| extension | φ:Q→Out N | d | ρ | Label | ID |
|---|
| (C22×S3)⋊1(C2×C4) = S3×C23⋊C4 | φ: C2×C4/C2 → C4 ⊆ Out C22×S3 | 24 | 8+ | (C2^2xS3):1(C2xC4) | 192,302 |
| (C22×S3)⋊2(C2×C4) = C2×C23.6D6 | φ: C2×C4/C2 → C4 ⊆ Out C22×S3 | 48 | | (C2^2xS3):2(C2xC4) | 192,513 |
| (C22×S3)⋊3(C2×C4) = (C2×C4)⋊9D12 | φ: C2×C4/C2 → C22 ⊆ Out C22×S3 | 96 | | (C2^2xS3):3(C2xC4) | 192,224 |
| (C22×S3)⋊4(C2×C4) = C24.60D6 | φ: C2×C4/C2 → C22 ⊆ Out C22×S3 | 96 | | (C2^2xS3):4(C2xC4) | 192,517 |
| (C22×S3)⋊5(C2×C4) = C24.76D6 | φ: C2×C4/C2 → C22 ⊆ Out C22×S3 | 96 | | (C2^2xS3):5(C2xC4) | 192,772 |
| (C22×S3)⋊6(C2×C4) = C24.35D6 | φ: C2×C4/C2 → C22 ⊆ Out C22×S3 | 48 | | (C2^2xS3):6(C2xC4) | 192,1045 |
| (C22×S3)⋊7(C2×C4) = C42⋊9D6 | φ: C2×C4/C2 → C22 ⊆ Out C22×S3 | 48 | | (C2^2xS3):7(C2xC4) | 192,1080 |
| (C22×S3)⋊8(C2×C4) = C42⋊13D6 | φ: C2×C4/C2 → C22 ⊆ Out C22×S3 | 48 | | (C2^2xS3):8(C2xC4) | 192,1104 |
| (C22×S3)⋊9(C2×C4) = C2×C4×D12 | φ: C2×C4/C4 → C2 ⊆ Out C22×S3 | 96 | | (C2^2xS3):9(C2xC4) | 192,1032 |
| (C22×S3)⋊10(C2×C4) = C2×Dic3⋊4D4 | φ: C2×C4/C4 → C2 ⊆ Out C22×S3 | 96 | | (C2^2xS3):10(C2xC4) | 192,1044 |
| (C22×S3)⋊11(C2×C4) = C2×Dic3⋊5D4 | φ: C2×C4/C4 → C2 ⊆ Out C22×S3 | 96 | | (C2^2xS3):11(C2xC4) | 192,1062 |
| (C22×S3)⋊12(C2×C4) = C4×S3×D4 | φ: C2×C4/C4 → C2 ⊆ Out C22×S3 | 48 | | (C2^2xS3):12(C2xC4) | 192,1103 |
| (C22×S3)⋊13(C2×C4) = C2×C4×C3⋊D4 | φ: C2×C4/C4 → C2 ⊆ Out C22×S3 | 96 | | (C2^2xS3):13(C2xC4) | 192,1347 |
| (C22×S3)⋊14(C2×C4) = C2×S3×C22⋊C4 | φ: C2×C4/C22 → C2 ⊆ Out C22×S3 | 48 | | (C2^2xS3):14(C2xC4) | 192,1043 |
| (C22×S3)⋊15(C2×C4) = C22×D6⋊C4 | φ: C2×C4/C22 → C2 ⊆ Out C22×S3 | 96 | | (C2^2xS3):15(C2xC4) | 192,1346 |
| extension | φ:Q→Out N | d | ρ | Label | ID |
|---|
| (C22×S3).1(C2×C4) = C23⋊C4⋊5S3 | φ: C2×C4/C2 → C4 ⊆ Out C22×S3 | 48 | 8- | (C2^2xS3).1(C2xC4) | 192,299 |
| (C22×S3).2(C2×C4) = S3×C4.D4 | φ: C2×C4/C2 → C4 ⊆ Out C22×S3 | 24 | 8+ | (C2^2xS3).2(C2xC4) | 192,303 |
| (C22×S3).3(C2×C4) = M4(2).21D6 | φ: C2×C4/C2 → C4 ⊆ Out C22×S3 | 48 | 8+ | (C2^2xS3).3(C2xC4) | 192,310 |
| (C22×S3).4(C2×C4) = (C2×D12)⋊13C4 | φ: C2×C4/C2 → C4 ⊆ Out C22×S3 | 48 | 4 | (C2^2xS3).4(C2xC4) | 192,565 |
| (C22×S3).5(C2×C4) = C2×C12.46D4 | φ: C2×C4/C2 → C4 ⊆ Out C22×S3 | 48 | | (C2^2xS3).5(C2xC4) | 192,689 |
| (C22×S3).6(C2×C4) = M4(2).31D6 | φ: C2×C4/C2 → C4 ⊆ Out C22×S3 | 48 | 4 | (C2^2xS3).6(C2xC4) | 192,691 |
| (C22×S3).7(C2×C4) = D6⋊C4⋊5C4 | φ: C2×C4/C2 → C22 ⊆ Out C22×S3 | 96 | | (C2^2xS3).7(C2xC4) | 192,228 |
| (C22×S3).8(C2×C4) = D6⋊C4⋊3C4 | φ: C2×C4/C2 → C22 ⊆ Out C22×S3 | 96 | | (C2^2xS3).8(C2xC4) | 192,229 |
| (C22×S3).9(C2×C4) = C8⋊6D12 | φ: C2×C4/C2 → C22 ⊆ Out C22×S3 | 96 | | (C2^2xS3).9(C2xC4) | 192,247 |
| (C22×S3).10(C2×C4) = C42.243D6 | φ: C2×C4/C2 → C22 ⊆ Out C22×S3 | 96 | | (C2^2xS3).10(C2xC4) | 192,249 |
| (C22×S3).11(C2×C4) = C42.185D6 | φ: C2×C4/C2 → C22 ⊆ Out C22×S3 | 96 | | (C2^2xS3).11(C2xC4) | 192,268 |
| (C22×S3).12(C2×C4) = D6⋊C8⋊C2 | φ: C2×C4/C2 → C22 ⊆ Out C22×S3 | 96 | | (C2^2xS3).12(C2xC4) | 192,286 |
| (C22×S3).13(C2×C4) = Dic3⋊M4(2) | φ: C2×C4/C2 → C22 ⊆ Out C22×S3 | 96 | | (C2^2xS3).13(C2xC4) | 192,288 |
| (C22×S3).14(C2×C4) = C3⋊C8⋊26D4 | φ: C2×C4/C2 → C22 ⊆ Out C22×S3 | 96 | | (C2^2xS3).14(C2xC4) | 192,289 |
| (C22×S3).15(C2×C4) = M4(2).19D6 | φ: C2×C4/C2 → C22 ⊆ Out C22×S3 | 48 | 8- | (C2^2xS3).15(C2xC4) | 192,304 |
| (C22×S3).16(C2×C4) = C12⋊2M4(2) | φ: C2×C4/C2 → C22 ⊆ Out C22×S3 | 96 | | (C2^2xS3).16(C2xC4) | 192,397 |
| (C22×S3).17(C2×C4) = C42.31D6 | φ: C2×C4/C2 → C22 ⊆ Out C22×S3 | 96 | | (C2^2xS3).17(C2xC4) | 192,399 |
| (C22×S3).18(C2×C4) = (C2×C4)⋊6D12 | φ: C2×C4/C2 → C22 ⊆ Out C22×S3 | 96 | | (C2^2xS3).18(C2xC4) | 192,498 |
| (C22×S3).19(C2×C4) = (C2×C42)⋊3S3 | φ: C2×C4/C2 → C22 ⊆ Out C22×S3 | 96 | | (C2^2xS3).19(C2xC4) | 192,499 |
| (C22×S3).20(C2×C4) = C24.24D6 | φ: C2×C4/C2 → C22 ⊆ Out C22×S3 | 96 | | (C2^2xS3).20(C2xC4) | 192,516 |
| (C22×S3).21(C2×C4) = (C2×D12)⋊10C4 | φ: C2×C4/C2 → C22 ⊆ Out C22×S3 | 96 | | (C2^2xS3).21(C2xC4) | 192,547 |
| (C22×S3).22(C2×C4) = D6⋊C4⋊7C4 | φ: C2×C4/C2 → C22 ⊆ Out C22×S3 | 96 | | (C2^2xS3).22(C2xC4) | 192,549 |
| (C22×S3).23(C2×C4) = (C22×C8)⋊7S3 | φ: C2×C4/C2 → C22 ⊆ Out C22×S3 | 96 | | (C2^2xS3).23(C2xC4) | 192,669 |
| (C22×S3).24(C2×C4) = C24⋊33D4 | φ: C2×C4/C2 → C22 ⊆ Out C22×S3 | 96 | | (C2^2xS3).24(C2xC4) | 192,670 |
| (C22×S3).25(C2×C4) = C24⋊21D4 | φ: C2×C4/C2 → C22 ⊆ Out C22×S3 | 96 | | (C2^2xS3).25(C2xC4) | 192,687 |
| (C22×S3).26(C2×C4) = D6⋊C8⋊40C2 | φ: C2×C4/C2 → C22 ⊆ Out C22×S3 | 96 | | (C2^2xS3).26(C2xC4) | 192,688 |
| (C22×S3).27(C2×C4) = M4(2)⋊26D6 | φ: C2×C4/C2 → C22 ⊆ Out C22×S3 | 48 | 4 | (C2^2xS3).27(C2xC4) | 192,1304 |
| (C22×S3).28(C2×C4) = M4(2)⋊28D6 | φ: C2×C4/C2 → C22 ⊆ Out C22×S3 | 48 | 4 | (C2^2xS3).28(C2xC4) | 192,1309 |
| (C22×S3).29(C2×C4) = D6⋊C42 | φ: C2×C4/C4 → C2 ⊆ Out C22×S3 | 96 | | (C2^2xS3).29(C2xC4) | 192,225 |
| (C22×S3).30(C2×C4) = D6⋊C4⋊C4 | φ: C2×C4/C4 → C2 ⊆ Out C22×S3 | 96 | | (C2^2xS3).30(C2xC4) | 192,227 |
| (C22×S3).31(C2×C4) = C8×D12 | φ: C2×C4/C4 → C2 ⊆ Out C22×S3 | 96 | | (C2^2xS3).31(C2xC4) | 192,245 |
| (C22×S3).32(C2×C4) = D6.C42 | φ: C2×C4/C4 → C2 ⊆ Out C22×S3 | 96 | | (C2^2xS3).32(C2xC4) | 192,248 |
| (C22×S3).33(C2×C4) = C8⋊9D12 | φ: C2×C4/C4 → C2 ⊆ Out C22×S3 | 96 | | (C2^2xS3).33(C2xC4) | 192,265 |
| (C22×S3).34(C2×C4) = D6.4C42 | φ: C2×C4/C4 → C2 ⊆ Out C22×S3 | 96 | | (C2^2xS3).34(C2xC4) | 192,267 |
| (C22×S3).35(C2×C4) = C3⋊D4⋊C8 | φ: C2×C4/C4 → C2 ⊆ Out C22×S3 | 96 | | (C2^2xS3).35(C2xC4) | 192,284 |
| (C22×S3).36(C2×C4) = D6⋊2M4(2) | φ: C2×C4/C4 → C2 ⊆ Out C22×S3 | 96 | | (C2^2xS3).36(C2xC4) | 192,287 |
| (C22×S3).37(C2×C4) = D12⋊C8 | φ: C2×C4/C4 → C2 ⊆ Out C22×S3 | 96 | | (C2^2xS3).37(C2xC4) | 192,393 |
| (C22×S3).38(C2×C4) = D6⋊3M4(2) | φ: C2×C4/C4 → C2 ⊆ Out C22×S3 | 96 | | (C2^2xS3).38(C2xC4) | 192,395 |
| (C22×S3).39(C2×C4) = C42.30D6 | φ: C2×C4/C4 → C2 ⊆ Out C22×S3 | 96 | | (C2^2xS3).39(C2xC4) | 192,398 |
| (C22×S3).40(C2×C4) = C4×D6⋊C4 | φ: C2×C4/C4 → C2 ⊆ Out C22×S3 | 96 | | (C2^2xS3).40(C2xC4) | 192,497 |
| (C22×S3).41(C2×C4) = C24.23D6 | φ: C2×C4/C4 → C2 ⊆ Out C22×S3 | 96 | | (C2^2xS3).41(C2xC4) | 192,515 |
| (C22×S3).42(C2×C4) = D6⋊C4⋊6C4 | φ: C2×C4/C4 → C2 ⊆ Out C22×S3 | 96 | | (C2^2xS3).42(C2xC4) | 192,548 |
| (C22×S3).43(C2×C4) = C8×C3⋊D4 | φ: C2×C4/C4 → C2 ⊆ Out C22×S3 | 96 | | (C2^2xS3).43(C2xC4) | 192,668 |
| (C22×S3).44(C2×C4) = C24⋊D4 | φ: C2×C4/C4 → C2 ⊆ Out C22×S3 | 96 | | (C2^2xS3).44(C2xC4) | 192,686 |
| (C22×S3).45(C2×C4) = C2×C8○D12 | φ: C2×C4/C4 → C2 ⊆ Out C22×S3 | 96 | | (C2^2xS3).45(C2xC4) | 192,1297 |
| (C22×S3).46(C2×C4) = C2×D12.C4 | φ: C2×C4/C4 → C2 ⊆ Out C22×S3 | 96 | | (C2^2xS3).46(C2xC4) | 192,1303 |
| (C22×S3).47(C2×C4) = S3×C8○D4 | φ: C2×C4/C4 → C2 ⊆ Out C22×S3 | 48 | 4 | (C2^2xS3).47(C2xC4) | 192,1308 |
| (C22×S3).48(C2×C4) = C22.58(S3×D4) | φ: C2×C4/C22 → C2 ⊆ Out C22×S3 | 96 | | (C2^2xS3).48(C2xC4) | 192,223 |
| (C22×S3).49(C2×C4) = D6⋊(C4⋊C4) | φ: C2×C4/C22 → C2 ⊆ Out C22×S3 | 96 | | (C2^2xS3).49(C2xC4) | 192,226 |
| (C22×S3).50(C2×C4) = C42.282D6 | φ: C2×C4/C22 → C2 ⊆ Out C22×S3 | 96 | | (C2^2xS3).50(C2xC4) | 192,244 |
| (C22×S3).51(C2×C4) = C4×C8⋊S3 | φ: C2×C4/C22 → C2 ⊆ Out C22×S3 | 96 | | (C2^2xS3).51(C2xC4) | 192,246 |
| (C22×S3).52(C2×C4) = C42.182D6 | φ: C2×C4/C22 → C2 ⊆ Out C22×S3 | 96 | | (C2^2xS3).52(C2xC4) | 192,264 |
| (C22×S3).53(C2×C4) = Dic3⋊5M4(2) | φ: C2×C4/C22 → C2 ⊆ Out C22×S3 | 96 | | (C2^2xS3).53(C2xC4) | 192,266 |
| (C22×S3).54(C2×C4) = S3×C22⋊C8 | φ: C2×C4/C22 → C2 ⊆ Out C22×S3 | 48 | | (C2^2xS3).54(C2xC4) | 192,283 |
| (C22×S3).55(C2×C4) = D6⋊M4(2) | φ: C2×C4/C22 → C2 ⊆ Out C22×S3 | 48 | | (C2^2xS3).55(C2xC4) | 192,285 |
| (C22×S3).56(C2×C4) = S3×C4.10D4 | φ: C2×C4/C22 → C2 ⊆ Out C22×S3 | 48 | 8- | (C2^2xS3).56(C2xC4) | 192,309 |
| (C22×S3).57(C2×C4) = C42.200D6 | φ: C2×C4/C22 → C2 ⊆ Out C22×S3 | 96 | | (C2^2xS3).57(C2xC4) | 192,392 |
| (C22×S3).58(C2×C4) = C42.202D6 | φ: C2×C4/C22 → C2 ⊆ Out C22×S3 | 96 | | (C2^2xS3).58(C2xC4) | 192,394 |
| (C22×S3).59(C2×C4) = C12⋊M4(2) | φ: C2×C4/C22 → C2 ⊆ Out C22×S3 | 96 | | (C2^2xS3).59(C2xC4) | 192,396 |
| (C22×S3).60(C2×C4) = C24.59D6 | φ: C2×C4/C22 → C2 ⊆ Out C22×S3 | 48 | | (C2^2xS3).60(C2xC4) | 192,514 |
| (C22×S3).61(C2×C4) = C4⋊(D6⋊C4) | φ: C2×C4/C22 → C2 ⊆ Out C22×S3 | 96 | | (C2^2xS3).61(C2xC4) | 192,546 |
| (C22×S3).62(C2×C4) = C2×D6⋊C8 | φ: C2×C4/C22 → C2 ⊆ Out C22×S3 | 96 | | (C2^2xS3).62(C2xC4) | 192,667 |
| (C22×S3).63(C2×C4) = D6⋊6M4(2) | φ: C2×C4/C22 → C2 ⊆ Out C22×S3 | 48 | | (C2^2xS3).63(C2xC4) | 192,685 |
| (C22×S3).64(C2×C4) = C2×C42⋊2S3 | φ: C2×C4/C22 → C2 ⊆ Out C22×S3 | 96 | | (C2^2xS3).64(C2xC4) | 192,1031 |
| (C22×S3).65(C2×C4) = C2×C4⋊C4⋊7S3 | φ: C2×C4/C22 → C2 ⊆ Out C22×S3 | 96 | | (C2^2xS3).65(C2xC4) | 192,1061 |
| (C22×S3).66(C2×C4) = S3×C42⋊C2 | φ: C2×C4/C22 → C2 ⊆ Out C22×S3 | 48 | | (C2^2xS3).66(C2xC4) | 192,1079 |
| (C22×S3).67(C2×C4) = C22×C8⋊S3 | φ: C2×C4/C22 → C2 ⊆ Out C22×S3 | 96 | | (C2^2xS3).67(C2xC4) | 192,1296 |
| (C22×S3).68(C2×C4) = C2×S3×M4(2) | φ: C2×C4/C22 → C2 ⊆ Out C22×S3 | 48 | | (C2^2xS3).68(C2xC4) | 192,1302 |
| (C22×S3).69(C2×C4) = S3×C2.C42 | φ: trivial image | 96 | | (C2^2xS3).69(C2xC4) | 192,222 |
| (C22×S3).70(C2×C4) = S3×C4×C8 | φ: trivial image | 96 | | (C2^2xS3).70(C2xC4) | 192,243 |
| (C22×S3).71(C2×C4) = S3×C8⋊C4 | φ: trivial image | 96 | | (C2^2xS3).71(C2xC4) | 192,263 |
| (C22×S3).72(C2×C4) = S3×C4⋊C8 | φ: trivial image | 96 | | (C2^2xS3).72(C2xC4) | 192,391 |
| (C22×S3).73(C2×C4) = S3×C2×C42 | φ: trivial image | 96 | | (C2^2xS3).73(C2xC4) | 192,1030 |
| (C22×S3).74(C2×C4) = C2×S3×C4⋊C4 | φ: trivial image | 96 | | (C2^2xS3).74(C2xC4) | 192,1060 |
| (C22×S3).75(C2×C4) = S3×C22×C8 | φ: trivial image | 96 | | (C2^2xS3).75(C2xC4) | 192,1295 |