Extensions 1→N→G→Q→1 with N=C₃xC₆ and Q=C₄:C₄

Direct product G=NxQ with N=C₃xC₆ and Q=C₄:C₄

		d	ρ	Label	ID
C₄:C₄xC₃xC₆		288		C4:C4xC3xC6	288,813

Semidirect products G=N:Q with N=C₃xC₆ and Q=C₄:C₄

extension	φ:Q→Aut N	d	Label	ID
(C₃xC₆):₁(C₄:C₄) = C₂xC₃:S₃.Q₈	φ: C₄:C₄/C₂ → D₄ ⊆ Aut C₃xC₆	48	(C3xC6):1(C4:C4)	288,882
(C₃xC₆):₂(C₄:C₄) = C₂xC₂.PSU₃(F₂)	φ: C₄:C₄/C₂ → Q₈ ⊆ Aut C₃xC₆	48	(C3xC6):2(C4:C4)	288,894
(C₃xC₆):₃(C₄:C₄) = C₂xC₄:(C₃²:C₄)	φ: C₄:C₄/C₄ → C₄ ⊆ Aut C₃xC₆	48	(C3xC6):3(C4:C4)	288,933
(C₃xC₆):₄(C₄:C₄) = C₂xDic₃:Dic₃	φ: C₄:C₄/C₂² → C₂² ⊆ Aut C₃xC₆	96	(C3xC6):4(C4:C4)	288,613
(C₃xC₆):₅(C₄:C₄) = C₂xC₆².C₂²	φ: C₄:C₄/C₂² → C₂² ⊆ Aut C₃xC₆	96	(C3xC6):5(C4:C4)	288,615
(C₃xC₆):₆(C₄:C₄) = C₆xDic₃:C₄	φ: C₄:C₄/C₂xC₄ → C₂ ⊆ Aut C₃xC₆	96	(C3xC6):6(C4:C4)	288,694
(C₃xC₆):₇(C₄:C₄) = C₆xC₄:Dic₃	φ: C₄:C₄/C₂xC₄ → C₂ ⊆ Aut C₃xC₆	96	(C3xC6):7(C4:C4)	288,696
(C₃xC₆):₈(C₄:C₄) = C₂xC₆.Dic₆	φ: C₄:C₄/C₂xC₄ → C₂ ⊆ Aut C₃xC₆	288	(C3xC6):8(C4:C4)	288,780
(C₃xC₆):₉(C₄:C₄) = C₂xC₁₂:Dic₃	φ: C₄:C₄/C₂xC₄ → C₂ ⊆ Aut C₃xC₆	288	(C3xC6):9(C4:C4)	288,782

Non-split extensions G=N.Q with N=C₃xC₆ and Q=C₄:C₄

extension	φ:Q→Aut N	d	ρ	Label	ID
(C₃xC₆).₁(C₄:C₄) = C₃²:C₄:C₈	φ: C₄:C₄/C₂ → D₄ ⊆ Aut C₃xC₆	48	4	(C3xC6).1(C4:C4)	288,380
(C₃xC₆).₂(C₄:C₄) = C₄.₁₉S₃wrC₂	φ: C₄:C₄/C₂ → D₄ ⊆ Aut C₃xC₆	48	4	(C3xC6).2(C4:C4)	288,381
(C₃xC₆).₃(C₄:C₄) = C₆².D₄	φ: C₄:C₄/C₂ → D₄ ⊆ Aut C₃xC₆	48		(C3xC6).3(C4:C4)	288,385
(C₃xC₆).₄(C₄:C₄) = C₆².₆D₄	φ: C₄:C₄/C₂ → D₄ ⊆ Aut C₃xC₆	96		(C3xC6).4(C4:C4)	288,390
(C₃xC₆).₅(C₄:C₄) = C₆².₇D₄	φ: C₄:C₄/C₂ → D₄ ⊆ Aut C₃xC₆	96		(C3xC6).5(C4:C4)	288,391
(C₃xC₆).₆(C₄:C₄) = C₄.₄PSU₃(F₂)	φ: C₄:C₄/C₂ → Q₈ ⊆ Aut C₃xC₆	48	8	(C3xC6).6(C4:C4)	288,392
(C₃xC₆).₇(C₄:C₄) = C₄.PSU₃(F₂)	φ: C₄:C₄/C₂ → Q₈ ⊆ Aut C₃xC₆	48	8	(C3xC6).7(C4:C4)	288,393
(C₃xC₆).₈(C₄:C₄) = C₄.₂PSU₃(F₂)	φ: C₄:C₄/C₂ → Q₈ ⊆ Aut C₃xC₆	48	8	(C3xC6).8(C4:C4)	288,394
(C₃xC₆).₉(C₄:C₄) = C₆².Q₈	φ: C₄:C₄/C₂ → Q₈ ⊆ Aut C₃xC₆	48		(C3xC6).9(C4:C4)	288,395
(C₃xC₆).₁₀(C₄:C₄) = C₆².₂Q₈	φ: C₄:C₄/C₂ → Q₈ ⊆ Aut C₃xC₆	48	8-	(C3xC6).10(C4:C4)	288,396
(C₃xC₆).₁₁(C₄:C₄) = C₈:(C₃²:C₄)	φ: C₄:C₄/C₄ → C₄ ⊆ Aut C₃xC₆	48	4	(C3xC6).11(C4:C4)	288,416
(C₃xC₆).₁₂(C₄:C₄) = C₃:S₃.₄D₈	φ: C₄:C₄/C₄ → C₄ ⊆ Aut C₃xC₆	48	4	(C3xC6).12(C4:C4)	288,417
(C₃xC₆).₁₃(C₄:C₄) = (C₃xC₂₄).C₄	φ: C₄:C₄/C₄ → C₄ ⊆ Aut C₃xC₆	48	4	(C3xC6).13(C4:C4)	288,418
(C₃xC₆).₁₄(C₄:C₄) = C₈.(C₃²:C₄)	φ: C₄:C₄/C₄ → C₄ ⊆ Aut C₃xC₆	48	4	(C3xC6).14(C4:C4)	288,419
(C₃xC₆).₁₅(C₄:C₄) = (C₃xC₁₂):₄C₈	φ: C₄:C₄/C₄ → C₄ ⊆ Aut C₃xC₆	96		(C3xC6).15(C4:C4)	288,424
(C₃xC₆).₁₆(C₄:C₄) = C₃²:₅(C₄:C₈)	φ: C₄:C₄/C₄ → C₄ ⊆ Aut C₃xC₆	96		(C3xC6).16(C4:C4)	288,427
(C₃xC₆).₁₇(C₄:C₄) = (C₆xC₁₂):₂C₄	φ: C₄:C₄/C₄ → C₄ ⊆ Aut C₃xC₆	48		(C3xC6).17(C4:C4)	288,429
(C₃xC₆).₁₈(C₄:C₄) = C₁₂.₈₁D₁₂	φ: C₄:C₄/C₂² → C₂² ⊆ Aut C₃xC₆	96		(C3xC6).18(C4:C4)	288,219
(C₃xC₆).₁₉(C₄:C₄) = C₁₂.₁₅Dic₆	φ: C₄:C₄/C₂² → C₂² ⊆ Aut C₃xC₆	96		(C3xC6).19(C4:C4)	288,220
(C₃xC₆).₂₀(C₄:C₄) = C₁₂.Dic₆	φ: C₄:C₄/C₂² → C₂² ⊆ Aut C₃xC₆	96		(C3xC6).20(C4:C4)	288,221
(C₃xC₆).₂₁(C₄:C₄) = C₁₂.₆Dic₆	φ: C₄:C₄/C₂² → C₂² ⊆ Aut C₃xC₆	96		(C3xC6).21(C4:C4)	288,222
(C₃xC₆).₂₂(C₄:C₄) = C₆.₁₈D₂₄	φ: C₄:C₄/C₂² → C₂² ⊆ Aut C₃xC₆	96		(C3xC6).22(C4:C4)	288,223
(C₃xC₆).₂₃(C₄:C₄) = C₁₂.₈Dic₆	φ: C₄:C₄/C₂² → C₂² ⊆ Aut C₃xC₆	96		(C3xC6).23(C4:C4)	288,224
(C₃xC₆).₂₄(C₄:C₄) = C₁₂.₈₂D₁₂	φ: C₄:C₄/C₂² → C₂² ⊆ Aut C₃xC₆	48	4	(C3xC6).24(C4:C4)	288,225
(C₃xC₆).₂₅(C₄:C₄) = C₆².₅Q₈	φ: C₄:C₄/C₂² → C₂² ⊆ Aut C₃xC₆	48	4	(C3xC6).25(C4:C4)	288,226
(C₃xC₆).₂₆(C₄:C₄) = C₆².₆Q₈	φ: C₄:C₄/C₂² → C₂² ⊆ Aut C₃xC₆	96		(C3xC6).26(C4:C4)	288,227
(C₃xC₆).₂₇(C₄:C₄) = C₃xC₁₂:C₈	φ: C₄:C₄/C₂xC₄ → C₂ ⊆ Aut C₃xC₆	96		(C3xC6).27(C4:C4)	288,238
(C₃xC₆).₂₈(C₄:C₄) = C₃xC₆.Q₁₆	φ: C₄:C₄/C₂xC₄ → C₂ ⊆ Aut C₃xC₆	96		(C3xC6).28(C4:C4)	288,241
(C₃xC₆).₂₉(C₄:C₄) = C₃xC₁₂.Q₈	φ: C₄:C₄/C₂xC₄ → C₂ ⊆ Aut C₃xC₆	96		(C3xC6).29(C4:C4)	288,242
(C₃xC₆).₃₀(C₄:C₄) = C₃xDic₃:C₈	φ: C₄:C₄/C₂xC₄ → C₂ ⊆ Aut C₃xC₆	96		(C3xC6).30(C4:C4)	288,248
(C₃xC₆).₃₁(C₄:C₄) = C₃xC₈:Dic₃	φ: C₄:C₄/C₂xC₄ → C₂ ⊆ Aut C₃xC₆	96		(C3xC6).31(C4:C4)	288,251
(C₃xC₆).₃₂(C₄:C₄) = C₃xC₂₄:₁C₄	φ: C₄:C₄/C₂xC₄ → C₂ ⊆ Aut C₃xC₆	96		(C3xC6).32(C4:C4)	288,252
(C₃xC₆).₃₃(C₄:C₄) = C₃xC₂₄.C₄	φ: C₄:C₄/C₂xC₄ → C₂ ⊆ Aut C₃xC₆	48	2	(C3xC6).33(C4:C4)	288,253
(C₃xC₆).₃₄(C₄:C₄) = C₃xC₁₂.₅₃D₄	φ: C₄:C₄/C₂xC₄ → C₂ ⊆ Aut C₃xC₆	48	4	(C3xC6).34(C4:C4)	288,256
(C₃xC₆).₃₅(C₄:C₄) = C₃xC₆.C₄²	φ: C₄:C₄/C₂xC₄ → C₂ ⊆ Aut C₃xC₆	96		(C3xC6).35(C4:C4)	288,265
(C₃xC₆).₃₆(C₄:C₄) = C₁₂.₅₇D₁₂	φ: C₄:C₄/C₂xC₄ → C₂ ⊆ Aut C₃xC₆	288		(C3xC6).36(C4:C4)	288,279
(C₃xC₆).₃₇(C₄:C₄) = C₁₂.₉Dic₆	φ: C₄:C₄/C₂xC₄ → C₂ ⊆ Aut C₃xC₆	288		(C3xC6).37(C4:C4)	288,282
(C₃xC₆).₃₈(C₄:C₄) = C₁₂.₁₀Dic₆	φ: C₄:C₄/C₂xC₄ → C₂ ⊆ Aut C₃xC₆	288		(C3xC6).38(C4:C4)	288,283
(C₃xC₆).₃₉(C₄:C₄) = C₁₂.₃₀Dic₆	φ: C₄:C₄/C₂xC₄ → C₂ ⊆ Aut C₃xC₆	288		(C3xC6).39(C4:C4)	288,289
(C₃xC₆).₄₀(C₄:C₄) = C₂₄:₂Dic₃	φ: C₄:C₄/C₂xC₄ → C₂ ⊆ Aut C₃xC₆	288		(C3xC6).40(C4:C4)	288,292
(C₃xC₆).₄₁(C₄:C₄) = C₂₄:₁Dic₃	φ: C₄:C₄/C₂xC₄ → C₂ ⊆ Aut C₃xC₆	288		(C3xC6).41(C4:C4)	288,293
(C₃xC₆).₄₂(C₄:C₄) = C₁₂.₅₉D₁₂	φ: C₄:C₄/C₂xC₄ → C₂ ⊆ Aut C₃xC₆	144		(C3xC6).42(C4:C4)	288,294
(C₃xC₆).₄₃(C₄:C₄) = C₆².₈Q₈	φ: C₄:C₄/C₂xC₄ → C₂ ⊆ Aut C₃xC₆	144		(C3xC6).43(C4:C4)	288,297
(C₃xC₆).₄₄(C₄:C₄) = C₆².₁₅Q₈	φ: C₄:C₄/C₂xC₄ → C₂ ⊆ Aut C₃xC₆	288		(C3xC6).44(C4:C4)	288,306
(C₃xC₆).₄₅(C₄:C₄) = C₃²xC₂.C₄²	central extension (φ=1)	288		(C3xC6).45(C4:C4)	288,313
(C₃xC₆).₄₆(C₄:C₄) = C₃²xC₄:C₈	central extension (φ=1)	288		(C3xC6).46(C4:C4)	288,323
(C₃xC₆).₄₇(C₄:C₄) = C₃²xC₄.Q₈	central extension (φ=1)	288		(C3xC6).47(C4:C4)	288,324
(C₃xC₆).₄₈(C₄:C₄) = C₃²xC₂.D₈	central extension (φ=1)	288		(C3xC6).48(C4:C4)	288,325
(C₃xC₆).₄₉(C₄:C₄) = C₃²xC₈.C₄	central extension (φ=1)	144		(C3xC6).49(C4:C4)	288,326

Extensions 1→N→G→Q→1 with N=C3xC6 and Q=C4:C4

Extensions 1→N→G→Q→1 with N=C₃xC₆ and Q=C₄:C₄