17,(18,(19,(20,21))))))),6)))); tree MPT_2010 = [&R] (1,(2,(3,(((4,5),(7,(((8,(((10,12),11),(13,(14,(15,16))))),9),(17,(18,((19,21),20)))))),6)))); tree MPT_2011 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),(((17,(18,19)),20),21)))),6)))); tree MPT_2012 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),((17,(18,19)),(20,21))))),6)))); tree MPT_2013 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),(((17,(18,19)),21),20)))),6)))); tree MPT_2014 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),((17,(18,19),21),20)))),6)))); tree MPT_2015 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),((17,((18,19),21)),20)))),6)))); tree MPT_2016 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),((17,(18,19,21)),20)))),6)))); tree MPT_2017 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),((17,(18,(19,21))),20)))),6)))); tree MPT_2018 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),(((17,20),(18,19)),21)))),6)))); tree MPT_2019 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),(((17,20),21),(18,19))))),6)))); tree MPT_2020 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),((17,(20,21)),(18,19))))),6)))); tree MPT_2021 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),((17,20,21),(18,19))))),6)))); tree MPT_2022 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),((17,20),((18,19),21))))),6)))); tree MPT_2023 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),((17,20),(18,19,21))))),6)))); tree MPT_2024 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),((17,20),(18,(19,21)))))),6)))); tree MPT_2025 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),((17,((18,19),20)),21)))),6)))); tree MPT_2026 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),(17,((18,19),20),21)))),6)))); tree MPT_2027 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),(17,(((18,19),20),21))))),6)))); tree MPT_2028 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),(17,((18,19),(20,21)))))),6)))); tree MPT_2029 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),(17,(((18,19),21),20))))),6)))); tree MPT_2030 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),(17,((18,19,21),20))))),6)))); tree MPT_2031 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),(17,((18,(19,21)),20))))),6)))); tree MPT_2032 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),((17,(18,19,20)),21)))),6)))); tree MPT_2033 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),(17,(18,19,20),21)))),6)))); tree MPT_2034 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),(17,((18,19,20),21))))),6)))); tree MPT_2035 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),(17,(18,19,20,21))))),6)))); tree MPT_2036 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),(17,(18,19,(20,21)))))),6)))); tree MPT_2037 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),(17,(18,(19,21),20))))),6)))); tree MPT_2038 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),((17,(18,(19,20))),21)))),6)))); tree MPT_2039 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),(17,(18,(19,20)),21)))),6)))); tree MPT_2040 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),(17,((18,(19,20)),21))))),6)))); tree MPT_2041 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),(17,(18,(19,20),21))))),6)))); tree MPT_2042 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),(17,(18,((19,20),21)))))),6)))); tree MPT_2043 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),(17,(18,(19,(20,21))))))),6)))); tree MPT_2044 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,11,12),(13,(14,(15,16))))),9),(17,(18,((19,21),20)))))),6)))); tree MPT_2045 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),(((17,(18,19)),20),21)))),6)))); tree MPT_2046 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),((17,(18,19)),(20,21))))),6)))); tree MPT_2047 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),(((17,(18,19)),21),20)))),6)))); tree MPT_2048 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),((17,(18,19),21),20)))),6)))); tree MPT_2049 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),((17,((18,19),21)),20)))),6)))); tree MPT_2050 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),((17,(18,19,21)),20)))),6)))); tree MPT_2051 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),((17,(18,(19,21))),20)))),6)))); tree MPT_2052 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),(((17,20),(18,19)),21)))),6)))); tree MPT_2053 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),(((17,20),21),(18,19))))),6)))); tree MPT_2054 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),((17,(20,21)),(18,19))))),6)))); tree MPT_2055 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),((17,20,21),(18,19))))),6)))); tree MPT_2056 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),((17,20),((18,19),21))))),6)))); tree MPT_2057 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),((17,20),(18,19,21))))),6)))); tree MPT_2058 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),((17,20),(18,(19,21)))))),6)))); tree MPT_2059 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),((17,((18,19),20)),21)))),6)))); tree MPT_2060 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),(17,((18,19),20),21)))),6)))); tree MPT_2061 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),(17,(((18,19),20),21))))),6)))); tree MPT_2062 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),(17,((18,19),(20,21)))))),6)))); tree MPT_2063 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),(17,(((18,19),21),20))))),6)))); tree MPT_2064 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),(17,((18,19,21),20))))),6)))); tree MPT_2065 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),(17,((18,(19,21)),20))))),6)))); tree MPT_2066 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),((17,(18,19,20)),21)))),6)))); tree MPT_2067 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),(17,(18,19,20),21)))),6)))); tree MPT_2068 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),(17,((18,19,20),21))))),6)))); tree MPT_2069 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),(17,(18,19,20,21))))),6)))); tree MPT_2070 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),(17,(18,19,(20,21)))))),6)))); tree MPT_2071 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),(17,(18,(19,21),20))))),6)))); tree MPT_2072 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),((17,(18,(19,20))),21)))),6)))); tree MPT_2073 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),(17,(18,(19,20)),21)))),6)))); tree MPT_2074 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),(17,((18,(19,20)),21))))),6)))); tree MPT_2075 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),(17,(18,(19,20),21))))),6)))); tree MPT_2076 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),(17,(18,((19,20),21)))))),6)))); tree MPT_2077 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),(17,(18,(19,(20,21))))))),6)))); tree MPT_2078 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,(11,12)),(13,(14,(15,16))))),9),(17,(18,((19,21),20)))))),6)))); tree MPT_2079 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),(((17,(18,19)),20),21)))),6)))); tree MPT_2080 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),((17,(18,19)),(20,21))))),6)))); tree MPT_2081 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),(((17,(18,19)),21),20)))),6)))); tree MPT_2082 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),((17,(18,19),21),20)))),6)))); tree MPT_2083 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),((17,((18,19),21)),20)))),6)))); tree MPT_2084 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),((17,(18,19,21)),20)))),6)))); tree MPT_2085 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),((17,(18,(19,21))),20)))),6)))); tree MPT_2086 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),(((17,20),(18,19)),21)))),6)))); tree MPT_2087 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),(((17,20),21),(18,19))))),6)))); tree MPT_2088 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),((17,(20,21)),(18,19))))),6)))); tree MPT_2089 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),((17,20,21),(18,19))))),6)))); tree MPT_2090 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),((17,20),((18,19),21))))),6)))); tree MPT_2091 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),((17,20),(18,19,21))))),6)))); tree MPT_2092 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),((17,20),(18,(19,21)))))),6)))); tree MPT_2093 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),((17,((18,19),20)),21)))),6)))); tree MPT_2094 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),(17,((18,19),20),21)))),6)))); tree MPT_2095 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),(17,(((18,19),20),21))))),6)))); tree MPT_2096 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),(17,((18,19),(20,21)))))),6)))); tree MPT_2097 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),(17,(((18,19),21),20))))),6)))); tree MPT_2098 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),(17,((18,19,21),20))))),6)))); tree MPT_2099 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),(17,((18,(19,21)),20))))),6)))); tree MPT_2100 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),((17,(18,19,20)),21)))),6)))); tree MPT_2101 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),(17,(18,19,20),21)))),6)))); tree MPT_2102 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),(17,((18,19,20),21))))),6)))); tree MPT_2103 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),(17,(18,19,20,21))))),6)))); tree MPT_2104 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),(17,(18,19,(20,21)))))),6)))); tree MPT_2105 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),(17,(18,(19,21),20))))),6)))); tree MPT_2106 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),((17,(18,(19,20))),21)))),6)))); tree MPT_2107 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),(17,(18,(19,20)),21)))),6)))); tree MPT_2108 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),(17,((18,(19,20)),21))))),6)))); tree MPT_2109 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),(17,(18,(19,20),21))))),6)))); tree MPT_2110 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),(17,(18,((19,20),21)))))),6)))); tree MPT_2111 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),(17,(18,(19,(20,21))))))),6)))); tree MPT_2112 = [&R] (1,(2,(3,(((4,5),(7,(((8,((10,12),(11,(13,(14,(15,16)))))),9),(17,(18,((19,21),20)))))),6)))); tree MPT_2113 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((((17,19),18),20),21))))))); tree MPT_2114 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,19),18),(20,21)))))))); tree MPT_2115 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((((17,19),18),21),20))))))); tree MPT_2116 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,19),18,21),20))))))); tree MPT_2117 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((((17,19),21),18),20))))))); tree MPT_2118 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,19,21),18),20))))))); tree MPT_2119 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,(19,21)),18),20))))))); tree MPT_2120 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,19),18,20),21))))))); tree MPT_2121 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,19),18,20,21))))))); tree MPT_2122 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,19),18,(20,21)))))))); tree MPT_2123 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,19),21),18,20))))))); tree MPT_2124 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,19,21),18,20))))))); tree MPT_2125 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,(19,21)),18,20))))))); tree MPT_2126 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((((17,19),20),18),21))))))); tree MPT_2127 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,19),20),18,21))))))); tree MPT_2128 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((((17,19),20),21),18))))))); tree MPT_2129 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,19),(20,21)),18))))))); tree MPT_2130 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((((17,19),21),20),18))))))); tree MPT_2131 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,19,21),20),18))))))); tree MPT_2132 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,(19,21)),20),18))))))); tree MPT_2133 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((((17,20),19),18),21))))))); tree MPT_2134 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,20),19),18,21))))))); tree MPT_2135 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((((17,20),19),21),18))))))); tree MPT_2136 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((((17,20),21),19),18))))))); tree MPT_2137 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,(20,21)),19),18))))))); tree MPT_2138 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,20,21),19),18))))))); tree MPT_2139 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,20),(19,21)),18))))))); tree MPT_2140 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,(19,20)),18),21))))))); tree MPT_2141 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,(19,20)),18,21))))))); tree MPT_2142 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,(19,20)),21),18))))))); tree MPT_2143 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,(19,20),21),18))))))); tree MPT_2144 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,((19,20),21)),18))))))); tree MPT_2145 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,(19,(20,21))),18))))))); tree MPT_2146 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,((19,21),20)),18))))))); tree MPT_2147 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,18,19),20),21))))))); tree MPT_2148 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,18,19),(20,21)))))))); tree MPT_2149 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,18,19),21),20))))))); tree MPT_2150 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,18,19,21),20))))))); tree MPT_2151 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,18,(19,21)),20))))))); tree MPT_2152 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,18,19,20),21))))))); tree MPT_2153 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,18,19,20,21))))))); tree MPT_2154 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,18,19,(20,21)))))))); tree MPT_2155 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,18,(19,21),20))))))); tree MPT_2156 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,20),18,19),21))))))); tree MPT_2157 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,20),18,19,21))))))); tree MPT_2158 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,20),21),18,19))))))); tree MPT_2159 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,(20,21)),18,19))))))); tree MPT_2160 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,20,21),18,19))))))); tree MPT_2161 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,20),18,(19,21)))))))); tree MPT_2162 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,18,(19,20)),21))))))); tree MPT_2163 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,18,(19,20),21))))))); tree MPT_2164 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,18,((19,20),21)))))))); tree MPT_2165 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,18,(19,(20,21))))))))); tree MPT_2166 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,18,((19,21),20)))))))); tree MPT_2167 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,(18,19)),20),21))))))); tree MPT_2168 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,(18,19)),(20,21)))))))); tree MPT_2169 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,(18,19)),21),20))))))); tree MPT_2170 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,(18,19),21),20))))))); tree MPT_2171 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,((18,19),21)),20))))))); tree MPT_2172 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,(18,19,21)),20))))))); tree MPT_2173 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,(18,(19,21))),20))))))); tree MPT_2174 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,20),(18,19)),21))))))); tree MPT_2175 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,20),21),(18,19)))))))); tree MPT_2176 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,(20,21)),(18,19)))))))); tree MPT_2177 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,20,21),(18,19)))))))); tree MPT_2178 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,20),((18,19),21)))))))); tree MPT_2179 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,20),(18,19,21)))))))); tree MPT_2180 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,20),(18,(19,21))))))))); tree MPT_2181 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,((18,19),20)),21))))))); tree MPT_2182 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,((18,19),20),21))))))); tree MPT_2183 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,(((18,19),20),21)))))))); tree MPT_2184 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,((18,19),(20,21))))))))); tree MPT_2185 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,(((18,19),21),20)))))))); tree MPT_2186 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,((18,19,21),20)))))))); tree MPT_2187 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,((18,(19,21)),20)))))))); tree MPT_2188 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,(18,19,20)),21))))))); tree MPT_2189 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,(18,19,20),21))))))); tree MPT_2190 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,((18,19,20),21)))))))); tree MPT_2191 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,(18,19,20,21)))))))); tree MPT_2192 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,(18,19,(20,21))))))))); tree MPT_2193 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,(18,(19,21),20)))))))); tree MPT_2194 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,(18,(19,20))),21))))))); tree MPT_2195 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,(18,(19,20)),21))))))); tree MPT_2196 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,((18,(19,20)),21)))))))); tree MPT_2197 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,(18,(19,20),21)))))))); tree MPT_2198 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,(18,((19,20),21))))))))); tree MPT_2199 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,(18,(19,(20,21)))))))))); tree MPT_2200 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,(18,((19,21),20))))))))); tree MPT_2201 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((((17,19),18),20),21))))))); tree MPT_2202 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,19),18),(20,21)))))))); tree MPT_2203 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((((17,19),18),21),20))))))); tree MPT_2204 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,19),18,21),20))))))); tree MPT_2205 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((((17,19),21),18),20))))))); tree MPT_2206 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,19,21),18),20))))))); tree MPT_2207 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,(19,21)),18),20))))))); tree MPT_2208 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,19),18,20),21))))))); tree MPT_2209 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,19),18,20,21))))))); tree MPT_2210 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,19),18,(20,21)))))))); tree MPT_2211 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,19),21),18,20))))))); tree MPT_2212 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,19,21),18,20))))))); tree MPT_2213 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,(19,21)),18,20))))))); tree MPT_2214 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((((17,19),20),18),21))))))); tree MPT_2215 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,19),20),18,21))))))); tree MPT_2216 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((((17,19),20),21),18))))))); tree MPT_2217 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,19),(20,21)),18))))))); tree MPT_2218 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((((17,19),21),20),18))))))); tree MPT_2219 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,19,21),20),18))))))); tree MPT_2220 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,(19,21)),20),18))))))); tree MPT_2221 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((((17,20),19),18),21))))))); tree MPT_2222 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,20),19),18,21))))))); tree MPT_2223 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((((17,20),19),21),18))))))); tree MPT_2224 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((((17,20),21),19),18))))))); tree MPT_2225 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,(20,21)),19),18))))))); tree MPT_2226 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,20,21),19),18))))))); tree MPT_2227 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,20),(19,21)),18))))))); tree MPT_2228 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,(19,20)),18),21))))))); tree MPT_2229 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,(19,20)),18,21))))))); tree MPT_2230 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,(19,20)),21),18))))))); tree MPT_2231 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,(19,20),21),18))))))); tree MPT_2232 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,((19,20),21)),18))))))); tree MPT_2233 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,(19,(20,21))),18))))))); tree MPT_2234 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,((19,21),20)),18))))))); tree MPT_2235 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,18,19),20),21))))))); tree MPT_2236 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,18,19),(20,21)))))))); tree MPT_2237 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,18,19),21),20))))))); tree MPT_2238 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,18,19,21),20))))))); tree MPT_2239 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,18,(19,21)),20))))))); tree MPT_2240 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,18,19,20),21))))))); tree MPT_2241 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,18,19,20,21))))))); tree MPT_2242 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,18,19,(20,21)))))))); tree MPT_2243 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,18,(19,21),20))))))); tree MPT_2244 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,20),18,19),21))))))); tree MPT_2245 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,20),18,19,21))))))); tree MPT_2246 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,20),21),18,19))))))); tree MPT_2247 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,(20,21)),18,19))))))); tree MPT_2248 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,20,21),18,19))))))); tree MPT_2249 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,20),18,(19,21)))))))); tree MPT_2250 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,18,(19,20)),21))))))); tree MPT_2251 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,18,(19,20),21))))))); tree MPT_2252 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,18,((19,20),21)))))))); tree MPT_2253 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,18,(19,(20,21))))))))); tree MPT_2254 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,18,((19,21),20)))))))); tree MPT_2255 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,(18,19)),20),21))))))); tree MPT_2256 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,(18,19)),(20,21)))))))); tree MPT_2257 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,(18,19)),21),20))))))); tree MPT_2258 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,(18,19),21),20))))))); tree MPT_2259 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,((18,19),21)),20))))))); tree MPT_2260 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,(18,19,21)),20))))))); tree MPT_2261 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,(18,(19,21))),20))))))); tree MPT_2262 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,20),(18,19)),21))))))); tree MPT_2263 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,20),21),(18,19)))))))); tree MPT_2264 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,(20,21)),(18,19)))))))); tree MPT_2265 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,20,21),(18,19)))))))); tree MPT_2266 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,20),((18,19),21)))))))); tree MPT_2267 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,20),(18,19,21)))))))); tree MPT_2268 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,20),(18,(19,21))))))))); tree MPT_2269 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,((18,19),20)),21))))))); tree MPT_2270 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,((18,19),20),21))))))); tree MPT_2271 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,(((18,19),20),21)))))))); tree MPT_2272 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,((18,19),(20,21))))))))); tree MPT_2273 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,(((18,19),21),20)))))))); tree MPT_2274 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,((18,19,21),20)))))))); tree MPT_2275 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,((18,(19,21)),20)))))))); tree MPT_2276 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,(18,19,20)),21))))))); tree MPT_2277 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,(18,19,20),21))))))); tree MPT_2278 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,((18,19,20),21)))))))); tree MPT_2279 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,(18,19,20,21)))))))); tree MPT_2280 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,(18,19,(20,21))))))))); tree MPT_2281 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,(18,(19,21),20)))))))); tree MPT_2282 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,(18,(19,20))),21))))))); tree MPT_2283 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,(18,(19,20)),21))))))); tree MPT_2284 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,((18,(19,20)),21)))))))); tree MPT_2285 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,(18,(19,20),21)))))))); tree MPT_2286 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,(18,((19,20),21))))))))); tree MPT_2287 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,(18,(19,(20,21)))))))))); tree MPT_2288 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,(18,((19,21),20))))))))); tree MPT_2289 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((((17,19),18),20),21))))))); tree MPT_2290 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,19),18),(20,21)))))))); tree MPT_2291 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((((17,19),18),21),20))))))); tree MPT_2292 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,19),18,21),20))))))); tree MPT_2293 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((((17,19),21),18),20))))))); tree MPT_2294 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,19,21),18),20))))))); tree MPT_2295 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,(19,21)),18),20))))))); tree MPT_2296 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,19),18,20),21))))))); tree MPT_2297 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,19),18,20,21))))))); tree MPT_2298 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,19),18,(20,21)))))))); tree MPT_2299 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,19),21),18,20))))))); tree MPT_2300 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,19,21),18,20))))))); tree MPT_2301 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,(19,21)),18,20))))))); tree MPT_2302 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((((17,19),20),18),21))))))); tree MPT_2303 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,19),20),18,21))))))); tree MPT_2304 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((((17,19),20),21),18))))))); tree MPT_2305 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,19),(20,21)),18))))))); tree MPT_2306 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((((17,19),21),20),18))))))); tree MPT_2307 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,19,21),20),18))))))); tree MPT_2308 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,(19,21)),20),18))))))); tree MPT_2309 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((((17,20),19),18),21))))))); tree MPT_2310 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,20),19),18,21))))))); tree MPT_2311 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((((17,20),19),21),18))))))); tree MPT_2312 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((((17,20),21),19),18))))))); tree MPT_2313 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,(20,21)),19),18))))))); tree MPT_2314 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,20,21),19),18))))))); tree MPT_2315 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,20),(19,21)),18))))))); tree MPT_2316 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,(19,20)),18),21))))))); tree MPT_2317 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,(19,20)),18,21))))))); tree MPT_2318 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,(19,20)),21),18))))))); tree MPT_2319 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,(19,20),21),18))))))); tree MPT_2320 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,((19,20),21)),18))))))); tree MPT_2321 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,(19,(20,21))),18))))))); tree MPT_2322 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,((19,21),20)),18))))))); tree MPT_2323 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,18,19),20),21))))))); tree MPT_2324 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,18,19),(20,21)))))))); tree MPT_2325 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,18,19),21),20))))))); tree MPT_2326 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,18,19,21),20))))))); tree MPT_2327 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,18,(19,21)),20))))))); tree MPT_2328 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,18,19,20),21))))))); tree MPT_2329 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,18,19,20,21))))))); tree MPT_2330 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,18,19,(20,21)))))))); tree MPT_2331 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,18,(19,21),20))))))); tree MPT_2332 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,20),18,19),21))))))); tree MPT_2333 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,20),18,19,21))))))); tree MPT_2334 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,20),21),18,19))))))); tree MPT_2335 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,(20,21)),18,19))))))); tree MPT_2336 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,20,21),18,19))))))); tree MPT_2337 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,20),18,(19,21)))))))); tree MPT_2338 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,18,(19,20)),21))))))); tree MPT_2339 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,18,(19,20),21))))))); tree MPT_2340 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,18,((19,20),21)))))))); tree MPT_2341 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,18,(19,(20,21))))))))); tree MPT_2342 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,18,((19,21),20)))))))); tree MPT_2343 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,(18,19)),20),21))))))); tree MPT_2344 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,(18,19)),(20,21)))))))); tree MPT_2345 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,(18,19)),21),20))))))); tree MPT_2346 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,(18,19),21),20))))))); tree MPT_2347 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,((18,19),21)),20))))))); tree MPT_2348 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,(18,19,21)),20))))))); tree MPT_2349 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,(18,(19,21))),20))))))); tree MPT_2350 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,20),(18,19)),21))))))); tree MPT_2351 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,20),21),(18,19)))))))); tree MPT_2352 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,(20,21)),(18,19)))))))); tree MPT_2353 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,20,21),(18,19)))))))); tree MPT_2354 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,20),((18,19),21)))))))); tree MPT_2355 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,20),(18,19,21)))))))); tree MPT_2356 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,20),(18,(19,21))))))))); tree MPT_2357 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,((18,19),20)),21))))))); tree MPT_2358 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,((18,19),20),21))))))); tree MPT_2359 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,(((18,19),20),21)))))))); tree MPT_2360 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,((18,19),(20,21))))))))); tree MPT_2361 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,(((18,19),21),20)))))))); tree MPT_2362 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,((18,19,21),20)))))))); tree MPT_2363 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,((18,(19,21)),20)))))))); tree MPT_2364 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,(18,19,20)),21))))))); tree MPT_2365 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,(18,19,20),21))))))); tree MPT_2366 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,((18,19,20),21)))))))); tree MPT_2367 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,(18,19,20,21)))))))); tree MPT_2368 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,(18,19,(20,21))))))))); tree MPT_2369 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,(18,(19,21),20)))))))); tree MPT_2370 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,(18,(19,20))),21))))))); tree MPT_2371 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,(18,(19,20)),21))))))); tree MPT_2372 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,((18,(19,20)),21)))))))); tree MPT_2373 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,(18,(19,20),21)))))))); tree MPT_2374 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,(18,((19,20),21))))))))); tree MPT_2375 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,(18,(19,(20,21)))))))))); tree MPT_2376 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,(18,((19,21),20))))))))); tree MPT_2377 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((((17,19),18),20),21))))))); tree MPT_2378 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,19),18),(20,21)))))))); tree MPT_2379 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((((17,19),18),21),20))))))); tree MPT_2380 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,19),18,21),20))))))); tree MPT_2381 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((((17,19),21),18),20))))))); tree MPT_2382 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,19,21),18),20))))))); tree MPT_2383 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,(19,21)),18),20))))))); tree MPT_2384 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,19),18,20),21))))))); tree MPT_2385 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,19),18,20,21))))))); tree MPT_2386 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,19),18,(20,21)))))))); tree MPT_2387 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,19),21),18,20))))))); tree MPT_2388 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,19,21),18,20))))))); tree MPT_2389 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,(19,21)),18,20))))))); tree MPT_2390 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((((17,19),20),18),21))))))); tree MPT_2391 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,19),20),18,21))))))); tree MPT_2392 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((((17,19),20),21),18))))))); tree MPT_2393 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,19),(20,21)),18))))))); tree MPT_2394 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((((17,19),21),20),18))))))); tree MPT_2395 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,19,21),20),18))))))); tree MPT_2396 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,(19,21)),20),18))))))); tree MPT_2397 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((((17,20),19),18),21))))))); tree MPT_2398 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,20),19),18,21))))))); tree MPT_2399 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((((17,20),19),21),18))))))); tree MPT_2400 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((((17,20),21),19),18))))))); tree MPT_2401 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,(20,21)),19),18))))))); tree MPT_2402 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,20,21),19),18))))))); tree MPT_2403 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,20),(19,21)),18))))))); tree MPT_2404 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,(19,20)),18),21))))))); tree MPT_2405 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,(19,20)),18,21))))))); tree MPT_2406 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,(19,20)),21),18))))))); tree MPT_2407 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,(19,20),21),18))))))); tree MPT_2408 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,((19,20),21)),18))))))); tree MPT_2409 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,(19,(20,21))),18))))))); tree MPT_2410 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,((19,21),20)),18))))))); tree MPT_2411 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,18,19),20),21))))))); tree MPT_2412 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,18,19),(20,21)))))))); tree MPT_2413 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,18,19),21),20))))))); tree MPT_2414 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,18,19,21),20))))))); tree MPT_2415 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,18,(19,21)),20))))))); tree MPT_2416 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,18,19,20),21))))))); tree MPT_2417 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,18,19,20,21))))))); tree MPT_2418 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,18,19,(20,21)))))))); tree MPT_2419 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,18,(19,21),20))))))); tree MPT_2420 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,20),18,19),21))))))); tree MPT_2421 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,20),18,19,21))))))); tree MPT_2422 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,20),21),18,19))))))); tree MPT_2423 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,(20,21)),18,19))))))); tree MPT_2424 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,20,21),18,19))))))); tree MPT_2425 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,20),18,(19,21)))))))); tree MPT_2426 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,18,(19,20)),21))))))); tree MPT_2427 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,18,(19,20),21))))))); tree MPT_2428 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,18,((19,20),21)))))))); tree MPT_2429 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,18,(19,(20,21))))))))); tree MPT_2430 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,18,((19,21),20)))))))); tree MPT_2431 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,(18,19)),20),21))))))); tree MPT_2432 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,(18,19)),(20,21)))))))); tree MPT_2433 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,(18,19)),21),20))))))); tree MPT_2434 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,(18,19),21),20))))))); tree MPT_2435 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,((18,19),21)),20))))))); tree MPT_2436 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,(18,19,21)),20))))))); tree MPT_2437 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,(18,(19,21))),20))))))); tree MPT_2438 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,20),(18,19)),21))))))); tree MPT_2439 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,20),21),(18,19)))))))); tree MPT_2440 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,(20,21)),(18,19)))))))); tree MPT_2441 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,20,21),(18,19)))))))); tree MPT_2442 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,20),((18,19),21)))))))); tree MPT_2443 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,20),(18,19,21)))))))); tree MPT_2444 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,20),(18,(19,21))))))))); tree MPT_2445 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,((18,19),20)),21))))))); tree MPT_2446 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,((18,19),20),21))))))); tree MPT_2447 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,(((18,19),20),21)))))))); tree MPT_2448 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,((18,19),(20,21))))))))); tree MPT_2449 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,(((18,19),21),20)))))))); tree MPT_2450 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,((18,19,21),20)))))))); tree MPT_2451 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,((18,(19,21)),20)))))))); tree MPT_2452 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,(18,19,20)),21))))))); tree MPT_2453 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,(18,19,20),21))))))); tree MPT_2454 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,((18,19,20),21)))))))); tree MPT_2455 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,(18,19,20,21)))))))); tree MPT_2456 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,(18,19,(20,21))))))))); tree MPT_2457 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,(18,(19,21),20)))))))); tree MPT_2458 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,(18,(19,20))),21))))))); tree MPT_2459 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,(18,(19,20)),21))))))); tree MPT_2460 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,((18,(19,20)),21)))))))); tree MPT_2461 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,(18,(19,20),21)))))))); tree MPT_2462 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,(18,((19,20),21))))))))); tree MPT_2463 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,(18,(19,(20,21)))))))))); tree MPT_2464 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,(18,((19,21),20))))))))); tree MPT_2465 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((((17,19),18),20),21))))))); tree MPT_2466 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,19),18),(20,21)))))))); tree MPT_2467 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((((17,19),18),21),20))))))); tree MPT_2468 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,19),18,21),20))))))); tree MPT_2469 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((((17,19),21),18),20))))))); tree MPT_2470 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,19,21),18),20))))))); tree MPT_2471 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,(19,21)),18),20))))))); tree MPT_2472 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,19),18,20),21))))))); tree MPT_2473 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,19),18,20,21))))))); tree MPT_2474 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,19),18,(20,21)))))))); tree MPT_2475 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,19),21),18,20))))))); tree MPT_2476 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,19,21),18,20))))))); tree MPT_2477 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,(19,21)),18,20))))))); tree MPT_2478 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((((17,19),20),18),21))))))); tree MPT_2479 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,19),20),18,21))))))); tree MPT_2480 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((((17,19),20),21),18))))))); tree MPT_2481 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,19),(20,21)),18))))))); tree MPT_2482 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((((17,19),21),20),18))))))); tree MPT_2483 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,19,21),20),18))))))); tree MPT_2484 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,(19,21)),20),18))))))); tree MPT_2485 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((((17,20),19),18),21))))))); tree MPT_2486 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,20),19),18,21))))))); tree MPT_2487 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((((17,20),19),21),18))))))); tree MPT_2488 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((((17,20),21),19),18))))))); tree MPT_2489 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,(20,21)),19),18))))))); tree MPT_2490 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,20,21),19),18))))))); tree MPT_2491 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,20),(19,21)),18))))))); tree MPT_2492 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,(19,20)),18),21))))))); tree MPT_2493 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,(19,20)),18,21))))))); tree MPT_2494 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,(19,20)),21),18))))))); tree MPT_2495 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,(19,20),21),18))))))); tree MPT_2496 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,((19,20),21)),18))))))); tree MPT_2497 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,(19,(20,21))),18))))))); tree MPT_2498 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,((19,21),20)),18))))))); tree MPT_2499 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,18,19),20),21))))))); tree MPT_2500 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,18,19),(20,21)))))))); tree MPT_2501 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,18,19),21),20))))))); tree MPT_2502 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,18,19,21),20))))))); tree MPT_2503 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,18,(19,21)),20))))))); tree MPT_2504 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,18,19,20),21))))))); tree MPT_2505 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,18,19,20,21))))))); tree MPT_2506 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,18,19,(20,21)))))))); tree MPT_2507 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,18,(19,21),20))))))); tree MPT_2508 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,20),18,19),21))))))); tree MPT_2509 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,20),18,19,21))))))); tree MPT_2510 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,20),21),18,19))))))); tree MPT_2511 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,(20,21)),18,19))))))); tree MPT_2512 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,20,21),18,19))))))); tree MPT_2513 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,20),18,(19,21)))))))); tree MPT_2514 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,18,(19,20)),21))))))); tree MPT_2515 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,18,(19,20),21))))))); tree MPT_2516 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,18,((19,20),21)))))))); tree MPT_2517 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,18,(19,(20,21))))))))); tree MPT_2518 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,18,((19,21),20)))))))); tree MPT_2519 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,(18,19)),20),21))))))); tree MPT_2520 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,(18,19)),(20,21)))))))); tree MPT_2521 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,(18,19)),21),20))))))); tree MPT_2522 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,(18,19),21),20))))))); tree MPT_2523 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,((18,19),21)),20))))))); tree MPT_2524 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,(18,19,21)),20))))))); tree MPT_2525 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,(18,(19,21))),20))))))); tree MPT_2526 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,20),(18,19)),21))))))); tree MPT_2527 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,20),21),(18,19)))))))); tree MPT_2528 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,(20,21)),(18,19)))))))); tree MPT_2529 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,20,21),(18,19)))))))); tree MPT_2530 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,20),((18,19),21)))))))); tree MPT_2531 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,20),(18,19,21)))))))); tree MPT_2532 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,20),(18,(19,21))))))))); tree MPT_2533 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,((18,19),20)),21))))))); tree MPT_2534 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,((18,19),20),21))))))); tree MPT_2535 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,(((18,19),20),21)))))))); tree MPT_2536 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,((18,19),(20,21))))))))); tree MPT_2537 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,(((18,19),21),20)))))))); tree MPT_2538 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,((18,19,21),20)))))))); tree MPT_2539 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,((18,(19,21)),20)))))))); tree MPT_2540 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,(18,19,20)),21))))))); tree MPT_2541 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,(18,19,20),21))))))); tree MPT_2542 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,((18,19,20),21)))))))); tree MPT_2543 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,(18,19,20,21)))))))); tree MPT_2544 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,(18,19,(20,21))))))))); tree MPT_2545 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,(18,(19,21),20)))))))); tree MPT_2546 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,(18,(19,20))),21))))))); tree MPT_2547 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,(18,(19,20)),21))))))); tree MPT_2548 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,((18,(19,20)),21)))))))); tree MPT_2549 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,(18,(19,20),21)))))))); tree MPT_2550 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,(18,((19,20),21))))))))); tree MPT_2551 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,(18,(19,(20,21)))))))))); tree MPT_2552 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,(18,((19,21),20))))))))); tree MPT_2553 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((((17,19),18),20),21))))))); tree MPT_2554 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,19),18),(20,21)))))))); tree MPT_2555 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((((17,19),18),21),20))))))); tree MPT_2556 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,19),18,21),20))))))); tree MPT_2557 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((((17,19),21),18),20))))))); tree MPT_2558 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,19,21),18),20))))))); tree MPT_2559 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,(19,21)),18),20))))))); tree MPT_2560 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,19),18,20),21))))))); tree MPT_2561 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,19),18,20,21))))))); tree MPT_2562 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,19),18,(20,21)))))))); tree MPT_2563 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,19),21),18,20))))))); tree MPT_2564 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,19,21),18,20))))))); tree MPT_2565 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,(19,21)),18,20))))))); tree MPT_2566 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((((17,19),20),18),21))))))); tree MPT_2567 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,19),20),18,21))))))); tree MPT_2568 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((((17,19),20),21),18))))))); tree MPT_2569 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,19),(20,21)),18))))))); tree MPT_2570 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((((17,19),21),20),18))))))); tree MPT_2571 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,19,21),20),18))))))); tree MPT_2572 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,(19,21)),20),18))))))); tree MPT_2573 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((((17,20),19),18),21))))))); tree MPT_2574 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,20),19),18,21))))))); tree MPT_2575 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((((17,20),19),21),18))))))); tree MPT_2576 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((((17,20),21),19),18))))))); tree MPT_2577 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,(20,21)),19),18))))))); tree MPT_2578 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,20,21),19),18))))))); tree MPT_2579 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,20),(19,21)),18))))))); tree MPT_2580 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,(19,20)),18),21))))))); tree MPT_2581 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,(19,20)),18,21))))))); tree MPT_2582 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,(19,20)),21),18))))))); tree MPT_2583 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,(19,20),21),18))))))); tree MPT_2584 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,((19,20),21)),18))))))); tree MPT_2585 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,(19,(20,21))),18))))))); tree MPT_2586 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,((19,21),20)),18))))))); tree MPT_2587 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,18,19),20),21))))))); tree MPT_2588 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,18,19),(20,21)))))))); tree MPT_2589 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,18,19),21),20))))))); tree MPT_2590 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,18,19,21),20))))))); tree MPT_2591 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,18,(19,21)),20))))))); tree MPT_2592 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,18,19,20),21))))))); tree MPT_2593 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,18,19,20,21))))))); tree MPT_2594 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,18,19,(20,21)))))))); tree MPT_2595 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,18,(19,21),20))))))); tree MPT_2596 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,20),18,19),21))))))); tree MPT_2597 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,20),18,19,21))))))); tree MPT_2598 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,20),21),18,19))))))); tree MPT_2599 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,(20,21)),18,19))))))); tree MPT_2600 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,20,21),18,19))))))); tree MPT_2601 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,20),18,(19,21)))))))); tree MPT_2602 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,18,(19,20)),21))))))); tree MPT_2603 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,18,(19,20),21))))))); tree MPT_2604 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,18,((19,20),21)))))))); tree MPT_2605 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,18,(19,(20,21))))))))); tree MPT_2606 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,18,((19,21),20)))))))); tree MPT_2607 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,(18,19)),20),21))))))); tree MPT_2608 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,(18,19)),(20,21)))))))); tree MPT_2609 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,(18,19)),21),20))))))); tree MPT_2610 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,(18,19),21),20))))))); tree MPT_2611 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,((18,19),21)),20))))))); tree MPT_2612 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,(18,19,21)),20))))))); tree MPT_2613 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,(18,(19,21))),20))))))); tree MPT_2614 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,20),(18,19)),21))))))); tree MPT_2615 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,20),21),(18,19)))))))); tree MPT_2616 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,(20,21)),(18,19)))))))); tree MPT_2617 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,20,21),(18,19)))))))); tree MPT_2618 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,20),((18,19),21)))))))); tree MPT_2619 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,20),(18,19,21)))))))); tree MPT_2620 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,20),(18,(19,21))))))))); tree MPT_2621 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,((18,19),20)),21))))))); tree MPT_2622 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,((18,19),20),21))))))); tree MPT_2623 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,(((18,19),20),21)))))))); tree MPT_2624 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,((18,19),(20,21))))))))); tree MPT_2625 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,(((18,19),21),20)))))))); tree MPT_2626 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,((18,19,21),20)))))))); tree MPT_2627 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,((18,(19,21)),20)))))))); tree MPT_2628 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,(18,19,20)),21))))))); tree MPT_2629 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,(18,19,20),21))))))); tree MPT_2630 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,((18,19,20),21)))))))); tree MPT_2631 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,(18,19,20,21)))))))); tree MPT_2632 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,(18,19,(20,21))))))))); tree MPT_2633 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,(18,(19,21),20)))))))); tree MPT_2634 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,(18,(19,20))),21))))))); tree MPT_2635 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,(18,(19,20)),21))))))); tree MPT_2636 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,((18,(19,20)),21)))))))); tree MPT_2637 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,(18,(19,20),21)))))))); tree MPT_2638 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,(18,((19,20),21))))))))); tree MPT_2639 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,(18,(19,(20,21)))))))))); tree MPT_2640 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,(18,((19,21),20))))))))); tree MPT_2641 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((((17,19),18),20),21))))))); tree MPT_2642 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,19),18),(20,21)))))))); tree MPT_2643 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((((17,19),18),21),20))))))); tree MPT_2644 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,19),18,21),20))))))); tree MPT_2645 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((((17,19),21),18),20))))))); tree MPT_2646 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,19,21),18),20))))))); tree MPT_2647 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,(19,21)),18),20))))))); tree MPT_2648 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,19),18,20),21))))))); tree MPT_2649 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,19),18,20,21))))))); tree MPT_2650 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,19),18,(20,21)))))))); tree MPT_2651 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,19),21),18,20))))))); tree MPT_2652 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,19,21),18,20))))))); tree MPT_2653 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,(19,21)),18,20))))))); tree MPT_2654 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((((17,19),20),18),21))))))); tree MPT_2655 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,19),20),18,21))))))); tree MPT_2656 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((((17,19),20),21),18))))))); tree MPT_2657 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,19),(20,21)),18))))))); tree MPT_2658 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((((17,19),21),20),18))))))); tree MPT_2659 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,19,21),20),18))))))); tree MPT_2660 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,(19,21)),20),18))))))); tree MPT_2661 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((((17,20),19),18),21))))))); tree MPT_2662 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,20),19),18,21))))))); tree MPT_2663 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((((17,20),19),21),18))))))); tree MPT_2664 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((((17,20),21),19),18))))))); tree MPT_2665 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,(20,21)),19),18))))))); tree MPT_2666 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,20,21),19),18))))))); tree MPT_2667 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,20),(19,21)),18))))))); tree MPT_2668 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,(19,20)),18),21))))))); tree MPT_2669 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,(19,20)),18,21))))))); tree MPT_2670 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,(19,20)),21),18))))))); tree MPT_2671 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,(19,20),21),18))))))); tree MPT_2672 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,((19,20),21)),18))))))); tree MPT_2673 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,(19,(20,21))),18))))))); tree MPT_2674 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,((19,21),20)),18))))))); tree MPT_2675 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,18,19),20),21))))))); tree MPT_2676 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,18,19),(20,21)))))))); tree MPT_2677 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,18,19),21),20))))))); tree MPT_2678 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,18,19,21),20))))))); tree MPT_2679 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,18,(19,21)),20))))))); tree MPT_2680 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,18,19,20),21))))))); tree MPT_2681 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,18,19,20,21))))))); tree MPT_2682 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,18,19,(20,21)))))))); tree MPT_2683 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,18,(19,21),20))))))); tree MPT_2684 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,20),18,19),21))))))); tree MPT_2685 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,20),18,19,21))))))); tree MPT_2686 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,20),21),18,19))))))); tree MPT_2687 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,(20,21)),18,19))))))); tree MPT_2688 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,20,21),18,19))))))); tree MPT_2689 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,20),18,(19,21)))))))); tree MPT_2690 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,18,(19,20)),21))))))); tree MPT_2691 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,18,(19,20),21))))))); tree MPT_2692 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,18,((19,20),21)))))))); tree MPT_2693 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,18,(19,(20,21))))))))); tree MPT_2694 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,18,((19,21),20)))))))); tree MPT_2695 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,(18,19)),20),21))))))); tree MPT_2696 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,(18,19)),(20,21)))))))); tree MPT_2697 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,(18,19)),21),20))))))); tree MPT_2698 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,(18,19),21),20))))))); tree MPT_2699 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,((18,19),21)),20))))))); tree MPT_2700 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,(18,19,21)),20))))))); tree MPT_2701 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,(18,(19,21))),20))))))); tree MPT_2702 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,20),(18,19)),21))))))); tree MPT_2703 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,20),21),(18,19)))))))); tree MPT_2704 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,(20,21)),(18,19)))))))); tree MPT_2705 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,20,21),(18,19)))))))); tree MPT_2706 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,20),((18,19),21)))))))); tree MPT_2707 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,20),(18,19,21)))))))); tree MPT_2708 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,20),(18,(19,21))))))))); tree MPT_2709 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,((18,19),20)),21))))))); tree MPT_2710 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,((18,19),20),21))))))); tree MPT_2711 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,(((18,19),20),21)))))))); tree MPT_2712 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,((18,19),(20,21))))))))); tree MPT_2713 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,(((18,19),21),20)))))))); tree MPT_2714 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,((18,19,21),20)))))))); tree MPT_2715 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,((18,(19,21)),20)))))))); tree MPT_2716 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,(18,19,20)),21))))))); tree MPT_2717 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,(18,19,20),21))))))); tree MPT_2718 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,((18,19,20),21)))))))); tree MPT_2719 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,(18,19,20,21)))))))); tree MPT_2720 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,(18,19,(20,21))))))))); tree MPT_2721 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,(18,(19,21),20)))))))); tree MPT_2722 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,(18,(19,20))),21))))))); tree MPT_2723 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,(18,(19,20)),21))))))); tree MPT_2724 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,((18,(19,20)),21)))))))); tree MPT_2725 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,(18,(19,20),21)))))))); tree MPT_2726 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,(18,((19,20),21))))))))); tree MPT_2727 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,(18,(19,(20,21)))))))))); tree MPT_2728 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,(18,((19,21),20))))))))); tree MPT_2729 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((((17,19),18),20),21))))))); tree MPT_2730 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,19),18),(20,21)))))))); tree MPT_2731 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((((17,19),18),21),20))))))); tree MPT_2732 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,19),18,21),20))))))); tree MPT_2733 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((((17,19),21),18),20))))))); tree MPT_2734 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,19,21),18),20))))))); tree MPT_2735 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,(19,21)),18),20))))))); tree MPT_2736 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,19),18,20),21))))))); tree MPT_2737 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,19),18,20,21))))))); tree MPT_2738 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,19),18,(20,21)))))))); tree MPT_2739 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,19),21),18,20))))))); tree MPT_2740 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,19,21),18,20))))))); tree MPT_2741 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,(19,21)),18,20))))))); tree MPT_2742 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((((17,19),20),18),21))))))); tree MPT_2743 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,19),20),18,21))))))); tree MPT_2744 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((((17,19),20),21),18))))))); tree MPT_2745 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,19),(20,21)),18))))))); tree MPT_2746 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((((17,19),21),20),18))))))); tree MPT_2747 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,19,21),20),18))))))); tree MPT_2748 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,(19,21)),20),18))))))); tree MPT_2749 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((((17,20),19),18),21))))))); tree MPT_2750 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,20),19),18,21))))))); tree MPT_2751 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((((17,20),19),21),18))))))); tree MPT_2752 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((((17,20),21),19),18))))))); tree MPT_2753 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,(20,21)),19),18))))))); tree MPT_2754 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,20,21),19),18))))))); tree MPT_2755 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,20),(19,21)),18))))))); tree MPT_2756 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,(19,20)),18),21))))))); tree MPT_2757 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,(19,20)),18,21))))))); tree MPT_2758 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,(19,20)),21),18))))))); tree MPT_2759 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,(19,20),21),18))))))); tree MPT_2760 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,((19,20),21)),18))))))); tree MPT_2761 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,(19,(20,21))),18))))))); tree MPT_2762 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,((19,21),20)),18))))))); tree MPT_2763 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,18,19),20),21))))))); tree MPT_2764 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,18,19),(20,21)))))))); tree MPT_2765 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,18,19),21),20))))))); tree MPT_2766 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,18,19,21),20))))))); tree MPT_2767 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,18,(19,21)),20))))))); tree MPT_2768 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,18,19,20),21))))))); tree MPT_2769 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,18,19,20,21))))))); tree MPT_2770 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,18,19,(20,21)))))))); tree MPT_2771 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,18,(19,21),20))))))); tree MPT_2772 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,20),18,19),21))))))); tree MPT_2773 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,20),18,19,21))))))); tree MPT_2774 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,20),21),18,19))))))); tree MPT_2775 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,(20,21)),18,19))))))); tree MPT_2776 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,20,21),18,19))))))); tree MPT_2777 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,20),18,(19,21)))))))); tree MPT_2778 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,18,(19,20)),21))))))); tree MPT_2779 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,18,(19,20),21))))))); tree MPT_2780 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,18,((19,20),21)))))))); tree MPT_2781 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,18,(19,(20,21))))))))); tree MPT_2782 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,18,((19,21),20)))))))); tree MPT_2783 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,(18,19)),20),21))))))); tree MPT_2784 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,(18,19)),(20,21)))))))); tree MPT_2785 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,(18,19)),21),20))))))); tree MPT_2786 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,(18,19),21),20))))))); tree MPT_2787 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,((18,19),21)),20))))))); tree MPT_2788 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,(18,19,21)),20))))))); tree MPT_2789 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,(18,(19,21))),20))))))); tree MPT_2790 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,20),(18,19)),21))))))); tree MPT_2791 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,20),21),(18,19)))))))); tree MPT_2792 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,(20,21)),(18,19)))))))); tree MPT_2793 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,20,21),(18,19)))))))); tree MPT_2794 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,20),((18,19),21)))))))); tree MPT_2795 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,20),(18,19,21)))))))); tree MPT_2796 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,20),(18,(19,21))))))))); tree MPT_2797 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,((18,19),20)),21))))))); tree MPT_2798 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,((18,19),20),21))))))); tree MPT_2799 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,(((18,19),20),21)))))))); tree MPT_2800 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,((18,19),(20,21))))))))); tree MPT_2801 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,(((18,19),21),20)))))))); tree MPT_2802 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,((18,19,21),20)))))))); tree MPT_2803 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,((18,(19,21)),20)))))))); tree MPT_2804 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,(18,19,20)),21))))))); tree MPT_2805 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,(18,19,20),21))))))); tree MPT_2806 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,((18,19,20),21)))))))); tree MPT_2807 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,(18,19,20,21)))))))); tree MPT_2808 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,(18,19,(20,21))))))))); tree MPT_2809 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,(18,(19,21),20)))))))); tree MPT_2810 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,(18,(19,20))),21))))))); tree MPT_2811 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,(18,(19,20)),21))))))); tree MPT_2812 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,((18,(19,20)),21)))))))); tree MPT_2813 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,(18,(19,20),21)))))))); tree MPT_2814 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,(18,((19,20),21))))))))); tree MPT_2815 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,(18,(19,(20,21)))))))))); tree MPT_2816 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,(18,((19,21),20))))))))); tree MPT_2817 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((((17,19),18),20),21))))))); tree MPT_2818 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,19),18),(20,21)))))))); tree MPT_2819 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((((17,19),18),21),20))))))); tree MPT_2820 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,19),18,21),20))))))); tree MPT_2821 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((((17,19),21),18),20))))))); tree MPT_2822 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,19,21),18),20))))))); tree MPT_2823 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,(19,21)),18),20))))))); tree MPT_2824 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,19),18,20),21))))))); tree MPT_2825 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,19),18,20,21))))))); tree MPT_2826 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,19),18,(20,21)))))))); tree MPT_2827 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,19),21),18,20))))))); tree MPT_2828 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,19,21),18,20))))))); tree MPT_2829 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,(19,21)),18,20))))))); tree MPT_2830 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((((17,19),20),18),21))))))); tree MPT_2831 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,19),20),18,21))))))); tree MPT_2832 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((((17,19),20),21),18))))))); tree MPT_2833 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,19),(20,21)),18))))))); tree MPT_2834 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((((17,19),21),20),18))))))); tree MPT_2835 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,19,21),20),18))))))); tree MPT_2836 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,(19,21)),20),18))))))); tree MPT_2837 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((((17,20),19),18),21))))))); tree MPT_2838 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,20),19),18,21))))))); tree MPT_2839 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((((17,20),19),21),18))))))); tree MPT_2840 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((((17,20),21),19),18))))))); tree MPT_2841 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,(20,21)),19),18))))))); tree MPT_2842 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,20,21),19),18))))))); tree MPT_2843 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,20),(19,21)),18))))))); tree MPT_2844 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,(19,20)),18),21))))))); tree MPT_2845 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,(19,20)),18,21))))))); tree MPT_2846 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,(19,20)),21),18))))))); tree MPT_2847 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,(19,20),21),18))))))); tree MPT_2848 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,((19,20),21)),18))))))); tree MPT_2849 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,(19,(20,21))),18))))))); tree MPT_2850 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,((19,21),20)),18))))))); tree MPT_2851 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,18,19),20),21))))))); tree MPT_2852 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,18,19),(20,21)))))))); tree MPT_2853 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,18,19),21),20))))))); tree MPT_2854 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,18,19,21),20))))))); tree MPT_2855 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,18,(19,21)),20))))))); tree MPT_2856 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,18,19,20),21))))))); tree MPT_2857 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,18,19,20,21))))))); tree MPT_2858 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,18,19,(20,21)))))))); tree MPT_2859 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,18,(19,21),20))))))); tree MPT_2860 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,20),18,19),21))))))); tree MPT_2861 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,20),18,19,21))))))); tree MPT_2862 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,20),21),18,19))))))); tree MPT_2863 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,(20,21)),18,19))))))); tree MPT_2864 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,20,21),18,19))))))); tree MPT_2865 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,20),18,(19,21)))))))); tree MPT_2866 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,18,(19,20)),21))))))); tree MPT_2867 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,18,(19,20),21))))))); tree MPT_2868 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,18,((19,20),21)))))))); tree MPT_2869 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,18,(19,(20,21))))))))); tree MPT_2870 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,18,((19,21),20)))))))); tree MPT_2871 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,(18,19)),20),21))))))); tree MPT_2872 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,(18,19)),(20,21)))))))); tree MPT_2873 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,(18,19)),21),20))))))); tree MPT_2874 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,(18,19),21),20))))))); tree MPT_2875 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,((18,19),21)),20))))))); tree MPT_2876 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,(18,19,21)),20))))))); tree MPT_2877 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,(18,(19,21))),20))))))); tree MPT_2878 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,20),(18,19)),21))))))); tree MPT_2879 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,20),21),(18,19)))))))); tree MPT_2880 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,(20,21)),(18,19)))))))); tree MPT_2881 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,20,21),(18,19)))))))); tree MPT_2882 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,20),((18,19),21)))))))); tree MPT_2883 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,20),(18,19,21)))))))); tree MPT_2884 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,20),(18,(19,21))))))))); tree MPT_2885 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,((18,19),20)),21))))))); tree MPT_2886 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,((18,19),20),21))))))); tree MPT_2887 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,(((18,19),20),21)))))))); tree MPT_2888 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,((18,19),(20,21))))))))); tree MPT_2889 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,(((18,19),21),20)))))))); tree MPT_2890 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,((18,19,21),20)))))))); tree MPT_2891 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,((18,(19,21)),20)))))))); tree MPT_2892 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,(18,19,20)),21))))))); tree MPT_2893 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,(18,19,20),21))))))); tree MPT_2894 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,((18,19,20),21)))))))); tree MPT_2895 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,(18,19,20,21)))))))); tree MPT_2896 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,(18,19,(20,21))))))))); tree MPT_2897 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,(18,(19,21),20)))))))); tree MPT_2898 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,(18,(19,20))),21))))))); tree MPT_2899 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,(18,(19,20)),21))))))); tree MPT_2900 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,((18,(19,20)),21)))))))); tree MPT_2901 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,(18,(19,20),21)))))))); tree MPT_2902 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,(18,((19,20),21))))))))); tree MPT_2903 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,(18,(19,(20,21)))))))))); tree MPT_2904 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,(18,((19,21),20))))))))); tree MPT_2905 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((((17,19),18),20),21))))))); tree MPT_2906 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,19),18),(20,21)))))))); tree MPT_2907 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((((17,19),18),21),20))))))); tree MPT_2908 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,19),18,21),20))))))); tree MPT_2909 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((((17,19),21),18),20))))))); tree MPT_2910 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,19,21),18),20))))))); tree MPT_2911 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,(19,21)),18),20))))))); tree MPT_2912 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,19),18,20),21))))))); tree MPT_2913 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,19),18,20,21))))))); tree MPT_2914 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,19),18,(20,21)))))))); tree MPT_2915 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,19),21),18,20))))))); tree MPT_2916 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,19,21),18,20))))))); tree MPT_2917 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,(19,21)),18,20))))))); tree MPT_2918 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((((17,19),20),18),21))))))); tree MPT_2919 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,19),20),18,21))))))); tree MPT_2920 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((((17,19),20),21),18))))))); tree MPT_2921 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,19),(20,21)),18))))))); tree MPT_2922 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((((17,19),21),20),18))))))); tree MPT_2923 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,19,21),20),18))))))); tree MPT_2924 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,(19,21)),20),18))))))); tree MPT_2925 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((((17,20),19),18),21))))))); tree MPT_2926 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,20),19),18,21))))))); tree MPT_2927 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((((17,20),19),21),18))))))); tree MPT_2928 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((((17,20),21),19),18))))))); tree MPT_2929 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,(20,21)),19),18))))))); tree MPT_2930 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,20,21),19),18))))))); tree MPT_2931 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,20),(19,21)),18))))))); tree MPT_2932 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,(19,20)),18),21))))))); tree MPT_2933 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,(19,20)),18,21))))))); tree MPT_2934 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,(19,20)),21),18))))))); tree MPT_2935 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,(19,20),21),18))))))); tree MPT_2936 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,((19,20),21)),18))))))); tree MPT_2937 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,(19,(20,21))),18))))))); tree MPT_2938 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,((19,21),20)),18))))))); tree MPT_2939 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,18,19),20),21))))))); tree MPT_2940 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,18,19),(20,21)))))))); tree MPT_2941 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,18,19),21),20))))))); tree MPT_2942 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,18,19,21),20))))))); tree MPT_2943 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,18,(19,21)),20))))))); tree MPT_2944 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,18,19,20),21))))))); tree MPT_2945 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,18,19,20,21))))))); tree MPT_2946 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,18,19,(20,21)))))))); tree MPT_2947 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,18,(19,21),20))))))); tree MPT_2948 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,20),18,19),21))))))); tree MPT_2949 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,20),18,19,21))))))); tree MPT_2950 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,20),21),18,19))))))); tree MPT_2951 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,(20,21)),18,19))))))); tree MPT_2952 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,20,21),18,19))))))); tree MPT_2953 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,20),18,(19,21)))))))); tree MPT_2954 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,18,(19,20)),21))))))); tree MPT_2955 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,18,(19,20),21))))))); tree MPT_2956 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,18,((19,20),21)))))))); tree MPT_2957 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,18,(19,(20,21))))))))); tree MPT_2958 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,18,((19,21),20)))))))); tree MPT_2959 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,(18,19)),20),21))))))); tree MPT_2960 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,(18,19)),(20,21)))))))); tree MPT_2961 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,(18,19)),21),20))))))); tree MPT_2962 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,(18,19),21),20))))))); tree MPT_2963 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,((18,19),21)),20))))))); tree MPT_2964 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,(18,19,21)),20))))))); tree MPT_2965 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,(18,(19,21))),20))))))); tree MPT_2966 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,20),(18,19)),21))))))); tree MPT_2967 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,20),21),(18,19)))))))); tree MPT_2968 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,(20,21)),(18,19)))))))); tree MPT_2969 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,20,21),(18,19)))))))); tree MPT_2970 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,20),((18,19),21)))))))); tree MPT_2971 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,20),(18,19,21)))))))); tree MPT_2972 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,20),(18,(19,21))))))))); tree MPT_2973 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,((18,19),20)),21))))))); tree MPT_2974 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,((18,19),20),21))))))); tree MPT_2975 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,(((18,19),20),21)))))))); tree MPT_2976 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,((18,19),(20,21))))))))); tree MPT_2977 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,(((18,19),21),20)))))))); tree MPT_2978 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,((18,19,21),20)))))))); tree MPT_2979 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,((18,(19,21)),20)))))))); tree MPT_2980 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,(18,19,20)),21))))))); tree MPT_2981 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,(18,19,20),21))))))); tree MPT_2982 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,((18,19,20),21)))))))); tree MPT_2983 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,(18,19,20,21)))))))); tree MPT_2984 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,(18,19,(20,21))))))))); tree MPT_2985 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,(18,(19,21),20)))))))); tree MPT_2986 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,(18,(19,20))),21))))))); tree MPT_2987 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,(18,(19,20)),21))))))); tree MPT_2988 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,((18,(19,20)),21)))))))); tree MPT_2989 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,(18,(19,20),21)))))))); tree MPT_2990 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,(18,((19,20),21))))))))); tree MPT_2991 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,(18,(19,(20,21)))))))))); tree MPT_2992 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,(18,((19,21),20))))))))); tree MPT_2993 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((((17,19),18),20),21))))))); tree MPT_2994 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,19),18),(20,21)))))))); tree MPT_2995 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((((17,19),18),21),20))))))); tree MPT_2996 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,19),18,21),20))))))); tree MPT_2997 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((((17,19),21),18),20))))))); tree MPT_2998 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,19,21),18),20))))))); tree MPT_2999 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,(19,21)),18),20))))))); tree MPT_3000 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,19),18,20),21))))))); tree MPT_3001 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,19),18,20,21))))))); tree MPT_3002 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,19),18,(20,21)))))))); tree MPT_3003 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,19),21),18,20))))))); tree MPT_3004 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,19,21),18,20))))))); tree MPT_3005 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,(19,21)),18,20))))))); tree MPT_3006 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((((17,19),20),18),21))))))); tree MPT_3007 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,19),20),18,21))))))); tree MPT_3008 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((((17,19),20),21),18))))))); tree MPT_3009 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,19),(20,21)),18))))))); tree MPT_3010 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((((17,19),21),20),18))))))); tree MPT_3011 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,19,21),20),18))))))); tree MPT_3012 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,(19,21)),20),18))))))); tree MPT_3013 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((((17,20),19),18),21))))))); tree MPT_3014 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,20),19),18,21))))))); tree MPT_3015 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((((17,20),19),21),18))))))); tree MPT_3016 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((((17,20),21),19),18))))))); tree MPT_3017 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,(20,21)),19),18))))))); tree MPT_3018 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,20,21),19),18))))))); tree MPT_3019 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,20),(19,21)),18))))))); tree MPT_3020 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,(19,20)),18),21))))))); tree MPT_3021 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,(19,20)),18,21))))))); tree MPT_3022 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,(19,20)),21),18))))))); tree MPT_3023 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,(19,20),21),18))))))); tree MPT_3024 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,((19,20),21)),18))))))); tree MPT_3025 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,(19,(20,21))),18))))))); tree MPT_3026 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,((19,21),20)),18))))))); tree MPT_3027 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,18,19),20),21))))))); tree MPT_3028 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,18,19),(20,21)))))))); tree MPT_3029 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,18,19),21),20))))))); tree MPT_3030 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,18,19,21),20))))))); tree MPT_3031 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,18,(19,21)),20))))))); tree MPT_3032 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,18,19,20),21))))))); tree MPT_3033 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,18,19,20,21))))))); tree MPT_3034 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,18,19,(20,21)))))))); tree MPT_3035 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,18,(19,21),20))))))); tree MPT_3036 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,20),18,19),21))))))); tree MPT_3037 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,20),18,19,21))))))); tree MPT_3038 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,20),21),18,19))))))); tree MPT_3039 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,(20,21)),18,19))))))); tree MPT_3040 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,20,21),18,19))))))); tree MPT_3041 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,20),18,(19,21)))))))); tree MPT_3042 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,18,(19,20)),21))))))); tree MPT_3043 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,18,(19,20),21))))))); tree MPT_3044 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,18,((19,20),21)))))))); tree MPT_3045 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,18,(19,(20,21))))))))); tree MPT_3046 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,18,((19,21),20)))))))); tree MPT_3047 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,(18,19)),20),21))))))); tree MPT_3048 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,(18,19)),(20,21)))))))); tree MPT_3049 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,(18,19)),21),20))))))); tree MPT_3050 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,(18,19),21),20))))))); tree MPT_3051 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,((18,19),21)),20))))))); tree MPT_3052 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,(18,19,21)),20))))))); tree MPT_3053 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,(18,(19,21))),20))))))); tree MPT_3054 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,20),(18,19)),21))))))); tree MPT_3055 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,20),21),(18,19)))))))); tree MPT_3056 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,(20,21)),(18,19)))))))); tree MPT_3057 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,20,21),(18,19)))))))); tree MPT_3058 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,20),((18,19),21)))))))); tree MPT_3059 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,20),(18,19,21)))))))); tree MPT_3060 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,20),(18,(19,21))))))))); tree MPT_3061 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,((18,19),20)),21))))))); tree MPT_3062 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,((18,19),20),21))))))); tree MPT_3063 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,(((18,19),20),21)))))))); tree MPT_3064 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,((18,19),(20,21))))))))); tree MPT_3065 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,(((18,19),21),20)))))))); tree MPT_3066 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,((18,19,21),20)))))))); tree MPT_3067 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,((18,(19,21)),20)))))))); tree MPT_3068 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,(18,19,20)),21))))))); tree MPT_3069 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,(18,19,20),21))))))); tree MPT_3070 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,((18,19,20),21)))))))); tree MPT_3071 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,(18,19,20,21)))))))); tree MPT_3072 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,(18,19,(20,21))))))))); tree MPT_3073 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,(18,(19,21),20)))))))); tree MPT_3074 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,(18,(19,20))),21))))))); tree MPT_3075 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,(18,(19,20)),21))))))); tree MPT_3076 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,((18,(19,20)),21)))))))); tree MPT_3077 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,(18,(19,20),21)))))))); tree MPT_3078 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,(18,((19,20),21))))))))); tree MPT_3079 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,(18,(19,(20,21)))))))))); tree MPT_3080 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,(18,((19,21),20))))))))); tree MPT_3081 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((((17,19),18),20),21))))))); tree MPT_3082 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,19),18),(20,21)))))))); tree MPT_3083 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((((17,19),18),21),20))))))); tree MPT_3084 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,19),18,21),20))))))); tree MPT_3085 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((((17,19),21),18),20))))))); tree MPT_3086 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,19,21),18),20))))))); tree MPT_3087 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,(19,21)),18),20))))))); tree MPT_3088 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,19),18,20),21))))))); tree MPT_3089 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,19),18,20,21))))))); tree MPT_3090 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,19),18,(20,21)))))))); tree MPT_3091 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,19),21),18,20))))))); tree MPT_3092 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,19,21),18,20))))))); tree MPT_3093 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,(19,21)),18,20))))))); tree MPT_3094 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((((17,19),20),18),21))))))); tree MPT_3095 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,19),20),18,21))))))); tree MPT_3096 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((((17,19),20),21),18))))))); tree MPT_3097 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,19),(20,21)),18))))))); tree MPT_3098 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((((17,19),21),20),18))))))); tree MPT_3099 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,19,21),20),18))))))); tree MPT_3100 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,(19,21)),20),18))))))); tree MPT_3101 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((((17,20),19),18),21))))))); tree MPT_3102 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,20),19),18,21))))))); tree MPT_3103 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((((17,20),19),21),18))))))); tree MPT_3104 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((((17,20),21),19),18))))))); tree MPT_3105 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,(20,21)),19),18))))))); tree MPT_3106 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,20,21),19),18))))))); tree MPT_3107 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,20),(19,21)),18))))))); tree MPT_3108 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,(19,20)),18),21))))))); tree MPT_3109 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,(19,20)),18,21))))))); tree MPT_3110 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,(19,20)),21),18))))))); tree MPT_3111 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,(19,20),21),18))))))); tree MPT_3112 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,((19,20),21)),18))))))); tree MPT_3113 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,(19,(20,21))),18))))))); tree MPT_3114 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,((19,21),20)),18))))))); tree MPT_3115 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,18,19),20),21))))))); tree MPT_3116 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,18,19),(20,21)))))))); tree MPT_3117 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,18,19),21),20))))))); tree MPT_3118 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,18,19,21),20))))))); tree MPT_3119 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,18,(19,21)),20))))))); tree MPT_3120 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,18,19,20),21))))))); tree MPT_3121 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,18,19,20,21))))))); tree MPT_3122 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,18,19,(20,21)))))))); tree MPT_3123 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,18,(19,21),20))))))); tree MPT_3124 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,20),18,19),21))))))); tree MPT_3125 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,20),18,19,21))))))); tree MPT_3126 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,20),21),18,19))))))); tree MPT_3127 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,(20,21)),18,19))))))); tree MPT_3128 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,20,21),18,19))))))); tree MPT_3129 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,20),18,(19,21)))))))); tree MPT_3130 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,18,(19,20)),21))))))); tree MPT_3131 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,18,(19,20),21))))))); tree MPT_3132 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,18,((19,20),21)))))))); tree MPT_3133 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,18,(19,(20,21))))))))); tree MPT_3134 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,18,((19,21),20)))))))); tree MPT_3135 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,(18,19)),20),21))))))); tree MPT_3136 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,(18,19)),(20,21)))))))); tree MPT_3137 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,(18,19)),21),20))))))); tree MPT_3138 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,(18,19),21),20))))))); tree MPT_3139 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,((18,19),21)),20))))))); tree MPT_3140 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,(18,19,21)),20))))))); tree MPT_3141 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,(18,(19,21))),20))))))); tree MPT_3142 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,20),(18,19)),21))))))); tree MPT_3143 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,20),21),(18,19)))))))); tree MPT_3144 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,(20,21)),(18,19)))))))); tree MPT_3145 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,20,21),(18,19)))))))); tree MPT_3146 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,20),((18,19),21)))))))); tree MPT_3147 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,20),(18,19,21)))))))); tree MPT_3148 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,20),(18,(19,21))))))))); tree MPT_3149 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,((18,19),20)),21))))))); tree MPT_3150 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,((18,19),20),21))))))); tree MPT_3151 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,(((18,19),20),21)))))))); tree MPT_3152 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,((18,19),(20,21))))))))); tree MPT_3153 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,(((18,19),21),20)))))))); tree MPT_3154 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,((18,19,21),20)))))))); tree MPT_3155 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,((18,(19,21)),20)))))))); tree MPT_3156 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,(18,19,20)),21))))))); tree MPT_3157 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,(18,19,20),21))))))); tree MPT_3158 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,((18,19,20),21)))))))); tree MPT_3159 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,(18,19,20,21)))))))); tree MPT_3160 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,(18,19,(20,21))))))))); tree MPT_3161 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,(18,(19,21),20)))))))); tree MPT_3162 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,(18,(19,20))),21))))))); tree MPT_3163 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,(18,(19,20)),21))))))); tree MPT_3164 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,((18,(19,20)),21)))))))); tree MPT_3165 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,(18,(19,20),21)))))))); tree MPT_3166 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,(18,((19,20),21))))))))); tree MPT_3167 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,(18,(19,(20,21)))))))))); tree MPT_3168 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,(18,((19,21),20))))))))); tree MPT_3169 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((((17,19),18),20),21))))))); tree MPT_3170 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,19),18),(20,21)))))))); tree MPT_3171 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((((17,19),18),21),20))))))); tree MPT_3172 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,19),18,21),20))))))); tree MPT_3173 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((((17,19),21),18),20))))))); tree MPT_3174 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,19,21),18),20))))))); tree MPT_3175 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,(19,21)),18),20))))))); tree MPT_3176 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,19),18,20),21))))))); tree MPT_3177 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,19),18,20,21))))))); tree MPT_3178 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,19),18,(20,21)))))))); tree MPT_3179 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,19),21),18,20))))))); tree MPT_3180 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,19,21),18,20))))))); tree MPT_3181 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,(19,21)),18,20))))))); tree MPT_3182 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((((17,19),20),18),21))))))); tree MPT_3183 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,19),20),18,21))))))); tree MPT_3184 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((((17,19),20),21),18))))))); tree MPT_3185 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,19),(20,21)),18))))))); tree MPT_3186 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((((17,19),21),20),18))))))); tree MPT_3187 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,19,21),20),18))))))); tree MPT_3188 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,(19,21)),20),18))))))); tree MPT_3189 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((((17,20),19),18),21))))))); tree MPT_3190 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,20),19),18,21))))))); tree MPT_3191 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((((17,20),19),21),18))))))); tree MPT_3192 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((((17,20),21),19),18))))))); tree MPT_3193 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,(20,21)),19),18))))))); tree MPT_3194 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,20,21),19),18))))))); tree MPT_3195 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,20),(19,21)),18))))))); tree MPT_3196 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,(19,20)),18),21))))))); tree MPT_3197 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,(19,20)),18,21))))))); tree MPT_3198 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,(19,20)),21),18))))))); tree MPT_3199 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,(19,20),21),18))))))); tree MPT_3200 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,((19,20),21)),18))))))); tree MPT_3201 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,(19,(20,21))),18))))))); tree MPT_3202 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,((19,21),20)),18))))))); tree MPT_3203 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,18,19),20),21))))))); tree MPT_3204 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,18,19),(20,21)))))))); tree MPT_3205 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,18,19),21),20))))))); tree MPT_3206 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,18,19,21),20))))))); tree MPT_3207 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,18,(19,21)),20))))))); tree MPT_3208 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,18,19,20),21))))))); tree MPT_3209 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,18,19,20,21))))))); tree MPT_3210 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,18,19,(20,21)))))))); tree MPT_3211 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,18,(19,21),20))))))); tree MPT_3212 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,20),18,19),21))))))); tree MPT_3213 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,20),18,19,21))))))); tree MPT_3214 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,20),21),18,19))))))); tree MPT_3215 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,(20,21)),18,19))))))); tree MPT_3216 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,20,21),18,19))))))); tree MPT_3217 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,20),18,(19,21)))))))); tree MPT_3218 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,18,(19,20)),21))))))); tree MPT_3219 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,18,(19,20),21))))))); tree MPT_3220 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,18,((19,20),21)))))))); tree MPT_3221 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,18,(19,(20,21))))))))); tree MPT_3222 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,18,((19,21),20)))))))); tree MPT_3223 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,(18,19)),20),21))))))); tree MPT_3224 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,(18,19)),(20,21)))))))); tree MPT_3225 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,(18,19)),21),20))))))); tree MPT_3226 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,(18,19),21),20))))))); tree MPT_3227 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,((18,19),21)),20))))))); tree MPT_3228 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,(18,19,21)),20))))))); tree MPT_3229 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,(18,(19,21))),20))))))); tree MPT_3230 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,20),(18,19)),21))))))); tree MPT_3231 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,20),21),(18,19)))))))); tree MPT_3232 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,(20,21)),(18,19)))))))); tree MPT_3233 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,20,21),(18,19)))))))); tree MPT_3234 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,20),((18,19),21)))))))); tree MPT_3235 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,20),(18,19,21)))))))); tree MPT_3236 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,20),(18,(19,21))))))))); tree MPT_3237 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,((18,19),20)),21))))))); tree MPT_3238 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,((18,19),20),21))))))); tree MPT_3239 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,(((18,19),20),21)))))))); tree MPT_3240 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,((18,19),(20,21))))))))); tree MPT_3241 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,(((18,19),21),20)))))))); tree MPT_3242 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,((18,19,21),20)))))))); tree MPT_3243 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,((18,(19,21)),20)))))))); tree MPT_3244 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,(18,19,20)),21))))))); tree MPT_3245 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,(18,19,20),21))))))); tree MPT_3246 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,((18,19,20),21)))))))); tree MPT_3247 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,(18,19,20,21)))))))); tree MPT_3248 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,(18,19,(20,21))))))))); tree MPT_3249 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,(18,(19,21),20)))))))); tree MPT_3250 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,(18,(19,20))),21))))))); tree MPT_3251 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,(18,(19,20)),21))))))); tree MPT_3252 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,((18,(19,20)),21)))))))); tree MPT_3253 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,(18,(19,20),21)))))))); tree MPT_3254 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,(18,((19,20),21))))))))); tree MPT_3255 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,(18,(19,(20,21)))))))))); tree MPT_3256 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,(18,((19,21),20))))))))); tree MPT_3257 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((((17,19),18),20),21))))))); tree MPT_3258 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,19),18),(20,21)))))))); tree MPT_3259 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((((17,19),18),21),20))))))); tree MPT_3260 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,19),18,21),20))))))); tree MPT_3261 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((((17,19),21),18),20))))))); tree MPT_3262 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,19,21),18),20))))))); tree MPT_3263 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,(19,21)),18),20))))))); tree MPT_3264 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,19),18,20),21))))))); tree MPT_3265 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,19),18,20,21))))))); tree MPT_3266 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,19),18,(20,21)))))))); tree MPT_3267 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,19),21),18,20))))))); tree MPT_3268 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,19,21),18,20))))))); tree MPT_3269 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,(19,21)),18,20))))))); tree MPT_3270 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((((17,19),20),18),21))))))); tree MPT_3271 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,19),20),18,21))))))); tree MPT_3272 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((((17,19),20),21),18))))))); tree MPT_3273 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,19),(20,21)),18))))))); tree MPT_3274 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((((17,19),21),20),18))))))); tree MPT_3275 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,19,21),20),18))))))); tree MPT_3276 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,(19,21)),20),18))))))); tree MPT_3277 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((((17,20),19),18),21))))))); tree MPT_3278 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,20),19),18,21))))))); tree MPT_3279 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((((17,20),19),21),18))))))); tree MPT_3280 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((((17,20),21),19),18))))))); tree MPT_3281 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,(20,21)),19),18))))))); tree MPT_3282 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,20,21),19),18))))))); tree MPT_3283 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,20),(19,21)),18))))))); tree MPT_3284 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,(19,20)),18),21))))))); tree MPT_3285 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,(19,20)),18,21))))))); tree MPT_3286 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,(19,20)),21),18))))))); tree MPT_3287 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,(19,20),21),18))))))); tree MPT_3288 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,((19,20),21)),18))))))); tree MPT_3289 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,(19,(20,21))),18))))))); tree MPT_3290 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,((19,21),20)),18))))))); tree MPT_3291 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,18,19),20),21))))))); tree MPT_3292 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,18,19),(20,21)))))))); tree MPT_3293 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,18,19),21),20))))))); tree MPT_3294 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,18,19,21),20))))))); tree MPT_3295 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,18,(19,21)),20))))))); tree MPT_3296 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,18,19,20),21))))))); tree MPT_3297 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,18,19,20,21))))))); tree MPT_3298 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,18,19,(20,21)))))))); tree MPT_3299 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,18,(19,21),20))))))); tree MPT_3300 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,20),18,19),21))))))); tree MPT_3301 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,20),18,19,21))))))); tree MPT_3302 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,20),21),18,19))))))); tree MPT_3303 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,(20,21)),18,19))))))); tree MPT_3304 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,20,21),18,19))))))); tree MPT_3305 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,20),18,(19,21)))))))); tree MPT_3306 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,18,(19,20)),21))))))); tree MPT_3307 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,18,(19,20),21))))))); tree MPT_3308 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,18,((19,20),21)))))))); tree MPT_3309 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,18,(19,(20,21))))))))); tree MPT_3310 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,18,((19,21),20)))))))); tree MPT_3311 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,(18,19)),20),21))))))); tree MPT_3312 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,(18,19)),(20,21)))))))); tree MPT_3313 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,(18,19)),21),20))))))); tree MPT_3314 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,(18,19),21),20))))))); tree MPT_3315 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,((18,19),21)),20))))))); tree MPT_3316 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,(18,19,21)),20))))))); tree MPT_3317 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,(18,(19,21))),20))))))); tree MPT_3318 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,20),(18,19)),21))))))); tree MPT_3319 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,20),21),(18,19)))))))); tree MPT_3320 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,(20,21)),(18,19)))))))); tree MPT_3321 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,20,21),(18,19)))))))); tree MPT_3322 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,20),((18,19),21)))))))); tree MPT_3323 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,20),(18,19,21)))))))); tree MPT_3324 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,20),(18,(19,21))))))))); tree MPT_3325 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,((18,19),20)),21))))))); tree MPT_3326 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,((18,19),20),21))))))); tree MPT_3327 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,(((18,19),20),21)))))))); tree MPT_3328 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,((18,19),(20,21))))))))); tree MPT_3329 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,(((18,19),21),20)))))))); tree MPT_3330 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,((18,19,21),20)))))))); tree MPT_3331 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,((18,(19,21)),20)))))))); tree MPT_3332 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,(18,19,20)),21))))))); tree MPT_3333 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,(18,19,20),21))))))); tree MPT_3334 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,((18,19,20),21)))))))); tree MPT_3335 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,(18,19,20,21)))))))); tree MPT_3336 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,(18,19,(20,21))))))))); tree MPT_3337 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,(18,(19,21),20)))))))); tree MPT_3338 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,(18,(19,20))),21))))))); tree MPT_3339 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,(18,(19,20)),21))))))); tree MPT_3340 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,((18,(19,20)),21)))))))); tree MPT_3341 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,(18,(19,20),21)))))))); tree MPT_3342 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,(18,((19,20),21))))))))); tree MPT_3343 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,(18,(19,(20,21)))))))))); tree MPT_3344 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,(18,((19,21),20))))))))); tree MPT_3345 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((((17,19),18),20),21))))))); tree MPT_3346 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,19),18),(20,21)))))))); tree MPT_3347 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((((17,19),18),21),20))))))); tree MPT_3348 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,19),18,21),20))))))); tree MPT_3349 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((((17,19),21),18),20))))))); tree MPT_3350 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,19,21),18),20))))))); tree MPT_3351 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,(19,21)),18),20))))))); tree MPT_3352 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,19),18,20),21))))))); tree MPT_3353 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,19),18,20,21))))))); tree MPT_3354 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,19),18,(20,21)))))))); tree MPT_3355 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,19),21),18,20))))))); tree MPT_3356 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,19,21),18,20))))))); tree MPT_3357 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,(19,21)),18,20))))))); tree MPT_3358 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((((17,19),20),18),21))))))); tree MPT_3359 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,19),20),18,21))))))); tree MPT_3360 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((((17,19),20),21),18))))))); tree MPT_3361 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,19),(20,21)),18))))))); tree MPT_3362 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((((17,19),21),20),18))))))); tree MPT_3363 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,19,21),20),18))))))); tree MPT_3364 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,(19,21)),20),18))))))); tree MPT_3365 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((((17,20),19),18),21))))))); tree MPT_3366 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,20),19),18,21))))))); tree MPT_3367 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((((17,20),19),21),18))))))); tree MPT_3368 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((((17,20),21),19),18))))))); tree MPT_3369 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,(20,21)),19),18))))))); tree MPT_3370 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,20,21),19),18))))))); tree MPT_3371 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,20),(19,21)),18))))))); tree MPT_3372 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,(19,20)),18),21))))))); tree MPT_3373 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,(19,20)),18,21))))))); tree MPT_3374 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,(19,20)),21),18))))))); tree MPT_3375 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,(19,20),21),18))))))); tree MPT_3376 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,((19,20),21)),18))))))); tree MPT_3377 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,(19,(20,21))),18))))))); tree MPT_3378 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,((19,21),20)),18))))))); tree MPT_3379 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,18,19),20),21))))))); tree MPT_3380 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,18,19),(20,21)))))))); tree MPT_3381 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,18,19),21),20))))))); tree MPT_3382 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,18,19,21),20))))))); tree MPT_3383 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,18,(19,21)),20))))))); tree MPT_3384 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,18,19,20),21))))))); tree MPT_3385 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,18,19,20,21))))))); tree MPT_3386 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,18,19,(20,21)))))))); tree MPT_3387 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,18,(19,21),20))))))); tree MPT_3388 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,20),18,19),21))))))); tree MPT_3389 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,20),18,19,21))))))); tree MPT_3390 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,20),21),18,19))))))); tree MPT_3391 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,(20,21)),18,19))))))); tree MPT_3392 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,20,21),18,19))))))); tree MPT_3393 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,20),18,(19,21)))))))); tree MPT_3394 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,18,(19,20)),21))))))); tree MPT_3395 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,18,(19,20),21))))))); tree MPT_3396 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,18,((19,20),21)))))))); tree MPT_3397 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,18,(19,(20,21))))))))); tree MPT_3398 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,18,((19,21),20)))))))); tree MPT_3399 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,(18,19)),20),21))))))); tree MPT_3400 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,(18,19)),(20,21)))))))); tree MPT_3401 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,(18,19)),21),20))))))); tree MPT_3402 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,(18,19),21),20))))))); tree MPT_3403 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,((18,19),21)),20))))))); tree MPT_3404 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,(18,19,21)),20))))))); tree MPT_3405 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,(18,(19,21))),20))))))); tree MPT_3406 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,20),(18,19)),21))))))); tree MPT_3407 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,20),21),(18,19)))))))); tree MPT_3408 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,(20,21)),(18,19)))))))); tree MPT_3409 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,20,21),(18,19)))))))); tree MPT_3410 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,20),((18,19),21)))))))); tree MPT_3411 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,20),(18,19,21)))))))); tree MPT_3412 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,20),(18,(19,21))))))))); tree MPT_3413 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,((18,19),20)),21))))))); tree MPT_3414 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,((18,19),20),21))))))); tree MPT_3415 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,(((18,19),20),21)))))))); tree MPT_3416 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,((18,19),(20,21))))))))); tree MPT_3417 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,(((18,19),21),20)))))))); tree MPT_3418 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,((18,19,21),20)))))))); tree MPT_3419 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,((18,(19,21)),20)))))))); tree MPT_3420 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,(18,19,20)),21))))))); tree MPT_3421 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,(18,19,20),21))))))); tree MPT_3422 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,((18,19,20),21)))))))); tree MPT_3423 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,(18,19,20,21)))))))); tree MPT_3424 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,(18,19,(20,21))))))))); tree MPT_3425 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,(18,(19,21),20)))))))); tree MPT_3426 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,(18,(19,20))),21))))))); tree MPT_3427 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,(18,(19,20)),21))))))); tree MPT_3428 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,((18,(19,20)),21)))))))); tree MPT_3429 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,(18,(19,20),21)))))))); tree MPT_3430 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,(18,((19,20),21))))))))); tree MPT_3431 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,(18,(19,(20,21)))))))))); tree MPT_3432 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,(18,((19,21),20))))))))); tree MPT_3433 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((((17,19),18),20),21))))))); tree MPT_3434 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,19),18),(20,21)))))))); tree MPT_3435 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((((17,19),18),21),20))))))); tree MPT_3436 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,19),18,21),20))))))); tree MPT_3437 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((((17,19),21),18),20))))))); tree MPT_3438 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,19,21),18),20))))))); tree MPT_3439 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,(19,21)),18),20))))))); tree MPT_3440 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,19),18,20),21))))))); tree MPT_3441 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,19),18,20,21))))))); tree MPT_3442 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,19),18,(20,21)))))))); tree MPT_3443 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,19),21),18,20))))))); tree MPT_3444 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,19,21),18,20))))))); tree MPT_3445 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,(19,21)),18,20))))))); tree MPT_3446 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((((17,19),20),18),21))))))); tree MPT_3447 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,19),20),18,21))))))); tree MPT_3448 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((((17,19),20),21),18))))))); tree MPT_3449 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,19),(20,21)),18))))))); tree MPT_3450 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((((17,19),21),20),18))))))); tree MPT_3451 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,19,21),20),18))))))); tree MPT_3452 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,(19,21)),20),18))))))); tree MPT_3453 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((((17,20),19),18),21))))))); tree MPT_3454 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,20),19),18,21))))))); tree MPT_3455 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((((17,20),19),21),18))))))); tree MPT_3456 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((((17,20),21),19),18))))))); tree MPT_3457 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,(20,21)),19),18))))))); tree MPT_3458 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,20,21),19),18))))))); tree MPT_3459 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,20),(19,21)),18))))))); tree MPT_3460 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,(19,20)),18),21))))))); tree MPT_3461 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,(19,20)),18,21))))))); tree MPT_3462 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,(19,20)),21),18))))))); tree MPT_3463 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,(19,20),21),18))))))); tree MPT_3464 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,((19,20),21)),18))))))); tree MPT_3465 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,(19,(20,21))),18))))))); tree MPT_3466 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,((19,21),20)),18))))))); tree MPT_3467 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,18,19),20),21))))))); tree MPT_3468 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,18,19),(20,21)))))))); tree MPT_3469 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,18,19),21),20))))))); tree MPT_3470 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,18,19,21),20))))))); tree MPT_3471 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,18,(19,21)),20))))))); tree MPT_3472 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,18,19,20),21))))))); tree MPT_3473 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,18,19,20,21))))))); tree MPT_3474 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,18,19,(20,21)))))))); tree MPT_3475 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,18,(19,21),20))))))); tree MPT_3476 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,20),18,19),21))))))); tree MPT_3477 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,20),18,19,21))))))); tree MPT_3478 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,20),21),18,19))))))); tree MPT_3479 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,(20,21)),18,19))))))); tree MPT_3480 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,20,21),18,19))))))); tree MPT_3481 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,20),18,(19,21)))))))); tree MPT_3482 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,18,(19,20)),21))))))); tree MPT_3483 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,18,(19,20),21))))))); tree MPT_3484 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,18,((19,20),21)))))))); tree MPT_3485 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,18,(19,(20,21))))))))); tree MPT_3486 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,18,((19,21),20)))))))); tree MPT_3487 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,(18,19)),20),21))))))); tree MPT_3488 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,(18,19)),(20,21)))))))); tree MPT_3489 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,(18,19)),21),20))))))); tree MPT_3490 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,(18,19),21),20))))))); tree MPT_3491 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,((18,19),21)),20))))))); tree MPT_3492 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,(18,19,21)),20))))))); tree MPT_3493 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,(18,(19,21))),20))))))); tree MPT_3494 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,20),(18,19)),21))))))); tree MPT_3495 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,20),21),(18,19)))))))); tree MPT_3496 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,(20,21)),(18,19)))))))); tree MPT_3497 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,20,21),(18,19)))))))); tree MPT_3498 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,20),((18,19),21)))))))); tree MPT_3499 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,20),(18,19,21)))))))); tree MPT_3500 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,20),(18,(19,21))))))))); tree MPT_3501 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,((18,19),20)),21))))))); tree MPT_3502 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,((18,19),20),21))))))); tree MPT_3503 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,(((18,19),20),21)))))))); tree MPT_3504 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,((18,19),(20,21))))))))); tree MPT_3505 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,(((18,19),21),20)))))))); tree MPT_3506 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,((18,19,21),20)))))))); tree MPT_3507 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,((18,(19,21)),20)))))))); tree MPT_3508 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,(18,19,20)),21))))))); tree MPT_3509 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,(18,19,20),21))))))); tree MPT_3510 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,((18,19,20),21)))))))); tree MPT_3511 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,(18,19,20,21)))))))); tree MPT_3512 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,(18,19,(20,21))))))))); tree MPT_3513 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,(18,(19,21),20)))))))); tree MPT_3514 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,(18,(19,20))),21))))))); tree MPT_3515 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,(18,(19,20)),21))))))); tree MPT_3516 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,((18,(19,20)),21)))))))); tree MPT_3517 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,(18,(19,20),21)))))))); tree MPT_3518 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,(18,((19,20),21))))))))); tree MPT_3519 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,(18,(19,(20,21)))))))))); tree MPT_3520 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,(18,((19,21),20))))))))); tree MPT_3521 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((((17,19),18),20),21))))))); tree MPT_3522 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,19),18),(20,21)))))))); tree MPT_3523 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((((17,19),18),21),20))))))); tree MPT_3524 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,19),18,21),20))))))); tree MPT_3525 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((((17,19),21),18),20))))))); tree MPT_3526 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,19,21),18),20))))))); tree MPT_3527 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,(19,21)),18),20))))))); tree MPT_3528 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,19),18,20),21))))))); tree MPT_3529 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,19),18,20,21))))))); tree MPT_3530 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,19),18,(20,21)))))))); tree MPT_3531 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,19),21),18,20))))))); tree MPT_3532 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,19,21),18,20))))))); tree MPT_3533 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,(19,21)),18,20))))))); tree MPT_3534 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((((17,19),20),18),21))))))); tree MPT_3535 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,19),20),18,21))))))); tree MPT_3536 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((((17,19),20),21),18))))))); tree MPT_3537 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,19),(20,21)),18))))))); tree MPT_3538 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((((17,19),21),20),18))))))); tree MPT_3539 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,19,21),20),18))))))); tree MPT_3540 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,(19,21)),20),18))))))); tree MPT_3541 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((((17,20),19),18),21))))))); tree MPT_3542 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,20),19),18,21))))))); tree MPT_3543 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((((17,20),19),21),18))))))); tree MPT_3544 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((((17,20),21),19),18))))))); tree MPT_3545 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,(20,21)),19),18))))))); tree MPT_3546 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,20,21),19),18))))))); tree MPT_3547 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,20),(19,21)),18))))))); tree MPT_3548 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,(19,20)),18),21))))))); tree MPT_3549 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,(19,20)),18,21))))))); tree MPT_3550 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,(19,20)),21),18))))))); tree MPT_3551 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,(19,20),21),18))))))); tree MPT_3552 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,((19,20),21)),18))))))); tree MPT_3553 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,(19,(20,21))),18))))))); tree MPT_3554 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,((19,21),20)),18))))))); tree MPT_3555 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,18,19),20),21))))))); tree MPT_3556 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,18,19),(20,21)))))))); tree MPT_3557 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,18,19),21),20))))))); tree MPT_3558 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,18,19,21),20))))))); tree MPT_3559 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,18,(19,21)),20))))))); tree MPT_3560 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,18,19,20),21))))))); tree MPT_3561 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,18,19,20,21))))))); tree MPT_3562 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,18,19,(20,21)))))))); tree MPT_3563 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,18,(19,21),20))))))); tree MPT_3564 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,20),18,19),21))))))); tree MPT_3565 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,20),18,19,21))))))); tree MPT_3566 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,20),21),18,19))))))); tree MPT_3567 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,(20,21)),18,19))))))); tree MPT_3568 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,20,21),18,19))))))); tree MPT_3569 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,20),18,(19,21)))))))); tree MPT_3570 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,18,(19,20)),21))))))); tree MPT_3571 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,18,(19,20),21))))))); tree MPT_3572 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,18,((19,20),21)))))))); tree MPT_3573 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,18,(19,(20,21))))))))); tree MPT_3574 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,18,((19,21),20)))))))); tree MPT_3575 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,(18,19)),20),21))))))); tree MPT_3576 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,(18,19)),(20,21)))))))); tree MPT_3577 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,(18,19)),21),20))))))); tree MPT_3578 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,(18,19),21),20))))))); tree MPT_3579 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,((18,19),21)),20))))))); tree MPT_3580 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,(18,19,21)),20))))))); tree MPT_3581 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,(18,(19,21))),20))))))); tree MPT_3582 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,20),(18,19)),21))))))); tree MPT_3583 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,20),21),(18,19)))))))); tree MPT_3584 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,(20,21)),(18,19)))))))); tree MPT_3585 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,20,21),(18,19)))))))); tree MPT_3586 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,20),((18,19),21)))))))); tree MPT_3587 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,20),(18,19,21)))))))); tree MPT_3588 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,20),(18,(19,21))))))))); tree MPT_3589 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,((18,19),20)),21))))))); tree MPT_3590 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,((18,19),20),21))))))); tree MPT_3591 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,(((18,19),20),21)))))))); tree MPT_3592 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,((18,19),(20,21))))))))); tree MPT_3593 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,(((18,19),21),20)))))))); tree MPT_3594 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,((18,19,21),20)))))))); tree MPT_3595 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,((18,(19,21)),20)))))))); tree MPT_3596 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,(18,19,20)),21))))))); tree MPT_3597 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,(18,19,20),21))))))); tree MPT_3598 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,((18,19,20),21)))))))); tree MPT_3599 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,(18,19,20,21)))))))); tree MPT_3600 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,(18,19,(20,21))))))))); tree MPT_3601 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,(18,(19,21),20)))))))); tree MPT_3602 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,(18,(19,20))),21))))))); tree MPT_3603 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,(18,(19,20)),21))))))); tree MPT_3604 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,((18,(19,20)),21)))))))); tree MPT_3605 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,(18,(19,20),21)))))))); tree MPT_3606 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,(18,((19,20),21))))))))); tree MPT_3607 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,(18,(19,(20,21)))))))))); tree MPT_3608 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,(18,((19,21),20))))))))); tree MPT_3609 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((((17,19),18),20),21))))))); tree MPT_3610 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,19),18),(20,21)))))))); tree MPT_3611 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((((17,19),18),21),20))))))); tree MPT_3612 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,19),18,21),20))))))); tree MPT_3613 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((((17,19),21),18),20))))))); tree MPT_3614 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,19,21),18),20))))))); tree MPT_3615 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,(19,21)),18),20))))))); tree MPT_3616 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,19),18,20),21))))))); tree MPT_3617 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,19),18,20,21))))))); tree MPT_3618 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,19),18,(20,21)))))))); tree MPT_3619 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,19),21),18,20))))))); tree MPT_3620 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,19,21),18,20))))))); tree MPT_3621 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,(19,21)),18,20))))))); tree MPT_3622 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((((17,19),20),18),21))))))); tree MPT_3623 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,19),20),18,21))))))); tree MPT_3624 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((((17,19),20),21),18))))))); tree MPT_3625 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,19),(20,21)),18))))))); tree MPT_3626 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((((17,19),21),20),18))))))); tree MPT_3627 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,19,21),20),18))))))); tree MPT_3628 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,(19,21)),20),18))))))); tree MPT_3629 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((((17,20),19),18),21))))))); tree MPT_3630 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,20),19),18,21))))))); tree MPT_3631 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((((17,20),19),21),18))))))); tree MPT_3632 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((((17,20),21),19),18))))))); tree MPT_3633 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,(20,21)),19),18))))))); tree MPT_3634 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,20,21),19),18))))))); tree MPT_3635 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,20),(19,21)),18))))))); tree MPT_3636 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,(19,20)),18),21))))))); tree MPT_3637 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,(19,20)),18,21))))))); tree MPT_3638 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,(19,20)),21),18))))))); tree MPT_3639 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,(19,20),21),18))))))); tree MPT_3640 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,((19,20),21)),18))))))); tree MPT_3641 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,(19,(20,21))),18))))))); tree MPT_3642 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,((19,21),20)),18))))))); tree MPT_3643 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,18,19),20),21))))))); tree MPT_3644 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,18,19),(20,21)))))))); tree MPT_3645 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,18,19),21),20))))))); tree MPT_3646 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,18,19,21),20))))))); tree MPT_3647 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,18,(19,21)),20))))))); tree MPT_3648 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,18,19,20),21))))))); tree MPT_3649 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,18,19,20,21))))))); tree MPT_3650 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,18,19,(20,21)))))))); tree MPT_3651 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,18,(19,21),20))))))); tree MPT_3652 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,20),18,19),21))))))); tree MPT_3653 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,20),18,19,21))))))); tree MPT_3654 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,20),21),18,19))))))); tree MPT_3655 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,(20,21)),18,19))))))); tree MPT_3656 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,20,21),18,19))))))); tree MPT_3657 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,20),18,(19,21)))))))); tree MPT_3658 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,18,(19,20)),21))))))); tree MPT_3659 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,18,(19,20),21))))))); tree MPT_3660 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,18,((19,20),21)))))))); tree MPT_3661 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,18,(19,(20,21))))))))); tree MPT_3662 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,18,((19,21),20)))))))); tree MPT_3663 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,(18,19)),20),21))))))); tree MPT_3664 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,(18,19)),(20,21)))))))); tree MPT_3665 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,(18,19)),21),20))))))); tree MPT_3666 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,(18,19),21),20))))))); tree MPT_3667 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,((18,19),21)),20))))))); tree MPT_3668 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,(18,19,21)),20))))))); tree MPT_3669 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,(18,(19,21))),20))))))); tree MPT_3670 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,20),(18,19)),21))))))); tree MPT_3671 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,20),21),(18,19)))))))); tree MPT_3672 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,(20,21)),(18,19)))))))); tree MPT_3673 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,20,21),(18,19)))))))); tree MPT_3674 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,20),((18,19),21)))))))); tree MPT_3675 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,20),(18,19,21)))))))); tree MPT_3676 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,20),(18,(19,21))))))))); tree MPT_3677 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,((18,19),20)),21))))))); tree MPT_3678 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,((18,19),20),21))))))); tree MPT_3679 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,(((18,19),20),21)))))))); tree MPT_3680 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,((18,19),(20,21))))))))); tree MPT_3681 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,(((18,19),21),20)))))))); tree MPT_3682 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,((18,19,21),20)))))))); tree MPT_3683 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,((18,(19,21)),20)))))))); tree MPT_3684 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,(18,19,20)),21))))))); tree MPT_3685 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,(18,19,20),21))))))); tree MPT_3686 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,((18,19,20),21)))))))); tree MPT_3687 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,(18,19,20,21)))))))); tree MPT_3688 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,(18,19,(20,21))))))))); tree MPT_3689 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,(18,(19,21),20)))))))); tree MPT_3690 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,(18,(19,20))),21))))))); tree MPT_3691 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,(18,(19,20)),21))))))); tree MPT_3692 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,((18,(19,20)),21)))))))); tree MPT_3693 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,(18,(19,20),21)))))))); tree MPT_3694 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,(18,((19,20),21))))))))); tree MPT_3695 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,(18,(19,(20,21)))))))))); tree MPT_3696 = [&R] (1,(2,(3,(((4,6),5),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,(18,((19,21),20))))))))); tree MPT_3697 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((((17,19),18),20),21))))))); tree MPT_3698 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,19),18),(20,21)))))))); tree MPT_3699 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((((17,19),18),21),20))))))); tree MPT_3700 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,19),18,21),20))))))); tree MPT_3701 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((((17,19),21),18),20))))))); tree MPT_3702 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,19,21),18),20))))))); tree MPT_3703 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,(19,21)),18),20))))))); tree MPT_3704 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,19),18,20),21))))))); tree MPT_3705 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,19),18,20,21))))))); tree MPT_3706 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,19),18,(20,21)))))))); tree MPT_3707 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,19),21),18,20))))))); tree MPT_3708 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,19,21),18,20))))))); tree MPT_3709 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,(19,21)),18,20))))))); tree MPT_3710 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((((17,19),20),18),21))))))); tree MPT_3711 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,19),20),18,21))))))); tree MPT_3712 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((((17,19),20),21),18))))))); tree MPT_3713 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,19),(20,21)),18))))))); tree MPT_3714 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((((17,19),21),20),18))))))); tree MPT_3715 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,19,21),20),18))))))); tree MPT_3716 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,(19,21)),20),18))))))); tree MPT_3717 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((((17,20),19),18),21))))))); tree MPT_3718 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,20),19),18,21))))))); tree MPT_3719 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((((17,20),19),21),18))))))); tree MPT_3720 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((((17,20),21),19),18))))))); tree MPT_3721 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,(20,21)),19),18))))))); tree MPT_3722 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,20,21),19),18))))))); tree MPT_3723 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,20),(19,21)),18))))))); tree MPT_3724 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,(19,20)),18),21))))))); tree MPT_3725 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,(19,20)),18,21))))))); tree MPT_3726 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,(19,20)),21),18))))))); tree MPT_3727 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,(19,20),21),18))))))); tree MPT_3728 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,((19,20),21)),18))))))); tree MPT_3729 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,(19,(20,21))),18))))))); tree MPT_3730 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,((19,21),20)),18))))))); tree MPT_3731 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,18,19),20),21))))))); tree MPT_3732 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,18,19),(20,21)))))))); tree MPT_3733 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,18,19),21),20))))))); tree MPT_3734 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,18,19,21),20))))))); tree MPT_3735 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,18,(19,21)),20))))))); tree MPT_3736 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,18,19,20),21))))))); tree MPT_3737 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,18,19,20,21))))))); tree MPT_3738 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,18,19,(20,21)))))))); tree MPT_3739 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,18,(19,21),20))))))); tree MPT_3740 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,20),18,19),21))))))); tree MPT_3741 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,20),18,19,21))))))); tree MPT_3742 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,20),21),18,19))))))); tree MPT_3743 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,(20,21)),18,19))))))); tree MPT_3744 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,20,21),18,19))))))); tree MPT_3745 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,20),18,(19,21)))))))); tree MPT_3746 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,18,(19,20)),21))))))); tree MPT_3747 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,18,(19,20),21))))))); tree MPT_3748 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,18,((19,20),21)))))))); tree MPT_3749 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,18,(19,(20,21))))))))); tree MPT_3750 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,18,((19,21),20)))))))); tree MPT_3751 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,(18,19)),20),21))))))); tree MPT_3752 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,(18,19)),(20,21)))))))); tree MPT_3753 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,(18,19)),21),20))))))); tree MPT_3754 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,(18,19),21),20))))))); tree MPT_3755 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,((18,19),21)),20))))))); tree MPT_3756 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,(18,19,21)),20))))))); tree MPT_3757 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,(18,(19,21))),20))))))); tree MPT_3758 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,20),(18,19)),21))))))); tree MPT_3759 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(((17,20),21),(18,19)))))))); tree MPT_3760 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,(20,21)),(18,19)))))))); tree MPT_3761 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,20,21),(18,19)))))))); tree MPT_3762 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,20),((18,19),21)))))))); tree MPT_3763 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,20),(18,19,21)))))))); tree MPT_3764 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,20),(18,(19,21))))))))); tree MPT_3765 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,((18,19),20)),21))))))); tree MPT_3766 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,((18,19),20),21))))))); tree MPT_3767 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,(((18,19),20),21)))))))); tree MPT_3768 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,((18,19),(20,21))))))))); tree MPT_3769 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,(((18,19),21),20)))))))); tree MPT_3770 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,((18,19,21),20)))))))); tree MPT_3771 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,((18,(19,21)),20)))))))); tree MPT_3772 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,(18,19,20)),21))))))); tree MPT_3773 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,(18,19,20),21))))))); tree MPT_3774 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,((18,19,20),21)))))))); tree MPT_3775 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,(18,19,20,21)))))))); tree MPT_3776 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,(18,19,(20,21))))))))); tree MPT_3777 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,(18,(19,21),20)))))))); tree MPT_3778 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),((17,(18,(19,20))),21))))))); tree MPT_3779 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,(18,(19,20)),21))))))); tree MPT_3780 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,((18,(19,20)),21)))))))); tree MPT_3781 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,(18,(19,20),21)))))))); tree MPT_3782 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,(18,((19,20),21))))))))); tree MPT_3783 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,(18,(19,(20,21)))))))))); tree MPT_3784 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,16),15)),13)),9),(17,(18,((19,21),20))))))))); tree MPT_3785 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((((17,19),18),20),21))))))); tree MPT_3786 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,19),18),(20,21)))))))); tree MPT_3787 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((((17,19),18),21),20))))))); tree MPT_3788 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,19),18,21),20))))))); tree MPT_3789 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((((17,19),21),18),20))))))); tree MPT_3790 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,19,21),18),20))))))); tree MPT_3791 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,(19,21)),18),20))))))); tree MPT_3792 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,19),18,20),21))))))); tree MPT_3793 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,19),18,20,21))))))); tree MPT_3794 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,19),18,(20,21)))))))); tree MPT_3795 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,19),21),18,20))))))); tree MPT_3796 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,19,21),18,20))))))); tree MPT_3797 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,(19,21)),18,20))))))); tree MPT_3798 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((((17,19),20),18),21))))))); tree MPT_3799 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,19),20),18,21))))))); tree MPT_3800 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((((17,19),20),21),18))))))); tree MPT_3801 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,19),(20,21)),18))))))); tree MPT_3802 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((((17,19),21),20),18))))))); tree MPT_3803 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,19,21),20),18))))))); tree MPT_3804 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,(19,21)),20),18))))))); tree MPT_3805 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((((17,20),19),18),21))))))); tree MPT_3806 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,20),19),18,21))))))); tree MPT_3807 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((((17,20),19),21),18))))))); tree MPT_3808 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((((17,20),21),19),18))))))); tree MPT_3809 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,(20,21)),19),18))))))); tree MPT_3810 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,20,21),19),18))))))); tree MPT_3811 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,20),(19,21)),18))))))); tree MPT_3812 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,(19,20)),18),21))))))); tree MPT_3813 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,(19,20)),18,21))))))); tree MPT_3814 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,(19,20)),21),18))))))); tree MPT_3815 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,(19,20),21),18))))))); tree MPT_3816 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,((19,20),21)),18))))))); tree MPT_3817 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,(19,(20,21))),18))))))); tree MPT_3818 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,((19,21),20)),18))))))); tree MPT_3819 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,18,19),20),21))))))); tree MPT_3820 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,18,19),(20,21)))))))); tree MPT_3821 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,18,19),21),20))))))); tree MPT_3822 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,18,19,21),20))))))); tree MPT_3823 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,18,(19,21)),20))))))); tree MPT_3824 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,18,19,20),21))))))); tree MPT_3825 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,18,19,20,21))))))); tree MPT_3826 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,18,19,(20,21)))))))); tree MPT_3827 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,18,(19,21),20))))))); tree MPT_3828 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,20),18,19),21))))))); tree MPT_3829 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,20),18,19,21))))))); tree MPT_3830 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,20),21),18,19))))))); tree MPT_3831 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,(20,21)),18,19))))))); tree MPT_3832 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,20,21),18,19))))))); tree MPT_3833 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,20),18,(19,21)))))))); tree MPT_3834 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,18,(19,20)),21))))))); tree MPT_3835 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,18,(19,20),21))))))); tree MPT_3836 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,18,((19,20),21)))))))); tree MPT_3837 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,18,(19,(20,21))))))))); tree MPT_3838 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,18,((19,21),20)))))))); tree MPT_3839 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,(18,19)),20),21))))))); tree MPT_3840 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,(18,19)),(20,21)))))))); tree MPT_3841 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,(18,19)),21),20))))))); tree MPT_3842 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,(18,19),21),20))))))); tree MPT_3843 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,((18,19),21)),20))))))); tree MPT_3844 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,(18,19,21)),20))))))); tree MPT_3845 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,(18,(19,21))),20))))))); tree MPT_3846 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,20),(18,19)),21))))))); tree MPT_3847 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(((17,20),21),(18,19)))))))); tree MPT_3848 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,(20,21)),(18,19)))))))); tree MPT_3849 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,20,21),(18,19)))))))); tree MPT_3850 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,20),((18,19),21)))))))); tree MPT_3851 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,20),(18,19,21)))))))); tree MPT_3852 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,20),(18,(19,21))))))))); tree MPT_3853 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,((18,19),20)),21))))))); tree MPT_3854 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,((18,19),20),21))))))); tree MPT_3855 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,(((18,19),20),21)))))))); tree MPT_3856 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,((18,19),(20,21))))))))); tree MPT_3857 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,(((18,19),21),20)))))))); tree MPT_3858 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,((18,19,21),20)))))))); tree MPT_3859 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,((18,(19,21)),20)))))))); tree MPT_3860 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,(18,19,20)),21))))))); tree MPT_3861 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,(18,19,20),21))))))); tree MPT_3862 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,((18,19,20),21)))))))); tree MPT_3863 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,(18,19,20,21)))))))); tree MPT_3864 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,(18,19,(20,21))))))))); tree MPT_3865 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,(18,(19,21),20)))))))); tree MPT_3866 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),((17,(18,(19,20))),21))))))); tree MPT_3867 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,(18,(19,20)),21))))))); tree MPT_3868 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,((18,(19,20)),21)))))))); tree MPT_3869 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,(18,(19,20),21)))))))); tree MPT_3870 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,(18,((19,20),21))))))))); tree MPT_3871 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,(18,(19,(20,21)))))))))); tree MPT_3872 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),((14,15),16)),13)),9),(17,(18,((19,21),20))))))))); tree MPT_3873 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((((17,19),18),20),21))))))); tree MPT_3874 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,19),18),(20,21)))))))); tree MPT_3875 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((((17,19),18),21),20))))))); tree MPT_3876 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,19),18,21),20))))))); tree MPT_3877 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((((17,19),21),18),20))))))); tree MPT_3878 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,19,21),18),20))))))); tree MPT_3879 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,(19,21)),18),20))))))); tree MPT_3880 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,19),18,20),21))))))); tree MPT_3881 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,19),18,20,21))))))); tree MPT_3882 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,19),18,(20,21)))))))); tree MPT_3883 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,19),21),18,20))))))); tree MPT_3884 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,19,21),18,20))))))); tree MPT_3885 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,(19,21)),18,20))))))); tree MPT_3886 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((((17,19),20),18),21))))))); tree MPT_3887 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,19),20),18,21))))))); tree MPT_3888 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((((17,19),20),21),18))))))); tree MPT_3889 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,19),(20,21)),18))))))); tree MPT_3890 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((((17,19),21),20),18))))))); tree MPT_3891 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,19,21),20),18))))))); tree MPT_3892 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,(19,21)),20),18))))))); tree MPT_3893 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((((17,20),19),18),21))))))); tree MPT_3894 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,20),19),18,21))))))); tree MPT_3895 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((((17,20),19),21),18))))))); tree MPT_3896 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((((17,20),21),19),18))))))); tree MPT_3897 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,(20,21)),19),18))))))); tree MPT_3898 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,20,21),19),18))))))); tree MPT_3899 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,20),(19,21)),18))))))); tree MPT_3900 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,(19,20)),18),21))))))); tree MPT_3901 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,(19,20)),18,21))))))); tree MPT_3902 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,(19,20)),21),18))))))); tree MPT_3903 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,(19,20),21),18))))))); tree MPT_3904 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,((19,20),21)),18))))))); tree MPT_3905 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,(19,(20,21))),18))))))); tree MPT_3906 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,((19,21),20)),18))))))); tree MPT_3907 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,18,19),20),21))))))); tree MPT_3908 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,18,19),(20,21)))))))); tree MPT_3909 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,18,19),21),20))))))); tree MPT_3910 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,18,19,21),20))))))); tree MPT_3911 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,18,(19,21)),20))))))); tree MPT_3912 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,18,19,20),21))))))); tree MPT_3913 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,18,19,20,21))))))); tree MPT_3914 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,18,19,(20,21)))))))); tree MPT_3915 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,18,(19,21),20))))))); tree MPT_3916 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,20),18,19),21))))))); tree MPT_3917 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,20),18,19,21))))))); tree MPT_3918 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,20),21),18,19))))))); tree MPT_3919 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,(20,21)),18,19))))))); tree MPT_3920 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,20,21),18,19))))))); tree MPT_3921 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,20),18,(19,21)))))))); tree MPT_3922 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,18,(19,20)),21))))))); tree MPT_3923 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,18,(19,20),21))))))); tree MPT_3924 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,18,((19,20),21)))))))); tree MPT_3925 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,18,(19,(20,21))))))))); tree MPT_3926 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,18,((19,21),20)))))))); tree MPT_3927 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,(18,19)),20),21))))))); tree MPT_3928 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,(18,19)),(20,21)))))))); tree MPT_3929 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,(18,19)),21),20))))))); tree MPT_3930 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,(18,19),21),20))))))); tree MPT_3931 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,((18,19),21)),20))))))); tree MPT_3932 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,(18,19,21)),20))))))); tree MPT_3933 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,(18,(19,21))),20))))))); tree MPT_3934 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,20),(18,19)),21))))))); tree MPT_3935 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(((17,20),21),(18,19)))))))); tree MPT_3936 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,(20,21)),(18,19)))))))); tree MPT_3937 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,20,21),(18,19)))))))); tree MPT_3938 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,20),((18,19),21)))))))); tree MPT_3939 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,20),(18,19,21)))))))); tree MPT_3940 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,20),(18,(19,21))))))))); tree MPT_3941 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,((18,19),20)),21))))))); tree MPT_3942 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,((18,19),20),21))))))); tree MPT_3943 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,(((18,19),20),21)))))))); tree MPT_3944 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,((18,19),(20,21))))))))); tree MPT_3945 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,(((18,19),21),20)))))))); tree MPT_3946 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,((18,19,21),20)))))))); tree MPT_3947 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,((18,(19,21)),20)))))))); tree MPT_3948 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,(18,19,20)),21))))))); tree MPT_3949 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,(18,19,20),21))))))); tree MPT_3950 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,((18,19,20),21)))))))); tree MPT_3951 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,(18,19,20,21)))))))); tree MPT_3952 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,(18,19,(20,21))))))))); tree MPT_3953 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,(18,(19,21),20)))))))); tree MPT_3954 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),((17,(18,(19,20))),21))))))); tree MPT_3955 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,(18,(19,20)),21))))))); tree MPT_3956 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,((18,(19,20)),21)))))))); tree MPT_3957 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,(18,(19,20),21)))))))); tree MPT_3958 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,(18,((19,20),21))))))))); tree MPT_3959 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,(18,(19,(20,21)))))))))); tree MPT_3960 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,((((10,12),11),(14,(15,16))),13)),9),(17,(18,((19,21),20))))))))); tree MPT_3961 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((((17,19),18),20),21))))))); tree MPT_3962 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,19),18),(20,21)))))))); tree MPT_3963 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((((17,19),18),21),20))))))); tree MPT_3964 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,19),18,21),20))))))); tree MPT_3965 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((((17,19),21),18),20))))))); tree MPT_3966 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,19,21),18),20))))))); tree MPT_3967 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,(19,21)),18),20))))))); tree MPT_3968 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,19),18,20),21))))))); tree MPT_3969 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,19),18,20,21))))))); tree MPT_3970 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,19),18,(20,21)))))))); tree MPT_3971 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,19),21),18,20))))))); tree MPT_3972 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,19,21),18,20))))))); tree MPT_3973 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,(19,21)),18,20))))))); tree MPT_3974 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((((17,19),20),18),21))))))); tree MPT_3975 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,19),20),18,21))))))); tree MPT_3976 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((((17,19),20),21),18))))))); tree MPT_3977 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,19),(20,21)),18))))))); tree MPT_3978 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((((17,19),21),20),18))))))); tree MPT_3979 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,19,21),20),18))))))); tree MPT_3980 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,(19,21)),20),18))))))); tree MPT_3981 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((((17,20),19),18),21))))))); tree MPT_3982 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,20),19),18,21))))))); tree MPT_3983 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((((17,20),19),21),18))))))); tree MPT_3984 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((((17,20),21),19),18))))))); tree MPT_3985 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,(20,21)),19),18))))))); tree MPT_3986 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,20,21),19),18))))))); tree MPT_3987 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,20),(19,21)),18))))))); tree MPT_3988 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,(19,20)),18),21))))))); tree MPT_3989 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,(19,20)),18,21))))))); tree MPT_3990 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,(19,20)),21),18))))))); tree MPT_3991 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,(19,20),21),18))))))); tree MPT_3992 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,((19,20),21)),18))))))); tree MPT_3993 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,(19,(20,21))),18))))))); tree MPT_3994 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,((19,21),20)),18))))))); tree MPT_3995 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,18,19),20),21))))))); tree MPT_3996 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,18,19),(20,21)))))))); tree MPT_3997 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,18,19),21),20))))))); tree MPT_3998 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,18,19,21),20))))))); tree MPT_3999 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,18,(19,21)),20))))))); tree MPT_4000 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,18,19,20),21))))))); tree MPT_4001 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,18,19,20,21))))))); tree MPT_4002 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,18,19,(20,21)))))))); tree MPT_4003 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,18,(19,21),20))))))); tree MPT_4004 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,20),18,19),21))))))); tree MPT_4005 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,20),18,19,21))))))); tree MPT_4006 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,20),21),18,19))))))); tree MPT_4007 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,(20,21)),18,19))))))); tree MPT_4008 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,20,21),18,19))))))); tree MPT_4009 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,20),18,(19,21)))))))); tree MPT_4010 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,18,(19,20)),21))))))); tree MPT_4011 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,18,(19,20),21))))))); tree MPT_4012 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,18,((19,20),21)))))))); tree MPT_4013 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,18,(19,(20,21))))))))); tree MPT_4014 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,18,((19,21),20)))))))); tree MPT_4015 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,(18,19)),20),21))))))); tree MPT_4016 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,(18,19)),(20,21)))))))); tree MPT_4017 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,(18,19)),21),20))))))); tree MPT_4018 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,(18,19),21),20))))))); tree MPT_4019 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,((18,19),21)),20))))))); tree MPT_4020 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,(18,19,21)),20))))))); tree MPT_4021 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,(18,(19,21))),20))))))); tree MPT_4022 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,20),(18,19)),21))))))); tree MPT_4023 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(((17,20),21),(18,19)))))))); tree MPT_4024 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,(20,21)),(18,19)))))))); tree MPT_4025 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,20,21),(18,19)))))))); tree MPT_4026 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,20),((18,19),21)))))))); tree MPT_4027 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,20),(18,19,21)))))))); tree MPT_4028 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,20),(18,(19,21))))))))); tree MPT_4029 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,((18,19),20)),21))))))); tree MPT_4030 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,((18,19),20),21))))))); tree MPT_4031 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,(((18,19),20),21)))))))); tree MPT_4032 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,((18,19),(20,21))))))))); tree MPT_4033 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,(((18,19),21),20)))))))); tree MPT_4034 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,((18,19,21),20)))))))); tree MPT_4035 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,((18,(19,21)),20)))))))); tree MPT_4036 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,(18,19,20)),21))))))); tree MPT_4037 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,(18,19,20),21))))))); tree MPT_4038 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,((18,19,20),21)))))))); tree MPT_4039 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,(18,19,20,21)))))))); tree MPT_4040 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,(18,19,(20,21))))))))); tree MPT_4041 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,(18,(19,21),20)))))))); tree MPT_4042 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),((17,(18,(19,20))),21))))))); tree MPT_4043 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,(18,(19,20)),21))))))); tree MPT_4044 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,((18,(19,20)),21)))))))); tree MPT_4045 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,(18,(19,20),21)))))))); tree MPT_4046 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,(18,((19,20),21))))))))); tree MPT_4047 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,(18,(19,(20,21)))))))))); tree MPT_4048 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,16),15)),13)),9),(17,(18,((19,21),20))))))))); tree MPT_4049 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((((17,19),18),20),21))))))); tree MPT_4050 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,19),18),(20,21)))))))); tree MPT_4051 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((((17,19),18),21),20))))))); tree MPT_4052 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,19),18,21),20))))))); tree MPT_4053 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((((17,19),21),18),20))))))); tree MPT_4054 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,19,21),18),20))))))); tree MPT_4055 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,(19,21)),18),20))))))); tree MPT_4056 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,19),18,20),21))))))); tree MPT_4057 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,19),18,20,21))))))); tree MPT_4058 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,19),18,(20,21)))))))); tree MPT_4059 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,19),21),18,20))))))); tree MPT_4060 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,19,21),18,20))))))); tree MPT_4061 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,(19,21)),18,20))))))); tree MPT_4062 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((((17,19),20),18),21))))))); tree MPT_4063 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,19),20),18,21))))))); tree MPT_4064 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((((17,19),20),21),18))))))); tree MPT_4065 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,19),(20,21)),18))))))); tree MPT_4066 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((((17,19),21),20),18))))))); tree MPT_4067 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,19,21),20),18))))))); tree MPT_4068 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,(19,21)),20),18))))))); tree MPT_4069 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((((17,20),19),18),21))))))); tree MPT_4070 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,20),19),18,21))))))); tree MPT_4071 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((((17,20),19),21),18))))))); tree MPT_4072 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((((17,20),21),19),18))))))); tree MPT_4073 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,(20,21)),19),18))))))); tree MPT_4074 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,20,21),19),18))))))); tree MPT_4075 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,20),(19,21)),18))))))); tree MPT_4076 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,(19,20)),18),21))))))); tree MPT_4077 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,(19,20)),18,21))))))); tree MPT_4078 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,(19,20)),21),18))))))); tree MPT_4079 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,(19,20),21),18))))))); tree MPT_4080 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,((19,20),21)),18))))))); tree MPT_4081 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,(19,(20,21))),18))))))); tree MPT_4082 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,((19,21),20)),18))))))); tree MPT_4083 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,18,19),20),21))))))); tree MPT_4084 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,18,19),(20,21)))))))); tree MPT_4085 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,18,19),21),20))))))); tree MPT_4086 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,18,19,21),20))))))); tree MPT_4087 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,18,(19,21)),20))))))); tree MPT_4088 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,18,19,20),21))))))); tree MPT_4089 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,18,19,20,21))))))); tree MPT_4090 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,18,19,(20,21)))))))); tree MPT_4091 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,18,(19,21),20))))))); tree MPT_4092 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,20),18,19),21))))))); tree MPT_4093 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,20),18,19,21))))))); tree MPT_4094 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,20),21),18,19))))))); tree MPT_4095 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,(20,21)),18,19))))))); tree MPT_4096 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,20,21),18,19))))))); tree MPT_4097 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,20),18,(19,21)))))))); tree MPT_4098 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,18,(19,20)),21))))))); tree MPT_4099 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,18,(19,20),21))))))); tree MPT_4100 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,18,((19,20),21)))))))); tree MPT_4101 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,18,(19,(20,21))))))))); tree MPT_4102 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,18,((19,21),20)))))))); tree MPT_4103 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,(18,19)),20),21))))))); tree MPT_4104 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,(18,19)),(20,21)))))))); tree MPT_4105 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,(18,19)),21),20))))))); tree MPT_4106 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,(18,19),21),20))))))); tree MPT_4107 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,((18,19),21)),20))))))); tree MPT_4108 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,(18,19,21)),20))))))); tree MPT_4109 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,(18,(19,21))),20))))))); tree MPT_4110 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,20),(18,19)),21))))))); tree MPT_4111 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(((17,20),21),(18,19)))))))); tree MPT_4112 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,(20,21)),(18,19)))))))); tree MPT_4113 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,20,21),(18,19)))))))); tree MPT_4114 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,20),((18,19),21)))))))); tree MPT_4115 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,20),(18,19,21)))))))); tree MPT_4116 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,20),(18,(19,21))))))))); tree MPT_4117 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,((18,19),20)),21))))))); tree MPT_4118 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,((18,19),20),21))))))); tree MPT_4119 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,(((18,19),20),21)))))))); tree MPT_4120 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,((18,19),(20,21))))))))); tree MPT_4121 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,(((18,19),21),20)))))))); tree MPT_4122 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,((18,19,21),20)))))))); tree MPT_4123 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,((18,(19,21)),20)))))))); tree MPT_4124 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,(18,19,20)),21))))))); tree MPT_4125 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,(18,19,20),21))))))); tree MPT_4126 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,((18,19,20),21)))))))); tree MPT_4127 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,(18,19,20,21)))))))); tree MPT_4128 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,(18,19,(20,21))))))))); tree MPT_4129 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,(18,(19,21),20)))))))); tree MPT_4130 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),((17,(18,(19,20))),21))))))); tree MPT_4131 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,(18,(19,20)),21))))))); tree MPT_4132 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,((18,(19,20)),21)))))))); tree MPT_4133 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,(18,(19,20),21)))))))); tree MPT_4134 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,(18,((19,20),21))))))))); tree MPT_4135 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,(18,(19,(20,21)))))))))); tree MPT_4136 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),((14,15),16)),13)),9),(17,(18,((19,21),20))))))))); tree MPT_4137 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((((17,19),18),20),21))))))); tree MPT_4138 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,19),18),(20,21)))))))); tree MPT_4139 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((((17,19),18),21),20))))))); tree MPT_4140 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,19),18,21),20))))))); tree MPT_4141 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((((17,19),21),18),20))))))); tree MPT_4142 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,19,21),18),20))))))); tree MPT_4143 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,(19,21)),18),20))))))); tree MPT_4144 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,19),18,20),21))))))); tree MPT_4145 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,19),18,20,21))))))); tree MPT_4146 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,19),18,(20,21)))))))); tree MPT_4147 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,19),21),18,20))))))); tree MPT_4148 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,19,21),18,20))))))); tree MPT_4149 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,(19,21)),18,20))))))); tree MPT_4150 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((((17,19),20),18),21))))))); tree MPT_4151 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,19),20),18,21))))))); tree MPT_4152 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((((17,19),20),21),18))))))); tree MPT_4153 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,19),(20,21)),18))))))); tree MPT_4154 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((((17,19),21),20),18))))))); tree MPT_4155 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,19,21),20),18))))))); tree MPT_4156 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,(19,21)),20),18))))))); tree MPT_4157 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((((17,20),19),18),21))))))); tree MPT_4158 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,20),19),18,21))))))); tree MPT_4159 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((((17,20),19),21),18))))))); tree MPT_4160 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((((17,20),21),19),18))))))); tree MPT_4161 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,(20,21)),19),18))))))); tree MPT_4162 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,20,21),19),18))))))); tree MPT_4163 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,20),(19,21)),18))))))); tree MPT_4164 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,(19,20)),18),21))))))); tree MPT_4165 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,(19,20)),18,21))))))); tree MPT_4166 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,(19,20)),21),18))))))); tree MPT_4167 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,(19,20),21),18))))))); tree MPT_4168 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,((19,20),21)),18))))))); tree MPT_4169 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,(19,(20,21))),18))))))); tree MPT_4170 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,((19,21),20)),18))))))); tree MPT_4171 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,18,19),20),21))))))); tree MPT_4172 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,18,19),(20,21)))))))); tree MPT_4173 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,18,19),21),20))))))); tree MPT_4174 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,18,19,21),20))))))); tree MPT_4175 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,18,(19,21)),20))))))); tree MPT_4176 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,18,19,20),21))))))); tree MPT_4177 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,18,19,20,21))))))); tree MPT_4178 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,18,19,(20,21)))))))); tree MPT_4179 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,18,(19,21),20))))))); tree MPT_4180 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,20),18,19),21))))))); tree MPT_4181 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,20),18,19,21))))))); tree MPT_4182 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,20),21),18,19))))))); tree MPT_4183 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,(20,21)),18,19))))))); tree MPT_4184 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,20,21),18,19))))))); tree MPT_4185 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,20),18,(19,21)))))))); tree MPT_4186 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,18,(19,20)),21))))))); tree MPT_4187 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,18,(19,20),21))))))); tree MPT_4188 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,18,((19,20),21)))))))); tree MPT_4189 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,18,(19,(20,21))))))))); tree MPT_4190 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,18,((19,21),20)))))))); tree MPT_4191 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,(18,19)),20),21))))))); tree MPT_4192 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,(18,19)),(20,21)))))))); tree MPT_4193 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,(18,19)),21),20))))))); tree MPT_4194 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,(18,19),21),20))))))); tree MPT_4195 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,((18,19),21)),20))))))); tree MPT_4196 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,(18,19,21)),20))))))); tree MPT_4197 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,(18,(19,21))),20))))))); tree MPT_4198 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,20),(18,19)),21))))))); tree MPT_4199 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(((17,20),21),(18,19)))))))); tree MPT_4200 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,(20,21)),(18,19)))))))); tree MPT_4201 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,20,21),(18,19)))))))); tree MPT_4202 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,20),((18,19),21)))))))); tree MPT_4203 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,20),(18,19,21)))))))); tree MPT_4204 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,20),(18,(19,21))))))))); tree MPT_4205 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,((18,19),20)),21))))))); tree MPT_4206 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,((18,19),20),21))))))); tree MPT_4207 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,(((18,19),20),21)))))))); tree MPT_4208 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,((18,19),(20,21))))))))); tree MPT_4209 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,(((18,19),21),20)))))))); tree MPT_4210 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,((18,19,21),20)))))))); tree MPT_4211 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,((18,(19,21)),20)))))))); tree MPT_4212 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,(18,19,20)),21))))))); tree MPT_4213 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,(18,19,20),21))))))); tree MPT_4214 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,((18,19,20),21)))))))); tree MPT_4215 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,(18,19,20,21)))))))); tree MPT_4216 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,(18,19,(20,21))))))))); tree MPT_4217 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,(18,(19,21),20)))))))); tree MPT_4218 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),((17,(18,(19,20))),21))))))); tree MPT_4219 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,(18,(19,20)),21))))))); tree MPT_4220 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,((18,(19,20)),21)))))))); tree MPT_4221 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,(18,(19,20),21)))))))); tree MPT_4222 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,(18,((19,20),21))))))))); tree MPT_4223 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,(18,(19,(20,21)))))))))); tree MPT_4224 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,11,12),(14,(15,16))),13)),9),(17,(18,((19,21),20))))))))); tree MPT_4225 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((((17,19),18),20),21))))))); tree MPT_4226 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,19),18),(20,21)))))))); tree MPT_4227 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((((17,19),18),21),20))))))); tree MPT_4228 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,19),18,21),20))))))); tree MPT_4229 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((((17,19),21),18),20))))))); tree MPT_4230 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,19,21),18),20))))))); tree MPT_4231 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,(19,21)),18),20))))))); tree MPT_4232 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,19),18,20),21))))))); tree MPT_4233 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,19),18,20,21))))))); tree MPT_4234 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,19),18,(20,21)))))))); tree MPT_4235 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,19),21),18,20))))))); tree MPT_4236 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,19,21),18,20))))))); tree MPT_4237 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,(19,21)),18,20))))))); tree MPT_4238 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((((17,19),20),18),21))))))); tree MPT_4239 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,19),20),18,21))))))); tree MPT_4240 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((((17,19),20),21),18))))))); tree MPT_4241 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,19),(20,21)),18))))))); tree MPT_4242 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((((17,19),21),20),18))))))); tree MPT_4243 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,19,21),20),18))))))); tree MPT_4244 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,(19,21)),20),18))))))); tree MPT_4245 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((((17,20),19),18),21))))))); tree MPT_4246 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,20),19),18,21))))))); tree MPT_4247 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((((17,20),19),21),18))))))); tree MPT_4248 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((((17,20),21),19),18))))))); tree MPT_4249 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,(20,21)),19),18))))))); tree MPT_4250 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,20,21),19),18))))))); tree MPT_4251 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,20),(19,21)),18))))))); tree MPT_4252 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,(19,20)),18),21))))))); tree MPT_4253 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,(19,20)),18,21))))))); tree MPT_4254 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,(19,20)),21),18))))))); tree MPT_4255 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,(19,20),21),18))))))); tree MPT_4256 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,((19,20),21)),18))))))); tree MPT_4257 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,(19,(20,21))),18))))))); tree MPT_4258 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,((19,21),20)),18))))))); tree MPT_4259 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,18,19),20),21))))))); tree MPT_4260 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,18,19),(20,21)))))))); tree MPT_4261 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,18,19),21),20))))))); tree MPT_4262 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,18,19,21),20))))))); tree MPT_4263 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,18,(19,21)),20))))))); tree MPT_4264 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,18,19,20),21))))))); tree MPT_4265 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,18,19,20,21))))))); tree MPT_4266 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,18,19,(20,21)))))))); tree MPT_4267 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,18,(19,21),20))))))); tree MPT_4268 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,20),18,19),21))))))); tree MPT_4269 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,20),18,19,21))))))); tree MPT_4270 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,20),21),18,19))))))); tree MPT_4271 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,(20,21)),18,19))))))); tree MPT_4272 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,20,21),18,19))))))); tree MPT_4273 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,20),18,(19,21)))))))); tree MPT_4274 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,18,(19,20)),21))))))); tree MPT_4275 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,18,(19,20),21))))))); tree MPT_4276 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,18,((19,20),21)))))))); tree MPT_4277 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,18,(19,(20,21))))))))); tree MPT_4278 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,18,((19,21),20)))))))); tree MPT_4279 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,(18,19)),20),21))))))); tree MPT_4280 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,(18,19)),(20,21)))))))); tree MPT_4281 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,(18,19)),21),20))))))); tree MPT_4282 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,(18,19),21),20))))))); tree MPT_4283 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,((18,19),21)),20))))))); tree MPT_4284 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,(18,19,21)),20))))))); tree MPT_4285 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,(18,(19,21))),20))))))); tree MPT_4286 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,20),(18,19)),21))))))); tree MPT_4287 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(((17,20),21),(18,19)))))))); tree MPT_4288 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,(20,21)),(18,19)))))))); tree MPT_4289 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,20,21),(18,19)))))))); tree MPT_4290 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,20),((18,19),21)))))))); tree MPT_4291 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,20),(18,19,21)))))))); tree MPT_4292 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,20),(18,(19,21))))))))); tree MPT_4293 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,((18,19),20)),21))))))); tree MPT_4294 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,((18,19),20),21))))))); tree MPT_4295 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,(((18,19),20),21)))))))); tree MPT_4296 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,((18,19),(20,21))))))))); tree MPT_4297 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,(((18,19),21),20)))))))); tree MPT_4298 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,((18,19,21),20)))))))); tree MPT_4299 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,((18,(19,21)),20)))))))); tree MPT_4300 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,(18,19,20)),21))))))); tree MPT_4301 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,(18,19,20),21))))))); tree MPT_4302 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,((18,19,20),21)))))))); tree MPT_4303 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,(18,19,20,21)))))))); tree MPT_4304 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,(18,19,(20,21))))))))); tree MPT_4305 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,(18,(19,21),20)))))))); tree MPT_4306 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),((17,(18,(19,20))),21))))))); tree MPT_4307 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,(18,(19,20)),21))))))); tree MPT_4308 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,((18,(19,20)),21)))))))); tree MPT_4309 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,(18,(19,20),21)))))))); tree MPT_4310 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,(18,((19,20),21))))))))); tree MPT_4311 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,(18,(19,(20,21)))))))))); tree MPT_4312 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,16),15)),13)),9),(17,(18,((19,21),20))))))))); tree MPT_4313 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((((17,19),18),20),21))))))); tree MPT_4314 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,19),18),(20,21)))))))); tree MPT_4315 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((((17,19),18),21),20))))))); tree MPT_4316 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,19),18,21),20))))))); tree MPT_4317 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((((17,19),21),18),20))))))); tree MPT_4318 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,19,21),18),20))))))); tree MPT_4319 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,(19,21)),18),20))))))); tree MPT_4320 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,19),18,20),21))))))); tree MPT_4321 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,19),18,20,21))))))); tree MPT_4322 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,19),18,(20,21)))))))); tree MPT_4323 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,19),21),18,20))))))); tree MPT_4324 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,19,21),18,20))))))); tree MPT_4325 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,(19,21)),18,20))))))); tree MPT_4326 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((((17,19),20),18),21))))))); tree MPT_4327 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,19),20),18,21))))))); tree MPT_4328 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((((17,19),20),21),18))))))); tree MPT_4329 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,19),(20,21)),18))))))); tree MPT_4330 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((((17,19),21),20),18))))))); tree MPT_4331 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,19,21),20),18))))))); tree MPT_4332 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,(19,21)),20),18))))))); tree MPT_4333 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((((17,20),19),18),21))))))); tree MPT_4334 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,20),19),18,21))))))); tree MPT_4335 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((((17,20),19),21),18))))))); tree MPT_4336 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((((17,20),21),19),18))))))); tree MPT_4337 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,(20,21)),19),18))))))); tree MPT_4338 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,20,21),19),18))))))); tree MPT_4339 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,20),(19,21)),18))))))); tree MPT_4340 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,(19,20)),18),21))))))); tree MPT_4341 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,(19,20)),18,21))))))); tree MPT_4342 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,(19,20)),21),18))))))); tree MPT_4343 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,(19,20),21),18))))))); tree MPT_4344 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,((19,20),21)),18))))))); tree MPT_4345 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,(19,(20,21))),18))))))); tree MPT_4346 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,((19,21),20)),18))))))); tree MPT_4347 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,18,19),20),21))))))); tree MPT_4348 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,18,19),(20,21)))))))); tree MPT_4349 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,18,19),21),20))))))); tree MPT_4350 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,18,19,21),20))))))); tree MPT_4351 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,18,(19,21)),20))))))); tree MPT_4352 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,18,19,20),21))))))); tree MPT_4353 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,18,19,20,21))))))); tree MPT_4354 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,18,19,(20,21)))))))); tree MPT_4355 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,18,(19,21),20))))))); tree MPT_4356 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,20),18,19),21))))))); tree MPT_4357 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,20),18,19,21))))))); tree MPT_4358 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,20),21),18,19))))))); tree MPT_4359 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,(20,21)),18,19))))))); tree MPT_4360 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,20,21),18,19))))))); tree MPT_4361 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,20),18,(19,21)))))))); tree MPT_4362 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,18,(19,20)),21))))))); tree MPT_4363 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,18,(19,20),21))))))); tree MPT_4364 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,18,((19,20),21)))))))); tree MPT_4365 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,18,(19,(20,21))))))))); tree MPT_4366 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,18,((19,21),20)))))))); tree MPT_4367 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,(18,19)),20),21))))))); tree MPT_4368 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,(18,19)),(20,21)))))))); tree MPT_4369 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,(18,19)),21),20))))))); tree MPT_4370 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,(18,19),21),20))))))); tree MPT_4371 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,((18,19),21)),20))))))); tree MPT_4372 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,(18,19,21)),20))))))); tree MPT_4373 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,(18,(19,21))),20))))))); tree MPT_4374 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,20),(18,19)),21))))))); tree MPT_4375 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(((17,20),21),(18,19)))))))); tree MPT_4376 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,(20,21)),(18,19)))))))); tree MPT_4377 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,20,21),(18,19)))))))); tree MPT_4378 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,20),((18,19),21)))))))); tree MPT_4379 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,20),(18,19,21)))))))); tree MPT_4380 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,20),(18,(19,21))))))))); tree MPT_4381 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,((18,19),20)),21))))))); tree MPT_4382 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,((18,19),20),21))))))); tree MPT_4383 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,(((18,19),20),21)))))))); tree MPT_4384 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,((18,19),(20,21))))))))); tree MPT_4385 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,(((18,19),21),20)))))))); tree MPT_4386 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,((18,19,21),20)))))))); tree MPT_4387 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,((18,(19,21)),20)))))))); tree MPT_4388 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,(18,19,20)),21))))))); tree MPT_4389 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,(18,19,20),21))))))); tree MPT_4390 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,((18,19,20),21)))))))); tree MPT_4391 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,(18,19,20,21)))))))); tree MPT_4392 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,(18,19,(20,21))))))))); tree MPT_4393 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,(18,(19,21),20)))))))); tree MPT_4394 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),((17,(18,(19,20))),21))))))); tree MPT_4395 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,(18,(19,20)),21))))))); tree MPT_4396 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,((18,(19,20)),21)))))))); tree MPT_4397 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,(18,(19,20),21)))))))); tree MPT_4398 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,(18,((19,20),21))))))))); tree MPT_4399 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,(18,(19,(20,21)))))))))); tree MPT_4400 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),((14,15),16)),13)),9),(17,(18,((19,21),20))))))))); tree MPT_4401 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((((17,19),18),20),21))))))); tree MPT_4402 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,19),18),(20,21)))))))); tree MPT_4403 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((((17,19),18),21),20))))))); tree MPT_4404 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,19),18,21),20))))))); tree MPT_4405 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((((17,19),21),18),20))))))); tree MPT_4406 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,19,21),18),20))))))); tree MPT_4407 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,(19,21)),18),20))))))); tree MPT_4408 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,19),18,20),21))))))); tree MPT_4409 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,19),18,20,21))))))); tree MPT_4410 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,19),18,(20,21)))))))); tree MPT_4411 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,19),21),18,20))))))); tree MPT_4412 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,19,21),18,20))))))); tree MPT_4413 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,(19,21)),18,20))))))); tree MPT_4414 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((((17,19),20),18),21))))))); tree MPT_4415 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,19),20),18,21))))))); tree MPT_4416 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((((17,19),20),21),18))))))); tree MPT_4417 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,19),(20,21)),18))))))); tree MPT_4418 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((((17,19),21),20),18))))))); tree MPT_4419 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,19,21),20),18))))))); tree MPT_4420 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,(19,21)),20),18))))))); tree MPT_4421 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((((17,20),19),18),21))))))); tree MPT_4422 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,20),19),18,21))))))); tree MPT_4423 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((((17,20),19),21),18))))))); tree MPT_4424 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((((17,20),21),19),18))))))); tree MPT_4425 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,(20,21)),19),18))))))); tree MPT_4426 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,20,21),19),18))))))); tree MPT_4427 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,20),(19,21)),18))))))); tree MPT_4428 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,(19,20)),18),21))))))); tree MPT_4429 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,(19,20)),18,21))))))); tree MPT_4430 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,(19,20)),21),18))))))); tree MPT_4431 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,(19,20),21),18))))))); tree MPT_4432 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,((19,20),21)),18))))))); tree MPT_4433 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,(19,(20,21))),18))))))); tree MPT_4434 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,((19,21),20)),18))))))); tree MPT_4435 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,18,19),20),21))))))); tree MPT_4436 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,18,19),(20,21)))))))); tree MPT_4437 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,18,19),21),20))))))); tree MPT_4438 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,18,19,21),20))))))); tree MPT_4439 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,18,(19,21)),20))))))); tree MPT_4440 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,18,19,20),21))))))); tree MPT_4441 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,18,19,20,21))))))); tree MPT_4442 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,18,19,(20,21)))))))); tree MPT_4443 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,18,(19,21),20))))))); tree MPT_4444 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,20),18,19),21))))))); tree MPT_4445 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,20),18,19,21))))))); tree MPT_4446 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,20),21),18,19))))))); tree MPT_4447 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,(20,21)),18,19))))))); tree MPT_4448 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,20,21),18,19))))))); tree MPT_4449 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,20),18,(19,21)))))))); tree MPT_4450 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,18,(19,20)),21))))))); tree MPT_4451 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,18,(19,20),21))))))); tree MPT_4452 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,18,((19,20),21)))))))); tree MPT_4453 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,18,(19,(20,21))))))))); tree MPT_4454 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,18,((19,21),20)))))))); tree MPT_4455 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,(18,19)),20),21))))))); tree MPT_4456 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,(18,19)),(20,21)))))))); tree MPT_4457 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,(18,19)),21),20))))))); tree MPT_4458 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,(18,19),21),20))))))); tree MPT_4459 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,((18,19),21)),20))))))); tree MPT_4460 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,(18,19,21)),20))))))); tree MPT_4461 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,(18,(19,21))),20))))))); tree MPT_4462 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,20),(18,19)),21))))))); tree MPT_4463 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(((17,20),21),(18,19)))))))); tree MPT_4464 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,(20,21)),(18,19)))))))); tree MPT_4465 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,20,21),(18,19)))))))); tree MPT_4466 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,20),((18,19),21)))))))); tree MPT_4467 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,20),(18,19,21)))))))); tree MPT_4468 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,20),(18,(19,21))))))))); tree MPT_4469 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,((18,19),20)),21))))))); tree MPT_4470 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,((18,19),20),21))))))); tree MPT_4471 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,(((18,19),20),21)))))))); tree MPT_4472 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,((18,19),(20,21))))))))); tree MPT_4473 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,(((18,19),21),20)))))))); tree MPT_4474 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,((18,19,21),20)))))))); tree MPT_4475 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,((18,(19,21)),20)))))))); tree MPT_4476 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,(18,19,20)),21))))))); tree MPT_4477 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,(18,19,20),21))))))); tree MPT_4478 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,((18,19,20),21)))))))); tree MPT_4479 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,(18,19,20,21)))))))); tree MPT_4480 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,(18,19,(20,21))))))))); tree MPT_4481 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,(18,(19,21),20)))))))); tree MPT_4482 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),((17,(18,(19,20))),21))))))); tree MPT_4483 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,(18,(19,20)),21))))))); tree MPT_4484 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,((18,(19,20)),21)))))))); tree MPT_4485 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,(18,(19,20),21)))))))); tree MPT_4486 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,(18,((19,20),21))))))))); tree MPT_4487 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,(18,(19,(20,21)))))))))); tree MPT_4488 = [&R] (1,(2,(3,(((4,5),6),(7,(((8,(((10,(11,12)),(14,(15,16))),13)),9),(17,(18,((19,21),20))))))))); tree MPT_4489 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),((((17,19),18),20),21))))))); tree MPT_4490 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(((17,19),18),(20,21)))))))); tree MPT_4491 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),((((17,19),18),21),20))))))); tree MPT_4492 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(((17,19),18,21),20))))))); tree MPT_4493 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),((((17,19),21),18),20))))))); tree MPT_4494 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(((17,19,21),18),20))))))); tree MPT_4495 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(((17,(19,21)),18),20))))))); tree MPT_4496 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(((17,19),18,20),21))))))); tree MPT_4497 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),((17,19),18,20,21))))))); tree MPT_4498 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),((17,19),18,(20,21)))))))); tree MPT_4499 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(((17,19),21),18,20))))))); tree MPT_4500 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),((17,19,21),18,20))))))); tree MPT_4501 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),((17,(19,21)),18,20))))))); tree MPT_4502 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),((((17,19),20),18),21))))))); tree MPT_4503 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(((17,19),20),18,21))))))); tree MPT_4504 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),((((17,19),20),21),18))))))); tree MPT_4505 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(((17,19),(20,21)),18))))))); tree MPT_4506 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),((((17,19),21),20),18))))))); tree MPT_4507 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(((17,19,21),20),18))))))); tree MPT_4508 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(((17,(19,21)),20),18))))))); tree MPT_4509 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),((((17,20),19),18),21))))))); tree MPT_4510 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(((17,20),19),18,21))))))); tree MPT_4511 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),((((17,20),19),21),18))))))); tree MPT_4512 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),((((17,20),21),19),18))))))); tree MPT_4513 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(((17,(20,21)),19),18))))))); tree MPT_4514 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(((17,20,21),19),18))))))); tree MPT_4515 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(((17,20),(19,21)),18))))))); tree MPT_4516 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(((17,(19,20)),18),21))))))); tree MPT_4517 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),((17,(19,20)),18,21))))))); tree MPT_4518 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),(((17,(19,20)),21),18))))))); tree MPT_4519 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),((17,(19,20),21),18))))))); tree MPT_4520 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),((17,((19,20),21)),18))))))); tree MPT_4521 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),((17,(19,(20,21))),18))))))); tree MPT_4522 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,12),(13,((14,16),15))),11)),9),((17,((19,21),20)),18))))))); tree MPT_4523 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),((((17,19),18),20),21))))))); tree MPT_4524 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),(((17,19),18),(20,21)))))))); tree MPT_4525 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),((((17,19),18),21),20))))))); tree MPT_4526 = [&R] (1,(2,(3,((4,(5,6)),(7,(((8,(((10,12),11),(13,((14,16),15)))),9),(((17,19),18,21),20))))))); tree MPT_452