Extensions 1→N→G→Q→1 with N=C₂xC₄:C₄ and Q=S₃

Direct product G=NxQ with N=C₂xC₄:C₄ and Q=S₃

		d	ρ	Label	ID
C₂xS₃xC₄:C₄		96		C2xS3xC4:C4	192,1060

Semidirect products G=N:Q with N=C₂xC₄:C₄ and Q=S₃

extension	φ:Q→Out N	d	Label	ID
(C₂xC₄:C₄):₁S₃ = C₂xC₆.D₈	φ: S₃/C₃ → C₂ ⊆ Out C₂xC₄:C₄	96	(C2xC4:C4):1S3	192,524
(C₂xC₄:C₄):₂S₃ = C₄oD₁₂:C₄	φ: S₃/C₃ → C₂ ⊆ Out C₂xC₄:C₄	96	(C2xC4:C4):2S3	192,525
(C₂xC₄:C₄):₃S₃ = (C₂xC₆).₄₀D₈	φ: S₃/C₃ → C₂ ⊆ Out C₂xC₄:C₄	96	(C2xC4:C4):3S3	192,526
(C₂xC₄:C₄):₄S₃ = C₄:C₄.₂₂₈D₆	φ: S₃/C₃ → C₂ ⊆ Out C₂xC₄:C₄	96	(C2xC4:C4):4S3	192,527
(C₂xC₄:C₄):₅S₃ = C₄:(D₆:C₄)	φ: S₃/C₃ → C₂ ⊆ Out C₂xC₄:C₄	96	(C2xC4:C4):5S3	192,546
(C₂xC₄:C₄):₆S₃ = (C₂xD₁₂):₁₀C₄	φ: S₃/C₃ → C₂ ⊆ Out C₂xC₄:C₄	96	(C2xC4:C4):6S3	192,547
(C₂xC₄:C₄):₇S₃ = D₆:C₄:₆C₄	φ: S₃/C₃ → C₂ ⊆ Out C₂xC₄:C₄	96	(C2xC4:C4):7S3	192,548
(C₂xC₄:C₄):₈S₃ = D₆:C₄:₇C₄	φ: S₃/C₃ → C₂ ⊆ Out C₂xC₄:C₄	96	(C2xC4:C4):8S3	192,549
(C₂xC₄:C₄):₉S₃ = (C₂xC₄):₃D₁₂	φ: S₃/C₃ → C₂ ⊆ Out C₂xC₄:C₄	96	(C2xC4:C4):9S3	192,550
(C₂xC₄:C₄):₁₀S₃ = (C₂xC₁₂).₂₈₉D₄	φ: S₃/C₃ → C₂ ⊆ Out C₂xC₄:C₄	96	(C2xC4:C4):10S3	192,551
(C₂xC₄:C₄):₁₁S₃ = (C₂xC₁₂).₂₉₀D₄	φ: S₃/C₃ → C₂ ⊆ Out C₂xC₄:C₄	96	(C2xC4:C4):11S3	192,552
(C₂xC₄:C₄):₁₂S₃ = (C₂xC₁₂).₅₆D₄	φ: S₃/C₃ → C₂ ⊆ Out C₂xC₄:C₄	96	(C2xC4:C4):12S3	192,553
(C₂xC₄:C₄):₁₃S₃ = C₆.₈2₊¹⁺⁴	φ: S₃/C₃ → C₂ ⊆ Out C₂xC₄:C₄	96	(C2xC4:C4):13S3	192,1063
(C₂xC₄:C₄):₁₄S₃ = C₂xD₆.D₄	φ: S₃/C₃ → C₂ ⊆ Out C₂xC₄:C₄	96	(C2xC4:C4):14S3	192,1064
(C₂xC₄:C₄):₁₅S₃ = C₂xC₁₂:D₄	φ: S₃/C₃ → C₂ ⊆ Out C₂xC₄:C₄	96	(C2xC4:C4):15S3	192,1065
(C₂xC₄:C₄):₁₆S₃ = C₆.2_-¹⁺⁴	φ: S₃/C₃ → C₂ ⊆ Out C₂xC₄:C₄	96	(C2xC4:C4):16S3	192,1066
(C₂xC₄:C₄):₁₇S₃ = C₂xD₆:Q₈	φ: S₃/C₃ → C₂ ⊆ Out C₂xC₄:C₄	96	(C2xC4:C4):17S3	192,1067
(C₂xC₄:C₄):₁₈S₃ = C₂xC₄.D₁₂	φ: S₃/C₃ → C₂ ⊆ Out C₂xC₄:C₄	96	(C2xC4:C4):18S3	192,1068
(C₂xC₄:C₄):₁₉S₃ = C₆.2₊¹⁺⁴	φ: S₃/C₃ → C₂ ⊆ Out C₂xC₄:C₄	96	(C2xC4:C4):19S3	192,1069
(C₂xC₄:C₄):₂₀S₃ = C₆.₁₀2₊¹⁺⁴	φ: S₃/C₃ → C₂ ⊆ Out C₂xC₄:C₄	96	(C2xC4:C4):20S3	192,1070
(C₂xC₄:C₄):₂₁S₃ = C₂xC₄:C₄:S₃	φ: S₃/C₃ → C₂ ⊆ Out C₂xC₄:C₄	96	(C2xC4:C4):21S3	192,1071
(C₂xC₄:C₄):₂₂S₃ = C₆.₅2_-¹⁺⁴	φ: S₃/C₃ → C₂ ⊆ Out C₂xC₄:C₄	96	(C2xC4:C4):22S3	192,1072
(C₂xC₄:C₄):₂₃S₃ = C₆.₁₁2₊¹⁺⁴	φ: S₃/C₃ → C₂ ⊆ Out C₂xC₄:C₄	96	(C2xC4:C4):23S3	192,1073
(C₂xC₄:C₄):₂₄S₃ = C₆.₆2_-¹⁺⁴	φ: S₃/C₃ → C₂ ⊆ Out C₂xC₄:C₄	96	(C2xC4:C4):24S3	192,1074
(C₂xC₄:C₄):₂₅S₃ = C₂xC₄:C₄:₇S₃	φ: trivial image	96	(C2xC4:C4):25S3	192,1061
(C₂xC₄:C₄):₂₆S₃ = C₂xDic₃:₅D₄	φ: trivial image	96	(C2xC4:C4):26S3	192,1062

Non-split extensions G=N.Q with N=C₂xC₄:C₄ and Q=S₃

extension	φ:Q→Out N	d	Label	ID
(C₂xC₄:C₄).₁S₃ = (C₂xC₁₂):C₈	φ: S₃/C₃ → C₂ ⊆ Out C₂xC₄:C₄	96	(C2xC4:C4).1S3	192,87
(C₂xC₄:C₄).₂S₃ = C₁₂.C₄²	φ: S₃/C₃ → C₂ ⊆ Out C₂xC₄:C₄	192	(C2xC4:C4).2S3	192,88
(C₂xC₄:C₄).₃S₃ = C₁₂.(C₄:C₄)	φ: S₃/C₃ → C₂ ⊆ Out C₂xC₄:C₄	96	(C2xC4:C4).3S3	192,89
(C₂xC₄:C₄).₄S₃ = C₂xC₆.Q₁₆	φ: S₃/C₃ → C₂ ⊆ Out C₂xC₄:C₄	192	(C2xC4:C4).4S3	192,521
(C₂xC₄:C₄).₅S₃ = C₂xC₁₂.Q₈	φ: S₃/C₃ → C₂ ⊆ Out C₂xC₄:C₄	192	(C2xC4:C4).5S3	192,522
(C₂xC₄:C₄).₆S₃ = C₄:C₄.₂₂₅D₆	φ: S₃/C₃ → C₂ ⊆ Out C₂xC₄:C₄	96	(C2xC4:C4).6S3	192,523
(C₂xC₄:C₄).₇S₃ = C₂xC₆.SD₁₆	φ: S₃/C₃ → C₂ ⊆ Out C₂xC₄:C₄	192	(C2xC4:C4).7S3	192,528
(C₂xC₄:C₄).₈S₃ = C₄:C₄.₂₃₀D₆	φ: S₃/C₃ → C₂ ⊆ Out C₂xC₄:C₄	96	(C2xC4:C4).8S3	192,529
(C₂xC₄:C₄).₉S₃ = C₄:C₄.₂₃₁D₆	φ: S₃/C₃ → C₂ ⊆ Out C₂xC₄:C₄	96	(C2xC4:C4).9S3	192,530
(C₂xC₄:C₄).₁₀S₃ = C₁₂:(C₄:C₄)	φ: S₃/C₃ → C₂ ⊆ Out C₂xC₄:C₄	192	(C2xC4:C4).10S3	192,531
(C₂xC₄:C₄).₁₁S₃ = C₄.(D₆:C₄)	φ: S₃/C₃ → C₂ ⊆ Out C₂xC₄:C₄	192	(C2xC4:C4).11S3	192,532
(C₂xC₄:C₄).₁₂S₃ = (C₄xDic₃):₈C₄	φ: S₃/C₃ → C₂ ⊆ Out C₂xC₄:C₄	192	(C2xC4:C4).12S3	192,534
(C₂xC₄:C₄).₁₃S₃ = Dic₃:(C₄:C₄)	φ: S₃/C₃ → C₂ ⊆ Out C₂xC₄:C₄	192	(C2xC4:C4).13S3	192,535
(C₂xC₄:C₄).₁₄S₃ = (C₄xDic₃):₉C₄	φ: S₃/C₃ → C₂ ⊆ Out C₂xC₄:C₄	192	(C2xC4:C4).14S3	192,536
(C₂xC₄:C₄).₁₅S₃ = C₆.₆₇(C₄xD₄)	φ: S₃/C₃ → C₂ ⊆ Out C₂xC₄:C₄	192	(C2xC4:C4).15S3	192,537
(C₂xC₄:C₄).₁₆S₃ = (C₂xDic₃):Q₈	φ: S₃/C₃ → C₂ ⊆ Out C₂xC₄:C₄	192	(C2xC4:C4).16S3	192,538
(C₂xC₄:C₄).₁₇S₃ = C₄:C₄:₅Dic₃	φ: S₃/C₃ → C₂ ⊆ Out C₂xC₄:C₄	192	(C2xC4:C4).17S3	192,539
(C₂xC₄:C₄).₁₈S₃ = (C₂xC₄).₄₄D₁₂	φ: S₃/C₃ → C₂ ⊆ Out C₂xC₄:C₄	192	(C2xC4:C4).18S3	192,540
(C₂xC₄:C₄).₁₉S₃ = (C₂xC₁₂).₅₄D₄	φ: S₃/C₃ → C₂ ⊆ Out C₂xC₄:C₄	192	(C2xC4:C4).19S3	192,541
(C₂xC₄:C₄).₂₀S₃ = (C₂xDic₃).Q₈	φ: S₃/C₃ → C₂ ⊆ Out C₂xC₄:C₄	192	(C2xC4:C4).20S3	192,542
(C₂xC₄:C₄).₂₁S₃ = C₄:C₄:₆Dic₃	φ: S₃/C₃ → C₂ ⊆ Out C₂xC₄:C₄	192	(C2xC4:C4).21S3	192,543
(C₂xC₄:C₄).₂₂S₃ = (C₂xC₁₂).₂₈₈D₄	φ: S₃/C₃ → C₂ ⊆ Out C₂xC₄:C₄	192	(C2xC4:C4).22S3	192,544
(C₂xC₄:C₄).₂₃S₃ = (C₂xC₁₂).₅₅D₄	φ: S₃/C₃ → C₂ ⊆ Out C₂xC₄:C₄	192	(C2xC4:C4).23S3	192,545
(C₂xC₄:C₄).₂₄S₃ = C₂xC₁₂:Q₈	φ: S₃/C₃ → C₂ ⊆ Out C₂xC₄:C₄	192	(C2xC4:C4).24S3	192,1056
(C₂xC₄:C₄).₂₅S₃ = C₂xDic₃.Q₈	φ: S₃/C₃ → C₂ ⊆ Out C₂xC₄:C₄	192	(C2xC4:C4).25S3	192,1057
(C₂xC₄:C₄).₂₆S₃ = C₂xC₄.Dic₆	φ: S₃/C₃ → C₂ ⊆ Out C₂xC₄:C₄	192	(C2xC4:C4).26S3	192,1058
(C₂xC₄:C₄).₂₇S₃ = C₆.₇2₊¹⁺⁴	φ: S₃/C₃ → C₂ ⊆ Out C₂xC₄:C₄	96	(C2xC4:C4).27S3	192,1059
(C₂xC₄:C₄).₂₈S₃ = Dic₃xC₄:C₄	φ: trivial image	192	(C2xC4:C4).28S3	192,533
(C₂xC₄:C₄).₂₉S₃ = C₂xDic₆:C₄	φ: trivial image	192	(C2xC4:C4).29S3	192,1055

Extensions 1→N→G→Q→1 with N=C2xC4:C4 and Q=S3

Extensions 1→N→G→Q→1 with N=C₂xC₄:C₄ and Q=S₃