Extensions 1→N→G→Q→1 with N=C₂xC₁₂ and Q=Q₈

Direct product G=NxQ with N=C₂xC₁₂ and Q=Q₈

		d	ρ	Label	ID
Q₈xC₂xC₁₂		192		Q8xC2xC12	192,1405

Semidirect products G=N:Q with N=C₂xC₁₂ and Q=Q₈

extension	φ:Q→Aut N	d	Label	ID
(C₂xC₁₂):₁Q₈ = (C₂xC₄):Dic₆	φ: Q₈/C₂ → C₂² ⊆ Aut C₂xC₁₂	192	(C2xC12):1Q8	192,215
(C₂xC₁₂):₂Q₈ = C₂xC₁₂:Q₈	φ: Q₈/C₂ → C₂² ⊆ Aut C₂xC₁₂	192	(C2xC12):2Q8	192,1056
(C₂xC₁₂):₃Q₈ = C₆.₇2₊¹⁺⁴	φ: Q₈/C₂ → C₂² ⊆ Aut C₂xC₁₂	96	(C2xC12):3Q8	192,1059
(C₂xC₁₂):₄Q₈ = C₄².₈₈D₆	φ: Q₈/C₂ → C₂² ⊆ Aut C₂xC₁₂	96	(C2xC12):4Q8	192,1076
(C₂xC₁₂):₅Q₈ = C₄².₉₀D₆	φ: Q₈/C₂ → C₂² ⊆ Aut C₂xC₁₂	96	(C2xC12):5Q8	192,1078
(C₂xC₁₂):₆Q₈ = (C₂xC₁₂):Q₈	φ: Q₈/C₂ → C₂² ⊆ Aut C₂xC₁₂	192	(C2xC12):6Q8	192,205
(C₂xC₁₂):₇Q₈ = (C₂xDic₃):Q₈	φ: Q₈/C₂ → C₂² ⊆ Aut C₂xC₁₂	192	(C2xC12):7Q8	192,538
(C₂xC₁₂):₈Q₈ = C₃xC₂³.₇₈C₂³	φ: Q₈/C₂ → C₂² ⊆ Aut C₂xC₁₂	192	(C2xC12):8Q8	192,828
(C₂xC₁₂):₉Q₈ = C₃xC₂³.₄₁C₂³	φ: Q₈/C₂ → C₂² ⊆ Aut C₂xC₁₂	96	(C2xC12):9Q8	192,1433
(C₂xC₁₂):₁₀Q₈ = (C₂xDic₆):₇C₄	φ: Q₈/C₄ → C₂ ⊆ Aut C₂xC₁₂	192	(C2xC12):10Q8	192,488
(C₂xC₁₂):₁₁Q₈ = C₃xC₂³.₆₇C₂³	φ: Q₈/C₄ → C₂ ⊆ Aut C₂xC₁₂	192	(C2xC12):11Q8	192,824
(C₂xC₁₂):₁₂Q₈ = C₂xC₁₂:₂Q₈	φ: Q₈/C₄ → C₂ ⊆ Aut C₂xC₁₂	192	(C2xC12):12Q8	192,1027
(C₂xC₁₂):₁₃Q₈ = C₄².₂₇₄D₆	φ: Q₈/C₄ → C₂ ⊆ Aut C₂xC₁₂	96	(C2xC12):13Q8	192,1029
(C₂xC₁₂):₁₄Q₈ = C₂xC₄xDic₆	φ: Q₈/C₄ → C₂ ⊆ Aut C₂xC₁₂	192	(C2xC12):14Q8	192,1026
(C₂xC₁₂):₁₅Q₈ = C₆xC₄:Q₈	φ: Q₈/C₄ → C₂ ⊆ Aut C₂xC₁₂	192	(C2xC12):15Q8	192,1420
(C₂xC₁₂):₁₆Q₈ = C₃xC₂³.₃₇C₂³	φ: Q₈/C₄ → C₂ ⊆ Aut C₂xC₁₂	96	(C2xC12):16Q8	192,1422

Non-split extensions G=N.Q with N=C₂xC₁₂ and Q=Q₈

extension	φ:Q→Aut N	d	ρ	Label	ID
(C₂xC₁₂).₁Q₈ = C₆.(C₄:Q₈)	φ: Q₈/C₂ → C₂² ⊆ Aut C₂xC₁₂	192		(C2xC12).1Q8	192,216
(C₂xC₁₂).₂Q₈ = (C₂xC₄).Dic₆	φ: Q₈/C₂ → C₂² ⊆ Aut C₂xC₁₂	192		(C2xC12).2Q8	192,219
(C₂xC₁₂).₃Q₈ = (C₂²xC₄).₈₅D₆	φ: Q₈/C₂ → C₂² ⊆ Aut C₂xC₁₂	192		(C2xC12).3Q8	192,220
(C₂xC₁₂).₄Q₈ = C₁₂.C₄²	φ: Q₈/C₂ → C₂² ⊆ Aut C₂xC₁₂	192		(C2xC12).4Q8	192,88
(C₂xC₁₂).₅Q₈ = C₁₂.(C₄:C₄)	φ: Q₈/C₂ → C₂² ⊆ Aut C₂xC₁₂	96		(C2xC12).5Q8	192,89
(C₂xC₁₂).₆Q₈ = C₄²:₃Dic₃	φ: Q₈/C₂ → C₂² ⊆ Aut C₂xC₁₂	48	4	(C2xC12).6Q8	192,90
(C₂xC₁₂).₇Q₈ = C₁₂.₂C₄²	φ: Q₈/C₂ → C₂² ⊆ Aut C₂xC₁₂	48		(C2xC12).7Q8	192,91
(C₂xC₁₂).₈Q₈ = (C₂xC₁₂).Q₈	φ: Q₈/C₂ → C₂² ⊆ Aut C₂xC₁₂	48	4	(C2xC12).8Q8	192,92
(C₂xC₁₂).₉Q₈ = M₄(2):Dic₃	φ: Q₈/C₂ → C₂² ⊆ Aut C₂xC₁₂	96		(C2xC12).9Q8	192,113
(C₂xC₁₂).₁₀Q₈ = C₁₂.₃C₄²	φ: Q₈/C₂ → C₂² ⊆ Aut C₂xC₁₂	48		(C2xC12).10Q8	192,114
(C₂xC₁₂).₁₁Q₈ = (C₂xC₂₄):C₄	φ: Q₈/C₂ → C₂² ⊆ Aut C₂xC₁₂	48	4	(C2xC12).11Q8	192,115
(C₂xC₁₂).₁₂Q₈ = C₁₂.₂₀C₄²	φ: Q₈/C₂ → C₂² ⊆ Aut C₂xC₁₂	48	4	(C2xC12).12Q8	192,116
(C₂xC₁₂).₁₃Q₈ = M₄(2):₄Dic₃	φ: Q₈/C₂ → C₂² ⊆ Aut C₂xC₁₂	48	4	(C2xC12).13Q8	192,118
(C₂xC₁₂).₁₄Q₈ = C₂xC₆.Q₁₆	φ: Q₈/C₂ → C₂² ⊆ Aut C₂xC₁₂	192		(C2xC12).14Q8	192,521
(C₂xC₁₂).₁₅Q₈ = C₂xC₁₂.Q₈	φ: Q₈/C₂ → C₂² ⊆ Aut C₂xC₁₂	192		(C2xC12).15Q8	192,522
(C₂xC₁₂).₁₆Q₈ = C₄:C₄.₂₂₅D₆	φ: Q₈/C₂ → C₂² ⊆ Aut C₂xC₁₂	96		(C2xC12).16Q8	192,523
(C₂xC₁₂).₁₇Q₈ = C₁₂:(C₄:C₄)	φ: Q₈/C₂ → C₂² ⊆ Aut C₂xC₁₂	192		(C2xC12).17Q8	192,531
(C₂xC₁₂).₁₈Q₈ = (C₄xDic₃):₈C₄	φ: Q₈/C₂ → C₂² ⊆ Aut C₂xC₁₂	192		(C2xC12).18Q8	192,534
(C₂xC₁₂).₁₉Q₈ = (C₄xDic₃):₉C₄	φ: Q₈/C₂ → C₂² ⊆ Aut C₂xC₁₂	192		(C2xC12).19Q8	192,536
(C₂xC₁₂).₂₀Q₈ = C₄:C₄:₆Dic₃	φ: Q₈/C₂ → C₂² ⊆ Aut C₂xC₁₂	192		(C2xC12).20Q8	192,543
(C₂xC₁₂).₂₁Q₈ = C₄:C₄.₂₃₂D₆	φ: Q₈/C₂ → C₂² ⊆ Aut C₂xC₁₂	96		(C2xC12).21Q8	192,554
(C₂xC₁₂).₂₂Q₈ = C₄:C₄.₂₃₄D₆	φ: Q₈/C₂ → C₂² ⊆ Aut C₂xC₁₂	96		(C2xC12).22Q8	192,557
(C₂xC₁₂).₂₃Q₈ = C₄².₄₃D₆	φ: Q₈/C₂ → C₂² ⊆ Aut C₂xC₁₂	96		(C2xC12).23Q8	192,558
(C₂xC₁₂).₂₄Q₈ = Dic₃:₄M₄(2)	φ: Q₈/C₂ → C₂² ⊆ Aut C₂xC₁₂	96		(C2xC12).24Q8	192,677
(C₂xC₁₂).₂₅Q₈ = C₁₂.₈₈(C₂xQ₈)	φ: Q₈/C₂ → C₂² ⊆ Aut C₂xC₁₂	96		(C2xC12).25Q8	192,678
(C₂xC₁₂).₂₆Q₈ = C₂³.₅₂D₁₂	φ: Q₈/C₂ → C₂² ⊆ Aut C₂xC₁₂	96		(C2xC12).26Q8	192,680
(C₂xC₁₂).₂₇Q₈ = C₂xC₁₂.₅₃D₄	φ: Q₈/C₂ → C₂² ⊆ Aut C₂xC₁₂	96		(C2xC12).27Q8	192,682
(C₂xC₁₂).₂₈Q₈ = C₂³.₈Dic₆	φ: Q₈/C₂ → C₂² ⊆ Aut C₂xC₁₂	48	4	(C2xC12).28Q8	192,683
(C₂xC₁₂).₂₉Q₈ = C₂³.₉Dic₆	φ: Q₈/C₂ → C₂² ⊆ Aut C₂xC₁₂	48	4	(C2xC12).29Q8	192,684
(C₂xC₁₂).₃₀Q₈ = C₂xC₄.Dic₆	φ: Q₈/C₂ → C₂² ⊆ Aut C₂xC₁₂	192		(C2xC12).30Q8	192,1058
(C₂xC₁₂).₃₁Q₈ = C₁₂.₅₃D₈	φ: Q₈/C₂ → C₂² ⊆ Aut C₂xC₁₂	192		(C2xC12).31Q8	192,38
(C₂xC₁₂).₃₂Q₈ = C₁₂.₃₉SD₁₆	φ: Q₈/C₂ → C₂² ⊆ Aut C₂xC₁₂	192		(C2xC12).32Q8	192,39
(C₂xC₁₂).₃₃Q₈ = C₆.(C₄xQ₈)	φ: Q₈/C₂ → C₂² ⊆ Aut C₂xC₁₂	192		(C2xC12).33Q8	192,206
(C₂xC₁₂).₃₄Q₈ = C₂.(C₄xDic₆)	φ: Q₈/C₂ → C₂² ⊆ Aut C₂xC₁₂	192		(C2xC12).34Q8	192,213
(C₂xC₁₂).₃₅Q₈ = Dic₃:C₄:C₄	φ: Q₈/C₂ → C₂² ⊆ Aut C₂xC₁₂	192		(C2xC12).35Q8	192,214
(C₂xC₁₂).₃₆Q₈ = C₃xC₄.₉C₄²	φ: Q₈/C₂ → C₂² ⊆ Aut C₂xC₁₂	48	4	(C2xC12).36Q8	192,143
(C₂xC₁₂).₃₇Q₈ = C₃xC₂².C₄²	φ: Q₈/C₂ → C₂² ⊆ Aut C₂xC₁₂	96		(C2xC12).37Q8	192,149
(C₂xC₁₂).₃₈Q₈ = C₃xM₄(2):₄C₄	φ: Q₈/C₂ → C₂² ⊆ Aut C₂xC₁₂	48	4	(C2xC12).38Q8	192,150
(C₂xC₁₂).₃₉Q₈ = (C₂xC₁₂).₅₄D₄	φ: Q₈/C₂ → C₂² ⊆ Aut C₂xC₁₂	192		(C2xC12).39Q8	192,541
(C₂xC₁₂).₄₀Q₈ = (C₂xC₁₂).₅₅D₄	φ: Q₈/C₂ → C₂² ⊆ Aut C₂xC₁₂	192		(C2xC12).40Q8	192,545
(C₂xC₁₂).₄₁Q₈ = C₃xC₂³.₈₁C₂³	φ: Q₈/C₂ → C₂² ⊆ Aut C₂xC₁₂	192		(C2xC12).41Q8	192,831
(C₂xC₁₂).₄₂Q₈ = C₃xC₂³.₈₃C₂³	φ: Q₈/C₂ → C₂² ⊆ Aut C₂xC₁₂	192		(C2xC12).42Q8	192,833
(C₂xC₁₂).₄₃Q₈ = C₃xM₄(2):C₄	φ: Q₈/C₂ → C₂² ⊆ Aut C₂xC₁₂	96		(C2xC12).43Q8	192,861
(C₂xC₁₂).₄₄Q₈ = C₃xM₄(2).C₄	φ: Q₈/C₂ → C₂² ⊆ Aut C₂xC₁₂	48	4	(C2xC12).44Q8	192,863
(C₂xC₁₂).₄₅Q₈ = C₂₄:₂C₈	φ: Q₈/C₄ → C₂ ⊆ Aut C₂xC₁₂	192		(C2xC12).45Q8	192,16
(C₂xC₁₂).₄₆Q₈ = C₂₄:₁C₈	φ: Q₈/C₄ → C₂ ⊆ Aut C₂xC₁₂	192		(C2xC12).46Q8	192,17
(C₂xC₁₂).₄₇Q₈ = C₃xC₈:₂C₈	φ: Q₈/C₄ → C₂ ⊆ Aut C₂xC₁₂	192		(C2xC12).47Q8	192,140
(C₂xC₁₂).₄₈Q₈ = C₃xC₈:₁C₈	φ: Q₈/C₄ → C₂ ⊆ Aut C₂xC₁₂	192		(C2xC12).48Q8	192,141
(C₂xC₁₂).₄₉Q₈ = (C₂xC₄²).₆S₃	φ: Q₈/C₄ → C₂ ⊆ Aut C₂xC₁₂	192		(C2xC12).49Q8	192,492
(C₂xC₁₂).₅₀Q₈ = C₃xC₂³.₆₃C₂³	φ: Q₈/C₄ → C₂ ⊆ Aut C₂xC₁₂	192		(C2xC12).50Q8	192,820
(C₂xC₁₂).₅₁Q₈ = C₁₂.₉C₄²	φ: Q₈/C₄ → C₂ ⊆ Aut C₂xC₁₂	192		(C2xC12).51Q8	192,110
(C₂xC₁₂).₅₂Q₈ = C₁₂:₄(C₄:C₄)	φ: Q₈/C₄ → C₂ ⊆ Aut C₂xC₁₂	192		(C2xC12).52Q8	192,487
(C₂xC₁₂).₅₃Q₈ = C₄²:₁₀Dic₃	φ: Q₈/C₄ → C₂ ⊆ Aut C₂xC₁₂	192		(C2xC12).53Q8	192,494
(C₂xC₁₂).₅₄Q₈ = C₄²:₁₁Dic₃	φ: Q₈/C₄ → C₂ ⊆ Aut C₂xC₁₂	192		(C2xC12).54Q8	192,495
(C₂xC₁₂).₅₅Q₈ = C₂xC₈:Dic₃	φ: Q₈/C₄ → C₂ ⊆ Aut C₂xC₁₂	192		(C2xC12).55Q8	192,663
(C₂xC₁₂).₅₆Q₈ = C₂xC₂₄:₁C₄	φ: Q₈/C₄ → C₂ ⊆ Aut C₂xC₁₂	192		(C2xC12).56Q8	192,664
(C₂xC₁₂).₅₇Q₈ = C₂xC₁₂.₆Q₈	φ: Q₈/C₄ → C₂ ⊆ Aut C₂xC₁₂	192		(C2xC12).57Q8	192,1028
(C₂xC₁₂).₅₈Q₈ = C₁₂.₈C₄²	φ: Q₈/C₄ → C₂ ⊆ Aut C₂xC₁₂	48		(C2xC12).58Q8	192,82
(C₂xC₁₂).₅₉Q₈ = C₁₂:₇M₄(2)	φ: Q₈/C₄ → C₂ ⊆ Aut C₂xC₁₂	96		(C2xC12).59Q8	192,483
(C₂xC₁₂).₆₀Q₈ = Dic₃:C₈:C₂	φ: Q₈/C₄ → C₂ ⊆ Aut C₂xC₁₂	96		(C2xC12).60Q8	192,661
(C₂xC₁₂).₆₁Q₈ = C₂³.₂₇D₁₂	φ: Q₈/C₄ → C₂ ⊆ Aut C₂xC₁₂	96		(C2xC12).61Q8	192,665
(C₂xC₁₂).₆₂Q₈ = C₂xC₂₄.C₄	φ: Q₈/C₄ → C₂ ⊆ Aut C₂xC₁₂	96		(C2xC12).62Q8	192,666
(C₂xC₁₂).₆₃Q₈ = (C₂xC₁₂):₃C₈	φ: Q₈/C₄ → C₂ ⊆ Aut C₂xC₁₂	192		(C2xC12).63Q8	192,83
(C₂xC₁₂).₆₄Q₈ = (C₂xC₂₄):₅C₄	φ: Q₈/C₄ → C₂ ⊆ Aut C₂xC₁₂	192		(C2xC12).64Q8	192,109
(C₂xC₁₂).₆₅Q₈ = C₂xC₁₂:C₈	φ: Q₈/C₄ → C₂ ⊆ Aut C₂xC₁₂	192		(C2xC12).65Q8	192,482
(C₂xC₁₂).₆₆Q₈ = C₄xDic₃:C₄	φ: Q₈/C₄ → C₂ ⊆ Aut C₂xC₁₂	192		(C2xC12).66Q8	192,490
(C₂xC₁₂).₆₇Q₈ = C₄xC₄:Dic₃	φ: Q₈/C₄ → C₂ ⊆ Aut C₂xC₁₂	192		(C2xC12).67Q8	192,493
(C₂xC₁₂).₆₈Q₈ = C₂xDic₃:C₈	φ: Q₈/C₄ → C₂ ⊆ Aut C₂xC₁₂	192		(C2xC12).68Q8	192,658
(C₂xC₁₂).₆₉Q₈ = C₃xC₄²:₆C₄	φ: Q₈/C₄ → C₂ ⊆ Aut C₂xC₁₂	48		(C2xC12).69Q8	192,145
(C₂xC₁₂).₇₀Q₈ = C₃xC₂².₄Q₁₆	φ: Q₈/C₄ → C₂ ⊆ Aut C₂xC₁₂	192		(C2xC12).70Q8	192,146
(C₂xC₁₂).₇₁Q₈ = C₃xC₄²:₈C₄	φ: Q₈/C₄ → C₂ ⊆ Aut C₂xC₁₂	192		(C2xC12).71Q8	192,815
(C₂xC₁₂).₇₂Q₈ = C₃xC₄²:₉C₄	φ: Q₈/C₄ → C₂ ⊆ Aut C₂xC₁₂	192		(C2xC12).72Q8	192,817
(C₂xC₁₂).₇₃Q₈ = C₃xC₂³.₆₅C₂³	φ: Q₈/C₄ → C₂ ⊆ Aut C₂xC₁₂	192		(C2xC12).73Q8	192,822
(C₂xC₁₂).₇₄Q₈ = C₃xC₄:M₄(2)	φ: Q₈/C₄ → C₂ ⊆ Aut C₂xC₁₂	96		(C2xC12).74Q8	192,856
(C₂xC₁₂).₇₅Q₈ = C₃xC₄².₆C₂²	φ: Q₈/C₄ → C₂ ⊆ Aut C₂xC₁₂	96		(C2xC12).75Q8	192,857
(C₂xC₁₂).₇₆Q₈ = C₆xC₄.Q₈	φ: Q₈/C₄ → C₂ ⊆ Aut C₂xC₁₂	192		(C2xC12).76Q8	192,858
(C₂xC₁₂).₇₇Q₈ = C₆xC₂.D₈	φ: Q₈/C₄ → C₂ ⊆ Aut C₂xC₁₂	192		(C2xC12).77Q8	192,859
(C₂xC₁₂).₇₈Q₈ = C₃xC₂³.₂₅D₄	φ: Q₈/C₄ → C₂ ⊆ Aut C₂xC₁₂	96		(C2xC12).78Q8	192,860
(C₂xC₁₂).₇₉Q₈ = C₆xC₈.C₄	φ: Q₈/C₄ → C₂ ⊆ Aut C₂xC₁₂	96		(C2xC12).79Q8	192,862
(C₂xC₁₂).₈₀Q₈ = C₆xC₄².C₂	φ: Q₈/C₄ → C₂ ⊆ Aut C₂xC₁₂	192		(C2xC12).80Q8	192,1416
(C₂xC₁₂).₈₁Q₈ = C₃xC₂².₇C₄²	central extension (φ=1)	192		(C2xC12).81Q8	192,142
(C₂xC₁₂).₈₂Q₈ = C₁₂xC₄:C₄	central extension (φ=1)	192		(C2xC12).82Q8	192,811
(C₂xC₁₂).₈₃Q₈ = C₆xC₄:C₈	central extension (φ=1)	192		(C2xC12).83Q8	192,855

Extensions 1→N→G→Q→1 with N=C2xC12 and Q=Q8

Extensions 1→N→G→Q→1 with N=C₂xC₁₂ and Q=Q₈