Extensions 1→N→G→Q→1 with N=C₆ and Q=C₆×Dic₃

Direct product G=N×Q with N=C₆ and Q=C₆×Dic₃

		d	ρ	Label	ID
Dic₃×C₆²		144		Dic3xC6^2	432,708

Semidirect products G=N:Q with N=C₆ and Q=C₆×Dic₃

extension	φ:Q→Aut N	d	ρ	Label	ID
C₆⋊₁(C₆×Dic₃) = S₃×C₆×Dic₃	φ: C₆×Dic₃/C₃×Dic₃ → C₂ ⊆ Aut C₆	48		C6:1(C6xDic3)	432,651
C₆⋊₂(C₆×Dic₃) = C₂×C₆×C₃⋊Dic₃	φ: C₆×Dic₃/C₆² → C₂ ⊆ Aut C₆	144		C6:2(C6xDic3)	432,718

Non-split extensions G=N.Q with N=C₆ and Q=C₆×Dic₃

extension	φ:Q→Aut N	d	ρ	Label	ID
C₆.₁(C₆×Dic₃) = C₃×S₃×C₃⋊C₈	φ: C₆×Dic₃/C₃×Dic₃ → C₂ ⊆ Aut C₆	48	4	C6.1(C6xDic3)	432,414
C₆.₂(C₆×Dic₃) = C₃×D₆.Dic₃	φ: C₆×Dic₃/C₃×Dic₃ → C₂ ⊆ Aut C₆	48	4	C6.2(C6xDic3)	432,416
C₆.₃(C₆×Dic₃) = C₃×Dic₃²	φ: C₆×Dic₃/C₃×Dic₃ → C₂ ⊆ Aut C₆	48		C6.3(C6xDic3)	432,425
C₆.₄(C₆×Dic₃) = C₃×D₆⋊Dic₃	φ: C₆×Dic₃/C₃×Dic₃ → C₂ ⊆ Aut C₆	48		C6.4(C6xDic3)	432,426
C₆.₅(C₆×Dic₃) = C₃×Dic₃⋊Dic₃	φ: C₆×Dic₃/C₃×Dic₃ → C₂ ⊆ Aut C₆	48		C6.5(C6xDic3)	432,428
C₆.₆(C₆×Dic₃) = C₆×C₉⋊C₈	φ: C₆×Dic₃/C₆² → C₂ ⊆ Aut C₆	144		C6.6(C6xDic3)	432,124
C₆.₇(C₆×Dic₃) = C₃×C₄.Dic₉	φ: C₆×Dic₃/C₆² → C₂ ⊆ Aut C₆	72	2	C6.7(C6xDic3)	432,125
C₆.₈(C₆×Dic₃) = C₁₂×Dic₉	φ: C₆×Dic₃/C₆² → C₂ ⊆ Aut C₆	144		C6.8(C6xDic3)	432,128
C₆.₉(C₆×Dic₃) = C₃×C₄⋊Dic₉	φ: C₆×Dic₃/C₆² → C₂ ⊆ Aut C₆	144		C6.9(C6xDic3)	432,130
C₆.₁₀(C₆×Dic₃) = C₂×He₃⋊₃C₈	φ: C₆×Dic₃/C₆² → C₂ ⊆ Aut C₆	144		C6.10(C6xDic3)	432,136
C₆.₁₁(C₆×Dic₃) = He₃⋊₇M₄(2)	φ: C₆×Dic₃/C₆² → C₂ ⊆ Aut C₆	72	6	C6.11(C6xDic3)	432,137
C₆.₁₂(C₆×Dic₃) = C₄×C₃²⋊C₁₂	φ: C₆×Dic₃/C₆² → C₂ ⊆ Aut C₆	144		C6.12(C6xDic3)	432,138
C₆.₁₃(C₆×Dic₃) = C₆².₂₀D₆	φ: C₆×Dic₃/C₆² → C₂ ⊆ Aut C₆	144		C6.13(C6xDic3)	432,140
C₆.₁₄(C₆×Dic₃) = C₂×C₉⋊C₂₄	φ: C₆×Dic₃/C₆² → C₂ ⊆ Aut C₆	144		C6.14(C6xDic3)	432,142
C₆.₁₅(C₆×Dic₃) = C₃₆.C₁₂	φ: C₆×Dic₃/C₆² → C₂ ⊆ Aut C₆	72	6	C6.15(C6xDic3)	432,143
C₆.₁₆(C₆×Dic₃) = C₄×C₉⋊C₁₂	φ: C₆×Dic₃/C₆² → C₂ ⊆ Aut C₆	144		C6.16(C6xDic3)	432,144
C₆.₁₇(C₆×Dic₃) = C₃₆⋊C₁₂	φ: C₆×Dic₃/C₆² → C₂ ⊆ Aut C₆	144		C6.17(C6xDic3)	432,146
C₆.₁₈(C₆×Dic₃) = C₃×C₁₈.D₄	φ: C₆×Dic₃/C₆² → C₂ ⊆ Aut C₆	72		C6.18(C6xDic3)	432,164
C₆.₁₉(C₆×Dic₃) = C₆²⋊₃C₁₂	φ: C₆×Dic₃/C₆² → C₂ ⊆ Aut C₆	72		C6.19(C6xDic3)	432,166
C₆.₂₀(C₆×Dic₃) = C₆².₂₇D₆	φ: C₆×Dic₃/C₆² → C₂ ⊆ Aut C₆	72		C6.20(C6xDic3)	432,167
C₆.₂₁(C₆×Dic₃) = C₂×C₆×Dic₉	φ: C₆×Dic₃/C₆² → C₂ ⊆ Aut C₆	144		C6.21(C6xDic3)	432,372
C₆.₂₂(C₆×Dic₃) = C₂²×C₃²⋊C₁₂	φ: C₆×Dic₃/C₆² → C₂ ⊆ Aut C₆	144		C6.22(C6xDic3)	432,376
C₆.₂₃(C₆×Dic₃) = C₂²×C₉⋊C₁₂	φ: C₆×Dic₃/C₆² → C₂ ⊆ Aut C₆	144		C6.23(C6xDic3)	432,378
C₆.₂₄(C₆×Dic₃) = C₆×C₃²⋊₄C₈	φ: C₆×Dic₃/C₆² → C₂ ⊆ Aut C₆	144		C6.24(C6xDic3)	432,485
C₆.₂₅(C₆×Dic₃) = C₃×C₁₂.₅₈D₆	φ: C₆×Dic₃/C₆² → C₂ ⊆ Aut C₆	72		C6.25(C6xDic3)	432,486
C₆.₂₆(C₆×Dic₃) = C₁₂×C₃⋊Dic₃	φ: C₆×Dic₃/C₆² → C₂ ⊆ Aut C₆	144		C6.26(C6xDic3)	432,487
C₆.₂₇(C₆×Dic₃) = C₃×C₁₂⋊Dic₃	φ: C₆×Dic₃/C₆² → C₂ ⊆ Aut C₆	144		C6.27(C6xDic3)	432,489
C₆.₂₈(C₆×Dic₃) = C₃×C₆²⋊₅C₄	φ: C₆×Dic₃/C₆² → C₂ ⊆ Aut C₆	72		C6.28(C6xDic3)	432,495
C₆.₂₉(C₆×Dic₃) = C₁₈×C₃⋊C₈	central extension (φ=1)	144		C6.29(C6xDic3)	432,126
C₆.₃₀(C₆×Dic₃) = C₉×C₄.Dic₃	central extension (φ=1)	72	2	C6.30(C6xDic3)	432,127
C₆.₃₁(C₆×Dic₃) = Dic₃×C₃₆	central extension (φ=1)	144		C6.31(C6xDic3)	432,131
C₆.₃₂(C₆×Dic₃) = C₉×C₄⋊Dic₃	central extension (φ=1)	144		C6.32(C6xDic3)	432,133
C₆.₃₃(C₆×Dic₃) = C₉×C₆.D₄	central extension (φ=1)	72		C6.33(C6xDic3)	432,165
C₆.₃₄(C₆×Dic₃) = Dic₃×C₂×C₁₈	central extension (φ=1)	144		C6.34(C6xDic3)	432,373
C₆.₃₅(C₆×Dic₃) = C₃×C₆×C₃⋊C₈	central extension (φ=1)	144		C6.35(C6xDic3)	432,469
C₆.₃₆(C₆×Dic₃) = C₃²×C₄.Dic₃	central extension (φ=1)	72		C6.36(C6xDic3)	432,470
C₆.₃₇(C₆×Dic₃) = Dic₃×C₃×C₁₂	central extension (φ=1)	144		C6.37(C6xDic3)	432,471
C₆.₃₈(C₆×Dic₃) = C₃²×C₄⋊Dic₃	central extension (φ=1)	144		C6.38(C6xDic3)	432,473
C₆.₃₉(C₆×Dic₃) = C₃²×C₆.D₄	central extension (φ=1)	72		C6.39(C6xDic3)	432,479

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Extensions 1→N→G→Q→1 with N=C6 and Q=C6×Dic3

Extensions 1→N→G→Q→1 with N=C₆ and Q=C₆×Dic₃