extension | φ:Q→Out N | d | ρ | Label | ID |
(S3×C2×C12)⋊1C2 = D6⋊D12 | φ: C2/C1 → C2 ⊆ Out S3×C2×C12 | 48 | | (S3xC2xC12):1C2 | 288,554 |
(S3×C2×C12)⋊2C2 = C2×D6.D6 | φ: C2/C1 → C2 ⊆ Out S3×C2×C12 | 48 | | (S3xC2xC12):2C2 | 288,948 |
(S3×C2×C12)⋊3C2 = D6⋊2D12 | φ: C2/C1 → C2 ⊆ Out S3×C2×C12 | 96 | | (S3xC2xC12):3C2 | 288,556 |
(S3×C2×C12)⋊4C2 = C12⋊7D12 | φ: C2/C1 → C2 ⊆ Out S3×C2×C12 | 48 | | (S3xC2xC12):4C2 | 288,557 |
(S3×C2×C12)⋊5C2 = C3×C12⋊D4 | φ: C2/C1 → C2 ⊆ Out S3×C2×C12 | 96 | | (S3xC2xC12):5C2 | 288,666 |
(S3×C2×C12)⋊6C2 = C3×D6⋊3D4 | φ: C2/C1 → C2 ⊆ Out S3×C2×C12 | 48 | | (S3xC2xC12):6C2 | 288,709 |
(S3×C2×C12)⋊7C2 = C2×D12⋊5S3 | φ: C2/C1 → C2 ⊆ Out S3×C2×C12 | 96 | | (S3xC2xC12):7C2 | 288,943 |
(S3×C2×C12)⋊8C2 = C2×D6.6D6 | φ: C2/C1 → C2 ⊆ Out S3×C2×C12 | 48 | | (S3xC2xC12):8C2 | 288,949 |
(S3×C2×C12)⋊9C2 = C2×S3×D12 | φ: C2/C1 → C2 ⊆ Out S3×C2×C12 | 48 | | (S3xC2xC12):9C2 | 288,951 |
(S3×C2×C12)⋊10C2 = S3×C4○D12 | φ: C2/C1 → C2 ⊆ Out S3×C2×C12 | 48 | 4 | (S3xC2xC12):10C2 | 288,953 |
(S3×C2×C12)⋊11C2 = S3×C6×D4 | φ: C2/C1 → C2 ⊆ Out S3×C2×C12 | 48 | | (S3xC2xC12):11C2 | 288,992 |
(S3×C2×C12)⋊12C2 = C6×D4⋊2S3 | φ: C2/C1 → C2 ⊆ Out S3×C2×C12 | 48 | | (S3xC2xC12):12C2 | 288,993 |
(S3×C2×C12)⋊13C2 = C6×Q8⋊3S3 | φ: C2/C1 → C2 ⊆ Out S3×C2×C12 | 96 | | (S3xC2xC12):13C2 | 288,996 |
(S3×C2×C12)⋊14C2 = C3×S3×C4○D4 | φ: C2/C1 → C2 ⊆ Out S3×C2×C12 | 48 | 4 | (S3xC2xC12):14C2 | 288,998 |
(S3×C2×C12)⋊15C2 = C62.20C23 | φ: C2/C1 → C2 ⊆ Out S3×C2×C12 | 48 | | (S3xC2xC12):15C2 | 288,498 |
(S3×C2×C12)⋊16C2 = C62.49C23 | φ: C2/C1 → C2 ⊆ Out S3×C2×C12 | 96 | | (S3xC2xC12):16C2 | 288,527 |
(S3×C2×C12)⋊17C2 = C4×D6⋊S3 | φ: C2/C1 → C2 ⊆ Out S3×C2×C12 | 96 | | (S3xC2xC12):17C2 | 288,549 |
(S3×C2×C12)⋊18C2 = C4×C3⋊D12 | φ: C2/C1 → C2 ⊆ Out S3×C2×C12 | 48 | | (S3xC2xC12):18C2 | 288,551 |
(S3×C2×C12)⋊19C2 = C62.74C23 | φ: C2/C1 → C2 ⊆ Out S3×C2×C12 | 48 | | (S3xC2xC12):19C2 | 288,552 |
(S3×C2×C12)⋊20C2 = C62.75C23 | φ: C2/C1 → C2 ⊆ Out S3×C2×C12 | 96 | | (S3xC2xC12):20C2 | 288,553 |
(S3×C2×C12)⋊21C2 = S3×D6⋊C4 | φ: C2/C1 → C2 ⊆ Out S3×C2×C12 | 48 | | (S3xC2xC12):21C2 | 288,568 |
(S3×C2×C12)⋊22C2 = C12×D12 | φ: C2/C1 → C2 ⊆ Out S3×C2×C12 | 96 | | (S3xC2xC12):22C2 | 288,644 |
(S3×C2×C12)⋊23C2 = C3×S3×C22⋊C4 | φ: C2/C1 → C2 ⊆ Out S3×C2×C12 | 48 | | (S3xC2xC12):23C2 | 288,651 |
(S3×C2×C12)⋊24C2 = C3×Dic3⋊4D4 | φ: C2/C1 → C2 ⊆ Out S3×C2×C12 | 48 | | (S3xC2xC12):24C2 | 288,652 |
(S3×C2×C12)⋊25C2 = C3×C23.9D6 | φ: C2/C1 → C2 ⊆ Out S3×C2×C12 | 48 | | (S3xC2xC12):25C2 | 288,654 |
(S3×C2×C12)⋊26C2 = C3×Dic3⋊5D4 | φ: C2/C1 → C2 ⊆ Out S3×C2×C12 | 96 | | (S3xC2xC12):26C2 | 288,664 |
(S3×C2×C12)⋊27C2 = C3×D6.D4 | φ: C2/C1 → C2 ⊆ Out S3×C2×C12 | 96 | | (S3xC2xC12):27C2 | 288,665 |
(S3×C2×C12)⋊28C2 = C12×C3⋊D4 | φ: C2/C1 → C2 ⊆ Out S3×C2×C12 | 48 | | (S3xC2xC12):28C2 | 288,699 |
(S3×C2×C12)⋊29C2 = S32×C2×C4 | φ: C2/C1 → C2 ⊆ Out S3×C2×C12 | 48 | | (S3xC2xC12):29C2 | 288,950 |
(S3×C2×C12)⋊30C2 = C3×Dic3⋊D4 | φ: C2/C1 → C2 ⊆ Out S3×C2×C12 | 48 | | (S3xC2xC12):30C2 | 288,655 |
(S3×C2×C12)⋊31C2 = C6×C4○D12 | φ: C2/C1 → C2 ⊆ Out S3×C2×C12 | 48 | | (S3xC2xC12):31C2 | 288,991 |
extension | φ:Q→Out N | d | ρ | Label | ID |
(S3×C2×C12).1C2 = C2×D6.Dic3 | φ: C2/C1 → C2 ⊆ Out S3×C2×C12 | 96 | | (S3xC2xC12).1C2 | 288,467 |
(S3×C2×C12).2C2 = D6⋊Dic6 | φ: C2/C1 → C2 ⊆ Out S3×C2×C12 | 96 | | (S3xC2xC12).2C2 | 288,499 |
(S3×C2×C12).3C2 = C62.25C23 | φ: C2/C1 → C2 ⊆ Out S3×C2×C12 | 96 | | (S3xC2xC12).3C2 | 288,503 |
(S3×C2×C12).4C2 = S3×C4.Dic3 | φ: C2/C1 → C2 ⊆ Out S3×C2×C12 | 48 | 4 | (S3xC2xC12).4C2 | 288,461 |
(S3×C2×C12).5C2 = C62.11C23 | φ: C2/C1 → C2 ⊆ Out S3×C2×C12 | 96 | | (S3xC2xC12).5C2 | 288,489 |
(S3×C2×C12).6C2 = D6⋊6Dic6 | φ: C2/C1 → C2 ⊆ Out S3×C2×C12 | 96 | | (S3xC2xC12).6C2 | 288,504 |
(S3×C2×C12).7C2 = D6⋊7Dic6 | φ: C2/C1 → C2 ⊆ Out S3×C2×C12 | 96 | | (S3xC2xC12).7C2 | 288,505 |
(S3×C2×C12).8C2 = S3×C4⋊Dic3 | φ: C2/C1 → C2 ⊆ Out S3×C2×C12 | 96 | | (S3xC2xC12).8C2 | 288,537 |
(S3×C2×C12).9C2 = C3×S3×C4⋊C4 | φ: C2/C1 → C2 ⊆ Out S3×C2×C12 | 96 | | (S3xC2xC12).9C2 | 288,662 |
(S3×C2×C12).10C2 = C3×C4⋊C4⋊7S3 | φ: C2/C1 → C2 ⊆ Out S3×C2×C12 | 96 | | (S3xC2xC12).10C2 | 288,663 |
(S3×C2×C12).11C2 = C3×C4.D12 | φ: C2/C1 → C2 ⊆ Out S3×C2×C12 | 96 | | (S3xC2xC12).11C2 | 288,668 |
(S3×C2×C12).12C2 = C3×S3×M4(2) | φ: C2/C1 → C2 ⊆ Out S3×C2×C12 | 48 | 4 | (S3xC2xC12).12C2 | 288,677 |
(S3×C2×C12).13C2 = C3×D6⋊3Q8 | φ: C2/C1 → C2 ⊆ Out S3×C2×C12 | 96 | | (S3xC2xC12).13C2 | 288,717 |
(S3×C2×C12).14C2 = C2×S3×Dic6 | φ: C2/C1 → C2 ⊆ Out S3×C2×C12 | 96 | | (S3xC2xC12).14C2 | 288,942 |
(S3×C2×C12).15C2 = S3×C6×Q8 | φ: C2/C1 → C2 ⊆ Out S3×C2×C12 | 96 | | (S3xC2xC12).15C2 | 288,995 |
(S3×C2×C12).16C2 = C12.77D12 | φ: C2/C1 → C2 ⊆ Out S3×C2×C12 | 96 | | (S3xC2xC12).16C2 | 288,204 |
(S3×C2×C12).17C2 = C3×D6⋊C8 | φ: C2/C1 → C2 ⊆ Out S3×C2×C12 | 96 | | (S3xC2xC12).17C2 | 288,254 |
(S3×C2×C12).18C2 = C2×S3×C3⋊C8 | φ: C2/C1 → C2 ⊆ Out S3×C2×C12 | 96 | | (S3xC2xC12).18C2 | 288,460 |
(S3×C2×C12).19C2 = C4×S3×Dic3 | φ: C2/C1 → C2 ⊆ Out S3×C2×C12 | 96 | | (S3xC2xC12).19C2 | 288,523 |
(S3×C2×C12).20C2 = S3×Dic3⋊C4 | φ: C2/C1 → C2 ⊆ Out S3×C2×C12 | 96 | | (S3xC2xC12).20C2 | 288,524 |
(S3×C2×C12).21C2 = C3×C42⋊2S3 | φ: C2/C1 → C2 ⊆ Out S3×C2×C12 | 96 | | (S3xC2xC12).21C2 | 288,643 |
(S3×C2×C12).22C2 = C3×D6⋊Q8 | φ: C2/C1 → C2 ⊆ Out S3×C2×C12 | 96 | | (S3xC2xC12).22C2 | 288,667 |
(S3×C2×C12).23C2 = C6×C8⋊S3 | φ: C2/C1 → C2 ⊆ Out S3×C2×C12 | 96 | | (S3xC2xC12).23C2 | 288,671 |
(S3×C2×C12).24C2 = S3×C4×C12 | φ: trivial image | 96 | | (S3xC2xC12).24C2 | 288,642 |
(S3×C2×C12).25C2 = S3×C2×C24 | φ: trivial image | 96 | | (S3xC2xC12).25C2 | 288,670 |