Extensions 1→N→G→Q→1 with N=C₂xC₃:S₃ and Q=D₆

Direct product G=NxQ with N=C₂xC₃:S₃ and Q=D₆

		d	ρ	Label	ID
C₂²xS₃xC₃:S₃		72		C2^2xS3xC3:S3	432,768

Semidirect products G=N:Q with N=C₂xC₃:S₃ and Q=D₆

extension	φ:Q→Out N	d	ρ	Label	ID
(C₂xC₃:S₃):₁D₆ = C₃:S₃:D₁₂	φ: D₆/C₁ → D₆ ⊆ Out C₂xC₃:S₃	36	12+	(C2xC3:S3):1D6	432,301
(C₂xC₃:S₃):₂D₆ = C₁₂.₈₆S₃²	φ: D₆/C₁ → D₆ ⊆ Out C₂xC₃:S₃	36	6+	(C2xC3:S3):2D6	432,302
(C₂xC₃:S₃):₃D₆ = C₆²:₂D₆	φ: D₆/C₁ → D₆ ⊆ Out C₂xC₃:S₃	36	6	(C2xC3:S3):3D6	432,324
(C₂xC₃:S₃):₄D₆ = C₂xHe₃:₂D₄	φ: D₆/C₂ → S₃ ⊆ Out C₂xC₃:S₃	72		(C2xC3:S3):4D6	432,320
(C₂xC₃:S₃):₅D₆ = C₂xHe₃:₃D₄	φ: D₆/C₂ → S₃ ⊆ Out C₂xC₃:S₃	72		(C2xC3:S3):5D6	432,322
(C₂xC₃:S₃):₆D₆ = C₆²:D₆	φ: D₆/C₂ → S₃ ⊆ Out C₂xC₃:S₃	36	12+	(C2xC3:S3):6D6	432,323
(C₂xC₃:S₃):₇D₆ = C₂²xC₃²:D₆	φ: D₆/C₂ → S₃ ⊆ Out C₂xC₃:S₃	36		(C2xC3:S3):7D6	432,545
(C₂xC₃:S₃):₈D₆ = S₃xD₆:S₃	φ: D₆/C₃ → C₂² ⊆ Out C₂xC₃:S₃	48	8-	(C2xC3:S3):8D6	432,597
(C₂xC₃:S₃):₉D₆ = D₆:S₃²	φ: D₆/C₃ → C₂² ⊆ Out C₂xC₃:S₃	48	8-	(C2xC3:S3):9D6	432,600
(C₂xC₃:S₃):₁₀D₆ = C₃:S₃:₄D₁₂	φ: D₆/C₃ → C₂² ⊆ Out C₂xC₃:S₃	24	8+	(C2xC3:S3):10D6	432,602
(C₂xC₃:S₃):₁₁D₆ = C₁₂:₃S₃²	φ: D₆/C₃ → C₂² ⊆ Out C₂xC₃:S₃	48	4	(C2xC3:S3):11D6	432,691
(C₂xC₃:S₃):₁₂D₆ = S₃xC₃:D₁₂	φ: D₆/S₃ → C₂ ⊆ Out C₂xC₃:S₃	24	8+	(C2xC3:S3):12D6	432,598
(C₂xC₃:S₃):₁₃D₆ = (S₃xC₆):D₆	φ: D₆/S₃ → C₂ ⊆ Out C₂xC₃:S₃	24	8+	(C2xC3:S3):13D6	432,601
(C₂xC₃:S₃):₁₄D₆ = S₃xC₁₂:S₃	φ: D₆/S₃ → C₂ ⊆ Out C₂xC₃:S₃	72		(C2xC3:S3):14D6	432,671
(C₂xC₃:S₃):₁₅D₆ = C₁₂:S₃²	φ: D₆/S₃ → C₂ ⊆ Out C₂xC₃:S₃	72		(C2xC3:S3):15D6	432,673
(C₂xC₃:S₃):₁₆D₆ = S₃xC₃²:₇D₄	φ: D₆/S₃ → C₂ ⊆ Out C₂xC₃:S₃	72		(C2xC3:S3):16D6	432,684
(C₂xC₃:S₃):₁₇D₆ = C₆²:₂₃D₆	φ: D₆/S₃ → C₂ ⊆ Out C₂xC₃:S₃	36		(C2xC3:S3):17D6	432,686
(C₂xC₃:S₃):₁₈D₆ = C₂xS₃³	φ: D₆/S₃ → C₂ ⊆ Out C₂xC₃:S₃	24	8+	(C2xC3:S3):18D6	432,759
(C₂xC₃:S₃):₁₉D₆ = C₂xC₃³:₆D₄	φ: D₆/C₆ → C₂ ⊆ Out C₂xC₃:S₃	144		(C2xC3:S3):19D6	432,680
(C₂xC₃:S₃):₂₀D₆ = C₂xC₃³:₈D₄	φ: D₆/C₆ → C₂ ⊆ Out C₂xC₃:S₃	72		(C2xC3:S3):20D6	432,682
(C₂xC₃:S₃):₂₁D₆ = C₃:S₃xC₃:D₄	φ: D₆/C₆ → C₂ ⊆ Out C₂xC₃:S₃	72		(C2xC3:S3):21D6	432,685
(C₂xC₃:S₃):₂₂D₆ = C₂xC₃³:₉D₄	φ: D₆/C₆ → C₂ ⊆ Out C₂xC₃:S₃	48		(C2xC3:S3):22D6	432,694
(C₂xC₃:S₃):₂₃D₆ = C₆²:₂₄D₆	φ: D₆/C₆ → C₂ ⊆ Out C₂xC₃:S₃	24	4	(C2xC3:S3):23D6	432,696
(C₂xC₃:S₃):₂₄D₆ = C₂²xC₃²:₄D₆	φ: D₆/C₆ → C₂ ⊆ Out C₂xC₃:S₃	48		(C2xC3:S3):24D6	432,769

Non-split extensions G=N.Q with N=C₂xC₃:S₃ and Q=D₆

extension	φ:Q→Out N	d	ρ	Label	ID
(C₂xC₃:S₃).₁D₆ = C₁₂:S₃:S₃	φ: D₆/C₁ → D₆ ⊆ Out C₂xC₃:S₃	72	12+	(C2xC3:S3).1D6	432,295
(C₂xC₃:S₃).₂D₆ = C₁₂.₈₄S₃²	φ: D₆/C₁ → D₆ ⊆ Out C₂xC₃:S₃	72	6	(C2xC3:S3).2D6	432,296
(C₂xC₃:S₃).₃D₆ = C₆².₈D₆	φ: D₆/C₁ → D₆ ⊆ Out C₂xC₃:S₃	72	12-	(C2xC3:S3).3D6	432,318
(C₂xC₃:S₃).₄D₆ = C₆².₉D₆	φ: D₆/C₁ → D₆ ⊆ Out C₂xC₃:S₃	72	6	(C2xC3:S3).4D6	432,319
(C₂xC₃:S₃).₅D₆ = C₃:S₃:Dic₆	φ: D₆/C₂ → S₃ ⊆ Out C₂xC₃:S₃	72	12-	(C2xC3:S3).5D6	432,294
(C₂xC₃:S₃).₆D₆ = C₁₂.₉₁S₃²	φ: D₆/C₂ → S₃ ⊆ Out C₂xC₃:S₃	72	6	(C2xC3:S3).6D6	432,297
(C₂xC₃:S₃).₇D₆ = C₁₂.S₃²	φ: D₆/C₂ → S₃ ⊆ Out C₂xC₃:S₃	72	12-	(C2xC3:S3).7D6	432,299
(C₂xC₃:S₃).₈D₆ = C₄xC₃²:D₆	φ: D₆/C₂ → S₃ ⊆ Out C₂xC₃:S₃	36	6	(C2xC3:S3).8D6	432,300
(C₂xC₃:S₃).₉D₆ = C₂xC₆.S₃²	φ: D₆/C₂ → S₃ ⊆ Out C₂xC₃:S₃	72		(C2xC3:S3).9D6	432,317
(C₂xC₃:S₃).₁₀D₆ = C₃:S₃.₂D₁₂	φ: D₆/C₃ → C₂² ⊆ Out C₂xC₃:S₃	24	4	(C2xC3:S3).10D6	432,579
(C₂xC₃:S₃).₁₁D₆ = S₃²:Dic₃	φ: D₆/C₃ → C₂² ⊆ Out C₂xC₃:S₃	24	4	(C2xC3:S3).11D6	432,580
(C₂xC₃:S₃).₁₂D₆ = C₃³:C₄:C₄	φ: D₆/C₃ → C₂² ⊆ Out C₂xC₃:S₃	48	4	(C2xC3:S3).12D6	432,581
(C₂xC₃:S₃).₁₃D₆ = (C₃xC₆).₈D₁₂	φ: D₆/C₃ → C₂² ⊆ Out C₂xC₃:S₃	24	8+	(C2xC3:S3).13D6	432,586
(C₂xC₃:S₃).₁₄D₆ = (C₃xC₆).₉D₁₂	φ: D₆/C₃ → C₂² ⊆ Out C₂xC₃:S₃	48	8-	(C2xC3:S3).14D6	432,587
(C₂xC₃:S₃).₁₅D₆ = C₆.PSU₃(F₂)	φ: D₆/C₃ → C₂² ⊆ Out C₂xC₃:S₃	48	8	(C2xC3:S3).15D6	432,592
(C₂xC₃:S₃).₁₆D₆ = C₆.₂PSU₃(F₂)	φ: D₆/C₃ → C₂² ⊆ Out C₂xC₃:S₃	48	8	(C2xC3:S3).16D6	432,593
(C₂xC₃:S₃).₁₇D₆ = D₆.₄S₃²	φ: D₆/C₃ → C₂² ⊆ Out C₂xC₃:S₃	48	8-	(C2xC3:S3).17D6	432,608
(C₂xC₃:S₃).₁₈D₆ = D₆.₃S₃²	φ: D₆/C₃ → C₂² ⊆ Out C₂xC₃:S₃	24	8+	(C2xC3:S3).18D6	432,609
(C₂xC₃:S₃).₁₉D₆ = Dic₃.S₃²	φ: D₆/C₃ → C₂² ⊆ Out C₂xC₃:S₃	24	8+	(C2xC3:S3).19D6	432,612
(C₂xC₃:S₃).₂₀D₆ = C₆².₉₆D₆	φ: D₆/C₃ → C₂² ⊆ Out C₂xC₃:S₃	24	4	(C2xC3:S3).20D6	432,693
(C₂xC₃:S₃).₂₁D₆ = C₂xC₃³:D₄	φ: D₆/C₃ → C₂² ⊆ Out C₂xC₃:S₃	24	4	(C2xC3:S3).21D6	432,755
(C₂xC₃:S₃).₂₂D₆ = C₂xC₃²:₂D₁₂	φ: D₆/C₃ → C₂² ⊆ Out C₂xC₃:S₃	24	8+	(C2xC3:S3).22D6	432,756
(C₂xC₃:S₃).₂₃D₆ = C₂xC₃³:Q₈	φ: D₆/C₃ → C₂² ⊆ Out C₂xC₃:S₃	48	8	(C2xC3:S3).23D6	432,758
(C₂xC₃:S₃).₂₄D₆ = Dic₃xC₃²:C₄	φ: D₆/S₃ → C₂ ⊆ Out C₂xC₃:S₃	48	8-	(C2xC3:S3).24D6	432,567
(C₂xC₃:S₃).₂₅D₆ = D₆:(C₃²:C₄)	φ: D₆/S₃ → C₂ ⊆ Out C₂xC₃:S₃	24	8+	(C2xC3:S3).25D6	432,568
(C₂xC₃:S₃).₂₆D₆ = C₃³:(C₄:C₄)	φ: D₆/S₃ → C₂ ⊆ Out C₂xC₃:S₃	48	8-	(C2xC3:S3).26D6	432,569
(C₂xC₃:S₃).₂₇D₆ = S₃²xDic₃	φ: D₆/S₃ → C₂ ⊆ Out C₂xC₃:S₃	48	8-	(C2xC3:S3).27D6	432,594
(C₂xC₃:S₃).₂₈D₆ = S₃xC₆.D₆	φ: D₆/S₃ → C₂ ⊆ Out C₂xC₃:S₃	24	8+	(C2xC3:S3).28D6	432,595
(C₂xC₃:S₃).₂₉D₆ = Dic₃:₆S₃²	φ: D₆/S₃ → C₂ ⊆ Out C₂xC₃:S₃	48	8-	(C2xC3:S3).29D6	432,596
(C₂xC₃:S₃).₃₀D₆ = D₆:₄S₃²	φ: D₆/S₃ → C₂ ⊆ Out C₂xC₃:S₃	24	8+	(C2xC3:S3).30D6	432,599
(C₂xC₃:S₃).₃₁D₆ = C₃³:₅(C₂xQ₈)	φ: D₆/S₃ → C₂ ⊆ Out C₂xC₃:S₃	48	8-	(C2xC3:S3).31D6	432,604
(C₂xC₃:S₃).₃₂D₆ = D₆.S₃²	φ: D₆/S₃ → C₂ ⊆ Out C₂xC₃:S₃	48	8-	(C2xC3:S3).32D6	432,607
(C₂xC₃:S₃).₃₃D₆ = D₆.₆S₃²	φ: D₆/S₃ → C₂ ⊆ Out C₂xC₃:S₃	48	8-	(C2xC3:S3).33D6	432,611
(C₂xC₃:S₃).₃₄D₆ = C₁₂.₃₉S₃²	φ: D₆/S₃ → C₂ ⊆ Out C₂xC₃:S₃	72		(C2xC3:S3).34D6	432,664
(C₂xC₃:S₃).₃₅D₆ = C₁₂.₅₇S₃²	φ: D₆/S₃ → C₂ ⊆ Out C₂xC₃:S₃	144		(C2xC3:S3).35D6	432,668
(C₂xC₃:S₃).₃₆D₆ = C₆².₉₁D₆	φ: D₆/S₃ → C₂ ⊆ Out C₂xC₃:S₃	72		(C2xC3:S3).36D6	432,676
(C₂xC₃:S₃).₃₇D₆ = C₆².₉₃D₆	φ: D₆/S₃ → C₂ ⊆ Out C₂xC₃:S₃	72		(C2xC3:S3).37D6	432,678
(C₂xC₃:S₃).₃₈D₆ = C₂xS₃xC₃²:C₄	φ: D₆/S₃ → C₂ ⊆ Out C₂xC₃:S₃	24	8+	(C2xC3:S3).38D6	432,753
(C₂xC₃:S₃).₃₉D₆ = C₄xC₃³:C₄	φ: D₆/C₆ → C₂ ⊆ Out C₂xC₃:S₃	48	4	(C2xC3:S3).39D6	432,637
(C₂xC₃:S₃).₄₀D₆ = C₃³:₉(C₄:C₄)	φ: D₆/C₆ → C₂ ⊆ Out C₂xC₃:S₃	48	4	(C2xC3:S3).40D6	432,638
(C₂xC₃:S₃).₄₁D₆ = C₆²:₁₁Dic₃	φ: D₆/C₆ → C₂ ⊆ Out C₂xC₃:S₃	24	4	(C2xC3:S3).41D6	432,641
(C₂xC₃:S₃).₄₂D₆ = (C₃xD₁₂):S₃	φ: D₆/C₆ → C₂ ⊆ Out C₂xC₃:S₃	144		(C2xC3:S3).42D6	432,661
(C₂xC₃:S₃).₄₃D₆ = C₁₂.₄₀S₃²	φ: D₆/C₆ → C₂ ⊆ Out C₂xC₃:S₃	72		(C2xC3:S3).43D6	432,665
(C₂xC₃:S₃).₄₄D₆ = C₁₂.₇₃S₃²	φ: D₆/C₆ → C₂ ⊆ Out C₂xC₃:S₃	72		(C2xC3:S3).44D6	432,667
(C₂xC₃:S₃).₄₅D₆ = C₃:S₃:₄Dic₆	φ: D₆/C₆ → C₂ ⊆ Out C₂xC₃:S₃	48	4	(C2xC3:S3).45D6	432,687
(C₂xC₃:S₃).₄₆D₆ = C₁₂:S₃:₁₂S₃	φ: D₆/C₆ → C₂ ⊆ Out C₂xC₃:S₃	48	4	(C2xC3:S3).46D6	432,688
(C₂xC₃:S₃).₄₇D₆ = C₁₂.₉₅S₃²	φ: D₆/C₆ → C₂ ⊆ Out C₂xC₃:S₃	48	4	(C2xC3:S3).47D6	432,689
(C₂xC₃:S₃).₄₈D₆ = C₄xC₃²:₄D₆	φ: D₆/C₆ → C₂ ⊆ Out C₂xC₃:S₃	48	4	(C2xC3:S3).48D6	432,690
(C₂xC₃:S₃).₄₉D₆ = C₂xC₃³:₉(C₂xC₄)	φ: D₆/C₆ → C₂ ⊆ Out C₂xC₃:S₃	48		(C2xC3:S3).49D6	432,692
(C₂xC₃:S₃).₅₀D₆ = C₂²xC₃³:C₄	φ: D₆/C₆ → C₂ ⊆ Out C₂xC₃:S₃	48		(C2xC3:S3).50D6	432,766
(C₂xC₃:S₃).₅₁D₆ = C₃:S₃xDic₆	φ: trivial image	144		(C2xC3:S3).51D6	432,663
(C₂xC₃:S₃).₅₂D₆ = C₄xS₃xC₃:S₃	φ: trivial image	72		(C2xC3:S3).52D6	432,670
(C₂xC₃:S₃).₅₃D₆ = C₃:S₃xD₁₂	φ: trivial image	72		(C2xC3:S3).53D6	432,672
(C₂xC₃:S₃).₅₄D₆ = C₂xDic₃xC₃:S₃	φ: trivial image	144		(C2xC3:S3).54D6	432,677

Extensions 1→N→G→Q→1 with N=C2xC3:S3 and Q=D6

Extensions 1→N→G→Q→1 with N=C₂xC₃:S₃ and Q=D₆