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 36 Igusa CM invariants of non-normal (D4) fields: 270

Number Igusa invariants Conductor Components Quartic invariants Class number Class group
1) [433, 130, 328] [1] 1 [433, 130, 328] 18 C18
2) [301, 273, 14945] [1] 1 [301, 273, 14945] 18 C18
3) [449, 345, 24256] [1] 1 [449, 345, 24256] 18 C18
4) [236, 96, 2068] [1] 2 [236, 96, 2068] 36 C2 x C18
5) [236, 264, 11524] [1] 1 [236, 264, 11524] 18 C3 x C6
6) [2245, 305, 9225] [1] 1 [2245, 305, 9225] 36 C36
7) [88, 98, 2313] [1] 1 [88, 98, 2313] 18 C18
8) [88, 98, 1609] [1] 1 [88, 98, 1609] 18 C18
9) [9017, 555, 74752] [1] 1 [9017, 555, 74752] 18 C18
10) [349, 33, 185] [1] 1 [349, 33, 185] 18 C18
11) [296, 66, 793] [1] 1 [296, 66, 793] 36 C36
12) [129, 123, 3492] [2, 2] 1 [129, 123, 3492] 18 C18
13) [129, 123, 3492] [1] 1 [129, 123, 3492] 18 C18
14) [104, 154, 833] [1] 1 [104, 154, 833] 72 C2 x C2 x C18
15) [104, 252, 9220] [1] 1 [104, 252, 9220] 36 C36
16) [104, 132, 2692] [1] 2 [104, 132, 2692] 72 C2 x C36
17) [853, 85, 1593] [1] 1 [853, 85, 1593] 18 C18
18) [161, 111, 1108] [2] 1 [161, 111, 1108] 18 C18
19) [161, 111, 1108] [1] 1 [161, 111, 1108] 18 C18
20) [161, 135, 4516] [2] 1 [161, 135, 4516] 6 C6
21) [5189, 117, 2125] [1] 1 [5189, 117, 2125] 18 C18
22) [641, 702, 112945] [1] 1 [641, 702, 112945] 18 C18
23) [97, 67, 516] [2, 2] 1 [97, 67, 516] 18 C18
24) [97, 67, 516] [1] 1 [97, 67, 516] 18 C18
25) [733, 141, 3321] [1] 2 [733, 141, 3321] 108 C6 x C18
26) [57, 127, 2308] [2] 1 [57, 127, 2308] 6 C6
27) [57, 175, 7300] [2] 2 [57, 175, 7300] 12 C2 x C6
28) [57, 462, 45153] [1] 1 [57, 462, 45153] 18 C3 x C6
29) [57, 94, 1297] [2, 2] 1 [57, 94, 1297] 6 C6
30) [4889, 123, 2560] [1] 1 [4889, 123, 2560] 90 C3 x C30
31) [2321, 290, 136] [1] 1 [2321, 290, 136] 18 C18
32) [377, 66, 712] [1] 1 [377, 66, 712] 36 C36
33) [209, 156, 859] [1] 1 [209, 156, 859] 18 C18
34) [821, 369, 32193] [1] 1 [821, 369, 32193] 36 C36
35) [13, 129, 3897] [3] 2 [13, 129, 3897] 12 C2 x C6
36) [13, 49, 337] [4, 4] 1 [13, 49, 337] 9 C9
37) [13, 57, 809] [3] 1 [13, 57, 809] 9 C9
38) [13, 341, 22489] [1] 1 [13, 341, 22489] 18 C18
39) [13, 125, 1537] [2, 2] 1 [13, 125, 1537] 6 C6
40) [13, 153, 2313] [2, 2] 2 [13, 153, 2313] 12 C2 x C6
41) [13, 61, 849] [2, 2] 1 [13, 61, 849] 6 C6
42) [13, 285, 20225] [1] 2 [13, 285, 20225] 36 C36
43) [13, 33, 113] [7, 7] 1 [13, 33, 113] 3 C3
44) [13, 189, 2921] [1] 1 [13, 189, 2921] 18 C18
45) [13, 165, 5633] [1] 1 [13, 165, 5633] 18 C18
46) [13, 9, 17] [18] 1 [13, 9, 17] 1 C1
47) [13, 43, 433] [1] 2 [13, 43, 433] 36 C36
48) [13, 33, 113] [9] 1 [13, 33, 113] 3 C3
49) [13, 126, 2097] [3] 2 [13, 126, 2097] 12 C2 x C6
50) [13, 350, 23137] [1] 1 [13, 350, 23137] 18 C18
51) [13, 133, 2989] [3, 3] 2 [13, 133, 2989] 18 C18
52) [977, 702, 107569] [1] 1 [977, 702, 107569] 18 C3 x C6
53) [8, 138, 2449] [1] 1 [8, 138, 2449] 18 C18
54) [8, 350, 29057] [1] 2 [8, 350, 29057] 36 C2 x C18
55) [8, 42, 369] [3, 3] 1 [8, 42, 369] 6 C6
56) [8, 410, 34825] [1] 4 [8, 410, 34825] 72 C2 x C2 x C18
57) [8, 266, 10489] [1] 2 [8, 266, 10489] 36 C2 x C18
58) [8, 534, 62041] [1] 1 [8, 534, 62041] 18 C3 x C6
59) [8, 182, 7993] [2, 2] 1 [8, 182, 7993] 9 C9
60) [8, 374, 27769] [1] 1 [8, 374, 27769] 18 C18
61) [8, 202, 5969] [1] 1 [8, 202, 5969] 18 C18
62) [8, 174, 4369] [1] 1 [8, 174, 4369] 18 C18
63) [8, 222, 6913] [1] 1 [8, 222, 6913] 18 C18
64) [8, 462, 39249] [1] 4 [8, 462, 39249] 72 C2 x C2 x C18
65) [8, 562, 40873] [1] 1 [8, 562, 40873] 18 C3 x C6
66) [8, 306, 16681] [1] 1 [8, 306, 16681] 18 C3 x C6
67) [8, 490, 50225] [1] 4 [8, 490, 50225] 72 C2 x C2 x C18
68) [8, 86, 967] [1] 1 [8, 86, 967] 18 C18
69) [8, 262, 16009] [1] 1 [8, 262, 16009] 18 C18
70) [8, 530, 41425] [1] 4 [8, 530, 41425] 72 C2 x C36
71) [8, 218, 9569] [1] 1 [8, 218, 9569] 18 C18
72) [8, 310, 22873] [1] 1 [8, 310, 22873] 18 C18
73) [8, 186, 4417] [1] 1 [8, 186, 4417] 18 C18
74) [8, 84, 1042] [1] 1 [8, 84, 1042] 18 C18
75) [8, 430, 45425] [1] 2 [8, 430, 45425] 36 C2 x C18
76) [8, 54, 601] [5, 5] 1 [8, 54, 601] 3 C3
77) [5, 125, 3545] [2, 2] 1 [5, 125, 3545] 6 C6
78) [5, 81, 1579] [1] 1 [5, 81, 1579] 18 C18
79) [5, 174, 7489] [4, 4] 1 [5, 174, 7489] 9 C9
80) [5, 150, 4905] [2, 2] 2 [5, 150, 4905] 12 C2 x C6
81) [5, 389, 31529] [1] 1 [5, 389, 31529] 18 C18
82) [5, 1209, 354609] [1] 4 [5, 1209, 354609] 72 C2 x C2 x C18
83) [5, 197, 8921] [1] 1 [5, 197, 8921] 18 C3 x C6
84) [5, 57, 801] [3, 3] 1 [5, 57, 801] 6 C6
85) [5, 233, 13361] [1] 1 [5, 233, 13361] 18 C18
86) [5, 489, 59769] [1] 2 [5, 489, 59769] 36 C2 x C18
87) [5, 474, 50389] [1] 1 [5, 474, 50389] 18 C18
88) [5, 153, 5401] [1] 1 [5, 153, 5401] 18 C18
89) [5, 250, 15445] [1] 1 [5, 250, 15445] 18 C3 x C6
90) [5, 326, 24569] [1] 1 [5, 326, 24569] 18 C18
91) [5, 47, 541] [2, 2] 2 [5, 47, 541] 18 C18
92) [5, 450, 44845] [1] 1 [5, 450, 44845] 18 C18
93) [5, 417, 42561] [1] 2 [5, 417, 42561] 36 C36
94) [5, 385, 36505] [1] 2 [5, 385, 36505] 36 C2 x C18
95) [5, 1029, 250929] [1] 4 [5, 1029, 250929] 72 C2 x C36
96) [5, 325, 21445] [1] 1 [5, 325, 21445] 18 C18
97) [5, 201, 10089] [2, 2] 2 [5, 201, 10089] 12 C2 x C6
98) [5, 246, 13129] [1] 1 [5, 246, 13129] 18 C18
99) [5, 326, 21449] [1] 1 [5, 326, 21449] 18 C18
100) [5, 366, 32209] [1] 1 [5, 366, 32209] 18 C18
101) [5, 46, 449] [4, 4] 1 [5, 46, 449] 3 C3
102) [5, 686, 101969] [1] 2 [5, 686, 101969] 36 C36
103) [5, 305, 23245] [1] 1 [5, 305, 23245] 18 C18
104) [5, 96, 2284] [1] 1 [5, 96, 2284] 18 C18
105) [5, 321, 21409] [1] 1 [5, 321, 21409] 18 C18
106) [5, 389, 37769] [1] 1 [5, 389, 37769] 18 C18
107) [5, 681, 113409] [1] 2 [5, 681, 113409] 36 C36
108) [5, 374, 33689] [1] 1 [5, 374, 33689] 18 C18
109) [5, 13, 41] [19] 1 [5, 13, 41] 1 C1
110) [5, 289, 20329] [1] 1 [5, 289, 20329] 18 C3 x C6
111) [5, 217, 10721] [1] 1 [5, 217, 10721] 18 C18
112) [5, 337, 28241] [1] 1 [5, 337, 28241] 18 C18
113) [5, 489, 57249] [1] 2 [5, 489, 57249] 36 C36
114) [5, 669, 96489] [1] 2 [5, 669, 96489] 36 C2 x C18
115) [5, 1701, 656649] [1] 4 [5, 1701, 656649] 72 C2 x C36
116) [5, 374, 31049] [1] 1 [5, 374, 31049] 18 C18
117) [5, 49, 569] [5] 1 [5, 49, 569] 3 C3
118) [29, 33, 265] [2, 2] 1 [29, 33, 265] 6 C6
119) [29, 17, 65] [2, 10] 2 [29, 17, 65] 2 C2
120) [29, 189, 8749] [1] 1 [29, 189, 8749] 18 C3 x C6
121) [29, 125, 2681] [1] 1 [29, 125, 2681] 18 C18
122) [29, 97, 721] [1] 1 [29, 97, 721] 18 C18
123) [92, 168, 6964] [1] 2 [92, 168, 6964] 36 C36
124) [92, 152, 4948] [1] 2 [92, 152, 4948] 36 C36
125) [193, 67, 688] [1] 1 [193, 67, 688] 18 C18
126) [93, 89, 97] [3, 3] 1 [93, 89, 97] 6 C6
127) [93, 73, 193] [1] 1 [93, 73, 193] 18 C18
128) [589, 193, 2097] [1] 1 [589, 193, 2097] 18 C18
129) [1201, 47, 252] [1] 1 [1201, 47, 252] 18 C18
130) [24, 196, 9508] [1] 2 [24, 196, 9508] 36 C6 x C6
131) [24, 172, 7012] [1] 2 [24, 172, 7012] 36 C2 x C18
132) [24, 100, 1636] [3, 3] 2 [24, 100, 1636] 12 C2 x C6
133) [24, 206, 2833] [1] 1 [24, 206, 2833] 18 C18
134) [221, 329, 24353] [1] 1 [221, 329, 24353] 36 C36
135) [221, 257, 545] [1] 1 [221, 257, 545] 36 C3 x C12
136) [221, 105, 2701] [1] 1 [221, 105, 2701] 36 C36
137) [4769, 87, 700] [1] 1 [4769, 87, 700] 18 C18
138) [141, 121, 3625] [1] 1 [141, 121, 3625] 18 C18
139) [152, 122, 2353] [1] 1 [152, 122, 2353] 18 C18
140) [152, 132, 3748] [1] 2 [152, 132, 3748] 36 C2 x C18
141) [40, 42, 401] [1] 1 [40, 42, 401] 36 C2 x C18
142) [40, 124, 2404] [1] 2 [40, 124, 2404] 72 C2 x C36
143) [140, 144, 5044] [1] 2 [140, 144, 5044] 72 C2 x C36
144) [113, 135, 3172] [2] 1 [113, 135, 3172] 6 C6
145) [248, 90, 1777] [1] 1 [248, 90, 1777] 18 C18
146) [185, 111, 1924] [2] 1 [185, 111, 1924] 12 C12
147) [89, 575, 66436] [1] 1 [89, 575, 66436] 18 C18
148) [89, 159, 5764] [2] 1 [89, 159, 5764] 6 C6
149) [89, 131, 2488] [1] 1 [89, 131, 2488] 18 C18
150) [89, 302, 9985] [1] 1 [89, 302, 9985] 18 C18
151) [3953, 269, 9196] [1] 1 [3953, 269, 9196] 18 C18
152) [305, 91, 164] [1] 1 [305, 91, 164] 36 C36
153) [305, 558, 72961] [1] 1 [305, 558, 72961] 36 C36
154) [305, 91, 164] [2, 2] 1 [305, 91, 164] 36 C36
155) [533, 233, 10241] [1] 1 [533, 233, 10241] 36 C36
156) [689, 107, 1312] [1] 1 [689, 107, 1312] 72 C72
157) [53, 249, 9657] [1] 2 [53, 249, 9657] 36 C6 x C6
158) [53, 165, 6157] [1] 1 [53, 165, 6157] 18 C3 x C6
159) [53, 165, 3825] [1] 1 [53, 165, 3825] 36 C2 x C18
160) [53, 33, 153] [3, 3] 1 [53, 33, 153] 6 C6
161) [53, 57, 163] [1] 1 [53, 57, 163] 18 C18
162) [53, 182, 649] [1] 1 [53, 182, 649] 18 C18
163) [341, 281, 9425] [1] 1 [341, 281, 9425] 18 C18
164) [2777, 69, 496] [1] 1 [2777, 69, 496] 54 C3 x C18
165) [332, 56, 452] [1] 1 [332, 56, 452] 18 C18
166) [281, 77, 850] [1] 1 [281, 77, 850] 18 C18
167) [281, 75, 1336] [1] 1 [281, 75, 1336] 18 C3 x C6
168) [37, 118, 2889] [2, 2] 1 [37, 118, 2889] 6 C6
169) [37, 1630, 605025] [1] 1 [37, 1630, 605025] 36 C36
170) [37, 206, 1137] [1] 1 [37, 206, 1137] 18 C18
171) [37, 305, 19177] [1] 1 [37, 305, 19177] 18 C18
172) [37, 13, 33] [2, 6] 1 [37, 13, 33] 2 C2
173) [37, 206, 1137] [3] 2 [37, 206, 1137] 18 C18
174) [949, 161, 549] [1] 1 [949, 161, 549] 36 C2 x C18
175) [7484, 526, 1813] [1] 2 [7484, 526, 1813] 36 C36
176) [293, 165, 873] [1] 1 [293, 165, 873] 36 C36
177) [28, 184, 8212] [1] 2 [28, 184, 8212] 36 C36
178) [28, 130, 3217] [1] 1 [28, 130, 3217] 18 C18
179) [537, 73, 124] [1] 1 [537, 73, 124] 18 C18
180) [61, 262, 13257] [1] 1 [61, 262, 13257] 18 C18
181) [61, 33, 257] [3] 1 [61, 33, 257] 9 C9
182) [61, 17, 57] [9] 2 [61, 17, 57] 6 C6
183) [17, 228, 4003] [1] 1 [17, 228, 4003] 18 C3 x C6
184) [17, 257, 5458] [1] 1 [17, 257, 5458] 18 C3 x C6
185) [17, 45, 298] [1] 1 [17, 45, 298] 18 C18
186) [17, 45, 502] [2, 4] 2 [17, 45, 502] 6 C6
187) [17, 183, 8164] [2] 1 [17, 183, 8164] 6 C6
188) [17, 41, 382] [2] 1 [17, 41, 382] 18 C18
189) [17, 41, 382] [1] 1 [17, 41, 382] 18 C18
190) [17, 150, 4537] [2, 2] 1 [17, 150, 4537] 6 C6
191) [17, 390, 20617] [1] 1 [17, 390, 20617] 18 C18
192) [17, 45, 502] [2] 1 [17, 45, 502] 6 C6
193) [17, 807, 140164] [1] 1 [17, 807, 140164] 18 C18
194) [17, 41, 382] [2, 4] 2 [17, 41, 382] 18 C18
195) [17, 78, 1249] [4, 4] 1 [17, 78, 1249] 3 C3
196) [17, 203, 10264] [1] 1 [17, 203, 10264] 18 C3 x C6
197) [17, 727, 125668] [1] 1 [17, 727, 125668] 18 C3 x C6
198) [489, 148, 1075] [1] 1 [489, 148, 1075] 18 C18
199) [373, 325, 26313] [1] 1 [373, 325, 26313] 18 C18
200) [173, 118, 713] [1] 1 [173, 118, 713] 18 C18
201) [3809, 186, 4840] [1] 1 [3809, 186, 4840] 36 C36
202) [1676, 152, 4100] [1] 1 [1676, 152, 4100] 18 C18
203) [2069, 685, 925] [1] 2 [2069, 685, 925] 36 C2 x C18
204) [181, 337, 20745] [1] 1 [181, 337, 20745] 18 C18
205) [133, 109, 277] [1] 1 [133, 109, 277] 18 C18
206) [77, 205, 2017] [1] 1 [77, 205, 2017] 18 C18
207) [77, 137, 3133] [1] 1 [77, 137, 3133] 18 C18
208) [77, 150, 697] [1] 1 [77, 150, 697] 18 C18
209) [11369, 147, 2560] [1] 1 [11369, 147, 2560] 18 C3 x C6
210) [188, 120, 3412] [1] 2 [188, 120, 3412] 36 C36
211) [1913, 75, 928] [1] 1 [1913, 75, 928] 18 C3 x C6
212) [44, 90, 1321] [1] 1 [44, 90, 1321] 18 C18
213) [44, 176, 7348] [1] 2 [44, 176, 7348] 36 C2 x C18
214) [44, 162, 5857] [1] 1 [44, 162, 5857] 18 C18
215) [44, 126, 3793] [1] 1 [44, 126, 3793] 18 C18
216) [389, 305, 20825] [1] 2 [389, 305, 20825] 36 C2 x C18
217) [12, 82, 1249] [1] 1 [12, 82, 1249] 18 C18
218) [12, 134, 4441] [1] 1 [12, 134, 4441] 18 C18
219) [12, 178, 7729] [1] 1 [12, 178, 7729] 18 C18
220) [12, 286, 6577] [1] 1 [12, 286, 6577] 18 C18
221) [12, 130, 2497] [3, 3] 1 [12, 130, 2497] 6 C6
222) [12, 230, 7417] [1] 1 [12, 230, 7417] 18 C18
223) [12, 118, 1129] [1] 1 [12, 118, 1129] 18 C18
224) [12, 346, 8761] [1] 1 [12, 346, 8761] 18 C18
225) [12, 18, 33] [3, 9] 1 [12, 18, 33] 2 C2
226) [12, 110, 2833] [1] 1 [12, 110, 2833] 18 C18
227) [1385, 375, 26500] [1] 1 [1385, 375, 26500] 36 C36
228) [21, 109, 1789] [3, 3] 1 [21, 109, 1789] 6 C6
229) [21, 97, 1465] [1] 1 [21, 97, 1465] 18 C18
230) [21, 205, 10501] [1] 1 [21, 205, 10501] 18 C3 x C6
231) [21, 145, 4621] [1] 1 [21, 145, 4621] 18 C18
232) [21, 121, 3529] [1] 1 [21, 121, 3529] 18 C18
233) [21, 121, 3613] [1] 1 [21, 121, 3613] 18 C18
234) [21, 86, 505] [3, 3] 1 [21, 86, 505] 6 C6
235) [85, 281, 4249] [1] 1 [85, 281, 4249] 36 C36
236) [749, 193, 137] [1] 1 [749, 193, 137] 18 C18
237) [2417, 203, 4864] [1] 1 [2417, 203, 4864] 18 C18
238) [56, 276, 15460] [1] 1 [56, 276, 15460] 18 C18
239) [2609, 153, 5200] [1] 2 [2609, 153, 5200] 36 C2 x C18
240) [2609, 155, 136] [1] 1 [2609, 155, 136] 18 C18
241) [2921, 462, 6625] [1] 1 [2921, 462, 6625] 18 C3 x C6
242) [1889, 183, 7900] [1] 1 [1889, 183, 7900] 18 C3 x C6
243) [41, 687, 57220] [1] 1 [41, 687, 57220] 18 C3 x C6
244) [41, 29, 118] [2] 1 [41, 29, 118] 6 C6
245) [41, 259, 5608] [1] 1 [41, 259, 5608] 18 C18
246) [41, 83, 1220] [2, 2] 1 [41, 83, 1220] 18 C18
247) [41, 29, 118] [2, 4] 2 [41, 29, 118] 6 C6
248) [41, 224, 3319] [1] 1 [41, 224, 3319] 18 C18
249) [41, 195, 9496] [1] 1 [41, 195, 9496] 18 C18
250) [41, 83, 1220] [1] 1 [41, 83, 1220] 18 C18
251) [41, 191, 9028] [2] 1 [41, 191, 9028] 6 C6
252) [201, 88, 127] [1] 1 [201, 88, 127] 18 C3 x C6
253) [469, 174, 65] [1] 1 [469, 174, 65] 54 C3 x C18
254) [829, 93, 297] [1] 1 [829, 93, 297] 18 C18
255) [829, 93, 297] [3] 2 [829, 93, 297] 18 C18
256) [8201, 93, 112] [1] 1 [8201, 93, 112] 18 C3 x C6
257) [397, 301, 20169] [1] 1 [397, 301, 20169] 18 C18
258) [365, 33, 181] [1] 1 [365, 33, 181] 36 C2 x C18
259) [101, 13, 17] [5] 1 [101, 13, 17] 3 C3
260) [1192, 90, 833] [1] 1 [1192, 90, 833] 36 C2 x C18
261) [381, 345, 8325] [1] 2 [381, 345, 8325] 36 C6 x C6
262) [69, 278, 1657] [1] 1 [69, 278, 1657] 18 C18
263) [65, 123, 1816] [1] 1 [65, 123, 1816] 36 C36
264) [65, 179, 7864] [1] 1 [65, 179, 7864] 36 C3 x C12
265) [65, 143, 3796] [2] 1 [65, 143, 3796] 36 C36
266) [65, 21, 94] [2] 1 [65, 21, 94] 12 C12
267) [65, 78, 481] [2, 2] 1 [65, 78, 481] 12 C12
268) [65, 171, 6904] [1] 1 [65, 171, 6904] 36 C36
269) [65, 143, 3796] [1] 1 [65, 143, 3796] 36 C36
270) [65, 21, 94] [2, 4] 2 [65, 21, 94] 12 C12