Genus 2 Curves Database Igusa CM Invariants Database Quartic CM Fields Database

An Igusa CM invariant is specified by a sequence of three polynomials [ H1(x), G2(x)/N2, G3(x)/N3], such that H1(x), G2(x), and G3(x) are in Z[x],

H1(i1) = 0, i2 = G2(i1)/N1N2, i3 = G3(i1)/N1N3,
where N1 = H1'(i1), and N2 and N3 are integers, and
i1 = I4I6/I10, i2 = I23I4/I10, i3 = I22I6/I10,

in terms of the Igusa-Clebsch invariants [ I2, I4, I6, I10 ].

Degree: [Non-normal] [Cyclic]

[2][4][6][8][10][12][14][16][18][20][22][24][26][28][30][32][34][36][38][40][42][44][46][48]
[50][52][54][56][58][60][62][64][66][68][70][72][74][76][78][80][82][84][86][88][90][92][94][96]
[98][100][102][104][106][108][110][112][114][116][118][120][122][124][126][128][130][132][134][136][138][140][142][144]
[146][148][150][152][154][156][158][160][162][164][166][168][170][172][174][176][178][180][182][184][186][188][190][192]
[194][196][198][200][202][204][206][208][210][212][214][216][218][220][222][224][226][228][230][232][234][236][238][240]
[242][244][246][248][250][252][254][256][258][260][262][264][266][268][270][272][274][276][278][280][282][284][286][288]
[290][292][294][296][298][300][302][304][306][308][310][312][314][316][318][320][322][324][326][328][330][332][334][336]
[338][340][342][344][346][348][350][352][354][356][358][360][362][364][366][368][370][372][374][376][378][380][382][384]
[386][388][390][392][394][396][398][400][402][404][406][408][410][412][414][416][418][420][422][424][426][428][430][432]
[434][436][438][440][442][444][446][448][450][452][454][456][458][460][462][464][466][468][470][472][474][476][478][480]
[482][484][486][488][490][492][494][496][498][500][502][504][506][508][510][512][514][516][518][520][522][524][526][528]
[530][532][534][536][538][540][542][544][546][548][550][552][554][556][558][560][562][564][566][568][570][572][574][576]
[578][580][582][584][586][588][590][592][594][596][598][600][602][604][606][608][610][612][614][616][618][620][622][624]
[626][628][630][632][634][636][638][640][642][644][646][648][650][652][654][656][658][660][662][664][666][668][670][672]
[674][676][678][680][682][684][686][688][690][692][694][696][698][700][702][704][706][708][710][712][714][716][718][720]
[722][724][726][728][730][732][734][736][738][740][742][744][746][748][750][752][754][756][758][760][762][764][766][768]
[770][772][774][776][778][780][782][784][786][788][790][792][794][796][798][800][802][804][806][808][810][812][814][816]
[818][820][822][824][826][828][830][832][834][836][838][840][842][844][846][848][850][852][854][856][858][860][862][864]
[1106][1108][1110][1112][1114][1116][1118][1120][1122][1124][1126][1128][1130][1132][1134][1136][1138][1140][1142][1144][1146][1148][1150][1152]

Degree 112 Igusa CM invariants of non-normal (D4) fields: 265

Number Igusa invariants Conductor Components Quartic invariants Class number Class group
1) [165, 269, 8809] [1] 1 [165, 269, 8809] 112 C2 x C56
2) [165, 830, 106225] [1] 1 [165, 830, 106225] 112 C4 x C28
3) [165, 281, 19369] [1] 1 [165, 281, 19369] 112 C4 x C28
4) [165, 417, 13401] [1] 1 [165, 417, 13401] 112 C2 x C56
5) [157, 465, 16337] [1] 2 [157, 465, 16337] 112 C2 x C56
6) [237, 485, 8977] [1] 1 [237, 485, 8977] 56 C2 x C28
7) [237, 166, 3097] [1] 1 [237, 166, 3097] 56 C56
8) [1397, 649, 63041] [1] 1 [1397, 649, 63041] 56 C56
9) [1117, 161, 6201] [1] 1 [1117, 161, 6201] 56 C56
10) [437, 905, 2753] [1] 1 [437, 905, 2753] 56 C56
11) [1605, 209, 889] [1] 1 [1605, 209, 889] 112 C2 x C56
12) [60, 304, 15844] [1] 1 [60, 304, 15844] 112 C2 x C56
13) [60, 266, 11689] [1] 1 [60, 266, 11689] 112 C2 x C2 x C28
14) [60, 554, 22729] [1] 1 [60, 554, 22729] 112 C2 x C2 x C28
15) [229, 1093, 202425] [1] 1 [229, 1093, 202425] 168 C168
16) [449, 339, 9760] [1] 1 [449, 339, 9760] 56 C2 x C28
17) [269, 877, 3377] [1] 1 [269, 877, 3377] 56 C56
18) [376, 254, 2593] [1] 1 [376, 254, 2593] 56 C56
19) [137, 114, 2701] [1] 1 [137, 114, 2701] 56 C56
20) [88, 302, 10129] [1] 1 [88, 302, 10129] 56 C2 x C28
21) [296, 372, 15652] [1] 2 [296, 372, 15652] 224 C2 x C4 x C28
22) [429, 809, 163513] [1] 1 [429, 809, 163513] 112 C4 x C28
23) [104, 190, 7361] [1] 1 [104, 190, 7361] 112 C2 x C2 x C28
24) [104, 196, 9188] [1] 1 [104, 196, 9188] 112 C112
25) [145, 355, 15520] [1] 1 [145, 355, 15520] 224 C4 x C56
26) [473, 387, 31648] [1] 1 [473, 387, 31648] 168 C2 x C84
27) [473, 411, 42112] [1] 1 [473, 411, 42112] 168 C2 x C84
28) [161, 318, 22705] [1] 1 [161, 318, 22705] 56 C2 x C28
29) [813, 557, 52969] [1] 1 [813, 557, 52969] 56 C2 x C28
30) [1240, 354, 329] [1] 1 [1240, 354, 329] 112 C2 x C56
31) [3253, 421, 43497] [1] 1 [3253, 421, 43497] 280 C280
32) [1277, 673, 87373] [1] 1 [1277, 673, 87373] 56 C56
33) [1277, 345, 3897] [1] 2 [1277, 345, 3897] 112 C112
34) [136, 76, 220] [1] 1 [136, 76, 220] 112 C4 x C28
35) [136, 362, 2161] [1] 1 [136, 362, 2161] 112 C2 x C56
36) [876, 578, 80017] [1] 1 [876, 578, 80017] 224 C2 x C2 x C56
37) [377, 419, 36256] [1] 1 [377, 419, 36256] 112 C4 x C28
38) [217, 123, 1124] [1] 1 [217, 123, 1124] 56 C56
39) [821, 501, 16569] [1] 2 [821, 501, 16569] 112 C2 x C56
40) [13, 91, 1339] [1] 1 [13, 91, 1339] 56 C2 x C28
41) [13, 537, 68969] [1] 1 [13, 537, 68969] 56 C56
42) [13, 953, 226321] [1] 1 [13, 953, 226321] 56 C56
43) [13, 1309, 294441] [1] 2 [13, 1309, 294441] 112 C2 x C56
44) [13, 394, 34597] [1] 1 [13, 394, 34597] 56 C56
45) [13, 749, 121969] [1] 1 [13, 749, 121969] 56 C56
46) [13, 88, 1468] [1] 1 [13, 88, 1468] 56 C56
47) [13, 881, 189097] [1] 1 [13, 881, 189097] 56 C56
48) [13, 926, 212497] [1] 1 [13, 926, 212497] 56 C56
49) [13, 501, 50657] [1] 1 [13, 501, 50657] 56 C56
50) [13, 821, 160057] [1] 1 [13, 821, 160057] 56 C56
51) [13, 785, 143497] [1] 1 [13, 785, 143497] 56 C2 x C28
52) [13, 325, 24973] [1] 1 [13, 325, 24973] 56 C2 x C28
53) [13, 1013, 256513] [1] 1 [13, 1013, 256513] 56 C2 x C28
54) [13, 797, 157369] [1] 1 [13, 797, 157369] 56 C56
55) [13, 857, 182881] [1] 1 [13, 857, 182881] 56 C56
56) [76, 334, 3265] [1] 1 [76, 334, 3265] 56 C56
57) [76, 168, 5156] [1] 1 [76, 168, 5156] 56 C56
58) [76, 216, 11588] [1] 1 [76, 216, 11588] 56 C56
59) [1741, 149, 1633] [1] 1 [1741, 149, 1633] 56 C56
60) [8, 910, 203825] [1] 2 [8, 910, 203825] 112 C2 x C56
61) [8, 750, 136017] [1] 2 [8, 750, 136017] 112 C2 x C2 x C28
62) [8, 586, 52049] [1] 1 [8, 586, 52049] 56 C2 x C28
63) [8, 830, 165025] [1] 2 [8, 830, 165025] 112 C2 x C2 x C28
64) [8, 1074, 260521] [1] 1 [8, 1074, 260521] 56 C2 x C28
65) [8, 730, 114017] [1] 1 [8, 730, 114017] 56 C56
66) [8, 798, 148833] [1] 2 [8, 798, 148833] 112 C2 x C56
67) [8, 1206, 324409] [1] 1 [8, 1206, 324409] 56 C56
68) [8, 970, 235025] [1] 2 [8, 970, 235025] 112 C2 x C2 x C28
69) [8, 762, 128961] [1] 2 [8, 762, 128961] 112 C2 x C2 x C28
70) [8, 826, 160769] [1] 2 [8, 826, 160769] 112 C2 x C2 x C28
71) [8, 826, 170177] [1] 2 [8, 826, 170177] 112 C2 x C2 x C28
72) [8, 942, 220689] [1] 2 [8, 942, 220689] 112 C2 x C2 x C28
73) [8, 318, 19873] [1] 1 [8, 318, 19873] 56 C2 x C28
74) [8, 1718, 571993] [1] 1 [8, 1718, 571993] 56 C56
75) [8, 858, 183393] [1] 2 [8, 858, 183393] 112 C2 x C2 x C28
76) [8, 446, 48577] [1] 1 [8, 446, 48577] 56 C56
77) [8, 574, 62369] [1] 1 [8, 574, 62369] 56 C56
78) [8, 670, 106817] [1] 1 [8, 670, 106817] 56 C56
79) [8, 378, 24769] [1] 1 [8, 378, 24769] 56 C2 x C28
80) [1957, 1065, 279153] [1] 1 [1957, 1065, 279153] 168 C2 x C84
81) [5, 961, 229969] [1] 1 [5, 961, 229969] 56 C2 x C28
82) [5, 877, 189281] [1] 1 [5, 877, 189281] 56 C56
83) [5, 1446, 435609] [1] 2 [5, 1446, 435609] 112 C2 x C56
84) [5, 533, 67241] [1] 1 [5, 533, 67241] 56 C56
85) [5, 1209, 351109] [1] 1 [5, 1209, 351109] 56 C2 x C28
86) [5, 232, 13276] [1] 1 [5, 232, 13276] 56 C56
87) [5, 709, 102889] [1] 1 [5, 709, 102889] 56 C56
88) [5, 781, 147529] [1] 1 [5, 781, 147529] 56 C56
89) [5, 1689, 713029] [1] 1 [5, 1689, 713029] 56 C56
90) [5, 1006, 252929] [1] 1 [5, 1006, 252929] 56 C2 x C28
91) [5, 550, 74905] [1] 1 [5, 550, 74905] 56 C2 x C28
92) [5, 630, 99145] [1] 1 [5, 630, 99145] 56 C2 x C28
93) [5, 1481, 468329] [1] 1 [5, 1481, 468329] 56 C56
94) [5, 1129, 285449] [1] 1 [5, 1129, 285449] 56 C56
95) [5, 216, 10684] [1] 1 [5, 216, 10684] 56 C56
96) [5, 1401, 487189] [1] 1 [5, 1401, 487189] 56 C56
97) [5, 438, 45961] [1] 1 [5, 438, 45961] 56 C2 x C28
98) [5, 821, 139249] [1] 1 [5, 821, 139249] 56 C56
99) [5, 1466, 485269] [1] 1 [5, 1466, 485269] 56 C56
100) [5, 577, 72881] [1] 1 [5, 577, 72881] 56 C56
101) [5, 609, 78409] [1] 1 [5, 609, 78409] 56 C56
102) [5, 877, 191921] [1] 1 [5, 877, 191921] 56 C2 x C28
103) [5, 264, 16924] [1] 1 [5, 264, 16924] 56 C56
104) [268, 554, 24201] [1] 1 [268, 554, 24201] 56 C56
105) [29, 665, 21229] [1] 1 [29, 665, 21229] 56 C2 x C28
106) [29, 621, 96229] [1] 1 [29, 621, 96229] 56 C2 x C28
107) [29, 774, 145593] [1] 2 [29, 774, 145593] 112 C2 x C56
108) [29, 1005, 252441] [1] 2 [29, 1005, 252441] 112 C2 x C56
109) [29, 993, 125865] [1] 2 [29, 993, 125865] 112 C2 x C56
110) [29, 454, 21833] [1] 1 [29, 454, 21833] 56 C56
111) [92, 402, 31201] [1] 1 [92, 402, 31201] 56 C2 x C28
112) [92, 656, 19172] [1] 1 [92, 656, 19172] 56 C56
113) [193, 410, 41832] [1] 1 [193, 410, 41832] 56 C2 x C28
114) [905, 183, 2716] [1] 1 [905, 183, 2716] 224 C4 x C56
115) [93, 581, 74137] [1] 2 [93, 581, 74137] 112 C2 x C2 x C28
116) [1416, 298, 9457] [1] 1 [1416, 298, 9457] 112 C2 x C56
117) [24, 590, 40561] [1] 1 [24, 590, 40561] 56 C2 x C28
118) [24, 626, 68569] [1] 1 [24, 626, 68569] 56 C2 x C28
119) [24, 494, 18673] [1] 1 [24, 494, 18673] 56 C2 x C28
120) [24, 532, 69892] [1] 2 [24, 532, 69892] 112 C2 x C56
121) [221, 510, 33201] [1] 2 [221, 510, 33201] 224 C2 x C4 x C28
122) [221, 493, 14297] [1] 2 [221, 493, 14297] 224 C2 x C2 x C56
123) [413, 329, 3829] [1] 1 [413, 329, 3829] 56 C56
124) [257, 235, 2948] [1] 1 [257, 235, 2948] 168 C168
125) [877, 681, 52577] [1] 1 [877, 681, 52577] 56 C56
126) [2113, 217, 7018] [1] 1 [2113, 217, 7018] 56 C56
127) [2521, 157, 490] [1] 1 [2521, 157, 490] 56 C56
128) [764, 610, 80801] [1] 1 [764, 610, 80801] 56 C2 x C28
129) [893, 553, 65513] [1] 1 [893, 553, 65513] 56 C56
130) [152, 84, 1612] [1] 1 [152, 84, 1612] 56 C2 x C28
131) [40, 228, 12836] [1] 1 [40, 228, 12836] 112 C112
132) [40, 310, 18265] [1] 1 [40, 310, 18265] 112 C4 x C28
133) [40, 302, 21361] [1] 1 [40, 302, 21361] 112 C2 x C2 x C28
134) [40, 370, 16585] [1] 1 [40, 370, 16585] 112 C4 x C28
135) [40, 494, 25009] [1] 1 [40, 494, 25009] 112 C2 x C2 x C28
136) [40, 124, 3484] [1] 1 [40, 124, 3484] 112 C4 x C28
137) [728, 498, 3033] [1] 2 [728, 498, 3033] 224 C2 x C2 x C2 x C28
138) [149, 393, 25165] [1] 1 [149, 393, 25165] 56 C2 x C28
139) [149, 526, 9569] [1] 1 [149, 526, 9569] 56 C56
140) [1733, 153, 1953] [1] 2 [1733, 153, 1953] 112 C2 x C56
141) [140, 416, 31924] [1] 2 [140, 416, 31924] 224 C4 x C56
142) [917, 413, 31409] [1] 1 [917, 413, 31409] 56 C56
143) [509, 309, 2365] [1] 1 [509, 309, 2365] 56 C2 x C28
144) [509, 1033, 73225] [1] 1 [509, 1033, 73225] 56 C56
145) [113, 327, 11788] [1] 1 [113, 327, 11788] 56 C2 x C28
146) [248, 82, 1433] [1] 1 [248, 82, 1433] 56 C56
147) [248, 396, 23332] [1] 2 [248, 396, 23332] 112 C2 x C56
148) [89, 639, 101524] [1] 1 [89, 639, 101524] 56 C56
149) [533, 757, 143129] [1] 1 [533, 757, 143129] 112 C2 x C56
150) [689, 291, 16864] [1] 1 [689, 291, 16864] 224 C4 x C56
151) [689, 263, 3340] [1] 1 [689, 263, 3340] 224 C4 x C56
152) [53, 701, 17897] [1] 1 [53, 701, 17897] 56 C56
153) [53, 550, 54425] [1] 2 [53, 550, 54425] 112 C2 x C56
154) [53, 349, 22169] [1] 1 [53, 349, 22169] 56 C56
155) [341, 717, 83425] [1] 1 [341, 717, 83425] 56 C56
156) [341, 953, 69425] [1] 1 [341, 953, 69425] 56 C56
157) [1528, 242, 889] [1] 1 [1528, 242, 889] 56 C2 x C28
158) [332, 354, 10081] [1] 1 [332, 354, 10081] 56 C2 x C28
159) [2029, 1021, 247929] [1] 1 [2029, 1021, 247929] 392 C7 x C56
160) [1909, 1033, 209025] [1] 1 [1909, 1033, 209025] 56 C56
161) [281, 467, 48832] [1] 1 [281, 467, 48832] 56 C2 x C28
162) [184, 194, 7753] [1] 1 [184, 194, 7753] 56 C56
163) [37, 545, 67513] [1] 1 [37, 545, 67513] 56 C56
164) [37, 557, 75481] [1] 1 [37, 557, 75481] 56 C2 x C28
165) [37, 793, 17269] [1] 1 [37, 793, 17269] 56 C56
166) [37, 785, 149977] [1] 1 [37, 785, 149977] 56 C56
167) [37, 641, 95977] [1] 1 [37, 641, 95977] 56 C56
168) [37, 321, 13097] [1] 1 [37, 321, 13097] 56 C56
169) [37, 1942, 940473] [1] 1 [37, 1942, 940473] 56 C56
170) [1848, 98, 553] [1] 1 [1848, 98, 553] 224 C2 x C2 x C2 x C28
171) [28, 362, 23689] [1] 1 [28, 362, 23689] 56 C56
172) [28, 330, 21737] [1] 1 [28, 330, 21737] 56 C56
173) [28, 520, 67348] [1] 2 [28, 520, 67348] 112 C2 x C56
174) [28, 518, 41881] [1] 1 [28, 518, 41881] 56 C2 x C2 x C14
175) [28, 638, 65473] [1] 1 [28, 638, 65473] 56 C2 x C28
176) [28, 390, 5657] [1] 1 [28, 390, 5657] 56 C56
177) [581, 77, 1337] [1] 1 [581, 77, 1337] 56 C56
178) [33, 251, 12772] [1] 1 [33, 251, 12772] 56 C56
179) [61, 313, 7885] [1] 1 [61, 313, 7885] 56 C2 x C28
180) [61, 1157, 208377] [1] 2 [61, 1157, 208377] 112 C2 x C56
181) [61, 449, 33793] [1] 1 [61, 449, 33793] 56 C56
182) [541, 669, 89033] [1] 1 [541, 669, 89033] 56 C56
183) [1533, 245, 5425] [1] 2 [1533, 245, 5425] 224 C2 x C2 x C56
184) [17, 1910, 285337] [1] 1 [17, 1910, 285337] 56 C2 x C28
185) [17, 430, 19025] [1] 2 [17, 430, 19025] 112 C112
186) [17, 599, 89356] [1] 1 [17, 599, 89356] 56 C2 x C28
187) [17, 2262, 426169] [1] 1 [17, 2262, 426169] 56 C56
188) [17, 966, 206089] [1] 1 [17, 966, 206089] 56 C2 x C28
189) [173, 341, 9997] [1] 1 [173, 341, 9997] 56 C56
190) [869, 61, 713] [1] 1 [869, 61, 713] 56 C56
191) [232, 132, 3428] [1] 1 [232, 132, 3428] 112 C112
192) [133, 401, 25537] [1] 1 [133, 401, 25537] 56 C56
193) [1016, 138, 3745] [1] 1 [1016, 138, 3745] 168 C2 x C84
194) [77, 441, 27657] [1] 2 [77, 441, 27657] 112 C2 x C2 x C28
195) [77, 765, 137817] [1] 2 [77, 765, 137817] 112 C2 x C56
196) [77, 585, 84613] [1] 1 [77, 585, 84613] 56 C56
197) [77, 373, 11201] [1] 1 [77, 373, 11201] 56 C56
198) [77, 297, 10021] [1] 1 [77, 297, 10021] 56 C56
199) [77, 641, 26317] [1] 1 [77, 641, 26317] 56 C56
200) [188, 270, 17473] [1] 1 [188, 270, 17473] 56 C56
201) [188, 354, 12529] [1] 1 [188, 354, 12529] 56 C2 x C28
202) [44, 574, 47873] [1] 2 [44, 574, 47873] 112 C2 x C2 x C28
203) [44, 528, 67540] [1] 2 [44, 528, 67540] 112 C2 x C2 x C28
204) [44, 542, 71857] [1] 1 [44, 542, 71857] 56 C56
205) [44, 230, 11641] [1] 1 [44, 230, 11641] 56 C2 x C28
206) [337, 283, 19264] [1] 1 [337, 283, 19264] 56 C56
207) [389, 609, 49833] [1] 4 [389, 609, 49833] 224 C2 x C2 x C56
208) [632, 282, 4081] [1] 1 [632, 282, 4081] 56 C2 x C28
209) [632, 690, 113337] [1] 2 [632, 690, 113337] 112 C2 x C56
210) [1157, 69, 901] [1] 1 [1157, 69, 901] 112 C2 x C2 x C28
211) [2389, 741, 2889] [1] 1 [2389, 741, 2889] 56 C56
212) [12, 950, 224425] [1] 2 [12, 950, 224425] 112 C2 x C2 x C28
213) [12, 466, 19297] [1] 1 [12, 466, 19297] 56 C2 x C28
214) [12, 578, 62353] [1] 1 [12, 578, 62353] 56 C2 x C28
215) [12, 826, 104857] [1] 1 [12, 826, 104857] 56 C2 x C2 x C14
216) [12, 710, 104857] [1] 1 [12, 710, 104857] 56 C2 x C2 x C14
217) [12, 526, 66817] [1] 1 [12, 526, 66817] 56 C56
218) [12, 506, 48457] [1] 1 [12, 506, 48457] 56 C2 x C28
219) [12, 886, 85657] [1] 1 [12, 886, 85657] 56 C2 x C28
220) [12, 770, 137425] [1] 2 [12, 770, 137425] 112 C2 x C2 x C28
221) [21, 806, 154009] [1] 1 [21, 806, 154009] 56 C2 x C28
222) [21, 749, 136969] [1] 1 [21, 749, 136969] 56 C2 x C28
223) [21, 665, 85561] [1] 1 [21, 665, 85561] 56 C2 x C28
224) [21, 505, 61441] [1] 1 [21, 505, 61441] 56 C56
225) [21, 761, 144649] [1] 1 [21, 761, 144649] 56 C56
226) [21, 638, 98737] [1] 1 [21, 638, 98737] 56 C56
227) [21, 617, 57241] [1] 1 [21, 617, 57241] 56 C56
228) [21, 457, 50317] [1] 1 [21, 457, 50317] 56 C56
229) [21, 118, 3397] [1] 2 [21, 118, 3397] 112 C2 x C56
230) [1581, 221, 2329] [1] 1 [1581, 221, 2329] 112 C2 x C2 x C28
231) [85, 382, 31041] [1] 1 [85, 382, 31041] 112 C112
232) [749, 2065, 322861] [1] 1 [749, 2065, 322861] 56 C56
233) [669, 313, 24325] [1] 1 [669, 313, 24325] 56 C56
234) [1073, 111, 2812] [1] 1 [1073, 111, 2812] 112 C4 x C28
235) [277, 889, 3057] [1] 1 [277, 889, 3057] 56 C56
236) [2621, 713, 94985] [1] 1 [2621, 713, 94985] 56 C56
237) [56, 438, 36985] [1] 1 [56, 438, 36985] 56 C2 x C28
238) [56, 378, 28945] [1] 1 [56, 378, 28945] 56 C2 x C28
239) [56, 530, 9241] [1] 1 [56, 530, 9241] 56 C56
240) [56, 162, 3817] [1] 1 [56, 162, 3817] 56 C56
241) [1036, 374, 30825] [1] 1 [1036, 374, 30825] 112 C2 x C56
242) [41, 151, 5608] [1] 1 [41, 151, 5608] 56 C56
243) [41, 534, 68665] [1] 1 [41, 534, 68665] 56 C2 x C28
244) [41, 494, 55105] [1] 1 [41, 494, 55105] 56 C2 x C28
245) [41, 447, 46252] [1] 1 [41, 447, 46252] 56 C2 x C28
246) [241, 337, 27850] [1] 1 [241, 337, 27850] 56 C56
247) [241, 195, 8964] [1] 1 [241, 195, 8964] 56 C56
248) [397, 257, 8473] [1] 1 [397, 257, 8473] 56 C56
249) [397, 1374, 414801] [1] 2 [397, 1374, 414801] 112 C2 x C56
250) [365, 757, 127841] [1] 1 [365, 757, 127841] 112 C112
251) [365, 381, 20869] [1] 1 [365, 381, 20869] 112 C2 x C2 x C28
252) [1885, 81, 1169] [1] 1 [1885, 81, 1169] 224 C2 x C4 x C28
253) [812, 224, 5236] [1] 2 [812, 224, 5236] 224 C2 x C4 x C28
254) [101, 99, 1819] [1] 1 [101, 99, 1819] 56 C2 x C28
255) [101, 485, 20401] [1] 1 [101, 485, 20401] 56 C56
256) [101, 654, 3505] [1] 1 [101, 654, 3505] 56 C56
257) [101, 87, 655] [1] 1 [101, 87, 655] 56 C2 x C28
258) [172, 242, 8449] [1] 1 [172, 242, 8449] 56 C2 x C2 x C14
259) [172, 168, 6884] [1] 1 [172, 168, 6884] 56 C56
260) [172, 426, 1337] [1] 1 [172, 426, 1337] 56 C2 x C28
261) [69, 494, 6913] [1] 1 [69, 494, 6913] 56 C56
262) [69, 625, 20221] [1] 1 [69, 625, 20221] 56 C2 x C28
263) [69, 874, 18469] [1] 1 [69, 874, 18469] 56 C2 x C2 x C14
264) [1864, 90, 161] [1] 1 [1864, 90, 161] 112 C2 x C2 x C28
265) [444, 328, 5140] [1] 2 [444, 328, 5140] 224 C4 x C56