Extensions 1→N→G→Q→1 with N=C₄×C₁₂ and Q=C₄

Direct product G=N×Q with N=C₄×C₁₂ and Q=C₄

		d	ρ	Label	ID
C₄²×C₁₂		192		C4^2xC12	192,807

Semidirect products G=N:Q with N=C₄×C₁₂ and Q=C₄

extension	φ:Q→Aut N	d	ρ	Label	ID
(C₄×C₁₂)⋊₁C₄ = C₄²⋊₃Dic₃	φ: C₄/C₁ → C₄ ⊆ Aut C₄×C₁₂	48	4	(C4xC12):1C4	192,90
(C₄×C₁₂)⋊₂C₄ = C₄²⋊₄Dic₃	φ: C₄/C₁ → C₄ ⊆ Aut C₄×C₁₂	48	4	(C4xC12):2C4	192,100
(C₄×C₁₂)⋊₃C₄ = C₄²⋊₅Dic₃	φ: C₄/C₁ → C₄ ⊆ Aut C₄×C₁₂	24	4	(C4xC12):3C4	192,104
(C₄×C₁₂)⋊₄C₄ = C₃×C₄.₉C₄²	φ: C₄/C₁ → C₄ ⊆ Aut C₄×C₁₂	48	4	(C4xC12):4C4	192,143
(C₄×C₁₂)⋊₅C₄ = C₃×C₄²⋊C₄	φ: C₄/C₁ → C₄ ⊆ Aut C₄×C₁₂	24	4	(C4xC12):5C4	192,159
(C₄×C₁₂)⋊₆C₄ = C₃×C₄²⋊₃C₄	φ: C₄/C₁ → C₄ ⊆ Aut C₄×C₁₂	48	4	(C4xC12):6C4	192,160
(C₄×C₁₂)⋊₇C₄ = C₄²⋊₇Dic₃	φ: C₄/C₂ → C₂ ⊆ Aut C₄×C₁₂	192		(C4xC12):7C4	192,496
(C₄×C₁₂)⋊₈C₄ = C₃×C₄²⋊₄C₄	φ: C₄/C₂ → C₂ ⊆ Aut C₄×C₁₂	192		(C4xC12):8C4	192,809
(C₄×C₁₂)⋊₉C₄ = C₃×C₄²⋊₅C₄	φ: C₄/C₂ → C₂ ⊆ Aut C₄×C₁₂	192		(C4xC12):9C4	192,816
(C₄×C₁₂)⋊₁₀C₄ = C₄²⋊₁₀Dic₃	φ: C₄/C₂ → C₂ ⊆ Aut C₄×C₁₂	192		(C4xC12):10C4	192,494
(C₄×C₁₂)⋊₁₁C₄ = C₄²⋊₁₁Dic₃	φ: C₄/C₂ → C₂ ⊆ Aut C₄×C₁₂	192		(C4xC12):11C4	192,495
(C₄×C₁₂)⋊₁₂C₄ = C₁₂.₈C₄²	φ: C₄/C₂ → C₂ ⊆ Aut C₄×C₁₂	48		(C4xC12):12C4	192,82
(C₄×C₁₂)⋊₁₃C₄ = C₄×C₄⋊Dic₃	φ: C₄/C₂ → C₂ ⊆ Aut C₄×C₁₂	192		(C4xC12):13C4	192,493
(C₄×C₁₂)⋊₁₄C₄ = Dic₃×C₄²	φ: C₄/C₂ → C₂ ⊆ Aut C₄×C₁₂	192		(C4xC12):14C4	192,489
(C₄×C₁₂)⋊₁₅C₄ = C₄²⋊₆Dic₃	φ: C₄/C₂ → C₂ ⊆ Aut C₄×C₁₂	192		(C4xC12):15C4	192,491
(C₄×C₁₂)⋊₁₆C₄ = C₃×C₄²⋊₆C₄	φ: C₄/C₂ → C₂ ⊆ Aut C₄×C₁₂	48		(C4xC12):16C4	192,145
(C₄×C₁₂)⋊₁₇C₄ = C₁₂×C₄⋊C₄	φ: C₄/C₂ → C₂ ⊆ Aut C₄×C₁₂	192		(C4xC12):17C4	192,811
(C₄×C₁₂)⋊₁₈C₄ = C₃×C₄²⋊₈C₄	φ: C₄/C₂ → C₂ ⊆ Aut C₄×C₁₂	192		(C4xC12):18C4	192,815
(C₄×C₁₂)⋊₁₉C₄ = C₃×C₄²⋊₉C₄	φ: C₄/C₂ → C₂ ⊆ Aut C₄×C₁₂	192		(C4xC12):19C4	192,817

Non-split extensions G=N.Q with N=C₄×C₁₂ and Q=C₄

extension	φ:Q→Aut N	d	ρ	Label	ID
(C₄×C₁₂).₁C₄ = C₁₂.₁₅C₄²	φ: C₄/C₁ → C₄ ⊆ Aut C₄×C₁₂	48	4	(C4xC12).1C4	192,25
(C₄×C₁₂).₂C₄ = C₄².Dic₃	φ: C₄/C₁ → C₄ ⊆ Aut C₄×C₁₂	48	4	(C4xC12).2C4	192,101
(C₄×C₁₂).₃C₄ = C₄².₃Dic₃	φ: C₄/C₁ → C₄ ⊆ Aut C₄×C₁₂	48	4	(C4xC12).3C4	192,107
(C₄×C₁₂).₄C₄ = C₃×C₁₆⋊C₄	φ: C₄/C₁ → C₄ ⊆ Aut C₄×C₁₂	48	4	(C4xC12).4C4	192,153
(C₄×C₁₂).₅C₄ = C₃×C₄².C₄	φ: C₄/C₁ → C₄ ⊆ Aut C₄×C₁₂	48	4	(C4xC12).5C4	192,161
(C₄×C₁₂).₆C₄ = C₃×C₄².₃C₄	φ: C₄/C₁ → C₄ ⊆ Aut C₄×C₁₂	48	4	(C4xC12).6C4	192,162
(C₄×C₁₂).₇C₄ = C₃×C₁₆⋊₅C₄	φ: C₄/C₂ → C₂ ⊆ Aut C₄×C₁₂	192		(C4xC12).7C4	192,152
(C₄×C₁₂).₈C₄ = C₆×C₈⋊C₄	φ: C₄/C₂ → C₂ ⊆ Aut C₄×C₁₂	192		(C4xC12).8C4	192,836
(C₄×C₁₂).₉C₄ = C₃×C₄².₁₂C₄	φ: C₄/C₂ → C₂ ⊆ Aut C₄×C₁₂	96		(C4xC12).9C4	192,864
(C₄×C₁₂).₁₀C₄ = C₃×C₄².₆C₄	φ: C₄/C₂ → C₂ ⊆ Aut C₄×C₁₂	96		(C4xC12).10C4	192,865
(C₄×C₁₂).₁₁C₄ = C₁₂⋊₇M₄(2)	φ: C₄/C₂ → C₂ ⊆ Aut C₄×C₁₂	96		(C4xC12).11C4	192,483
(C₄×C₁₂).₁₂C₄ = C₄².₂₇₀D₆	φ: C₄/C₂ → C₂ ⊆ Aut C₄×C₁₂	96		(C4xC12).12C4	192,485
(C₄×C₁₂).₁₃C₄ = C₁₂⋊C₁₆	φ: C₄/C₂ → C₂ ⊆ Aut C₄×C₁₂	192		(C4xC12).13C4	192,21
(C₄×C₁₂).₁₄C₄ = C₂₄.₁C₈	φ: C₄/C₂ → C₂ ⊆ Aut C₄×C₁₂	48	2	(C4xC12).14C4	192,22
(C₄×C₁₂).₁₅C₄ = C₄×C₄.Dic₃	φ: C₄/C₂ → C₂ ⊆ Aut C₄×C₁₂	96		(C4xC12).15C4	192,481
(C₄×C₁₂).₁₆C₄ = C₂×C₁₂⋊C₈	φ: C₄/C₂ → C₂ ⊆ Aut C₄×C₁₂	192		(C4xC12).16C4	192,482
(C₄×C₁₂).₁₇C₄ = C₄×C₃⋊C₁₆	φ: C₄/C₂ → C₂ ⊆ Aut C₄×C₁₂	192		(C4xC12).17C4	192,19
(C₄×C₁₂).₁₈C₄ = C₂₄.C₈	φ: C₄/C₂ → C₂ ⊆ Aut C₄×C₁₂	192		(C4xC12).18C4	192,20
(C₄×C₁₂).₁₉C₄ = C₂×C₄×C₃⋊C₈	φ: C₄/C₂ → C₂ ⊆ Aut C₄×C₁₂	192		(C4xC12).19C4	192,479
(C₄×C₁₂).₂₀C₄ = C₂×C₄².S₃	φ: C₄/C₂ → C₂ ⊆ Aut C₄×C₁₂	192		(C4xC12).20C4	192,480
(C₄×C₁₂).₂₁C₄ = C₄².₂₈₅D₆	φ: C₄/C₂ → C₂ ⊆ Aut C₄×C₁₂	96		(C4xC12).21C4	192,484
(C₄×C₁₂).₂₂C₄ = C₃×C₄⋊C₁₆	φ: C₄/C₂ → C₂ ⊆ Aut C₄×C₁₂	192		(C4xC12).22C4	192,169
(C₄×C₁₂).₂₃C₄ = C₃×C₈.C₈	φ: C₄/C₂ → C₂ ⊆ Aut C₄×C₁₂	48	2	(C4xC12).23C4	192,170
(C₄×C₁₂).₂₄C₄ = C₁₂×M₄(2)	φ: C₄/C₂ → C₂ ⊆ Aut C₄×C₁₂	96		(C4xC12).24C4	192,837
(C₄×C₁₂).₂₅C₄ = C₆×C₄⋊C₈	φ: C₄/C₂ → C₂ ⊆ Aut C₄×C₁₂	192		(C4xC12).25C4	192,855
(C₄×C₁₂).₂₆C₄ = C₃×C₄⋊M₄(2)	φ: C₄/C₂ → C₂ ⊆ Aut C₄×C₁₂	96		(C4xC12).26C4	192,856

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Extensions 1→N→G→Q→1 with N=C4×C12 and Q=C4

Extensions 1→N→G→Q→1 with N=C₄×C₁₂ and Q=C₄