単純正方分割リスト
| ★以下のリストの図は猫目石さんのページで見ることができます。 →ここをクリックしてください。 ★なお、猫目石さんが次の法則を発見しました。 2*F[k]-3 (F[k]はk番目のフィボナッチ数で13以上)のとき、位数 2*k+1 の単純正方分割が存在する。 なお、フィボナッチ数列の項数は、1,2,3,5,8,13,21,34,55,89,144,233,377・・・で数えるとする。 F[K]=144までは確認済み。 ★新しい単純正方分割を見つける法則をまとめてみました。→ここをクリックしてください。 |
| Side= 23 Order=13 - (12,11)(1,3,7)(11,2)(5)(2,5)(4,1)(3) Side= 39a Order=15 - (20,8,11)(5,3)(2,12)(7)(19,8)(5,7)(11,2)(9) Side= 39b Order=15 - (20,19)(1,3,8,7)(19,2)(5)(2,5)(12,1)(3)(8) Side= 41 Order=15 - (23,18)(7,11)(18,3,2)(1,5,3)(4)(2,1)(12)(11) Side= 48a Order=16 - (28,20)(7,5,8)(2,3)(9)(20,8)(11)(12,5)(2,9)(7) Side= 48b Order=16 - (28,20)(8,12)(20,9,7)(5,7)(2,5)(11)(3,2)(9)(8) Side= 48c Order=16 - (28,20)(11,9)(20,8)(2,7)(8,5)(5,3)(12)(2,9)(7) Side= 51 Order=16 - (22,14,15)(13,1)(16)(13,9)(9,4)(4,5)(20)(16,1)(15) Side= 52 Order=16 - (28,24)(7,9,8)(24,4)(1,6)(5)(1,7)(4,6)(15)(13) Side= 62 Order=17 - (33,29)(4,5,20)(29,7,1)(6)(13)(7,13)(9,4)(1,6)(5) Side= 64a Order=17 - (36,28)(9,8,11)(28,8)(3,5)(7,2)(5)(2,9)(7)(20)(16) Side= 64b Order=17 - (36,28)(9,11,8)(28,8)(3,5)(7,2)(5,9,2)(7)(20)(16) Side= 65a Order=17 - (33,32)(1,3,8,20)(32,2)(5)(13)(2,5,13)(12,1)(3)(8) Side= 65b Order=17 - (36,29)(16,13)(14,13,9)(4,9)(4,20,1)(5)(1,16)(15)(14) Side= 67 Order=17 - (39,28)(12,7,9)(5,2)(11)(28,8,3)(2,7,8)(5)(20)(19) Side= 68a Order=17 - (25,20,23)(5,12,3)(26)(23,7)(19)(20,3)(7,19)(17,5)(12) Side= 68b Order=17 - (36,32)(4,6,7,15)(32,8)(5,1)(8)(1,4)(9)(6,21)(15) Side= 68c Order=17 - (36,32)(8,9,15)(32,4)(11,1)(10)(4,11)(17,8)(1,10)(9) Side= 69 Order=17 - (39,30)(7,12,11)(2,5)(30,11)(3,8)(8,7,2)(5)(20)(19) Side= 70a Order=17 - (38,32)(6,9,17)(32,8,4)(1,8)(5)(7,1)(6)(4,21)(17) Side= 70b Order=17 - (39,31)(5,7,19)(3,2)(1,8)(31,12)(5,3)(2,1)(20)(19) Side= 70c Order=17 - (41,29)(11,18)(2,5,4)(29,11,1)(3)(1,3)(7,2)(23)(18) Side= 80a Order=18 - (44,36)(8,28)(36,16)(9,7)(5,7,16)(2,5)(11)(3,2)(9)(8) Side= 80b Order=18 - (44,36)(11,9,16)(36,8)(2,7)(8,5)(5,3)(28)(2,9)(7)(16) Side= 80c Order=18 - (44,36)(16,7,5,8)(2,3)(9)(36,8)(11)(28,5)(2,9)(7)(16) Side= 80d Order=18 - (51,29)(14,15)(13,1)(16)(29,13,9)(9,4)(4,5)(20)(16,1)(15) Side= 82a Order=18 - (47,35)(12,23)(35,12,5,7)(3,2)(1,5,3)(4)(2,1)(24)(23) Side= 82b Order=18 - (51,31)(15,16)(9,5,1)(4,13)(31,16,4)(9)(13)(22)(15,1)(14) Side= 84a Order=18 - (44,40)(7,13,20)(40,4)(1,6)(5)(11,6,7)(5,1)(4,24)(20) Side= 84b Order=18 - (48,36)(9,7,20)(2,5)(8,3)(36,7,5)(8)(2,11)(9)(28)(20) Side= 85a Order=18 - (39,25,21)(4,17)(15,14)(1,16)(21,17,1)(15)(16)(31)(4,29)(25) Side= 85b Order=18 - (46,39)(9,11,19)(39,7)(7,2)(5,8)(5,2)(3,11)(8)(27)(19) Side= 86a Order=18 - (47,39)(7,5,8,19)(2,3)(9)(39,8)(11)(12,5)(2,28)(7)(19) Side= 86b Order=18 - (47,39)(8,12,19)(39,9,7)(5,7)(2,5)(11)(3,2)(28)(8)(19) Side= 86c Order=18 - (47,39)(11,8,20)(39,8)(3,5)(5,7,2)(7)(11,2)(9)(27)(20) Side= 86d Order=18 - (51,35)(15,20)(1,5,9)(35,13,4)(9)(4,16)(13)(22)(1,15)(14) Side= 87a Order=18 - (48,39)(7,12,20)(2,5)(39,11)(9,8)(8,3)(28)(2,7)(5)(20) Side= 87b Order=18 - (48,39)(8,11,20)(3,5)(39,7,2)(5)(2,9)(7)(12)(8,28)(20) Side= 87c Order=18 - (51,36)(14,22)(1,13)(36,16)(9,13)(4,9)(20)(5,4)(1,16)(15) Side= 91 Order=18 - (52,39)(15,24)(39,7,6)(4,6,5)(1,9)(8)(1,4)(7)(28)(24) Side=107a Order=19 - (54,53)(2,5,13,33)(53,1)(3)(8)(21)(1,3,8,21)(20,2)(5)(13) 猫目石さんの発見 Side=107b Order=19 - (35,24,48)(14,10)(4,6)(24,11)(6,10,2)(8)(2,4)(13)(11,59)(48) Side=109 Order=19 - (35,23,51)(13,10)(3,7)(23,12)(12,4)(11)(11,1)(10,3)(7,58)(51) Side=111a Order=19 - (62,49)(6,5,9,29)(1,4)(7)(13)(49,20)(6,7)(5,1)(4,33)(29) Side=111b Order=19 - (68,43)(20,23)(5,12,3)(26)(43,23,7)(19)(20,3)(7,19)(17,5)(12) Side=112a Order=19 - (64,48)(20,28)(48,9,7)(5,7,8)(2,5)(11)(3,2)(9)(8)(36)(28) Side=112b Order=19 - (64,48)(20,28)(48,7,9)(5,7,8)(5,2)(3,11,2)(9)(8)(36)(28) Side=113 Order=19 - (68,45)(20,25)(3,12,5)(45,26)(7,23)(19)(3,20)(19,7)(5,17)(12) Side=114 Order=19 - (35,28,51)(11,7,10)(28,7)(4,3)(13)(3,12)(10)(1,12,63)(11)(51) 2004.3.11 追加 Side=115a Order=19 - (65,50)(16,20,14)(5,9)(50,14,1)(13,4)(1,4)(9,16)(13)(36)(29) Side=115b Order=19 - (67,48)(20,28)(48,11,8)(7,5,8)(2,3)(5,12)(39)(9,2)(7)(28) Side=115c Order=19 - (68,47)(15,32)(8,7)(47,15,6)(1,6)(4,5)(9,1)(8,4)(36)(32) Side=116a Order=19 - (60,56)(4,12,6,7,27)(56,8)(5,1)(8)(1,4)(21)(12)(6,33)(27) Side=116b Order=19 - (65,51)(20,16,15)(51,9,5)(1,14)(4,13)(4,1)(16,9)(13)(36)(29) Side=116c Order=19 - (68,48)(17,12,19)(5,7)(3,19)(26)(48,23)(7,12)(25,5)(3,23)(20) Side=116d Order=19 - (33,27,56)(12,8,7)(27,6)(1,6)(4,5)(21,1)(12)(8,4)(60)(56) Side=116e Order=19 - (35,25,56)(12,13)(25,10)(8,4)(3,10)(7)(15,3)(12,8)(4,60)(56) Side=117a Order=19 - (65,52)(20,32)(52,8,5)(3,2)(1,13,8)(12)(5,3)(2,1)(33)(32) Side=117b Order=19 - (68,49)(12,17,20)(7,5)(19,3)(49,26)(23)(12,7)(5,25)(23,3)(20) Side=117c Order=19 - (70,47)(18,29)(7,11)(47,18,3,2)(1,5,3)(4)(2,1)(41)(11)(29) Side=118a Order=19 - (62,56)(6,21,29)(56,12)(8,4)(1,12,8)(5)(7,1)(6)(4,33)(29) Side=118b Order=19 - (69,49)(8,11,30)(5,3)(2,12)(7)(49,19,8)(5,7)(11,2)(39)(30) Side=118c Order=19 - (33,29,56)(8,21)(29,4)(12)(6,5,1)(4,12,6)(1,8)(7)(62)(56) Side=119 Order=19 - (70,49)(17,32)(8,9)(49,17,4)(6,5,1)(4,6)(1,8)(7)(38)(32) Side=120a Order=19 - (62,58)(8,9,15,26)(58,4)(11,1)(10)(4,11)(17,8)(1,36)(9)(26) Side=120b Order=19 - (70,50)(19,31)(1,3,8,7)(50,19,2)(5)(2,5)(12,1)(3)(39)(31) Side=122 Order=19 - (66,56)(10,15,31)(56,12,8)(3,12)(4,7)(13,3)(10)(8,4)(35)(31) Side=126 Order=19 - (68,58)(11,15,32)(58,9,1)(8,4)(10,9)(17)(1,8)(11)(4,36)(32) Side=131 Order=20 - (85,46)(25,21)(4,17)(15,14)(1,16)(46,21,17,1)(15)(16)(31)(4,29)(25) Side=132 Oredr=20 - (80,52)(16,36)(9,7)(2,5)(8,3)(52,16,7,5)(8)(2,11)(9)(44)(36) Side=138 Order=20 - (40,39,59)(2,5,12,20)(39,1)(3)(8)(1,3,8)(7,2)(5)(20,79)(59) Side=139a Order=20 - (85,54)(29,25)(4,21)(16,17)(54,16,15)(15,1)(1,14)(39)(17)(4,25)(21) Side-139b Order=20 - (46,35,58)(12,23)(35,7,3,1)(2,11)(5)(5,2)(1,4)(3)(23,81)(58) Side=140a Order=20 - (80,60)(15,16,29)(9,5,1)(4,13)(60,16,4)(9)(13)(51)(15,1)(14)(29) Side=140b Order=20 - (82,58)(23,35)(2,5,4,12)(58,23,1)(3)(1,3)(7,2)(5)(12,47)(35) Side=140c Order=20 - (84,56)(20,36)(11,9)(56,20,8)(2,7)(8,5)(5,3)(48)(2,9)(7)(36) Side=142 Order=20 - (82,60)(14,15,31)(13,1)(16)(60,13,9)(9,4)(4,5)(51)(16,1)(15)(31) Side=143 Order=20 - (85,58)(19,39)(11,8)(58,19,8)(3,5)(5,7,2)(7)(11,2)(9)(46)(39) Side=144a Order=20 - (80,64)(9,8,11,36)(3,5)(7,2)(5)(2,9)(7)(64,28)(16)(8,44)(36) Side=144b Order=20 - (80,64)(28,36)(64,9,7)(2,5)(11)(9,16,8)(8,3)(44)(2,7)(5)(36) Side=144c Order=20 - (84,60)(20,40)(4,5,11)(60,20,7,1)(6)(13,6,5)(1,4)(7)(44)(40) Side=144d Order=20 - (86,58)(19,39)(7,12)(2,5)(58,19,11)(9,8)(8,3)(47)(2,7)(5)(39) Side=144e Order=20 - (86,58)(19,39)(8,11)(3,5)(58,19,7,2)(5)(2,9)(7)(12)(8,47)(39) Side=145a Order=20 - (85,60)(29,31)(60,21,4)(17,16)(15,16)(1,15)(39)(14,1)(17)(25,4)(21) Side=145b Order=20 - (86,59)(20,39)(9,11)(59,20,7)(7,2)(5,8)(5,2)(3,11)(8)(47)(39) Side=146a Order=20 - (87,59)(20,39)(7,5,8)(2,3)(9)(59,20,8)(11)(12,5)(2,48)(7)(39) Side=146b Order=20 - (87,59)(20,39)(8,12)(59,20,9,7)(5,7)(2,5)(11)(3,2)(48)(8)(39) Side=149 Ordet=20 - (85,64)(25,39)(64,17,4)(14,15)(16,1)(15)(1,17,21)(16)(31)(29,4)(25) Side=154 Order=20 - (91,63)(24,39)(7,9,8)(63,24,4)(1,6)(5)(1,7)(4,6)(15)(52)(39) Side=157 Order=20 - (86,71)(14,22,35)(1,13)(71,16)(9,13)(4,9)(20)(5,4)(1,51)(15)(35) Side=158 Order=20 - (87,71)(15,20,36)(1,5,9)(71,13,4)(9)(4,16)(13)(22)(1,51)(14)(36) Side=175 Order=21 - (88,87)(1,3,8,21,54)(87,2)(5)(13)(34)(2,5,13,34)(33,1)(3)(8)(21) 猫目石さんの発見 Side=179 Order=21 - (107,72)(24,48)(14,10)(4,6)(72,24,11)(6,10,2)(8)(2,4)(13)(11,59)(48) Side=183 Order=21 - (109,74)(23,51)(13,10)(3,7)(74,23,12)(12,4)(11)(11,1)(10,3)(7,58)(51) Side=188a Order=21 - (64,48,76)(20,28)(48,9,7)(5,7,8)(2,5)(11)(3,2)(9)(8)(112)(28)(76) Side=188b Order=21 - (64,48,76)(20,28)(48,7,9)(5,7,8)(5,2)(3,11,2)(9)(8)(112)(28)(76) Side=189 Order=21 - (62,49,78)(6,5,9,29)(1,4)(7)(13)(49,20)(6,7)(5,1)(4,111)(29)(78) Side=191 Order=21 - (67,48,76)(20,28)(48,11,8)(7,5,8)(2,3)(5,12)(115)(9,2)(7)(28)(76) Side=193a Order=21 - (54,53,86)(2,5,13,33)(53,1)(3)(8)(21)(1,3,8,107)(20,2)(5)(13)(86) Side=193b Order=21 - (70,47,76)(18,29)(7,11)(47,18,3,2)(1,5,3)(4)(2,1)(117)(11)(29)(76) Side=193c Order=21 - (114,79) (28,51)(11,7,10)(79,28,7)(4,3)(13)(3,12)(10)(1,12,63)(11)(51) 2004.3.11 追加 Side=194 Order=21 - (68,47,79)(15,32)(8,7)(47,15,6)(1,6)(4,5)(9,1)(8,4)(115)(32)(79) Side=196 Oredr=21 - (65,51,80)(20,16,15)(51,9,5)(1,14)(4,13)(4,1)(16,9)(13)(116)(29)(80) Side=197a Order=21 - (69,49,79)(8,11,30)(5,3)(2,12)(7)(49,19,8)(5,7)(11,2)(118)(30)(79) Side=197b Order=21 - (116,81)(25,56)(12,13)(81,25,10)(8,4)(3,10)(7)(15,3)(12,8)(4,60)(56) Side=199a Order=21 - (110,89)(36,53)(89,10,11)(9,1)(8,4)(21,10,9)(17)(1,8)(11)(4,57)(53) Side=199b Order=21 - (60,56,83)(4,12,6,7,27)(56,8)(5,1)(8)(1,4)(21)(12)(6,116)(27)(83) Side=199c Order=21 - (116,83)(27,56)(12,8,7)(83,27,6)(1,6)(4,5)(21,1)(12)(8,4)(60)(56) Sode=200 Order=21 - (70,49,81)(17,32)(8,9)(49,17,4)(6,5,1)(4,6)(1,8)(7)(119)(32)(81) Side=201a Order=21 - (65,50,86)(16,20,14)(5,9)(50,14,1)(13,4)(1,4)(9,16)(13)(36)(115)(86) Side=201b Order=21 - (65,52,84)(20,32)(52,8,5)(3,2)(1,13,8)(12)(5,3)(2,1)(117)(32)(84) Side=201c Order=21 - (70,50,81)(19,31)(1,3,8,7)(50,19,2)(5)(2,5)(12,1)(3)(120)(31)(81) Side=202 Order=21 - (106,96)(20,12,13,51)(96,10)(8,4)(3,10)(7)(35,3)(20)(12,8)(4,55)(51) Side=203a Order=21 - (68,43,92)(20,23)(5,12,3)(26)(43,23,7)(19)(20,3)(7,111)(17,5)(12)(92) Side=203b Order=21 - (62,56,85)(6,21,29)(56,12)(8,4)(1,12,8)(5)(7,1)(6)(4,118)(29)(85) Side=203c Order=21 - (118,85)(29,56)(8,21)(85,29,4)(12)(6,5,1)(4,12,6)(1,8)(7)(62)(56) Side=204 Order=21 - (62,58,84)(8,9,15,26)(58,4)(11,1)(10)(4,11)(17,8)(1,120)(9)(26)(84) Side=206 Order=21 - (113,93)(23,25,45)(93,17,3)(19,7)(5,20)(12)(12,5)(7,26,3)(68)(19)(45) Side=207 Order=21 - (122,85)(41,44)(85,33,4)(29,13,3)(10,37)(23)(52,10)(3,16,4)(13)(41)(29) Side=209a Order=21 - (68,48,93)(17,12,19)(5,7)(3,19)(26)(48,23)(7,12)(25,5)(3,116)(20)(93) Side=209b Order=21 - (68,49,92)(12,17,20)(7,5)(19,3)(49,26)(23)(12,7)(5,117)(23,3)(20)(92) Side=209c Order=21 - (66,56,87)(10,15,31)(56,12,8)(3,12)(4,7)(13,3)(10)(8,4)(122)(31)(87) Side=216 Order=21 - (126,90)(32,58)(4,11,17)(90,32,8)(1,10)(9)(8,9)(15,4)(11,1)(68)(58) Side=220 Order=22 - (80,52,88)(16,36)(9,7)(2,5)(8,3)(52,16,7,5)(8)(2,11)(9)(132)(36)(88) Side=229 Order=22 - (80,60,89)(15,16,29)(9,5,1)(4,13)(60,16,4)(9)(13)(140)(15,1)(14)(29)(89) Side=231 Order=22 - (85,46,100)(25,21)(4,17)(15,14)(1,16)(46,21,17,1)(15)(16)(131)(4,29)(25)(100) Side=232a Order=22 - (139,93)(35,58)(12,23)(93,35,7,3,1)(2,11)(5)(5,2)(1,4)(3)(23,81)(58) Side=232b Order=22 - (84,56,92)(20,36)(11,9)(56,20,8)(2,7)(8,5)(5,3)(140)(2,9)(7)(36)(92) Side=233a Order=22 - (82,58,93)(23,35)(2,5,4,12)(58,23,1)(3)(1,3)(7,2)(5)(12,140)(35)(93) Side=233b Ordet=22 - (82,60,91)(14,15,31)(13,1)(16)(60,13,9)(9,4)(4,5)(142)(16,1)(15)(31)(91) Side=236 Order=22 - (138,98)(39,59)(2,5,12,20)(98,39,1)(3)(8)(1,3,8)(7,2)(5)(20,79)(59) Side=239 Order=22 - (85,54,100)(29,25)(4,21)(16,17)(54,16,15)(15,1)(1,14)(139)(17)(4,25)(21)(100) Side=240 Order=22 - (85,58,97)(19,39)(11,8)(58,19,8)(3,5)(5,7,2)(7)(11,2)(9)(143)(39)(97) Side=241a Order=22 - (86,58,97)(19,39)(7,12)(2,5)(58,19,11)(9,8)(8,3)(144)(2,7)(5)(39)(97) Side=241b Order=22 - (86,58,97)(19,39)(8,11)(3,5)(58,19,7,2)(5)(2,9)(7)(12)(8,144)(39)(97) Side=243 Order=22 - (86,59,98)(20,39)(9,11)(59,20,7)(7,2)(5,8)(5,2)(3,11)(8)(145)(39)(98) Side=244a Order=22 - (80,64,100)(9,8,11,36)(3,5)(7,2)(5)(2,9)(7)(64,28)(16)(8,144)(36)(100) Side=244b Order=22 - (80,64,100)(28,36)(64,9,7)(2,5)(11)(9,16,8)(8,3)(144)(2,7)(5)(36)(100) Side=244c Order=22 - (84,60,100)(20,40)(4,5,11)(60,20,7,1)(6)(13,6,5)(1,4)(7)(144)(40)(100) Side=244d Order=22 - (87,59,98)(20,39)(7,5,8)(2,3)(9)(59,20,8)(11)(12,5)(2,146)(7)(39)(98) Side=244e Order=22 - (87,59,98)(20,39)(8,12)(59,20,9,7)(5,7)(2,5)(11)(3,2)(146)(8)(39)(98) Side=256 Order=22 - (91,63,102)(24,39)(7,9,8)(63,24,4)(1,6)(5)(1,7)(4,6)(15)(154)(39)(102) Side=263 Order=22 - (86,71,106)(14,22,35)(1,13)(71,16)(9,13)(4,9)(20)(5,4)(1,157)(15)(35)(106) Side=264 Order=22 - (151,113)(47,66)(113,23,15)(6,7,15,19)(7,13,1)(8)(1,6)(24)(23)(19)(85)(66) Side=265 Order=22 - (87,71,107)(15,20,36)(1,5,9)(71,13,4)(9)(4,16)(13)(22)(1,158)(14)(36)(107) Side=269 Order=22 - (145,124)(25,39,60)(124,17,4)(14,15)(16,1)(15)(1,17,21)(16)(31)(29,4)(85)(60) Side=273a Order=22 - (149,124)(29,31,64)(124,21,4)(17,16)(15,16)(1,15)(39)(14,1)(17)(25,4)(85)(64) Side=273b Order=22 - (85,64,124)(25,39)(64,17,4)(14,15)(16,1)(15)(1,17,21)(16)(31)(29,4)(149)(124) Side=285 Order=23 - (143,142)(1,3,8,21,55,54)(142,2)(5)(13)(34)(2,5,13,34)(88,1)(3)(8)(21)(55) 猫目石さんの発見 Side=299 Order=23 - (107,72,120)(24,48)(14,10)(4,6)(72,24,11)(6,10,2)(8)(2,4)(13)(11,179)(48)(120) Side=308 Order=23 - (109,74,125)(23,51)(13,10)(3,7)(74,23,12)(12,4)(11)(11,1)(10,3)(7,183)(51)(125) Side=312a Order=23 - (188,124)(48,76)(20,28)(124,48,9,7)(5,7,8)(2,5)(11)(3,2)(9)(8)(112)(28)(76) Side=312b Order=23 - (188,124)(48,76)(20,28)(124,48,7,9)(5,7,8)(5,2)(3,11,2)(9)(8)(112)(28)(76) Side=315 Order=23 - (191,124)(48,76)(20,28)(124,48,11,8)(7,5,8)(2,3)(5,12)(115)(9,2)(7)(28)(76) Side=316a Order=23 - (193,123)(47,76)(18,29)(7,11)(123,47,18,3,2)(1,5,3)(4)(2,1)(117)(11)(29)(76) Side=316b Order=23 - (88,87,141)(1,3,8,21,54)(87,2)(5)(13)(34)(2,5,13,175)(33,1)(3)(8)(21)(141) Side=316c Order=23 - (189,127)(49,78)(6,5,9,29)(1,4)(7)(13)(127,49,20)(6,7)(5,1)(4,111)(29)(78) Side=320 Order=23 - (194,126)(47,79)(15,32)(8,7)(126,47,15,6)(1,6)(4,5)(9,1)(8,4)(115)(32)(79) Side=323 Order=23 - (114,79,130) (28,51)(11,7,10)(79,28,7)(4,3)(13)(3,12)(10)(1,12,193)(11)(51)(130) 2004.3.11 追加 Side=325 Order=23 - (197,128) (49,79)(8,11,30)(5,3)(2,12)(7)(128,49,19,8)(5,7)(11,2)(118)(30)(79) Side=327 Order=23 - (196,131)(51,80)(20,16,15)(131,51,9,5)(1,14)(4,13)(4,1)(16,9)(13)(116)(29)(80) Side=330 Order=23 - (200,130)(49,81)(17,32)(8,9)(130,49,17,4)(6,5,1)(4,6)(1,8)(7)(119)(32)(81) Side=332a Order=23 - (201,131)(50,81)(19,31)(1,3,8,7)(131,50,19,2)(5)(2,5)(12,1)(3)(120)(31)(81) Side=332b Order=23 - (193,139)(53,86)(2,5,13,33)(139,53,1)(3)(8)(21)(1,3,8,107)(20,2)(5)(13)(86) Side=333 Order=23 - (195,138)(53,85)(21,32)(138,21,10,9,17)(1,8)(11)(36,10)(32)(9,1)(8,110)(17)(85) SIde=334 Order=23 - (116,81,137)(25,56)(12,13)(81,25,10)(8,4)(3,10)(7)(15,3)(12,8)(4,197)(56)(137) Side=337a Order=23 - (201,136)(50,86)(16,20,14)(5,9)(136,50,14,1)(13,4)(1,4)(9,16)(13)(36)(115)(86) Side=337b Order=23 - (201,136)(52,84)(20,32)(136,52,8,5)(3,2)(1,13,8)(12)(5,3)(2,1)(117)(32)(84) Side=338a Order=23 - (203,135)(43,92)(20,23)(5,12,3)(26)(135,43,23,7)(19)(20,3)(7,111)(17,5)(12)(92)) Side=338b Order=23 - (199,139)(56,83)(4,12,6,7,27)(139,56,8)(5,1)(8)(1,4)(21)(12)(6,116)(27)(83) Side=338c Order=23 - (116,83,139)(27,56)(12,8,7)(83,27,6)(1,6)(4,5)(21,1)(12)(8,4)(199)(56)(139) Side=340 Order=23 - (192,148)(41,37,70)(4,33)(3,13,29)(148,37,10)(23)(10,122)(4,16,3)(13)(41)(29)(70) Side=341 Order=23 - (110,89,142)(36,53)(89,10,11)(9,1)(8,4)(21,10,9)(17)(1,8)(11)(4,199)(53)(142) Side=343 Order=23 - (187,156)(44,39,73)(156,20,11)(5,34)(9,2)(31,20)(29)(11,9)(2,114)(5,39)(34)(73) Side=344a Order=23 - (206,138) (45,93)(20,25)(3,12,5)(138,45,26)(7,23)(19)(3,113)(19,7)(5,17)(12)(93) Side=344b Order=23 - (203,141)(56,85)(6,21,29)(141,56,12)(8,4)(1,12,8)(5)(7,1)(6)(4,118)(29)(85) Side=344c Order=23 - (118,85,141)(29,56)(8,21)(85,29,4)(12)(6,5,1)(4,12,6)(1,8)(7)(203)(56)(141) Side=345 Order=23 - (193,152)(82,70)(152,41)(11,18,41)(2,5,4)(111,11,1)(3)(1,3)(7,2)(23)(18)(82) Side=346 Order=23 - (204,142)(58,84)(8,9,15,26)(142,58,4)(11,1)(10)(4,11)(17,8)(1,120)(9)(26)(84) Side=348 Order=23 - (200,148)(33,37,78)(29,4)(41)(148,29,13,10)(3,23,13)(16)(10,3)(122)(41,4)(37)(78) Side=349 Order=23 - (106,96,147)(20,12,13,51)(96,10)(8,4)(3,10)(7)(35,3)(20)(12,8)(4,202)(51)(147) Side=350a Order=23 - (209,141)(48,93)(17,12,19)(5,7)(3,19)(26)(141,48,23)(7,12)(25,5)(3,116)(20)(93) Side=350b Order=23 - (209,141)(49,92)(12,17,20)(7,5)(19,3)(141,49,26)(23)(12,7)(5,117)(23,3)(20)(92) Side=351 Order=23 - (206,145)(52,93)(18,14,20)(145,52,9)(9,5)(22,5)(4,1)(21)(18)(21,1)(20,113)(93) Side=352 Order=23 - (209,143)(56,87)(10,15,31)(143,56,12,8)(3,12)(4,7)(13,3)(10)(8,4)(122)(31)(87) Side=353 Order=23 - (197,156)(39,34,83)(5,29)(2,11,31)(156,34,9)(20)(9,20)(5,44,2)(11)(39)(114)(83) Side=360 Order=24 - (220,140)(52,88)(16,36)(9,7)(2,5)(8,3)(140,52,16,7,5)(8)(2,11)(9)(132)(36)(88) Side=364 Order=23 - (216,148)(58,90)(11,15,32)(148,58,9,1)(8,4)(10,9)(17)(1,8)(11)(4,126)(32)(90) Side=369 Order=23 - (203,166)(41,44,81)(166,33,4)(29,13,3)(10,37)(23)(52,10)(3,16,4)(13)(122)(29)(81) Side=373a Order=23 - (207,166)(37,44,85)(4,23,10)(166,29,16)(3,41)(13)(13,3)(10,29)(52)(4,122)(33)(85) Side=373b Order=23 - (122,85,166)(41,44)(85,33,4)(29,13,3)(10,37)(23)(52,10)(3,16,4)(13)(207)(29)(166) Side=377 Order=24 - (231,146)(46,100)(25,21)(4,17)(15,14)(1,16)(146,46,21,17,1)(15)(16)(131)(4,29)(25)(100) Side=378 Order=24 - (229,149)(60,89)(15,16,29)(9,5,1)(4,13)(149,60,16,4)(9)(13)(140)(15,1)(14)(29)(89) Side=380 Order=24 - (232,148)(56,92)(20,36)(11,9)(148,56,20,8)(2,7)(8,5)(5,3)(140)(2,9)(7)(36)(92) Side=383 Order=24 - (139,93,151)(35,58)(12,23)(93,35,7,3,1)(2,11)(5)(5,2)(1,4)(3)(23,232)(58)(151) Side=384a Order=24 - (233,151)(58,93)(23,35)(2,5,4,12)(151,58,23,1)(3)(1,3)(7,2)(5)(12,140)(35)(93) Side=384b Order=24 - (233,151)(60,91)(14,15,31)(13,1)(16)(151,60,13,9)(9,4)(4,5)(142)(16,1)(15)(31)(91) Side=393a Order=24 - (239,154)(54,100)(29,25)(4,21)(16,17)(154,54,16,15)(15,1)(1,14)(139)(17)(4,25)(21)(100) Side=393b Order=24 - (138,98,157)(39,59)(2,5,12,20)(98,39,1)(3)(8)(1,3,8)(7,2)(5)(20,236)(59)(157) Side=395 Order=24 - (240,155)(58,97)(19,39)(11,8)(155,58,19,8)(3,5)(5,7,2)(7)(11,2)(9)(143)(39)(97) Side=396a Order=24 - (241,155)(58,97)(19,39)(7,12)(2,5)(155,58,19,11)(9,8)(8,3)(144)(2,7)(5)(39)(97) Side=396b Order=24 - (241,155)(58,97)(19,39)(8,11)(3,5)(155,58,19,7,2)(5)(2,9)(7)(12)(8,144)(39)(97) Side=400 Order=24 - (243,157)(59,98)(20,39)(9,11)(157,59,20,7)(7,2)(5,8)(5,2)(3,11)(8)(145)(39)(98) Side=401a Order=24 - (244,157)(59,98)(20,39)(7,5,8)(2,3)(9)(157,59,20,8)(11)(12,5)(2,146)(7)(39)(98) Side=401b Order=24 - (244,157)(59,98)(20,39)(8,12)(157,59,20,9,7)(5,7)(2,5)(11)(3,2)(146)(8)(39)(98) Side=404 Order=24 - (244,160)(60,100)(20,40)(4,5,11)(160,60,20,7,1)(6)(13,6,5)(1,4)(7)(144)(40)(100) Side=408a Order=24 - (244,164)(64,100)(9,8,11,36)(3,5)(7,2)(5)(2,9)(7)(164,64,28)(16)(8,144)(36)(100) Side=408b Order=24 - (244,164)(64,100)(28,36)(164,64,9,7)(2,5)(11)(9,16,8)(8,3)(144)(2,7)(5)(36)(100) Side=421 Order=24 - (256,165)(63,102)(24,39)(7,9,8)(165,63,24,4)(1,6)(5)(1,7)(4,6)(15)(154)(39)(102) Side=423 Order=24 - (186,114,123)(105,9)(132)(62,60,31,33)(29,2)(27,77,36)(17,49,50)(47,15)(168)(32)(128)(127) Side=435 Order=24 - (200,112,123)(101,11)(134)(95,50,55)(30,27,44)(3,24)(12,21)(45,5)(63,9)(178)(54)(140)(117) Side=439 Order=24 - (260,179)(69,110)(17,28,24)(179,69,12)(7,10)(16,3)(7,17)(13)(12,13,3)(10)(41)(150)(110) Side=440 Order=24 - (263,177)(71,106)(14,22,35)(1,13)(177,71,16)(9,13)(4,9)(20)(5,4)(1,157)(15)(35)(106) Side=443a Order=24 - (265,178)(71,107)(15,20,36)(1,5,9)(178,71,13,4)(9)(4,16)(13)(22)(1,158)(14)(36)(107) Side=443b Order=24 - (151,113,179)(47,66)(113,23,15)(6,7,15,19)(7,13,1)(8)(1,6)(24)(23)(19)(264)(66)(179) Side=445 Order=24 - (263,182)(60,122)(21,39)(182,60,19,23)(16,23)(15,4)(11,16)(26)(5,11)(21)(4,141)(15)(122) Side=451 Order=24 - (269,182)(71,111)(16,15,40)(4,11)(182,71,15,14,3)(7)(4,14)(1,17)(16)(7,158)(40)(111) Side=453 Order=24 - (269,184)(60,124)(29,31)(184,60,21,4)(17,16)(15,16)(1,15)(39)(14,1)(17)(25,4)(145)(124) Side=457 Order=24 - (252,205)(37,59,109)(15,22)(205,34,13)(8,7)(22,37,29)(21)(62,15)(8,21)(47,13)(143)(109) Side=461a Order=24 - (273,188)(64,124)(25,39)(188,64,17,4)(14,15)(16,1)(15)(1,17,21)(16)(31)(29,4)(149)(124) Side=461b Order=24 - (149,124,188)(29,31,64)(124,21,4)(17,16)(15,16)(1,15)(39)(14,1)(17)(25,4)(273)(64)(188) Side=463 Order=25 - (232,231)(1,3,8,21,55,143)(231,2)(5)(13)(34)(89)(2,5,13,34,89)(88,1)(3)(8)(21)(55) Side=468 Order=24 - (257,211)(44,56,111)(13,31)(211,35,11)(25,31)(24)(6,25)(65)(19,6)(13,24)(46,11)(146)(111) Side=479 Order=24 - (175,140,164)(35,29,52,24)(28,160)(6,23)(130,86)(43,60)(26,17)(77)(44,68)(174)(5,155)(150) Side=565 Order=25 - (203,135,227)(43,92)(20,23)(5,12,3)(26)(135,43,23,7)(19)(20,3)(7,338)(17,5)(12)(92)(227) |
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