extension | φ:Q→Out N | d | ρ | Label | ID |
(S3×C2×C4)⋊1C22 = C42⋊11D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4):1C2^2 | 192,1084 |
(S3×C2×C4)⋊2C22 = D4×D12 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4):2C2^2 | 192,1108 |
(S3×C2×C4)⋊3C22 = D4⋊5D12 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4):3C2^2 | 192,1113 |
(S3×C2×C4)⋊4C22 = C24.67D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4):4C2^2 | 192,1145 |
(S3×C2×C4)⋊5C22 = S3×C22≀C2 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 24 | | (S3xC2xC4):5C2^2 | 192,1147 |
(S3×C2×C4)⋊6C22 = C24⋊7D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4):6C2^2 | 192,1148 |
(S3×C2×C4)⋊7C22 = C24⋊8D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4):7C2^2 | 192,1149 |
(S3×C2×C4)⋊8C22 = C24.44D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4):8C2^2 | 192,1150 |
(S3×C2×C4)⋊9C22 = C24.45D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4):9C2^2 | 192,1151 |
(S3×C2×C4)⋊10C22 = C24.46D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4):10C2^2 | 192,1152 |
(S3×C2×C4)⋊11C22 = C24.47D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4):11C2^2 | 192,1154 |
(S3×C2×C4)⋊12C22 = C6.372+ 1+4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4):12C2^2 | 192,1164 |
(S3×C2×C4)⋊13C22 = C6.382+ 1+4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4):13C2^2 | 192,1166 |
(S3×C2×C4)⋊14C22 = D12⋊19D4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4):14C2^2 | 192,1168 |
(S3×C2×C4)⋊15C22 = D12⋊20D4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4):15C2^2 | 192,1171 |
(S3×C2×C4)⋊16C22 = C6.482+ 1+4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4):16C2^2 | 192,1179 |
(S3×C2×C4)⋊17C22 = C4⋊C4⋊26D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4):17C2^2 | 192,1186 |
(S3×C2×C4)⋊18C22 = D12⋊21D4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4):18C2^2 | 192,1189 |
(S3×C2×C4)⋊19C22 = C6.562+ 1+4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4):19C2^2 | 192,1203 |
(S3×C2×C4)⋊20C22 = C6.1202+ 1+4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4):20C2^2 | 192,1212 |
(S3×C2×C4)⋊21C22 = C6.1212+ 1+4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4):21C2^2 | 192,1213 |
(S3×C2×C4)⋊22C22 = C4⋊C4⋊28D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4):22C2^2 | 192,1215 |
(S3×C2×C4)⋊23C22 = C6.612+ 1+4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4):23C2^2 | 192,1216 |
(S3×C2×C4)⋊24C22 = C6.682+ 1+4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4):24C2^2 | 192,1225 |
(S3×C2×C4)⋊25C22 = C42⋊20D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4):25C2^2 | 192,1233 |
(S3×C2×C4)⋊26C22 = D12⋊10D4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4):26C2^2 | 192,1235 |
(S3×C2×C4)⋊27C22 = C42⋊25D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4):27C2^2 | 192,1263 |
(S3×C2×C4)⋊28C22 = C42⋊27D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4):28C2^2 | 192,1270 |
(S3×C2×C4)⋊29C22 = D12⋊11D4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4):29C2^2 | 192,1276 |
(S3×C2×C4)⋊30C22 = D4×C3⋊D4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4):30C2^2 | 192,1360 |
(S3×C2×C4)⋊31C22 = C24.52D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4):31C2^2 | 192,1364 |
(S3×C2×C4)⋊32C22 = C24.53D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4):32C2^2 | 192,1365 |
(S3×C2×C4)⋊33C22 = C2×D4⋊6D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4):33C2^2 | 192,1516 |
(S3×C2×C4)⋊34C22 = C2×D4○D12 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4):34C2^2 | 192,1521 |
(S3×C2×C4)⋊35C22 = C6.C25 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | 4 | (S3xC2xC4):35C2^2 | 192,1523 |
(S3×C2×C4)⋊36C22 = S3×2+ 1+4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 24 | 8+ | (S3xC2xC4):36C2^2 | 192,1524 |
(S3×C2×C4)⋊37C22 = D6.C24 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | 8- | (S3xC2xC4):37C2^2 | 192,1525 |
(S3×C2×C4)⋊38C22 = D12.39C23 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | 8+ | (S3xC2xC4):38C2^2 | 192,1527 |
(S3×C2×C4)⋊39C22 = C24.35D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4):39C2^2 | 192,1045 |
(S3×C2×C4)⋊40C22 = C24.38D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4):40C2^2 | 192,1049 |
(S3×C2×C4)⋊41C22 = C24.41D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4):41C2^2 | 192,1053 |
(S3×C2×C4)⋊42C22 = C24.42D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4):42C2^2 | 192,1054 |
(S3×C2×C4)⋊43C22 = C42⋊9D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4):43C2^2 | 192,1080 |
(S3×C2×C4)⋊44C22 = C42⋊10D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4):44C2^2 | 192,1083 |
(S3×C2×C4)⋊45C22 = C42⋊12D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4):45C2^2 | 192,1086 |
(S3×C2×C4)⋊46C22 = C42⋊13D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4):46C2^2 | 192,1104 |
(S3×C2×C4)⋊47C22 = C42⋊14D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4):47C2^2 | 192,1106 |
(S3×C2×C4)⋊48C22 = D12⋊23D4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4):48C2^2 | 192,1109 |
(S3×C2×C4)⋊49C22 = C42⋊19D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4):49C2^2 | 192,1119 |
(S3×C2×C4)⋊50C22 = C6.402+ 1+4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4):50C2^2 | 192,1169 |
(S3×C2×C4)⋊51C22 = C6.532+ 1+4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4):51C2^2 | 192,1196 |
(S3×C2×C4)⋊52C22 = C42⋊22D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4):52C2^2 | 192,1237 |
(S3×C2×C4)⋊53C22 = C42⋊26D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4):53C2^2 | 192,1264 |
(S3×C2×C4)⋊54C22 = C24.83D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4):54C2^2 | 192,1350 |
(S3×C2×C4)⋊55C22 = C2×C12⋊D4 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4):55C2^2 | 192,1065 |
(S3×C2×C4)⋊56C22 = S3×C4⋊D4 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4):56C2^2 | 192,1163 |
(S3×C2×C4)⋊57C22 = C2×D6⋊3D4 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4):57C2^2 | 192,1359 |
(S3×C2×C4)⋊58C22 = C22×S3×D4 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4):58C2^2 | 192,1514 |
(S3×C2×C4)⋊59C22 = C22×D4⋊2S3 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4):59C2^2 | 192,1515 |
(S3×C2×C4)⋊60C22 = C22×Q8⋊3S3 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4):60C2^2 | 192,1518 |
(S3×C2×C4)⋊61C22 = C2×S3×C4○D4 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4):61C2^2 | 192,1520 |
(S3×C2×C4)⋊62C22 = C2×C4×D12 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4):62C2^2 | 192,1032 |
(S3×C2×C4)⋊63C22 = C2×S3×C22⋊C4 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4):63C2^2 | 192,1043 |
(S3×C2×C4)⋊64C22 = C2×Dic3⋊4D4 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4):64C2^2 | 192,1044 |
(S3×C2×C4)⋊65C22 = C2×C23.9D6 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4):65C2^2 | 192,1047 |
(S3×C2×C4)⋊66C22 = C2×Dic3⋊D4 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4):66C2^2 | 192,1048 |
(S3×C2×C4)⋊67C22 = C2×Dic3⋊5D4 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4):67C2^2 | 192,1062 |
(S3×C2×C4)⋊68C22 = C2×D6.D4 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4):68C2^2 | 192,1064 |
(S3×C2×C4)⋊69C22 = C4×S3×D4 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4):69C2^2 | 192,1103 |
(S3×C2×C4)⋊70C22 = S3×C22.D4 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4):70C2^2 | 192,1211 |
(S3×C2×C4)⋊71C22 = C2×C4×C3⋊D4 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4):71C2^2 | 192,1347 |
(S3×C2×C4)⋊72C22 = C22×C4○D12 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4):72C2^2 | 192,1513 |
extension | φ:Q→Out N | d | ρ | Label | ID |
(S3×C2×C4).1C22 = S3×C4.D4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 24 | 8+ | (S3xC2xC4).1C2^2 | 192,303 |
(S3×C2×C4).2C22 = M4(2).19D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | 8- | (S3xC2xC4).2C2^2 | 192,304 |
(S3×C2×C4).3C22 = S3×C4.10D4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | 8- | (S3xC2xC4).3C2^2 | 192,309 |
(S3×C2×C4).4C22 = M4(2).21D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | 8+ | (S3xC2xC4).4C2^2 | 192,310 |
(S3×C2×C4).5C22 = C4⋊C4⋊19D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4).5C2^2 | 192,329 |
(S3×C2×C4).6C22 = D4⋊(C4×S3) | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).6C2^2 | 192,330 |
(S3×C2×C4).7C22 = D4⋊D12 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4).7C2^2 | 192,332 |
(S3×C2×C4).8C22 = D6.D8 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).8C2^2 | 192,333 |
(S3×C2×C4).9C22 = D6⋊5SD16 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4).9C2^2 | 192,335 |
(S3×C2×C4).10C22 = D6.SD16 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).10C2^2 | 192,336 |
(S3×C2×C4).11C22 = D6⋊C8⋊11C2 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).11C2^2 | 192,338 |
(S3×C2×C4).12C22 = C3⋊C8⋊1D4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).12C2^2 | 192,339 |
(S3×C2×C4).13C22 = D4⋊3D12 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).13C2^2 | 192,340 |
(S3×C2×C4).14C22 = C3⋊C8⋊D4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).14C2^2 | 192,341 |
(S3×C2×C4).15C22 = D4.D12 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).15C2^2 | 192,342 |
(S3×C2×C4).16C22 = C24⋊1C4⋊C2 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).16C2^2 | 192,343 |
(S3×C2×C4).17C22 = (S3×Q8)⋊C4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).17C2^2 | 192,361 |
(S3×C2×C4).18C22 = Q8⋊7(C4×S3) | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).18C2^2 | 192,362 |
(S3×C2×C4).19C22 = D6.1SD16 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).19C2^2 | 192,364 |
(S3×C2×C4).20C22 = Q8⋊3D12 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).20C2^2 | 192,365 |
(S3×C2×C4).21C22 = Q8.11D12 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).21C2^2 | 192,367 |
(S3×C2×C4).22C22 = D6⋊Q16 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).22C2^2 | 192,368 |
(S3×C2×C4).23C22 = Q8⋊4D12 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).23C2^2 | 192,369 |
(S3×C2×C4).24C22 = D6.Q16 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).24C2^2 | 192,370 |
(S3×C2×C4).25C22 = C3⋊(C8⋊D4) | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).25C2^2 | 192,371 |
(S3×C2×C4).26C22 = D6⋊C8.C2 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).26C2^2 | 192,373 |
(S3×C2×C4).27C22 = C8⋊Dic3⋊C2 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).27C2^2 | 192,374 |
(S3×C2×C4).28C22 = C3⋊C8.D4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).28C2^2 | 192,375 |
(S3×C2×C4).29C22 = C42⋊3D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | 4 | (S3xC2xC4).29C2^2 | 192,380 |
(S3×C2×C4).30C22 = C8⋊(C4×S3) | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).30C2^2 | 192,420 |
(S3×C2×C4).31C22 = D6.2SD16 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).31C2^2 | 192,421 |
(S3×C2×C4).32C22 = D6.4SD16 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).32C2^2 | 192,422 |
(S3×C2×C4).33C22 = C24⋊7D4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).33C2^2 | 192,424 |
(S3×C2×C4).34C22 = C4.Q8⋊S3 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).34C2^2 | 192,425 |
(S3×C2×C4).35C22 = C8.2D12 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).35C2^2 | 192,426 |
(S3×C2×C4).36C22 = C6.(C4○D8) | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).36C2^2 | 192,427 |
(S3×C2×C4).37C22 = C8⋊S3⋊C4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).37C2^2 | 192,440 |
(S3×C2×C4).38C22 = D6.5D8 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).38C2^2 | 192,441 |
(S3×C2×C4).39C22 = D6.2Q16 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).39C2^2 | 192,443 |
(S3×C2×C4).40C22 = C2.D8⋊S3 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).40C2^2 | 192,444 |
(S3×C2×C4).41C22 = C8⋊3D12 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).41C2^2 | 192,445 |
(S3×C2×C4).42C22 = C2.D8⋊7S3 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).42C2^2 | 192,447 |
(S3×C2×C4).43C22 = M4(2).25D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | 4 | (S3xC2xC4).43C2^2 | 192,452 |
(S3×C2×C4).44C22 = D12⋊D4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4).44C2^2 | 192,715 |
(S3×C2×C4).45C22 = Dic6⋊D4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).45C2^2 | 192,717 |
(S3×C2×C4).46C22 = C24⋊12D4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).46C2^2 | 192,718 |
(S3×C2×C4).47C22 = D6⋊6SD16 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4).47C2^2 | 192,728 |
(S3×C2×C4).48C22 = D6⋊8SD16 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).48C2^2 | 192,729 |
(S3×C2×C4).49C22 = D12⋊7D4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).49C2^2 | 192,731 |
(S3×C2×C4).50C22 = Dic6.16D4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).50C2^2 | 192,732 |
(S3×C2×C4).51C22 = C24⋊8D4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).51C2^2 | 192,733 |
(S3×C2×C4).52C22 = D6⋊5Q16 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).52C2^2 | 192,745 |
(S3×C2×C4).53C22 = D12.17D4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).53C2^2 | 192,746 |
(S3×C2×C4).54C22 = C24.36D4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).54C2^2 | 192,748 |
(S3×C2×C4).55C22 = C6.2+ 1+4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).55C2^2 | 192,1069 |
(S3×C2×C4).56C22 = C6.52- 1+4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).56C2^2 | 192,1072 |
(S3×C2×C4).57C22 = C6.112+ 1+4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).57C2^2 | 192,1073 |
(S3×C2×C4).58C22 = C42.91D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).58C2^2 | 192,1082 |
(S3×C2×C4).59C22 = C42.92D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).59C2^2 | 192,1085 |
(S3×C2×C4).60C22 = C42.94D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).60C2^2 | 192,1088 |
(S3×C2×C4).61C22 = C42.95D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).61C2^2 | 192,1089 |
(S3×C2×C4).62C22 = C42.98D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).62C2^2 | 192,1092 |
(S3×C2×C4).63C22 = C42.108D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).63C2^2 | 192,1105 |
(S3×C2×C4).64C22 = D12⋊24D4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).64C2^2 | 192,1110 |
(S3×C2×C4).65C22 = D4⋊6D12 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).65C2^2 | 192,1114 |
(S3×C2×C4).66C22 = C42.113D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).66C2^2 | 192,1117 |
(S3×C2×C4).67C22 = C42.115D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).67C2^2 | 192,1120 |
(S3×C2×C4).68C22 = C42.117D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).68C2^2 | 192,1122 |
(S3×C2×C4).69C22 = C42.125D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).69C2^2 | 192,1131 |
(S3×C2×C4).70C22 = C42.126D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).70C2^2 | 192,1133 |
(S3×C2×C4).71C22 = Q8×D12 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).71C2^2 | 192,1134 |
(S3×C2×C4).72C22 = Q8⋊6D12 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).72C2^2 | 192,1135 |
(S3×C2×C4).73C22 = Q8⋊7D12 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).73C2^2 | 192,1136 |
(S3×C2×C4).74C22 = D12⋊10Q8 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).74C2^2 | 192,1138 |
(S3×C2×C4).75C22 = C42.132D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).75C2^2 | 192,1140 |
(S3×C2×C4).76C22 = C42.133D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).76C2^2 | 192,1141 |
(S3×C2×C4).77C22 = C42.134D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).77C2^2 | 192,1142 |
(S3×C2×C4).78C22 = C42.135D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).78C2^2 | 192,1143 |
(S3×C2×C4).79C22 = C12⋊(C4○D4) | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).79C2^2 | 192,1155 |
(S3×C2×C4).80C22 = C6.322+ 1+4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).80C2^2 | 192,1156 |
(S3×C2×C4).81C22 = Dic6⋊19D4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).81C2^2 | 192,1157 |
(S3×C2×C4).82C22 = Dic6⋊20D4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).82C2^2 | 192,1158 |
(S3×C2×C4).83C22 = C6.722- 1+4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).83C2^2 | 192,1167 |
(S3×C2×C4).84C22 = C6.732- 1+4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).84C2^2 | 192,1170 |
(S3×C2×C4).85C22 = C6.422+ 1+4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4).85C2^2 | 192,1172 |
(S3×C2×C4).86C22 = C6.432+ 1+4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).86C2^2 | 192,1173 |
(S3×C2×C4).87C22 = C6.452+ 1+4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).87C2^2 | 192,1175 |
(S3×C2×C4).88C22 = C6.1152+ 1+4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).88C2^2 | 192,1177 |
(S3×C2×C4).89C22 = C6.472+ 1+4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).89C2^2 | 192,1178 |
(S3×C2×C4).90C22 = C6.492+ 1+4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).90C2^2 | 192,1180 |
(S3×C2×C4).91C22 = C4⋊C4.187D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).91C2^2 | 192,1183 |
(S3×C2×C4).92C22 = S3×C22⋊Q8 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4).92C2^2 | 192,1185 |
(S3×C2×C4).93C22 = C6.162- 1+4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).93C2^2 | 192,1187 |
(S3×C2×C4).94C22 = C6.172- 1+4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).94C2^2 | 192,1188 |
(S3×C2×C4).95C22 = D12⋊22D4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).95C2^2 | 192,1190 |
(S3×C2×C4).96C22 = Dic6⋊21D4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).96C2^2 | 192,1191 |
(S3×C2×C4).97C22 = Dic6⋊22D4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).97C2^2 | 192,1192 |
(S3×C2×C4).98C22 = C6.512+ 1+4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4).98C2^2 | 192,1193 |
(S3×C2×C4).99C22 = C6.1182+ 1+4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).99C2^2 | 192,1194 |
(S3×C2×C4).100C22 = C6.522+ 1+4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).100C2^2 | 192,1195 |
(S3×C2×C4).101C22 = C6.212- 1+4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).101C2^2 | 192,1198 |
(S3×C2×C4).102C22 = C6.232- 1+4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).102C2^2 | 192,1200 |
(S3×C2×C4).103C22 = C6.772- 1+4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).103C2^2 | 192,1201 |
(S3×C2×C4).104C22 = C6.242- 1+4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).104C2^2 | 192,1202 |
(S3×C2×C4).105C22 = C6.782- 1+4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).105C2^2 | 192,1204 |
(S3×C2×C4).106C22 = C6.252- 1+4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).106C2^2 | 192,1205 |
(S3×C2×C4).107C22 = C6.592+ 1+4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).107C2^2 | 192,1206 |
(S3×C2×C4).108C22 = C6.792- 1+4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).108C2^2 | 192,1207 |
(S3×C2×C4).109C22 = C4⋊C4.197D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).109C2^2 | 192,1208 |
(S3×C2×C4).110C22 = C6.822- 1+4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).110C2^2 | 192,1214 |
(S3×C2×C4).111C22 = C6.1222+ 1+4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4).111C2^2 | 192,1217 |
(S3×C2×C4).112C22 = C6.622+ 1+4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4).112C2^2 | 192,1218 |
(S3×C2×C4).113C22 = C6.632+ 1+4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).113C2^2 | 192,1219 |
(S3×C2×C4).114C22 = C6.642+ 1+4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).114C2^2 | 192,1220 |
(S3×C2×C4).115C22 = C6.662+ 1+4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).115C2^2 | 192,1222 |
(S3×C2×C4).116C22 = C6.852- 1+4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).116C2^2 | 192,1224 |
(S3×C2×C4).117C22 = C6.692+ 1+4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).117C2^2 | 192,1226 |
(S3×C2×C4).118C22 = C42.233D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).118C2^2 | 192,1227 |
(S3×C2×C4).119C22 = C42.137D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).119C2^2 | 192,1228 |
(S3×C2×C4).120C22 = C42.141D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).120C2^2 | 192,1234 |
(S3×C2×C4).121C22 = Dic6⋊10D4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).121C2^2 | 192,1236 |
(S3×C2×C4).122C22 = C42.144D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).122C2^2 | 192,1241 |
(S3×C2×C4).123C22 = C42.145D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).123C2^2 | 192,1243 |
(S3×C2×C4).124C22 = C42.148D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).124C2^2 | 192,1248 |
(S3×C2×C4).125C22 = C42.237D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).125C2^2 | 192,1250 |
(S3×C2×C4).126C22 = C42.150D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).126C2^2 | 192,1251 |
(S3×C2×C4).127C22 = C42.151D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).127C2^2 | 192,1252 |
(S3×C2×C4).128C22 = C42.152D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).128C2^2 | 192,1253 |
(S3×C2×C4).129C22 = C42.153D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).129C2^2 | 192,1254 |
(S3×C2×C4).130C22 = C42.154D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).130C2^2 | 192,1255 |
(S3×C2×C4).131C22 = C42.155D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).131C2^2 | 192,1256 |
(S3×C2×C4).132C22 = C42.156D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).132C2^2 | 192,1257 |
(S3×C2×C4).133C22 = C42.157D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).133C2^2 | 192,1258 |
(S3×C2×C4).134C22 = C42.158D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).134C2^2 | 192,1259 |
(S3×C2×C4).135C22 = C42.163D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).135C2^2 | 192,1268 |
(S3×C2×C4).136C22 = C42.164D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).136C2^2 | 192,1269 |
(S3×C2×C4).137C22 = C42.165D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).137C2^2 | 192,1271 |
(S3×C2×C4).138C22 = C42⋊28D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4).138C2^2 | 192,1274 |
(S3×C2×C4).139C22 = Dic6⋊11D4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).139C2^2 | 192,1277 |
(S3×C2×C4).140C22 = C42.168D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).140C2^2 | 192,1278 |
(S3×C2×C4).141C22 = S3×C4⋊Q8 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).141C2^2 | 192,1282 |
(S3×C2×C4).142C22 = C42.171D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).142C2^2 | 192,1283 |
(S3×C2×C4).143C22 = C42.240D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).143C2^2 | 192,1284 |
(S3×C2×C4).144C22 = D12⋊12D4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).144C2^2 | 192,1285 |
(S3×C2×C4).145C22 = D12⋊8Q8 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).145C2^2 | 192,1286 |
(S3×C2×C4).146C22 = C42.174D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).146C2^2 | 192,1288 |
(S3×C2×C4).147C22 = D12⋊9Q8 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).147C2^2 | 192,1289 |
(S3×C2×C4).148C22 = C42.176D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).148C2^2 | 192,1290 |
(S3×C2×C4).149C22 = C42.177D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).149C2^2 | 192,1291 |
(S3×C2×C4).150C22 = C42.178D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).150C2^2 | 192,1292 |
(S3×C2×C4).151C22 = C42.179D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).151C2^2 | 192,1293 |
(S3×C2×C4).152C22 = C42.180D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).152C2^2 | 192,1294 |
(S3×C2×C4).153C22 = M4(2)⋊26D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | 4 | (S3xC2xC4).153C2^2 | 192,1304 |
(S3×C2×C4).154C22 = M4(2)⋊28D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | 4 | (S3xC2xC4).154C2^2 | 192,1309 |
(S3×C2×C4).155C22 = C2×D8⋊S3 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4).155C2^2 | 192,1314 |
(S3×C2×C4).156C22 = C2×Q8⋊3D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4).156C2^2 | 192,1318 |
(S3×C2×C4).157C22 = C2×D4.D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).157C2^2 | 192,1319 |
(S3×C2×C4).158C22 = C2×Q16⋊S3 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).158C2^2 | 192,1323 |
(S3×C2×C4).159C22 = SD16⋊D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | 4 | (S3xC2xC4).159C2^2 | 192,1327 |
(S3×C2×C4).160C22 = S3×C8⋊C22 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 24 | 8+ | (S3xC2xC4).160C2^2 | 192,1331 |
(S3×C2×C4).161C22 = D8⋊4D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | 8- | (S3xC2xC4).161C2^2 | 192,1332 |
(S3×C2×C4).162C22 = S3×C8.C22 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | 8- | (S3xC2xC4).162C2^2 | 192,1335 |
(S3×C2×C4).163C22 = D24⋊C22 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | 8+ | (S3xC2xC4).163C2^2 | 192,1336 |
(S3×C2×C4).164C22 = Q8×C3⋊D4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).164C2^2 | 192,1374 |
(S3×C2×C4).165C22 = C6.442- 1+4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).165C2^2 | 192,1375 |
(S3×C2×C4).166C22 = C6.452- 1+4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).166C2^2 | 192,1376 |
(S3×C2×C4).167C22 = C6.1042- 1+4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).167C2^2 | 192,1383 |
(S3×C2×C4).168C22 = C6.1452+ 1+4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4).168C2^2 | 192,1388 |
(S3×C2×C4).169C22 = C6.1072- 1+4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).169C2^2 | 192,1390 |
(S3×C2×C4).170C22 = C6.1082- 1+4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).170C2^2 | 192,1392 |
(S3×C2×C4).171C22 = C6.1482+ 1+4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).171C2^2 | 192,1393 |
(S3×C2×C4).172C22 = C2×Q8.15D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).172C2^2 | 192,1519 |
(S3×C2×C4).173C22 = C2×Q8○D12 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).173C2^2 | 192,1522 |
(S3×C2×C4).174C22 = S3×2- 1+4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | 8- | (S3xC2xC4).174C2^2 | 192,1526 |
(S3×C2×C4).175C22 = C8⋊6D12 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).175C2^2 | 192,247 |
(S3×C2×C4).176C22 = C42.243D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).176C2^2 | 192,249 |
(S3×C2×C4).177C22 = C8⋊9D12 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).177C2^2 | 192,265 |
(S3×C2×C4).178C22 = C42.185D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).178C2^2 | 192,268 |
(S3×C2×C4).179C22 = Dic3⋊M4(2) | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).179C2^2 | 192,288 |
(S3×C2×C4).180C22 = C3⋊C8⋊26D4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).180C2^2 | 192,289 |
(S3×C2×C4).181C22 = C12⋊2M4(2) | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).181C2^2 | 192,397 |
(S3×C2×C4).182C22 = C42.31D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).182C2^2 | 192,399 |
(S3×C2×C4).183C22 = (C22×C8)⋊7S3 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).183C2^2 | 192,669 |
(S3×C2×C4).184C22 = C24⋊33D4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).184C2^2 | 192,670 |
(S3×C2×C4).185C22 = C24⋊21D4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).185C2^2 | 192,687 |
(S3×C2×C4).186C22 = D6⋊C8⋊40C2 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).186C2^2 | 192,688 |
(S3×C2×C4).187C22 = C42.276D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).187C2^2 | 192,1036 |
(S3×C2×C4).188C22 = C42.277D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).188C2^2 | 192,1038 |
(S3×C2×C4).189C22 = C6.82+ 1+4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).189C2^2 | 192,1063 |
(S3×C2×C4).190C22 = C6.2- 1+4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).190C2^2 | 192,1066 |
(S3×C2×C4).191C22 = C6.102+ 1+4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).191C2^2 | 192,1070 |
(S3×C2×C4).192C22 = C6.62- 1+4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).192C2^2 | 192,1074 |
(S3×C2×C4).193C22 = C42.96D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).193C2^2 | 192,1090 |
(S3×C2×C4).194C22 = C42.97D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).194C2^2 | 192,1091 |
(S3×C2×C4).195C22 = C42.99D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).195C2^2 | 192,1093 |
(S3×C2×C4).196C22 = C42.100D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).196C2^2 | 192,1094 |
(S3×C2×C4).197C22 = C42.102D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).197C2^2 | 192,1097 |
(S3×C2×C4).198C22 = C42.104D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).198C2^2 | 192,1099 |
(S3×C2×C4).199C22 = Dic6⋊23D4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).199C2^2 | 192,1111 |
(S3×C2×C4).200C22 = Dic6⋊24D4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).200C2^2 | 192,1112 |
(S3×C2×C4).201C22 = C42⋊18D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4).201C2^2 | 192,1115 |
(S3×C2×C4).202C22 = C42.114D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).202C2^2 | 192,1118 |
(S3×C2×C4).203C22 = C42.116D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).203C2^2 | 192,1121 |
(S3×C2×C4).204C22 = C42.118D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).204C2^2 | 192,1123 |
(S3×C2×C4).205C22 = C42.119D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).205C2^2 | 192,1124 |
(S3×C2×C4).206C22 = C42.122D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).206C2^2 | 192,1127 |
(S3×C2×C4).207C22 = C42.136D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).207C2^2 | 192,1144 |
(S3×C2×C4).208C22 = C6.342+ 1+4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).208C2^2 | 192,1160 |
(S3×C2×C4).209C22 = C6.442+ 1+4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).209C2^2 | 192,1174 |
(S3×C2×C4).210C22 = C6.202- 1+4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).210C2^2 | 192,1197 |
(S3×C2×C4).211C22 = C6.222- 1+4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).211C2^2 | 192,1199 |
(S3×C2×C4).212C22 = C6.652+ 1+4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).212C2^2 | 192,1221 |
(S3×C2×C4).213C22 = C6.672+ 1+4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).213C2^2 | 192,1223 |
(S3×C2×C4).214C22 = C42.138D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).214C2^2 | 192,1229 |
(S3×C2×C4).215C22 = C42⋊23D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4).215C2^2 | 192,1238 |
(S3×C2×C4).216C22 = C42.143D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).216C2^2 | 192,1240 |
(S3×C2×C4).217C22 = D12⋊7Q8 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).217C2^2 | 192,1249 |
(S3×C2×C4).218C22 = C42.160D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).218C2^2 | 192,1261 |
(S3×C2×C4).219C22 = C42.161D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).219C2^2 | 192,1266 |
(S3×C2×C4).220C22 = C42.162D6 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).220C2^2 | 192,1267 |
(S3×C2×C4).221C22 = (C2×C12)⋊17D4 | φ: C22/C1 → C22 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).221C2^2 | 192,1391 |
(S3×C2×C4).222C22 = S3×D4⋊C4 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4).222C2^2 | 192,328 |
(S3×C2×C4).223C22 = D4⋊2S3⋊C4 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).223C2^2 | 192,331 |
(S3×C2×C4).224C22 = D6⋊D8 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).224C2^2 | 192,334 |
(S3×C2×C4).225C22 = D6⋊SD16 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).225C2^2 | 192,337 |
(S3×C2×C4).226C22 = S3×Q8⋊C4 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).226C2^2 | 192,360 |
(S3×C2×C4).227C22 = C4⋊C4.150D6 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).227C2^2 | 192,363 |
(S3×C2×C4).228C22 = D6⋊2SD16 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).228C2^2 | 192,366 |
(S3×C2×C4).229C22 = D6⋊1Q16 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).229C2^2 | 192,372 |
(S3×C2×C4).230C22 = S3×C4≀C2 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 24 | 4 | (S3xC2xC4).230C2^2 | 192,379 |
(S3×C2×C4).231C22 = S3×C4.Q8 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).231C2^2 | 192,418 |
(S3×C2×C4).232C22 = (S3×C8)⋊C4 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).232C2^2 | 192,419 |
(S3×C2×C4).233C22 = C8⋊8D12 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).233C2^2 | 192,423 |
(S3×C2×C4).234C22 = S3×C2.D8 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).234C2^2 | 192,438 |
(S3×C2×C4).235C22 = C8.27(C4×S3) | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).235C2^2 | 192,439 |
(S3×C2×C4).236C22 = D6⋊2D8 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).236C2^2 | 192,442 |
(S3×C2×C4).237C22 = D6⋊2Q16 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).237C2^2 | 192,446 |
(S3×C2×C4).238C22 = S3×C8.C4 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 48 | 4 | (S3xC2xC4).238C2^2 | 192,451 |
(S3×C2×C4).239C22 = D6⋊3D8 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).239C2^2 | 192,716 |
(S3×C2×C4).240C22 = C24⋊14D4 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).240C2^2 | 192,730 |
(S3×C2×C4).241C22 = D6⋊3Q16 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).241C2^2 | 192,747 |
(S3×C2×C4).242C22 = C2×S3×C4⋊C4 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).242C2^2 | 192,1060 |
(S3×C2×C4).243C22 = C2×C4⋊C4⋊7S3 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).243C2^2 | 192,1061 |
(S3×C2×C4).244C22 = C2×C4.D12 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).244C2^2 | 192,1068 |
(S3×C2×C4).245C22 = S3×C42⋊C2 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4).245C2^2 | 192,1079 |
(S3×C2×C4).246C22 = C4×Q8⋊3S3 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).246C2^2 | 192,1132 |
(S3×C2×C4).247C22 = C4⋊C4⋊21D6 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4).247C2^2 | 192,1165 |
(S3×C2×C4).248C22 = S3×C42.C2 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).248C2^2 | 192,1246 |
(S3×C2×C4).249C22 = C42.236D6 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).249C2^2 | 192,1247 |
(S3×C2×C4).250C22 = S3×C4⋊1D4 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4).250C2^2 | 192,1273 |
(S3×C2×C4).251C22 = C42.238D6 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).251C2^2 | 192,1275 |
(S3×C2×C4).252C22 = C42.241D6 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).252C2^2 | 192,1287 |
(S3×C2×C4).253C22 = C2×S3×M4(2) | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4).253C2^2 | 192,1302 |
(S3×C2×C4).254C22 = S3×C8○D4 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 48 | 4 | (S3xC2xC4).254C2^2 | 192,1308 |
(S3×C2×C4).255C22 = C2×S3×D8 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4).255C2^2 | 192,1313 |
(S3×C2×C4).256C22 = C2×D8⋊3S3 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).256C2^2 | 192,1315 |
(S3×C2×C4).257C22 = C2×S3×SD16 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4).257C2^2 | 192,1317 |
(S3×C2×C4).258C22 = C2×Q8.7D6 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).258C2^2 | 192,1320 |
(S3×C2×C4).259C22 = C2×S3×Q16 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).259C2^2 | 192,1322 |
(S3×C2×C4).260C22 = C2×D24⋊C2 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).260C2^2 | 192,1324 |
(S3×C2×C4).261C22 = S3×C4○D8 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 48 | 4 | (S3xC2xC4).261C2^2 | 192,1326 |
(S3×C2×C4).262C22 = C2×D6⋊3Q8 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).262C2^2 | 192,1372 |
(S3×C2×C4).263C22 = (C2×D4)⋊43D6 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4).263C2^2 | 192,1387 |
(S3×C2×C4).264C22 = C22×S3×Q8 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).264C2^2 | 192,1517 |
(S3×C2×C4).265C22 = C42.282D6 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).265C2^2 | 192,244 |
(S3×C2×C4).266C22 = C8×D12 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).266C2^2 | 192,245 |
(S3×C2×C4).267C22 = C4×C8⋊S3 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).267C2^2 | 192,246 |
(S3×C2×C4).268C22 = D6.C42 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).268C2^2 | 192,248 |
(S3×C2×C4).269C22 = C42.182D6 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).269C2^2 | 192,264 |
(S3×C2×C4).270C22 = Dic3⋊5M4(2) | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).270C2^2 | 192,266 |
(S3×C2×C4).271C22 = D6.4C42 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).271C2^2 | 192,267 |
(S3×C2×C4).272C22 = C3⋊D4⋊C8 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).272C2^2 | 192,284 |
(S3×C2×C4).273C22 = D6⋊M4(2) | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4).273C2^2 | 192,285 |
(S3×C2×C4).274C22 = D6⋊C8⋊C2 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).274C2^2 | 192,286 |
(S3×C2×C4).275C22 = D6⋊2M4(2) | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).275C2^2 | 192,287 |
(S3×C2×C4).276C22 = C42.200D6 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).276C2^2 | 192,392 |
(S3×C2×C4).277C22 = D12⋊C8 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).277C2^2 | 192,393 |
(S3×C2×C4).278C22 = C42.202D6 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).278C2^2 | 192,394 |
(S3×C2×C4).279C22 = D6⋊3M4(2) | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).279C2^2 | 192,395 |
(S3×C2×C4).280C22 = C12⋊M4(2) | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).280C2^2 | 192,396 |
(S3×C2×C4).281C22 = C42.30D6 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).281C2^2 | 192,398 |
(S3×C2×C4).282C22 = C2×D6⋊C8 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).282C2^2 | 192,667 |
(S3×C2×C4).283C22 = C8×C3⋊D4 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).283C2^2 | 192,668 |
(S3×C2×C4).284C22 = D6⋊6M4(2) | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4).284C2^2 | 192,685 |
(S3×C2×C4).285C22 = C24⋊D4 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).285C2^2 | 192,686 |
(S3×C2×C4).286C22 = C2×C42⋊2S3 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).286C2^2 | 192,1031 |
(S3×C2×C4).287C22 = C4×C4○D12 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).287C2^2 | 192,1033 |
(S3×C2×C4).288C22 = C2×D6⋊Q8 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).288C2^2 | 192,1067 |
(S3×C2×C4).289C22 = C42.188D6 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).289C2^2 | 192,1081 |
(S3×C2×C4).290C22 = C42.93D6 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).290C2^2 | 192,1087 |
(S3×C2×C4).291C22 = C4×D4⋊2S3 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).291C2^2 | 192,1095 |
(S3×C2×C4).292C22 = C42.228D6 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).292C2^2 | 192,1107 |
(S3×C2×C4).293C22 = C42.229D6 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).293C2^2 | 192,1116 |
(S3×C2×C4).294C22 = C4×S3×Q8 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).294C2^2 | 192,1130 |
(S3×C2×C4).295C22 = C42.232D6 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).295C2^2 | 192,1137 |
(S3×C2×C4).296C22 = C42.131D6 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).296C2^2 | 192,1139 |
(S3×C2×C4).297C22 = S3×C4.4D4 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4).297C2^2 | 192,1232 |
(S3×C2×C4).298C22 = C42.234D6 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).298C2^2 | 192,1239 |
(S3×C2×C4).299C22 = S3×C42⋊2C2 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 48 | | (S3xC2xC4).299C2^2 | 192,1262 |
(S3×C2×C4).300C22 = C42.189D6 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).300C2^2 | 192,1265 |
(S3×C2×C4).301C22 = C22×C8⋊S3 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).301C2^2 | 192,1296 |
(S3×C2×C4).302C22 = C2×C8○D12 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).302C2^2 | 192,1297 |
(S3×C2×C4).303C22 = C2×D12.C4 | φ: C22/C2 → C2 ⊆ Out S3×C2×C4 | 96 | | (S3xC2xC4).303C2^2 | 192,1303 |
(S3×C2×C4).304C22 = S3×C4×C8 | φ: trivial image | 96 | | (S3xC2xC4).304C2^2 | 192,243 |
(S3×C2×C4).305C22 = S3×C8⋊C4 | φ: trivial image | 96 | | (S3xC2xC4).305C2^2 | 192,263 |
(S3×C2×C4).306C22 = S3×C22⋊C8 | φ: trivial image | 48 | | (S3xC2xC4).306C2^2 | 192,283 |
(S3×C2×C4).307C22 = S3×C4⋊C8 | φ: trivial image | 96 | | (S3xC2xC4).307C2^2 | 192,391 |
(S3×C2×C4).308C22 = S3×C2×C42 | φ: trivial image | 96 | | (S3xC2xC4).308C2^2 | 192,1030 |
(S3×C2×C4).309C22 = S3×C22×C8 | φ: trivial image | 96 | | (S3xC2xC4).309C2^2 | 192,1295 |