Small groups by order

Order	Id	Structure decription	Group Name	Characteristic
1	[1, 1]	1	Trivial group
2	[2, 1]	C₂	Cyclic group	2
3	[3, 1]	C₃	Cyclic group	3
4	[4, 1]	C₄	Cyclic group	2
4	[4, 2]	C₂\(\times\)C₂	Klein 4-group V₄ = elementary abelian group of type [2, 2]	2
5	[5, 1]	C₅	Cyclic group	5
6	[6, 1]	S₃	Symmetric group on 3 letters	2, 3
6	[6, 2]	C₆	Cyclic group	2, 3
7	[7, 1]	C₇	Cyclic group	7
8	[8, 1]	C₈	Cyclic group	2
8	[8, 2]	C₄\(\times\)C₂	Abelian group of type [2, 4]	2
8	[8, 3]	D₈	Dihedral group	2
8	[8, 4]	Q₈	Quaternion group	2
8	[8, 5]	C₂\(\times\)C₂\(\times\)C₂	Elementary abelian group of type [2, 2,2]	2
9	[9, 1]	C₉	Cyclic group	3
9	[9, 2]	C₃\(\times\)C₃	Elementary abelian group of type [3, 3]	3
10	[10, 1]	D₁₀	Dihedral group	2, 5
10	[10, 2]	C₁₀	Cyclic group	2, 5
11	[11, 1]	C₁₁	Cyclic group	11
12	[12, 1]	C₃ \(\rtimes\) C₄	Dicyclic group	2, 3
12	[12, 2]	C₁₂	Cyclic group	2, 3
12	[12, 3]	A₄	Alternating group on 4 letters	2, 3
12	[12, 4]	D₁₂	Dihedral group	2, 3
12	[12, 5]	C₆\(\times\)C₂	Abelian group of type [2, 6]	2, 3
13	[13, 1]	C₁₃	Cyclic group	13
14	[14, 1]	D₁₄	Dihedral group	2, 7
14	[14, 2]	C₁₄	Cyclic group	2, 7
15	[15, 1]	C₁₅	Cyclic group	3, 5
16	[16, 1]	C₁₆	Cyclic group	2
16	[16, 2]	C₄\(\times\)C₄	Abelian group of type [4, 4]	2
16	[16, 3]	(C₄ \(\times\)C₂)\(\rtimes\) C₂	The semidirect product of C₂² and C₄ acting via C₄/C₂=C₂	2
16	[16, 4]	C₄ \(\rtimes\) C₄	The semidirect product of C₄ and C₄ acting via C₄/C₂=C₂	2
16	[16, 5]	C₈\(\times\)C₂	Abelian group of type [2, 8]	2
16	[16, 6]	C₈ \(\rtimes\) C₂	Modular maximal-cyclic group	2
16	[16, 7]	D₁₆	Dihedral group	2
16	[16, 8]	QD₁₆	Semidihedral group	2
16	[16, 9]	Q₁₆	Generalised quaternion group	2
16	[16, 10]	C₄\(\times\)C₂\(\times\)C₂	Abelian group of type [2, 2,4]	2
16	[16, 11]	C₂\(\times\)D₈	Direct product of C₂ and D₄	2
16	[16, 12]	C₂\(\times\)Q₈	Direct product of C₂ and Q₈	2
16	[16, 13]	(C₄ \(\times\)C₂)\(\rtimes\) C₂	Pauli group = central product of C₄ and D₄	2
16	[16, 14]	C₂\(\times\)C₂\(\times\)C₂\(\times\)C₂	Elementary abelian group of type [2, 2,2, 2]	2
17	[17, 1]	C₁₇	Cyclic group	17
18	[18, 1]	D₁₈	Dihedral group	2, 3
18	[18, 2]	C₁₈	Cyclic group	2, 3
18	[18, 3]	C₃\(\times\)S₃	Direct product of C₃ and S₃	2, 3
18	[18, 4]	(C₃ \(\times\)C₃)\(\rtimes\) C₂	The semidirect product of C₃ and S₃ acting via S₃/C₃=C₂	2, 3
18	[18, 5]	C₆\(\times\)C₃	Abelian group of type [3, 6]	2, 3
19	[19, 1]	C₁₉	Cyclic group	19
20	[20, 1]	C₅ \(\rtimes\) C₄	Dicyclic group	2, 5
20	[20, 2]	C₂₀	Cyclic group	2, 5
20	[20, 3]	C₅ \(\rtimes\) C₄	Frobenius group	2, 5
20	[20, 4]	D₂₀	Dihedral group	2, 5
20	[20, 5]	C₁₀\(\times\)C₂	Abelian group of type [2, 10]	2, 5
21	[21, 1]	C₇ \(\rtimes\) C₃	The semidirect product of C₇ and C₃ acting faithfully	3, 7
21	[21, 2]	C₂₁	Cyclic group	3, 7
22	[22, 1]	D₂₂	Dihedral group	2, 11
22	[22, 2]	C₂₂	Cyclic group	2, 11
23	[23, 1]	C₂₃	Cyclic group	23
24	[24, 1]	C₃ \(\rtimes\) C₈	The semidirect product of C₃ and C₈ acting via C₈/C₄=C₂	2, 3
24	[24, 2]	C₂₄	Cyclic group	2, 3
24	[24, 3]	SL(2, 3)	Special linear group on 𝔽₃²	2, 3
24	[24, 4]	C₃ \(\rtimes\) Q₈	Dicyclic group	2, 3
24	[24, 5]	C₄\(\times\)S₃	Direct product of C₄ and S₃	2, 3
24	[24, 6]	D₂₄	Dihedral group	2, 3
24	[24, 7]	C₂\(\times\)(C₃ \(\rtimes\) C₄)	Direct product of C₂ and Dic₃	2, 3
24	[24, 8]	(C₆ \(\times\)C₂)\(\rtimes\) C₂	The semidirect product of C₃ and D₄ acting via D₄/C₂²=C₂	2, 3
24	[24, 9]	C₁₂\(\times\)C₂	Abelian group of type [2, 12]	2, 3
24	[24, 10]	C₃\(\times\)D₈	Direct product of C₃ and D₄	2, 3
24	[24, 11]	C₃\(\times\)Q₈	Direct product of C₃ and Q₈	2, 3
24	[24, 12]	S₄	Symmetric group on 4 letters	2, 3
24	[24, 13]	C₂\(\times\)A₄	Direct product of C₂ and A₄	2, 3
24	[24, 14]	C₂\(\times\)C₂\(\times\)S₃	Direct product of C₂² and S₃	2, 3
24	[24, 15]	C₆\(\times\)C₂\(\times\)C₂	Abelian group of type [2, 2,6]	2, 3
25	[25, 1]	C₂₅	Cyclic group	5
25	[25, 2]	C₅\(\times\)C₅	Elementary abelian group of type [5, 5]	5
26	[26, 1]	D₂₆	Dihedral group	2, 13
26	[26, 2]	C₂₆	Cyclic group	2, 13
27	[27, 1]	C₂₇	Cyclic group	3
27	[27, 2]	C₉\(\times\)C₃	Abelian group of type [3, 9]	3
27	[27, 3]	(C₃ \(\times\)C₃)\(\rtimes\) C₃	Heisenberg group	3
27	[27, 4]	C₉ \(\rtimes\) C₃	Extraspecial group	3
27	[27, 5]	C₃\(\times\)C₃\(\times\)C₃	Elementary abelian group of type [3, 3,3]	3
28	[28, 1]	C₇ \(\rtimes\) C₄	Dicyclic group	2, 7
28	[28, 2]	C₂₈	Cyclic group	2, 7
28	[28, 3]	D₂₈	Dihedral group	2, 7
28	[28, 4]	C₁₄\(\times\)C₂	Abelian group of type [2, 14]	2, 7
29	[29, 1]	C₂₉	Cyclic group	29
30	[30, 1]	C₅\(\times\)S₃	Direct product of C₅ and S₃	2, 3, 5
30	[30, 2]	C₃\(\times\)D₁₀	Direct product of C₃ and D₅	2, 3, 5
30	[30, 3]	D₃₀	Dihedral group	2, 3, 5
30	[30, 4]	C₃₀	Cyclic group	2, 3, 5
31	[31, 1]	C₃₁	Cyclic group	31
32	[32, 1]	C₃₂	Cyclic group	2
32	[32, 2]	(C₄ \(\times\)C₂)\(\rtimes\) C₄	1st central stem extension by C₂ of C₄₂	2
32	[32, 3]	C₈\(\times\)C₄	Abelian group of type [4, 8]	2
32	[32, 4]	C₈ \(\rtimes\) C₄	3rd semidirect product of C₈ and C₄ acting via C₄/C₂=C₂	2
32	[32, 5]	(C₈ \(\times\)C₂)\(\rtimes\) C₂	The semidirect product of C₂² and C₈ acting via C₈/C₄=C₂	2
32	[32, 6]	(C₂ \(\times\)C₂\(\times\)C₂)\(\rtimes\) C₄	The semidirect product of C₂₃ and C₄ acting faithfully	2
32	[32, 7]	(C₈ \(\rtimes\) C₂)\(\rtimes\) C₂	1st non-split extension by C₄ of D₄ acting via D₄/C₂²=C₂	2
32	[32, 8]	C₂.((C₄\(\times\)C₂)\(\rtimes\) C₂)= (C₂ \(\times\)C₂). (C₄ \(\times\)C₂)	2nd non-split extension by C₄ of D₄ acting via D₄/C₂²=C₂	2
32	[32, 9]	(C₈ \(\times\)C₂)\(\rtimes\) C₂	1st semidirect product of D₄ and C₄ acting via C₄/C₂=C₂	2
32	[32, 10]	Q₈ \(\rtimes\) C₄	1st semidirect product of Q₈ and C₄ acting via C₄/C₂=C₂	2
32	[32, 11]	(C₄ \(\times\)C₄)\(\rtimes\) C₂	Wreath product of C₄ by C₂	2
32	[32, 12]	C₄ \(\rtimes\) C₈	The semidirect product of C₄ and C₈ acting via C₈/C₄=C₂	2
32	[32, 13]	C₈ \(\rtimes\) C₄	1st non-split extension by C₄ of Q₈ acting via Q₈/C₄=C₂	2
32	[32, 14]	C₈ \(\rtimes\) C₄	2nd central extension by C₂ of D₈	2
32	[32, 15]	C₄.D₈ = C₄.(C₄ \(\times\)C₂)	1st non-split extension by C₈ of C₄ acting via C₄/C₂=C₂	2
32	[32, 16]	C₁₆\(\times\)C₂	Abelian group of type [2, 16]	2
32	[32, 17]	C₁₆ \(\rtimes\) C₂	Modular maximal-cyclic group	2
32	[32, 18]	D₃₂	Dihedral group	2
32	[32, 19]	QD₃₂	Semidihedral group	2
32	[32, 20]	Q₃₂	Generalised quaternion group	2
32	[32, 21]	C₄\(\times\)C₄\(\times\)C₂	Abelian group of type [2, 4,4]	2
32	[32, 22]	C₂\(\times\)((C₄\(\times\)C₂)\(\rtimes\) C₂)	Direct product of C₂ and C₂²\(\rtimes\)C₄	2
32	[32, 23]	C₂\(\times\)(C₄ \(\rtimes\) C₄)	Direct product of C₂ and C₄\(\rtimes\)C₄	2
32	[32, 24]	(C₄ \(\times\)C₄)\(\rtimes\) C₂	1st semidirect product of C₄₂ and C₂ acting faithfully	2
32	[32, 25]	C₄\(\times\)D₈	Direct product of C₄ and D₄	2
32	[32, 26]	C₄\(\times\)Q₈	Direct product of C₄ and Q₈	2
32	[32, 27]	(C₂ \(\times\)C₂\(\times\)C₂\(\times\)C₂)\(\rtimes\) C₂	Wreath product of C₂² by C₂	2
32	[32, 28]	(C₄ \(\times\)C₂\(\times\)C₂)\(\rtimes\) C₂	The semidirect product of C₄ and D₄ acting via D₄/C₂²=C₂	2
32	[32, 29]	(C₂ \(\times\)Q₈)\(\rtimes\) C₂	The semidirect product of C₂² and Q₈ acting via Q₈/C₄=C₂	2
32	[32, 30]	(C₄ \(\times\)C₂\(\times\)C₂)\(\rtimes\) C₂	3rd non-split extension by C₂² of D₄ acting via D₄/C₂²=C₂	2
32	[32, 31]	(C₄ \(\times\)C₄)\(\rtimes\) C₂	4th non-split extension by C₄ of D₄ acting via D₄/C₄=C₂	2
32	[32, 32]	(C₂ \(\times\)C₂). (C₂ \(\times\)C₂\(\times\)C₂)	4th non-split extension by C₄₂ of C₂ acting faithfully	2
32	[32, 33]	(C₄ \(\times\)C₄)\(\rtimes\) C₂	2nd semidirect product of C₄₂ and C₂ acting faithfully	2
32	[32, 34]	(C₄ \(\times\)C₄)\(\rtimes\) C₂	The semidirect product of C₄ and D₄ acting via D₄/C₄=C₂	2
32	[32, 35]	C₄ \(\rtimes\) Q₈	The semidirect product of C₄ and Q₈ acting via Q₈/C₄=C₂	2
32	[32, 36]	C₈\(\times\)C₂\(\times\)C₂	Abelian group of type [2, 2,8]	2
32	[32, 37]	C₂\(\times\)(C₈ \(\rtimes\) C₂)	Direct product of C₂ and M₄(2)	2
32	[32, 38]	(C₈ \(\times\)C₂)\(\rtimes\) C₂	Central product of C₈ and D₄	2
32	[32, 39]	C₂\(\times\)D₁₆	Direct product of C₂ and D₈	2
32	[32, 40]	C₂\(\times\)QD₁₆	Direct product of C₂ and SD₁₆	2
32	[32, 41]	C₂\(\times\)Q₁₆	Direct product of C₂ and Q₁₆	2
32	[32, 42]	(C₈ \(\times\)C₂)\(\rtimes\) C₂	Central product of C₄ and D₈	2
32	[32, 43]	C₈ \(\rtimes\) (C₂ \(\times\)C₂)	The semidirect product of C₈ and C₂² acting faithfully	2
32	[32, 44]	(C₂ \(\times\)Q₈)\(\rtimes\) C₂	The non-split extension by C₈ of C₂² acting faithfully	2
32	[32, 45]	C₄\(\times\)C₂\(\times\)C₂\(\times\)C₂	Abelian group of type [2, 2,2, 4]	2
32	[32, 46]	C₂\(\times\)C₂\(\times\)D₈	Direct product of C₂² and D₄	2
32	[32, 47]	C₂\(\times\)C₂\(\times\)Q₈	Direct product of C₂² and Q₈	2
32	[32, 48]	C₂\(\times\)((C₄\(\times\)C₂)\(\rtimes\) C₂)	Direct product of C₂ and C₄○D₄	2
32	[32, 49]	(C₂ \(\times\)C₂\(\times\)C₂)\(\rtimes\) (C₂ \(\times\)C₂)	Extraspecial group	2
32	[32, 50]	(C₂ \(\times\)Q₈)\(\rtimes\) C₂	Gamma matrices = Extraspecial group	2
32	[32, 51]	C₂\(\times\)C₂\(\times\)C₂\(\times\)C₂\(\times\)C₂	Elementary abelian group of type [2, 2,2, 2,2]	2
33	[33, 1]	C₃₃	Cyclic group	3, 11
34	[34, 1]	D₃₄	Dihedral group	2, 17
34	[34, 2]	C₃₄	Cyclic group	2, 17
35	[35, 1]	C₃₅	Cyclic group	5, 7
36	[36, 1]	C₉ \(\rtimes\) C₄	Dicyclic group	2, 3
36	[36, 2]	C₃₆	Cyclic group	2, 3
36	[36, 3]	(C₂ \(\times\)C₂)\(\rtimes\) C₉	The central extension by C₃ of A₄	2, 3
36	[36, 4]	D₃₆	Dihedral group	2, 3
36	[36, 5]	C₁₈\(\times\)C₂	Abelian group of type [2, 18]	2, 3
36	[36, 6]	C₃\(\times\)(C₃ \(\rtimes\) C₄)	Direct product of C₃ and Dic₃	2, 3
36	[36, 7]	(C₃ \(\times\)C₃)\(\rtimes\) C₄	The semidirect product of C₃ and Dic₃ acting via Dic₃/C₆=C₂	2, 3
36	[36, 8]	C₁₂\(\times\)C₃	Abelian group of type [3, 12]	2, 3
36	[36, 9]	(C₃ \(\times\)C₃)\(\rtimes\) C₄	The semidirect product of C₃₂ and C₄ acting faithfully	2, 3
36	[36, 10]	S₃\(\times\)S₃	Direct product of S₃ and S₃	2, 3
36	[36, 11]	C₃\(\times\)A₄	Direct product of C₃ and A₄	2, 3
36	[36, 12]	C₆\(\times\)S₃	Direct product of C₆ and S₃	2, 3
36	[36, 13]	C₂\(\times\)((C₃\(\times\)C₃)\(\rtimes\) C₂)	Direct product of C₂ and C₃\(\rtimes\)S₃	2, 3
36	[36, 14]	C₆\(\times\)C₆	Abelian group of type [6, 6]	2, 3
37	[37, 1]	C₃₇	Cyclic group	37
38	[38, 1]	D₃₈	Dihedral group	2, 19
38	[38, 2]	C₃₈	Cyclic group	2, 19
39	[39, 1]	C₁₃ \(\rtimes\) C₃	The semidirect product of C₁₃ and C₃ acting faithfully	3, 13
39	[39, 2]	C₃₉	Cyclic group	3, 13
40	[40, 1]	C₅ \(\rtimes\) C₈	The semidirect product of C₅ and C₈ acting via C₈/C₄=C₂	2, 5
40	[40, 2]	C₄₀	Cyclic group	2, 5
40	[40, 3]	C₅ \(\rtimes\) C₈	The semidirect product of C₅ and C₈ acting via C₈/C₂=C₄	2, 5
40	[40, 4]	C₅ \(\rtimes\) Q₈	Dicyclic group	2, 5
40	[40, 5]	C₄\(\times\)D₁₀	Direct product of C₄ and D₅	2, 5
40	[40, 6]	D₄₀	Dihedral group	2, 5
40	[40, 7]	C₂\(\times\)(C₅ \(\rtimes\) C₄)	Direct product of C₂ and Dic₅	2, 5
40	[40, 8]	(C₁₀ \(\times\)C₂)\(\rtimes\) C₂	The semidirect product of C₅ and D₄ acting via D₄/C₂²=C₂	2, 5
40	[40, 9]	C₂₀\(\times\)C₂	Abelian group of type [2, 20]	2, 5
40	[40, 10]	C₅\(\times\)D₈	Direct product of C₅ and D₄	2, 5
40	[40, 11]	C₅\(\times\)Q₈	Direct product of C₅ and Q₈	2, 5
40	[40, 12]	C₂\(\times\)(C₅ \(\rtimes\) C₄)	Direct product of C₂ and F₅	2, 5
40	[40, 13]	C₂\(\times\)C₂\(\times\)D₁₀	Direct product of C₂² and D₅	2, 5
40	[40, 14]	C₁₀\(\times\)C₂\(\times\)C₂	Abelian group of type [2, 2,10]	2, 5
41	[41, 1]	C₄₁	Cyclic group	41
42	[42, 1]	C₇ \(\rtimes\) C₆	Frobenius group	2, 3, 7
42	[42, 2]	C₂\(\times\)(C₇ \(\rtimes\) C₃)	Direct product of C₂ and C₇\(\rtimes\)C₃	2, 3, 7
42	[42, 3]	C₇\(\times\)S₃	Direct product of C₇ and S₃	2, 3, 7
42	[42, 4]	C₃\(\times\)D₁₄	Direct product of C₃ and D₇	2, 3, 7
42	[42, 5]	D₄₂	Dihedral group	2, 3, 7
42	[42, 6]	C₄₂	Cyclic group	2, 3, 7
43	[43, 1]	C₄₃	Cyclic group	43
44	[44, 1]	C₁₁ \(\rtimes\) C₄	Dicyclic group	2, 11
44	[44, 2]	C₄₄	Cyclic group	2, 11
44	[44, 3]	D₄₄	Dihedral group	2, 11
44	[44, 4]	C₂²\(\times\)C₂	Abelian group of type [2, 22]	2, 11
45	[45, 1]	C₄₅	Cyclic group	3, 5
45	[45, 2]	C₁₅\(\times\)C₃	Abelian group of type [3, 15]	3, 5
46	[46, 1]	D₄₆	Dihedral group	2, 23
46	[46, 2]	C₄₆	Cyclic group	2, 23
47	[47, 1]	C₄₇	Cyclic group	47
48	[48, 1]	C₃ \(\rtimes\) C₁₆	The semidirect product of C₃ and C₁₆ acting via C₁₆/C₈=C₂	2, 3
48	[48, 2]	C₄₈	Cyclic group	2, 3
48	[48, 3]	(C₄ \(\times\)C₄)\(\rtimes\) C₃	The semidirect product of C₄₂ and C₃ acting faithfully	2, 3
48	[48, 4]	C₈\(\times\)S₃	Direct product of C₈ and S₃	2, 3
48	[48, 5]	C₂₄ \(\rtimes\) C₂	3rd semidirect product of C₈ and S₃ acting via S₃/C₃=C₂	2, 3
48	[48, 6]	C₂₄ \(\rtimes\) C₂	2nd semidirect product of C₂₄ and C₂ acting faithfully	2, 3
48	[48, 7]	D₄₈	Dihedral group	2, 3
48	[48, 8]	C₃ \(\rtimes\) Q₁₆	Dicyclic group	2, 3
48	[48, 9]	C₂\(\times\)(C₃ \(\rtimes\) C₈)	Direct product of C₂ and C₃\(\rtimes\)C₈	2, 3
48	[48, 10]	(C₃ \(\rtimes\) C₈)\(\rtimes\) C₂	The non-split extension by C₄ of Dic₃ acting via Dic₃/C₆=C₂	2, 3
48	[48, 11]	C₄\(\times\)(C₃ \(\rtimes\) C₄)	Direct product of C₄ and Dic₃	2, 3
48	[48, 12]	(C₃ \(\rtimes\) C₄)\(\rtimes\) C₄	The semidirect product of Dic₃ and C₄ acting via C₄/C₂=C₂	2, 3
48	[48, 13]	C₁₂ \(\rtimes\) C₄	The semidirect product of C₄ and Dic₃ acting via Dic₃/C₆=C₂	2, 3
48	[48, 14]	(C₁₂ \(\times\)C₂)\(\rtimes\) C₂	The semidirect product of D₆ and C₄ acting via C₄/C₂=C₂	2, 3
48	[48, 15]	(C₃ \(\times\)D₈)\(\rtimes\) C₂	The semidirect product of D₄ and S₃ acting via S₃/C₃=C₂	2, 3
48	[48, 16]	(C₃ \(\rtimes\) Q₈)\(\rtimes\) C₂	The non-split extension by D₄ of S₃ acting via S₃/C₃=C₂	2, 3
48	[48, 17]	(C₃ \(\times\)Q₈)\(\rtimes\) C₂	The semidirect product of Q₈ and S₃ acting via S₃/C₃=C₂	2, 3
48	[48, 18]	C₃ \(\rtimes\) Q₁₆	The semidirect product of C₃ and Q₁₆ acting via Q₁₆/Q₈=C₂	2, 3
48	[48, 19]	(C₆ \(\times\)C₂)\(\rtimes\) C₄	7th non-split extension by C₆ of D₄ acting via D₄/C₂²=C₂	2, 3
48	[48, 20]	C₁₂\(\times\)C₄	Abelian group of type [4, 12]	2, 3
48	[48, 21]	C₃\(\times\)((C₄\(\times\)C₂)\(\rtimes\) C₂)	Direct product of C₃ and C₂²\(\rtimes\)C₄	2, 3
48	[48, 22]	C₃\(\times\)(C₄ \(\rtimes\) C₄)	Direct product of C₃ and C₄\(\rtimes\)C₄	2, 3
48	[48, 23]	C₂₄\(\times\)C₂	Abelian group of type [2, 24]	2, 3
48	[48, 24]	C₃\(\times\)(C₈ \(\rtimes\) C₂)	Direct product of C₃ and M₄(2)	2, 3
48	[48, 25]	C₃\(\times\)D₁₆	Direct product of C₃ and D₈	2, 3
48	[48, 26]	C₃\(\times\)QD₁₆	Direct product of C₃ and SD₁₆	2, 3
48	[48, 27]	C₃\(\times\)Q₁₆	Direct product of C₃ and Q₁₆	2, 3
48	[48, 28]	C₂.S₄ = SL(2, 3).C₂	Conformal special unitary group on 𝔽₃²	2, 3
48	[48, 29]	GL₂(𝔽₃)	General linear group on 𝔽₃²	2, 3
48	[48, 30]	A₄ \(\rtimes\) C₄	The semidirect product of A₄ and C₄ acting via C₄/C₂=C₂	2, 3
48	[48, 31]	C₄\(\times\)A₄	Direct product of C₄ and A₄	2, 3
48	[48, 32]	C₂\(\times\)SL(2, 3)	Direct product of C₂ and SL₂(𝔽₃)	2, 3
48	[48, 33]	((C₄\(\times\)C₂)\(\rtimes\) C₂)\(\rtimes\) C₃	The central extension by C₄ of A₄	2, 3
48	[48, 34]	C₂\(\times\)(C₃ \(\rtimes\) Q₈)	Direct product of C₂ and Dic₆	2, 3
48	[48, 35]	C₂\(\times\)C₄\(\times\)S₃	Direct product of C₂×C₄ and S₃	2, 3
48	[48, 36]	C₂\(\times\)D₂₄	Direct product of C₂ and D₁₂	2, 3
48	[48, 37]	(C₁₂ \(\times\)C₂)\(\rtimes\) C₂	Central product of C₄ and D₁₂	2, 3
48	[48, 38]	D₈\(\times\)S₃	Direct product of S₃ and D₄	2, 3
48	[48, 39]	(C₄ \(\times\)S₃)\(\rtimes\) C₂	The semidirect product of D₄ and S₃ acting through Inn(D₄)	2, 3
48	[48, 40]	Q₈\(\times\)S₃	Direct product of S₃ and Q₈	2, 3
48	[48, 41]	(C₄ \(\times\)S₃)\(\rtimes\) C₂	The semidirect product of Q₈ and S₃ acting through Inn(Q₈)	2, 3
48	[48, 42]	C₂\(\times\)C₂\(\times\)(C₃ \(\rtimes\) C₄)	Direct product of C₂² and Dic₃	2, 3
48	[48, 43]	C₂\(\times\)((C₆\(\times\)C₂)\(\rtimes\) C₂)	Direct product of C₂ and C₃\(\rtimes\)D₄	2, 3
48	[48, 44]	C₁₂\(\times\)C₂\(\times\)C₂	Abelian group of type [2, 2,12]	2, 3
48	[48, 45]	C₆\(\times\)D₈	Direct product of C₆ and D₄	2, 3
48	[48, 46]	C₆\(\times\)Q₈	Direct product of C₆ and Q₈	2, 3
48	[48, 47]	C₃\(\times\)((C₄\(\times\)C₂)\(\rtimes\) C₂)	Direct product of C₃ and C₄○D₄	2, 3
48	[48, 48]	C₂\(\times\)S₄	Direct product of C₂ and S₄	2, 3
48	[48, 49]	C₂\(\times\)C₂\(\times\)A₄	Direct product of C₂² and A₄	2, 3
48	[48, 50]	(C₂ \(\times\)C₂\(\times\)C₂\(\times\)C₂)\(\rtimes\) C₃	The semidirect product of C₂² and A₄ acting via A₄/C₂²=C₃	2, 3
48	[48, 51]	C₂\(\times\)C₂\(\times\)C₂\(\times\)S₃	Direct product of C₂₃ and S₃	2, 3
48	[48, 52]	C₆\(\times\)C₂\(\times\)C₂\(\times\)C₂	Abelian group of type [2, 2,2, 6]	2, 3
49	[49, 1]	C₄₉	Cyclic group	7
49	[49, 2]	C₇\(\times\)C₇	Elementary abelian group of type [7, 7]	7
50	[50, 1]	D₅₀	Dihedral group	2, 5
50	[50, 2]	C₅₀	Cyclic group	2, 5
50	[50, 3]	C₅\(\times\)D₁₀	Direct product of C₅ and D₅	2, 5
50	[50, 4]	(C₅ \(\times\)C₅)\(\rtimes\) C₂	The semidirect product of C₅ and D₅ acting via D₅/C₅=C₂	2, 5
50	[50, 5]	C₁₀\(\times\)C₅	Abelian group of type [5, 10]	2, 5
51	[51, 1]	C₅₁	Cyclic group	3, 17
52	[52, 1]	C₁₃ \(\rtimes\) C₄	Dicyclic group	2, 13
52	[52, 2]	C₅₂	Cyclic group	2, 13
52	[52, 3]	C₁₃ \(\rtimes\) C₄	The semidirect product of C₁₃ and C₄ acting faithfully	2, 13
52	[52, 4]	D₅₂	Dihedral group	2, 13
52	[52, 5]	C₂₆\(\times\)C₂	Abelian group of type [2, 26]	2, 13
53	[53, 1]	C₅₃	Cyclic group	53
54	[54, 1]	D₅₄	Dihedral group	2, 3
54	[54, 2]	C₅₄	Cyclic group	2, 3
54	[54, 3]	C₃\(\times\)D₁₈	Direct product of C₃ and D₉	2, 3
54	[54, 4]	C₉\(\times\)S₃	Direct product of C₉ and S₃	2, 3
54	[54, 5]	(C₃ \(\times\)C₃)\(\rtimes\) C₆	The semidirect product of C₃₂ and C₆ acting faithfully	2, 3
54	[54, 6]	C₉ \(\rtimes\) C₆	The semidirect product of C₉ and C₆ acting faithfully	2, 3
54	[54, 7]	(C₉ \(\times\)C₃)\(\rtimes\) C₂	The semidirect product of C₉ and S₃ acting via S₃/C₃=C₂	2, 3
54	[54, 8]	((C₃\(\times\)C₃)\(\rtimes\) C₃)\(\rtimes\) C₂	2nd semidirect product of He3 and C₂ acting faithfully	2, 3
54	[54, 9]	C₁₈\(\times\)C₃	Abelian group of type [3, 18]	2, 3
54	[54, 10]	C₂\(\times\)((C₃\(\times\)C₃)\(\rtimes\) C₃)	Direct product of C₂ and He3	2, 3
54	[54, 11]	C₂\(\times\)(C₉ \(\rtimes\) C₃)	Direct product of C₂ and 3¹⁺²	2, 3
54	[54, 12]	C₃\(\times\)C₃\(\times\)S₃	Direct product of C₃₂ and S₃	2, 3
54	[54, 13]	C₃\(\times\)((C₃\(\times\)C₃)\(\rtimes\) C₂)	Direct product of C₃ and C₃\(\rtimes\)S₃	2, 3
54	[54, 14]	(C₃ \(\times\)C₃\(\times\)C₃)\(\rtimes\) C₂	3rd semidirect product of C₃₃ and C₂ acting faithfully	2, 3
54	[54, 15]	C₆\(\times\)C₃\(\times\)C₃	Abelian group of type [3, 3,6]	2, 3
55	[55, 1]	C₁₁ \(\rtimes\) C₅	The semidirect product of C₁₁ and C₅ acting faithfully	5, 11
55	[55, 2]	C₅₅	Cyclic group	5, 11
56	[56, 1]	C₇ \(\rtimes\) C₈	The semidirect product of C₇ and C₈ acting via C₈/C₄=C₂	2, 7
56	[56, 2]	C₅₆	Cyclic group	2, 7
56	[56, 3]	C₇ \(\rtimes\) Q₈	Dicyclic group	2, 7
56	[56, 4]	C₄\(\times\)D₁₄	Direct product of C₄ and D₇	2, 7
56	[56, 5]	D₅₆	Dihedral group	2, 7
56	[56, 6]	C₂\(\times\)(C₇ \(\rtimes\) C₄)	Direct product of C₂ and Dic₇	2, 7
56	[56, 7]	(C₁₄ \(\times\)C₂)\(\rtimes\) C₂	The semidirect product of C₇ and D₄ acting via D₄/C₂²=C₂	2, 7
56	[56, 8]	C₂₈\(\times\)C₂	Abelian group of type [2, 28]	2, 7
56	[56, 9]	C₇\(\times\)D₈	Direct product of C₇ and D₄	2, 7
56	[56, 10]	C₇\(\times\)Q₈	Direct product of C₇ and Q₈	2, 7
56	[56, 11]	(C₂ \(\times\)C₂\(\times\)C₂)\(\rtimes\) C₇	Frobenius group	2, 7
56	[56, 12]	C₂\(\times\)C₂\(\times\)D₁₄	Direct product of C₂² and D₇	2, 7
56	[56, 13]	C₁₄\(\times\)C₂\(\times\)C₂	Abelian group of type [2, 2,14]	2, 7
57	[57, 1]	C₁₉ \(\rtimes\) C₃	The semidirect product of C₁₉ and C₃ acting faithfully	3, 19
57	[57, 2]	C₅₇	Cyclic group	3, 19
58	[58, 1]	D₅₈	Dihedral group	2, 29
58	[58, 2]	C₅₈	Cyclic group	2, 29
59	[59, 1]	C₅₉	Cyclic group	59
60	[60, 1]	C₅\(\times\)(C₃ \(\rtimes\) C₄)	Direct product of C₅ and Dic₃	2, 3, 5
60	[60, 2]	C₃\(\times\)(C₅ \(\rtimes\) C₄)	Direct product of C₃ and Dic₅	2, 3, 5
60	[60, 3]	C₁₅ \(\rtimes\) C₄	Dicyclic group	2, 3, 5
60	[60, 4]	C₆₀	Cyclic group	2, 3, 5
60	[60, 5]	A₅	Alternating group on 5 letters	2, 3, 5
60	[60, 6]	C₃\(\times\)(C₅ \(\rtimes\) C₄)	Direct product of C₃ and F₅	2, 3, 5
60	[60, 7]	C₁₅ \(\rtimes\) C₄	The semidirect product of C₃ and F₅ acting via F₅/D₅=C₂	2, 3, 5
60	[60, 8]	S₃\(\times\)D₁₀	Direct product of S₃ and D₅	2, 3, 5
60	[60, 9]	C₅\(\times\)A₄	Direct product of C₅ and A₄	2, 3, 5
60	[60, 10]	C₆\(\times\)D₁₀	Direct product of C₆ and D₅	2, 3, 5
60	[60, 11]	C₁₀\(\times\)S₃	Direct product of C₁₀ and S₃	2, 3, 5
60	[60, 12]	D₆₀	Dihedral group	2, 3, 5
60	[60, 13]	C₃₀\(\times\)C₂	Abelian group of type [2, 30]	2, 3, 5
61	[61, 1]	C₆₁	Cyclic group	61
62	[62, 1]	D₃₁	Dihedral group	2, 31
62	[62, 2]	C₆₂	Cyclic group	2, 31
63	[63, 1]	C₇:C₉	The semidirect product of C₇ and C₉ acting via C₉/C₃=C₃	3, 7
63	[63, 2]	C₆₃	Cyclic group	3, 7
63	[63, 3]	C₃\(\times\)C₇:C₃	Direct product of C₃ and C₇⋊C₃	3, 7
63	[63, 4]	C₃\(\times\)C₂₁	Abelian group of type [3, 21]	3, 7
64	[64, 1]	C₆₄	Cyclic group	2
64	[64, 2]	C₈²	Abelian group of type [8, 8]	2
64	[64, 3]	C₈:C₈	3rd semidirect product of C₈ and C₈ acting via C₈/C₄=C₂	2
64	[64, 4]	C₂³:C₈	The semidirect product of C₂₃ and C₈ acting via C₈/C₂=C₄	2
64	[64, 5]	C₂².M₄(2)	2nd non-split extension by C₂² of M₄(2) acting via M₄(2)/C₂×C₄=C₂	2
64	[64, 6]	D₄:C₈	The semidirect product of D₄ and C₈ acting via C₈/C₄=C₂	2
64	[64, 7]	Q₈:C₈	The semidirect product of Q₈ and C₈ acting via C₈/C₄=C₂	2
64	[64, 8]	C₂².SD₁₆	1st non-split extension by C₂² of SD₁₆ acting via SD₁₆/Q₈=C₂	2
64	[64, 9]	C₂³.31D₄	2nd non-split extension by C₂₃ of D₄ acting via D₄/C₂²=C₂	2
64	[64, 10]	C₄².C₂²	1st non-split extension by C₄₂ of C₂² acting faithfully	2
64	[64, 11]	C₄².2C₂²	2nd non-split extension by C₄₂ of C₂² acting faithfully	2
64	[64, 12]	C₄.D₈	1st non-split extension by C₄ of D₈ acting via D₈/D₄=C₂	2
64	[64, 13]	C₄.10D₈	2nd non-split extension by C₄ of D₈ acting via D₈/D₄=C₂	2
64	[64, 14]	C₄.6Q₁₆	2nd non-split extension by C₄ of Q₁₆ acting via Q₁₆/Q₈=C₂	2
64	[64, 15]	C₈:₂C₈	2nd semidirect product of C₈ and C₈ acting via C₈/C₄=C₂	2
64	[64, 16]	C₈:₁C₈	1st semidirect product of C₈ and C₈ acting via C₈/C₄=C₂	2
64	[64, 17]	C₂².7C₄²	2nd central extension by C₂² of C₄₂	2
64	[64, 18]	C₄.9C₄²	1st central stem extension by C₄ of C₄₂	2
64	[64, 19]	C₄.10C₄²	2nd central stem extension by C₄ of C₄₂	2
64	[64, 20]	C₄²:₆C₄	3rd semidirect product of C₄₂ and C₄ acting via C₄/C₂=C₂	2
64	[64, 21]	C₂².4Q₁₆	1st central extension by C₂² of Q₁₆	2
64	[64, 22]	C₄.C₄²	3rd non-split extension by C₄ of C₄₂ acting via C₄₂/C₂×C₄=C₂	2
64	[64, 23]	C₂³.9D₄	2nd non-split extension by C₂₃ of D₄ acting via D₄/C₂=C₂²	2
64	[64, 24]	C₂².C₄²	2nd non-split extension by C₂² of C₄₂ acting via C₄₂/C₂×C₄=C₂	2
64	[64, 25]	M₄(2):₄C₄	4th semidirect product of M₄(2) and C₄ acting via C₄/C₂=C₂	2
64	[64, 26]	C₄\(\times\)C₁₆	Abelian group of type [4, 16]	2
64	[64, 27]	C₁₆:₅C₄	3rd semidirect product of C₁₆ and C₄ acting via C₄/C₂=C₂	2
64	[64, 28]	C₁₆:C₄	2nd semidirect product of C₁₆ and C₄ acting faithfully	2
64	[64, 29]	C₂²:C₁₆	The semidirect product of C₂² and C₁₆ acting via C₁₆/C₈=C₂	2
64	[64, 30]	C₂³.C₈	The non-split extension by C₂₃ of C₈ acting via C₈/C₂=C₄	2
64	[64, 31]	D₄.C₈	The non-split extension by D₄ of C₈ acting via C₈/C₄=C₂	2
64	[64, 32]	C₂wrC₄	Wreath product of C₂ by C₄	2
64	[64, 33]	C₂³.D₄	2nd non-split extension by C₂₃ of D₄ acting faithfully	2
64	[64, 34]	C₄²:C₄	2nd semidirect product of C₄₂ and C₄ acting faithfully	2
64	[64, 35]	C₄²:₃C₄	3rd semidirect product of C₄₂ and C₄ acting faithfully	2
64	[64, 36]	C₄².C₄	2nd non-split extension by C₄₂ of C₄ acting faithfully	2
64	[64, 37]	C₄².3C₄	3rd non-split extension by C₄₂ of C₄ acting faithfully	2
64	[64, 38]	C₂.D₁₆	1st central extension by C₂ of D₁₆	2
64	[64, 39]	C₂.Q₃₂	1st central extension by C₂ of Q₃₂	2
64	[64, 40]	D₈.C₄	1st non-split extension by D₈ of C₄ acting via C₄/C₂=C₂	2
64	[64, 41]	D₈:₂C₄	2nd semidirect product of D₈ and C₄ acting via C₄/C₂=C₂	2
64	[64, 42]	M₅(2):C₂	6th semidirect product of M₅(2) and C₂ acting faithfully	2
64	[64, 43]	C₈.17D₄	4th non-split extension by C₈ of D₄ acting via D₄/C₂²=C₂	2
64	[64, 44]	C₄:C₁₆	The semidirect product of C₄ and C₁₆ acting via C₁₆/C₈=C₂	2
64	[64, 45]	C₈.C₈	1st non-split extension by C₈ of C₈ acting via C₈/C₄=C₂	2
64	[64, 46]	C₈.Q₈	The non-split extension by C₈ of Q₈ acting via Q₈/C₂=C₂²	2
64	[64, 47]	C₁₆:₃C₄	1st semidirect product of C₁₆ and C₄ acting via C₄/C₂=C₂	2
64	[64, 48]	C₁₆:₄C₄	2nd semidirect product of C₁₆ and C₄ acting via C₄/C₂=C₂	2
64	[64, 49]	C₈.4Q₈	3rd non-split extension by C₈ of Q₈ acting via Q₈/C₄=C₂	2
64	[64, 50]	C₂\(\times\)C₃₂	Abelian group of type [2, 32]	2
64	[64, 51]	M₆(2)	Modular maximal-cyclic group	2
64	[64, 52]	D₃₂	Dihedral group	2
64	[64, 53]	SD₆₄	Semidihedral group	2
64	[64, 54]	Q₆₄	Generalised quaternion group	2
64	[64, 55]	C₄³	Abelian group of type [4, 4,4]	2
64	[64, 56]	C₂\(\times\)C₂.C₄²	Direct product of C₂ and C₂.C₄₂	2
64	[64, 57]	C₄²:₄C₄	1st semidirect product of C₄₂ and C₄ acting via C₄/C₂=C₂	2
64	[64, 58]	C₄\(\times\)C₂²:C₄	Direct product of C₄ and C₂²⋊C₄	2
64	[64, 59]	C₄\(\times\)C₄:C₄	Direct product of C₄ and C₄⋊C₄	2
64	[64, 60]	C₂⁴:₃C₄	1st semidirect product of C₂₄ and C₄ acting via C₄/C₂=C₂	2
64	[64, 61]	C₂³.7Q₈	2nd non-split extension by C₂₃ of Q₈ acting via Q₈/C₄=C₂	2
64	[64, 62]	C₂³.34D₄	5th non-split extension by C₂₃ of D₄ acting via D₄/C₂²=C₂	2
64	[64, 63]	C₄²:₈C₄	5th semidirect product of C₄₂ and C₄ acting via C₄/C₂=C₂	2
64	[64, 64]	C₄²:₅C₄	2nd semidirect product of C₄₂ and C₄ acting via C₄/C₂=C₂	2
64	[64, 65]	C₄²:₉C₄	6th semidirect product of C₄₂ and C₄ acting via C₄/C₂=C₂	2
64	[64, 66]	C₂³.8Q₈	3rd non-split extension by C₂₃ of Q₈ acting via Q₈/C₄=C₂	2
64	[64, 67]	C₂³.23D₄	2nd non-split extension by C₂₃ of D₄ acting via D₄/C₄=C₂	2
64	[64, 68]	C₂³.63C₂³	13rd central extension by C₂₃ of C₂₃	2
64	[64, 69]	C₂⁴.C₂²	2nd non-split extension by C₂₄ of C₂² acting faithfully	2
64	[64, 70]	C₂³.65C₂³	15th central extension by C₂₃ of C₂₃	2
64	[64, 71]	C₂⁴.3C₂²	3rd non-split extension by C₂₄ of C₂² acting faithfully	2
64	[64, 72]	C₂³.67C₂³	17th central extension by C₂₃ of C₂₃	2
64	[64, 73]	C₂³:₂D₄	1st semidirect product of C₂₃ and D₄ acting via D₄/C₂=C₂²	2
64	[64, 74]	C₂³:Q₈	1st semidirect product of C₂₃ and Q₈ acting via Q₈/C₂=C₂²	2
64	[64, 75]	C₂³.10D₄	3rd non-split extension by C₂₃ of D₄ acting via D₄/C₂=C₂²	2
64	[64, 76]	C₂³.78C₂³	4th central stem extension by C₂₃ of C₂₃	2
64	[64, 77]	C₂³.Q₈	3rd non-split extension by C₂₃ of Q₈ acting via Q₈/C₂=C₂²	2
64	[64, 78]	C₂³.11D₄	4th non-split extension by C₂₃ of D₄ acting via D₄/C₂=C₂²	2
64	[64, 79]	C₂³.81C₂³	7th central stem extension by C₂₃ of C₂₃	2
64	[64, 80]	C₂³.4Q₈	4th non-split extension by C₂₃ of Q₈ acting via Q₈/C₂=C₂²	2
64	[64, 81]	C₂³.83C₂³	9th central stem extension by C₂₃ of C₂₃	2
64	[64, 82]	C₂³.84C₂³	10th central stem extension by C₂₃ of C₂₃	2
64	[64, 83]	C₂\(\times\)C₄\(\times\)C₈	Abelian group of type [2, 4,8]	2
64	[64, 84]	C₂\(\times\)C₈:C₄	Direct product of C₂ and C₈⋊C₄	2
64	[64, 85]	C₄\(\times\)M₄(2)	Direct product of C₄ and M₄(2)	2
64	[64, 86]	C₈o2M₄(2)	Central product of C₈ and M₄(2)	2
64	[64, 87]	C₂\(\times\)C₂²:C₈	Direct product of C₂ and C₂²⋊C₈	2
64	[64, 88]	C₂⁴.4C₄	2nd non-split extension by C₂₄ of C₄ acting via C₄/C₂=C₂	2
64	[64, 89]	(C₂²\(\times\)C₈):C₂	2nd semidirect product of C₂²×C₈ and C₂ acting faithfully	2
64	[64, 90]	C₂\(\times\)C₂³:C₄	Direct product of C₂ and C₂₃⋊C₄	2
64	[64, 91]	C₂³.C₂³	2nd non-split extension by C₂₃ of C₂₃ acting via C₂₃/C₂=C₂²	2
64	[64, 92]	C₂\(\times\)C₄.D₄	Direct product of C₂ and C₄.D₄	2
64	[64, 93]	C₂\(\times\)C₄.10D₄	Direct product of C₂ and C₄.10D₄	2
64	[64, 94]	M₄(2).8C₂²	3rd non-split extension by M₄(2) of C₂² acting via C₂²/C₂=C₂	2
64	[64, 95]	C₂\(\times\)D₄:C₄	Direct product of C₂ and D₄⋊C₄	2
64	[64, 96]	C₂\(\times\)Q₈:C₄	Direct product of C₂ and Q₈⋊C₄	2
64	[64, 97]	C₂³.24D₄	3rd non-split extension by C₂₃ of D₄ acting via D₄/C₄=C₂	2
64	[64, 98]	C₂³.36D₄	7th non-split extension by C₂₃ of D₄ acting via D₄/C₂²=C₂	2
64	[64, 99]	C₂³.37D₄	8th non-split extension by C₂₃ of D₄ acting via D₄/C₂²=C₂	2
64	[64, 100]	C₂³.38D₄	9th non-split extension by C₂₃ of D₄ acting via D₄/C₂²=C₂	2
64	[64, 101]	C₂\(\times\)C₄wrC₂	Direct product of C₂ and C₄≀C₂	2
64	[64, 102]	C₄²:C₂²	1st semidirect product of C₄₂ and C₂² acting faithfully	2
64	[64, 103]	C₂\(\times\)C₄:C₈	Direct product of C₂ and C₄⋊C₈	2
64	[64, 104]	C₄:M₄(2)	The semidirect product of C₄ and M₄(2) acting via M₄(2)/C₂×C₄=C₂	2
64	[64, 105]	C₄².6C₂²	6th non-split extension by C₄₂ of C₂² acting faithfully	2
64	[64, 106]	C₂\(\times\)C₄.Q₈	Direct product of C₂ and C₄.Q₈	2
64	[64, 107]	C₂\(\times\)C₂.D₈	Direct product of C₂ and C₂.D₈	2
64	[64, 108]	C₂³.25D₄	4th non-split extension by C₂₃ of D₄ acting via D₄/C₄=C₂	2
64	[64, 109]	M₄(2):C₄	1st semidirect product of M₄(2) and C₄ acting via C₄/C₂=C₂	2
64	[64, 110]	C₂\(\times\)C₈.C₄	Direct product of C₂ and C₈.C₄	2
64	[64, 111]	M₄(2).C₄	1st non-split extension by M₄(2) of C₄ acting via C₄/C₂=C₂	2
64	[64, 112]	C₄².12C₄	9th non-split extension by C₄₂ of C₄ acting via C₄/C₂=C₂	2
64	[64, 113]	C₄².6C₄	3rd non-split extension by C₄₂ of C₄ acting via C₄/C₂=C₂	2
64	[64, 114]	C₄².7C₂²	7th non-split extension by C₄₂ of C₂² acting faithfully	2
64	[64, 115]	C₈\(\times\)D₄	Direct product of C₈ and D₄	2
64	[64, 116]	C₈:₉D₄	3rd semidirect product of C₈ and D₄ acting via D₄/C₂²=C₂	2
64	[64, 117]	C₈:₆D₄	3rd semidirect product of C₈ and D₄ acting via D₄/C₄=C₂	2
64	[64, 118]	C₄\(\times\)D₈	Direct product of C₄ and D₈	2
64	[64, 119]	C₄\(\times\)SD₁₆	Direct product of C₄ and SD₁₆	2
64	[64, 120]	C₄\(\times\)Q₁₆	Direct product of C₄ and Q₁₆	2
64	[64, 121]	SD₁₆:C₄	1st semidirect product of SD₁₆ and C₄ acting via C₄/C₂=C₂	2
64	[64, 122]	Q₁₆:C₄	3rd semidirect product of Q₁₆ and C₄ acting via C₄/C₂=C₂	2
64	[64, 123]	D₈:C₄	3rd semidirect product of D₈ and C₄ acting via C₄/C₂=C₂	2
64	[64, 124]	C₈oD₈	Central product of C₈ and D₈	2
64	[64, 125]	C₈.26D₄	13rd non-split extension by C₈ of D₄ acting via D₄/C₂²=C₂	2
64	[64, 126]	C₈\(\times\)Q₈	Direct product of C₈ and Q₈	2
64	[64, 127]	C₈:₄Q₈	3rd semidirect product of C₈ and Q₈ acting via Q₈/C₄=C₂	2
64	[64, 128]	C₂²:D₈	The semidirect product of C₂² and D₈ acting via D₈/D₄=C₂	2
64	[64, 129]	Q₈:D₄	1st semidirect product of Q₈ and D₄ acting via D₄/C₂²=C₂	2
64	[64, 130]	D₄:D₄	2nd semidirect product of D₄ and D₄ acting via D₄/C₂²=C₂	2
64	[64, 131]	C₂²:SD₁₆	The semidirect product of C₂² and SD₁₆ acting via SD₁₆/D₄=C₂	2
64	[64, 132]	C₂²:Q₁₆	The semidirect product of C₂² and Q₁₆ acting via Q₁₆/Q₈=C₂	2
64	[64, 133]	D₄.7D₄	2nd non-split extension by D₄ of D₄ acting via D₄/C₂²=C₂	2
64	[64, 134]	D₄:₄D₄	3rd semidirect product of D₄ and D₄ acting via D₄/C₂²=C₂	2
64	[64, 135]	D₄.8D₄	3rd non-split extension by D₄ of D₄ acting via D₄/C₂²=C₂	2
64	[64, 136]	D₄.9D₄	4th non-split extension by D₄ of D₄ acting via D₄/C₂²=C₂	2
64	[64, 137]	D₄.10D₄	5th non-split extension by D₄ of D₄ acting via D₄/C₂²=C₂	2
64	[64, 138]	C₂wrC₂²	Wreath product of C₂ by C₂²	2
64	[64, 139]	C₂³.7D₄	7th non-split extension by C₂₃ of D₄ acting faithfully	2
64	[64, 140]	C₄:D₈	The semidirect product of C₄ and D₈ acting via D₈/D₄=C₂	2
64	[64, 141]	C₄:SD₁₆	The semidirect product of C₄ and SD₁₆ acting via SD₁₆/Q₈=C₂	2
64	[64, 142]	D₄.D₄	1st non-split extension by D₄ of D₄ acting via D₄/C₄=C₂	2
64	[64, 143]	C₄:2Q₁₆	The semidirect product of C₄ and Q₁₆ acting via Q₁₆/Q₈=C₂	2
64	[64, 144]	D₄.2D₄	2nd non-split extension by D₄ of D₄ acting via D₄/C₄=C₂	2
64	[64, 145]	Q₈.D₄	2nd non-split extension by Q₈ of D₄ acting via D₄/C₄=C₂	2
64	[64, 146]	C₈:₈D₄	2nd semidirect product of C₈ and D₄ acting via D₄/C₂²=C₂	2
64	[64, 147]	C₈:₇D₄	1st semidirect product of C₈ and D₄ acting via D₄/C₂²=C₂	2
64	[64, 148]	C₈.18D₄	5th non-split extension by C₈ of D₄ acting via D₄/C₂²=C₂	2
64	[64, 149]	C₈:D₄	1st semidirect product of C₈ and D₄ acting via D₄/C₂=C₂²	2
64	[64, 150]	C₈:₂D₄	2nd semidirect product of C₈ and D₄ acting via D₄/C₂=C₂²	2
64	[64, 151]	C₈.D₄	1st non-split extension by C₈ of D₄ acting via D₄/C₂=C₂²	2
64	[64, 152]	D₄.3D₄	3rd non-split extension by D₄ of D₄ acting via D₄/C₄=C₂	2
64	[64, 153]	D₄.4D₄	4th non-split extension by D₄ of D₄ acting via D₄/C₄=C₂	2
64	[64, 154]	D₄.5D₄	5th non-split extension by D₄ of D₄ acting via D₄/C₄=C₂	2
64	[64, 155]	D₄:Q₈	1st semidirect product of D₄ and Q₈ acting via Q₈/C₄=C₂	2
64	[64, 156]	Q₈:Q₈	1st semidirect product of Q₈ and Q₈ acting via Q₈/C₄=C₂	2
64	[64, 157]	D₄:₂Q₈	2nd semidirect product of D₄ and Q₈ acting via Q₈/C₄=C₂	2
64	[64, 158]	C₄.Q₁₆	3rd non-split extension by C₄ of Q₁₆ acting via Q₁₆/Q₈=C₂	2
64	[64, 159]	D₄.Q₈	The non-split extension by D₄ of Q₈ acting via Q₈/C₄=C₂	2
64	[64, 160]	Q₈.Q₈	The non-split extension by Q₈ of Q₈ acting via Q₈/C₄=C₂	2
64	[64, 161]	C₂².D₈	3rd non-split extension by C₂² of D₈ acting via D₈/D₄=C₂	2
64	[64, 162]	C₂³.46D₄	17th non-split extension by C₂₃ of D₄ acting via D₄/C₂²=C₂	2
64	[64, 163]	C₂³.19D₄	12nd non-split extension by C₂₃ of D₄ acting via D₄/C₂=C₂²	2
64	[64, 164]	C₂³.47D₄	18th non-split extension by C₂₃ of D₄ acting via D₄/C₂²=C₂	2
64	[64, 165]	C₂³.48D₄	19th non-split extension by C₂₃ of D₄ acting via D₄/C₂²=C₂	2
64	[64, 166]	C₂³.20D₄	13rd non-split extension by C₂₃ of D₄ acting via D₄/C₂=C₂²	2
64	[64, 167]	C₄.4D₈	4th non-split extension by C₄ of D₈ acting via D₈/C₈=C₂	2
64	[64, 168]	C₄.SD₁₆	4th non-split extension by C₄ of SD₁₆ acting via SD₁₆/C₈=C₂	2
64	[64, 169]	C₄².78C₂²	21st non-split extension by C₄₂ of C₂² acting via C₂²/C₂=C₂	2
64	[64, 170]	C₄².28C₂²	28th non-split extension by C₄₂ of C₂² acting faithfully	2
64	[64, 171]	C₄².29C₂²	29th non-split extension by C₄₂ of C₂² acting faithfully	2
64	[64, 172]	C₄².30C₂²	30th non-split extension by C₄₂ of C₂² acting faithfully	2
64	[64, 173]	C₈:₅D₄	2nd semidirect product of C₈ and D₄ acting via D₄/C₄=C₂	2
64	[64, 174]	C₈:₄D₄	1st semidirect product of C₈ and D₄ acting via D₄/C₄=C₂	2
64	[64, 175]	C₄:Q₁₆	The semidirect product of C₄ and Q₁₆ acting via Q₁₆/C₈=C₂	2
64	[64, 176]	C₈.12D₄	8th non-split extension by C₈ of D₄ acting via D₄/C₄=C₂	2
64	[64, 177]	C₈:₃D₄	3rd semidirect product of C₈ and D₄ acting via D₄/C₂=C₂²	2
64	[64, 178]	C₈.2D₄	2nd non-split extension by C₈ of D₄ acting via D₄/C₂=C₂²	2
64	[64, 179]	C₈:₃Q₈	2nd semidirect product of C₈ and Q₈ acting via Q₈/C₄=C₂	2
64	[64, 180]	C₈.5Q₈	4th non-split extension by C₈ of Q₈ acting via Q₈/C₄=C₂	2
64	[64, 181]	C₈:₂Q₈	1st semidirect product of C₈ and Q₈ acting via Q₈/C₄=C₂	2
64	[64, 182]	C₈:Q₈	The semidirect product of C₈ and Q₈ acting via Q₈/C₂=C₂²	2
64	[64, 183]	C₂²\(\times\)C₁₆	Abelian group of type [2, 2,16]	2
64	[64, 184]	C₂\(\times\)M₅(2)	Direct product of C₂ and M₅(2)	2
64	[64, 185]	D₄oC₁₆	Central product of D₄ and C₁₆	2
64	[64, 186]	C₂\(\times\)D₁₆	Direct product of C₂ and D₁₆	2
64	[64, 187]	C₂\(\times\)SD₃₂	Direct product of C₂ and SD₃₂	2
64	[64, 188]	C₂\(\times\)Q₃₂	Direct product of C₂ and Q₃₂	2
64	[64, 189]	C₄oD₁₆	Central product of C₄ and D₁₆	2
64	[64, 190]	C₁₆:C₂²	The semidirect product of C₁₆ and C₂² acting faithfully	2
64	[64, 191]	Q₃₂:C₂	2nd semidirect product of Q₃₂ and C₂ acting faithfully	2
64	[64, 192]	C₂²\(\times\)C₄²	Abelian group of type [2, 2,4, 4]	2
64	[64, 193]	C₂²\(\times\)C₂²:C₄	Direct product of C₂² and C₂²⋊C₄	2
64	[64, 194]	C₂²\(\times\)C₄:C₄	Direct product of C₂² and C₄⋊C₄	2
64	[64, 195]	C₂\(\times\)C₄²:C₂	Direct product of C₂ and C₄₂⋊C₂	2
64	[64, 196]	C₂\(\times\)C₄\(\times\)D₄	Direct product of C₂×C₄ and D₄	2
64	[64, 197]	C₂\(\times\)C₄\(\times\)Q₈	Direct product of C₂×C₄ and Q₈	2
64	[64, 198]	C₄\(\times\)C₄oD₄	Direct product of C₄ and C₄○D₄	2
64	[64, 199]	C₂².11C₂⁴	7th central extension by C₂² of C₂₄	2
64	[64, 200]	C₂³.32C₂³	5th non-split extension by C₂₃ of C₂₃ acting via C₂₃/C₂²=C₂	2
64	[64, 201]	C₂³.33C₂³	6th non-split extension by C₂₃ of C₂₃ acting via C₂₃/C₂²=C₂	2
64	[64, 202]	C₂\(\times\)C₂²wrC₂	Direct product of C₂ and C₂²≀C₂	2
64	[64, 203]	C₂\(\times\)C₄:D₄	Direct product of C₂ and C₄⋊D₄	2
64	[64, 204]	C₂\(\times\)C₂²:Q₈	Direct product of C₂ and C₂²⋊Q₈	2
64	[64, 205]	C₂\(\times\)C₂².D₄	Direct product of C₂ and C₂².D₄	2
64	[64, 206]	C₂².19C₂⁴	5th central stem extension by C₂² of C₂₄	2
64	[64, 207]	C₂\(\times\)C₄.4D₄	Direct product of C₂ and C₄.4D₄	2
64	[64, 208]	C₂\(\times\)C₄².C₂	Direct product of C₂ and C₄₂.C₂	2
64	[64, 209]	C₂\(\times\)C₄²:₂C₂	Direct product of C₂ and C₄₂⋊2C₂	2
64	[64, 210]	C₂³.36C₂³	9th non-split extension by C₂₃ of C₂₃ acting via C₂₃/C₂²=C₂	2
64	[64, 211]	C₂\(\times\)C₄:₁D₄	Direct product of C₂ and C₄⋊1D₄	2
64	[64, 212]	C₂\(\times\)C₄:Q₈	Direct product of C₂ and C₄⋊Q₈	2
64	[64, 213]	C₂².26C₂⁴	12nd central stem extension by C₂² of C₂₄	2
64	[64, 214]	C₂³.37C₂³	10th non-split extension by C₂₃ of C₂₃ acting via C₂₃/C₂²=C₂	2
64	[64, 215]	C₂³:₃D₄	2nd semidirect product of C₂₃ and D₄ acting via D₄/C₂=C₂²	2
64	[64, 216]	C₂².29C₂⁴	15th central stem extension by C₂² of C₂₄	2
64	[64, 217]	C₂³.38C₂³	11st non-split extension by C₂₃ of C₂₃ acting via C₂₃/C₂²=C₂	2
64	[64, 218]	C₂².31C₂⁴	17th central stem extension by C₂² of C₂₄	2
64	[64, 219]	C₂².32C₂⁴	18th central stem extension by C₂² of C₂₄	2
64	[64, 220]	C₂².33C₂⁴	19th central stem extension by C₂² of C₂₄	2
64	[64, 221]	C₂².34C₂⁴	20th central stem extension by C₂² of C₂₄	2
64	[64, 222]	C₂².35C₂⁴	21st central stem extension by C₂² of C₂₄	2
64	[64, 223]	C₂².36C₂⁴	22nd central stem extension by C₂² of C₂₄	2
64	[64, 224]	C₂³:₂Q₈	2nd semidirect product of C₂₃ and Q₈ acting via Q₈/C₂=C₂²	2
64	[64, 225]	C₂³.41C₂³	14th non-split extension by C₂₃ of C₂₃ acting via C₂₃/C₂²=C₂	2
64	[64, 226]	D₄²	Direct product of D₄ and D₄	2
64	[64, 227]	D₄:₅D₄	1st semidirect product of D₄ and D₄ acting through Inn(D₄)	2
64	[64, 228]	D₄:₆D₄	2nd semidirect product of D₄ and D₄ acting through Inn(D₄)	2
64	[64, 229]	Q₈:₅D₄	1st semidirect product of Q₈ and D₄ acting through Inn(Q₈)	2
64	[64, 230]	D₄\(\times\)Q₈	Direct product of D₄ and Q₈	2
64	[64, 231]	Q₈:₆D₄	2nd semidirect product of Q₈ and D₄ acting through Inn(Q₈)	2
64	[64, 232]	C₂².45C₂⁴	31st central stem extension by C₂² of C₂₄	2
64	[64, 233]	C₂².46C₂⁴	32nd central stem extension by C₂² of C₂₄	2
64	[64, 234]	C₂².47C₂⁴	33rd central stem extension by C₂² of C₂₄	2
64	[64, 235]	D₄:₃Q₈	The semidirect product of D₄ and Q₈ acting through Inn(D₄)	2
64	[64, 236]	C₂².49C₂⁴	35th central stem extension by C₂² of C₂₄	2
64	[64, 237]	C₂².50C₂⁴	36th central stem extension by C₂² of C₂₄	2
64	[64, 238]	Q₈:₃Q₈	The semidirect product of Q₈ and Q₈ acting through Inn(Q₈)	2
64	[64, 239]	Q₈²	Direct product of Q₈ and Q₈	2
64	[64, 240]	C₂².53C₂⁴	39th central stem extension by C₂² of C₂₄	2
64	[64, 241]	C₂².54C₂⁴	40th central stem extension by C₂² of C₂₄	2
64	[64, 242]	C₂⁴:C₂²	4th semidirect product of C₂₄ and C₂² acting faithfully	2
64	[64, 243]	C₂².56C₂⁴	42nd central stem extension by C₂² of C₂₄	2
64	[64, 244]	C₂².57C₂⁴	43rd central stem extension by C₂² of C₂₄	2
64	[64, 245]	C₂².58C₂⁴	44th central stem extension by C₂² of C₂₄	2
64	[64, 246]	C₂³\(\times\)C₈	Abelian group of type [2, 2,2, 8]	2
64	[64, 247]	C₂²\(\times\)M₄(2)	Direct product of C₂² and M₄(2)	2
64	[64, 248]	C₂\(\times\)C₈oD₄	Direct product of C₂ and C₈○D₄	2
64	[64, 249]	Q₈oM₄(2)	Central product of Q₈ and M₄(2)	2
64	[64, 250]	C₂²\(\times\)D₈	Direct product of C₂² and D₈	2
64	[64, 251]	C₂²\(\times\)SD₁₆	Direct product of C₂² and SD₁₆	2
64	[64, 252]	C₂²\(\times\)Q₁₆	Direct product of C₂² and Q₁₆	2
64	[64, 253]	C₂\(\times\)C₄oD₈	Direct product of C₂ and C₄○D₈	2
64	[64, 254]	C₂\(\times\)C₈:C₂²	Direct product of C₂ and C₈⋊C₂²	2
64	[64, 255]	C₂\(\times\)C₈.C₂²	Direct product of C₂ and C₈.C₂²	2
64	[64, 256]	D₈:C₂²	4th semidirect product of D₈ and C₂² acting via C₂²/C₂=C₂	2
64	[64, 257]	D₄oD₈	Central product of D₄ and D₈	2
64	[64, 258]	D₄oSD₁₆	Central product of D₄ and SD₁₆	2
64	[64, 259]	Q₈oD₈	Central product of Q₈ and D₈	2
64	[64, 260]	C₂⁴\(\times\)C₄	Abelian group of type [2, 2,2, 2,4]	2
64	[64, 261]	D₄\(\times\)C₂³	Direct product of C₂₃ and D₄	2
64	[64, 262]	Q₈\(\times\)C₂³	Direct product of C₂₃ and Q₈	2
64	[64, 263]	C₂²\(\times\)C₄oD₄	Direct product of C₂² and C₄○D₄	2
64	[64, 264]	C₂\(\times\)ES+(2, 2)	Direct product of C₂ and 2+ 1+4	2
64	[64, 265]	C₂\(\times\)ES-(2, 2)	Direct product of C₂ and 2- 1+4	2
64	[64, 266]	C₂.C₂⁵	6th central stem extension by C₂ of C₂₅	2
64	[64, 267]	C₂⁶	Elementary abelian group of type [2, 2,2, 2,2, 2]	2
65	[65, 1]	C₆₅	Cyclic group	5, 13
66	[66, 1]	S₃\(\times\)C₁₁	Direct product of C₁₁ and S₃	2, 3, 11
66	[66, 2]	C₃\(\times\)D₁₁	Direct product of C₃ and D₁₁	2, 3, 11
66	[66, 3]	D₃₃	Dihedral group	2, 3, 11
66	[66, 4]	C₆₆	Cyclic group	2, 3, 11
67	[67, 1]	C₆₇	Cyclic group	67
68	[68, 1]	Dic₁₇	Dicyclic group	2, 17
68	[68, 2]	C₆₈	Cyclic group	2, 17
68	[68, 3]	C₁₇:C₄	The semidirect product of C₁₇ and C₄ acting faithfully	2, 17
68	[68, 4]	D₃₄	Dihedral group	2, 17
68	[68, 5]	C₂\(\times\)C₃₄	Abelian group of type [2, 34]	2, 17
69	[69, 1]	C₆₉	Cyclic group	3, 23
70	[70, 1]	C₇\(\times\)D₅	Direct product of C₇ and D₅	2, 5, 7
70	[70, 2]	C₅\(\times\)D₇	Direct product of C₅ and D₇	2, 5, 7
70	[70, 3]	D₃₅	Dihedral group	2, 5, 7
70	[70, 4]	C₇₀	Cyclic group	2, 5, 7
71	[71, 1]	C₇₁	Cyclic group	71
72	[72, 1]	C₉:C₈	The semidirect product of C₉ and C₈ acting via C₈/C₄=C₂	2, 3
72	[72, 2]	C₇₂	Cyclic group	2, 3
72	[72, 3]	Q₈:C₉	The semidirect product of Q₈ and C₉ acting via C₉/C₃=C₃	2, 3
72	[72, 4]	Dic₁₈	Dicyclic group	2, 3
72	[72, 5]	C₄\(\times\)D₉	Direct product of C₄ and D₉	2, 3
72	[72, 6]	D₃₆	Dihedral group	2, 3
72	[72, 7]	C₂\(\times\)Dic₉	Direct product of C₂ and Dic₉	2, 3
72	[72, 8]	C₉:D₄	The semidirect product of C₉ and D₄ acting via D₄/C₂²=C₂	2, 3
72	[72, 9]	C₂\(\times\)C₃₆	Abelian group of type [2, 36]	2, 3
72	[72, 10]	D₄\(\times\)C₉	Direct product of C₉ and D₄	2, 3
72	[72, 11]	Q₈\(\times\)C₉	Direct product of C₉ and Q₈	2, 3
72	[72, 12]	C₃\(\times\)C₃:C₈	Direct product of C₃ and C₃⋊C₈	2, 3
72	[72, 13]	C₃²:₄C₈	2nd semidirect product of C₃₂ and C₈ acting via C₈/C₄=C₂	2, 3
72	[72, 14]	C₃\(\times\)C₂₄	Abelian group of type [3, 24]	2, 3
72	[72, 15]	C₃.S₄	The non-split extension by C₃ of S₄ acting via S₄/A₄=C₂	2, 3
72	[72, 16]	C₂\(\times\)C₃.A₄	Direct product of C₂ and C₃.A₄	2, 3
72	[72, 17]	C₂²\(\times\)D₉	Direct product of C₂² and D₉	2, 3
72	[72, 18]	C₂²\(\times\)C₁₈	Abelian group of type [2, 2,18]	2, 3
72	[72, 19]	C₃²:₂C₈	The semidirect product of C₃₂ and C₈ acting via C₈/C₂=C₄	2, 3
72	[72, 20]	S₃\(\times\)Dic₃	Direct product of S₃ and Dic₃	2, 3
72	[72, 21]	C₆.D₆	2nd non-split extension by C₆ of D₆ acting via D₆/S₃=C₂	2, 3
72	[72, 22]	D₆:S₃	1st semidirect product of D₆ and S₃ acting via S₃/C₃=C₂	2, 3
72	[72, 23]	C₃:D₁₂	The semidirect product of C₃ and D₁₂ acting via D₁₂/D₆=C₂	2, 3
72	[72, 24]	C₃²:₂Q₈	The semidirect product of C₃₂ and Q₈ acting via Q₈/C₂=C₂²	2, 3
72	[72, 25]	C₃\(\times\)SL(2, 3)	Direct product of C₃ and SL₂(𝔽₃)	2, 3
72	[72, 26]	C₃\(\times\)Dic₆	Direct product of C₃ and Dic₆	2, 3
72	[72, 27]	S₃\(\times\)C₁₂	Direct product of C₁₂ and S₃	2, 3
72	[72, 28]	C₃\(\times\)D₁₂	Direct product of C₃ and D₁₂	2, 3
72	[72, 29]	C₆\(\times\)Dic₃	Direct product of C₆ and Dic₃	2, 3
72	[72, 30]	C₃\(\times\)C₃:D₄	Direct product of C₃ and C₃⋊D₄	2, 3
72	[72, 31]	C₃²:₄Q₈	2nd semidirect product of C₃₂ and Q₈ acting via Q₈/C₄=C₂	2, 3
72	[72, 32]	C₄\(\times\)C₃:S₃	Direct product of C₄ and C₃⋊S₃	2, 3
72	[72, 33]	C₁₂:S₃	1st semidirect product of C₁₂ and S₃ acting via S₃/C₃=C₂	2, 3
72	[72, 34]	C₂\(\times\)C₃:Dic₃	Direct product of C₂ and C₃⋊Dic₃	2, 3
72	[72, 35]	C₃²:₇D₄	2nd semidirect product of C₃₂ and D₄ acting via D₄/C₂²=C₂	2, 3
72	[72, 36]	C₆\(\times\)C₁₂	Abelian group of type [6, 12]	2, 3
72	[72, 37]	D₄\(\times\)C₃²	Direct product of C₃₂ and D₄	2, 3
72	[72, 38]	Q₈\(\times\)C₃²	Direct product of C₃₂ and Q₈	2, 3
72	[72, 39]	F₉	Frobenius group	2, 3
72	[72, 40]	S₃wrC₂	Wreath product of S₃ by C₂	2, 3
72	[72, 41]	PSU(3, 2)	Projective special unitary group on 𝔽₂³	2, 3
72	[72, 42]	C₃\(\times\)S₄	Direct product of C₃ and S₄	2, 3
72	[72, 43]	C₃:S₄	The semidirect product of C₃ and S₄ acting via S₄/A₄=C₂	2, 3
72	[72, 44]	S₃\(\times\)A₄	Direct product of S₃ and A₄	2, 3
72	[72, 45]	C₂\(\times\)C₃²:C₄	Direct product of C₂ and C₃₂⋊C₄	2, 3
72	[72, 46]	C₂\(\times\)S₃²	Direct product of C₂, S₃ and S₃	2, 3
72	[72, 47]	C₆\(\times\)A₄	Direct product of C₆ and A₄	2, 3
72	[72, 48]	S₃\(\times\)C₂\(\times\)C₆	Direct product of C₂×C₆ and S₃	2, 3
72	[72, 49]	C₂²\(\times\)C₃:S₃	Direct product of C₂² and C₃⋊S₃	2, 3
72	[72, 50]	C₂\(\times\)C₆²	Abelian group of type [2, 6,6]	2, 3
73	[73, 1]	C₇₃	Cyclic group	73
74	[74, 1]	D₃₇	Dihedral group	2, 37
74	[74, 2]	C₇₄	Cyclic group	2, 37
75	[75, 1]	C₇₅	Cyclic group	3, 5
75	[75, 2]	C₅²:C₃	The semidirect product of C₅₂ and C₃ acting faithfully	3, 5
75	[75, 3]	C₅\(\times\)C₁₅	Abelian group of type [5, 15]	3, 5
76	[76, 1]	Dic₁₉	Dicyclic group	2, 19
76	[76, 2]	C₇₆	Cyclic group	2, 19
76	[76, 3]	D₃₈	Dihedral group	2, 19
76	[76, 4]	C₂\(\times\)C₃₈	Abelian group of type [2, 38]	2, 19
77	[77, 1]	C₇₇	Cyclic group	7, 11
78	[78, 1]	C₁₃:C₆	The semidirect product of C₁₃ and C₆ acting faithfully	2, 3, 13
78	[78, 2]	C₂\(\times\)C₁₃:C₃	Direct product of C₂ and C₁₃⋊C₃	2, 3, 13
78	[78, 3]	S₃\(\times\)C₁₃	Direct product of C₁₃ and S₃	2, 3, 13
78	[78, 4]	C₃\(\times\)D₁₃	Direct product of C₃ and D₁₃	2, 3, 13
78	[78, 5]	D₃₉	Dihedral group	2, 3, 13
78	[78, 6]	C₇₈	Cyclic group	2, 3, 13
79	[79, 1]	C₇₉	Cyclic group	79
80	[80, 1]	C₅:2C₁₆	The semidirect product of C₅ and C₁₆ acting via C₁₆/C₈=C₂	2, 5
80	[80, 2]	C₈₀	Cyclic group	2, 5
80	[80, 3]	C₅:C₁₆	The semidirect product of C₅ and C₁₆ acting via C₁₆/C₄=C₄	2, 5
80	[80, 4]	C₈\(\times\)D₅	Direct product of C₈ and D₅	2, 5
80	[80, 5]	C₈:D₅	3rd semidirect product of C₈ and D₅ acting via D₅/C₅=C₂	2, 5
80	[80, 6]	C₄₀:C₂	2nd semidirect product of C₄₀ and C₂ acting faithfully	2, 5
80	[80, 7]	D₄₀	Dihedral group	2, 5
80	[80, 8]	Dic₂₀	Dicyclic group	2, 5
80	[80, 9]	C₂\(\times\)C₅:₂C₈	Direct product of C₂ and C₅⋊2C₈	2, 5
80	[80, 10]	C₄.Dic₅	The non-split extension by C₄ of Dic₅ acting via Dic₅/C₁₀=C₂	2, 5
80	[80, 11]	C₄\(\times\)Dic₅	Direct product of C₄ and Dic₅	2, 5
80	[80, 12]	C₁₀.D₄	1st non-split extension by C₁₀ of D₄ acting via D₄/C₂²=C₂	2, 5
80	[80, 13]	C₄:Dic₅	The semidirect product of C₄ and Dic₅ acting via Dic₅/C₁₀=C₂	2, 5
80	[80, 14]	D₁₀:C₄	1st semidirect product of D₁₀ and C₄ acting via C₄/C₂=C₂	2, 5
80	[80, 15]	D₄:D₅	The semidirect product of D₄ and D₅ acting via D₅/C₅=C₂	2, 5
80	[80, 16]	D₄.D₅	The non-split extension by D₄ of D₅ acting via D₅/C₅=C₂	2, 5
80	[80, 17]	Q₈:D₅	The semidirect product of Q₈ and D₅ acting via D₅/C₅=C₂	2, 5
80	[80, 18]	C₅:Q₁₆	The semidirect product of C₅ and Q₁₆ acting via Q₁₆/Q₈=C₂	2, 5
80	[80, 19]	C₂³.D₅	The non-split extension by C₂₃ of D₅ acting via D₅/C₅=C₂	2, 5
80	[80, 20]	C₄\(\times\)C₂₀	Abelian group of type [4, 20]	2, 5
80	[80, 21]	C₅\(\times\)C₂²:C₄	Direct product of C₅ and C₂²⋊C₄	2, 5
80	[80, 22]	C₅\(\times\)C₄:C₄	Direct product of C₅ and C₄⋊C₄	2, 5
80	[80, 23]	C₂\(\times\)C₄₀	Abelian group of type [2, 40]	2, 5
80	[80, 24]	C₅\(\times\)M₄(2)	Direct product of C₅ and M₄(2)	2, 5
80	[80, 25]	C₅\(\times\)D₈	Direct product of C₅ and D₈	2, 5
80	[80, 26]	C₅\(\times\)SD₁₆	Direct product of C₅ and SD₁₆	2, 5
80	[80, 27]	C₅\(\times\)Q₁₆	Direct product of C₅ and Q₁₆	2, 5
80	[80, 28]	D₅:C₈	The semidirect product of D₅ and C₈ acting via C₈/C₄=C₂	2, 5
80	[80, 29]	C₄.F₅	The non-split extension by C₄ of F₅ acting via F₅/D₅=C₂	2, 5
80	[80, 30]	C₄\(\times\)F₅	Direct product of C₄ and F₅	2, 5
80	[80, 31]	C₄:F₅	The semidirect product of C₄ and F₅ acting via F₅/D₅=C₂	2, 5
80	[80, 32]	C₂\(\times\)C₅:C₈	Direct product of C₂ and C₅⋊C₈	2, 5
80	[80, 33]	C₂².F₅	The non-split extension by C₂² of F₅ acting via F₅/D₅=C₂	2, 5
80	[80, 34]	C₂²:F₅	The semidirect product of C₂² and F₅ acting via F₅/D₅=C₂	2, 5
80	[80, 35]	C₂\(\times\)Dic₁₀	Direct product of C₂ and Dic₁₀	2, 5
80	[80, 36]	C₂\(\times\)C₄\(\times\)D₅	Direct product of C₂×C₄ and D₅	2, 5
80	[80, 37]	C₂\(\times\)D₂₀	Direct product of C₂ and D₂₀	2, 5
80	[80, 38]	C₄oD₂₀	Central product of C₄ and D₂₀	2, 5
80	[80, 39]	D₄\(\times\)D₅	Direct product of D₄ and D₅	2, 5
80	[80, 40]	D₄:₂D₅	The semidirect product of D₄ and D₅ acting through Inn(D₄)	2, 5
80	[80, 41]	Q₈\(\times\)D₅	Direct product of Q₈ and D₅	2, 5
80	[80, 42]	Q₈:₂D₅	The semidirect product of Q₈ and D₅ acting through Inn(Q₈)	2, 5
80	[80, 43]	C₂²\(\times\)Dic₅	Direct product of C₂² and Dic₅	2, 5
80	[80, 44]	C₂\(\times\)C₅:D₄	Direct product of C₂ and C₅⋊D₄	2, 5
80	[80, 45]	C₂²\(\times\)C₂₀	Abelian group of type [2, 2,20]	2, 5
80	[80, 46]	D₄\(\times\)C₁₀	Direct product of C₁₀ and D₄	2, 5
80	[80, 47]	Q₈\(\times\)C₁₀	Direct product of C₁₀ and Q₈	2, 5
80	[80, 48]	C₅\(\times\)C₄oD₄	Direct product of C₅ and C₄○D₄	2, 5
80	[80, 49]	C₂⁴:C₅	The semidirect product of C₂₄ and C₅ acting faithfully	2, 5
80	[80, 50]	C₂²\(\times\)F₅	Direct product of C₂² and F₅	2, 5
80	[80, 51]	C₂³\(\times\)D₅	Direct product of C₂₃ and D₅	2, 5
80	[80, 52]	C₂³\(\times\)C₁₀	Abelian group of type [2, 2,2, 10]	2, 5
81	[81, 1]	C₈₁	Cyclic group	3
81	[81, 2]	C₉²	Abelian group of type [9, 9]	3
81	[81, 3]	C₃²:C₉	The semidirect product of C₃₂ and C₉ acting via C₉/C₃=C₃	3
81	[81, 4]	C₉:C₉	The semidirect product of C₉ and C₉ acting via C₉/C₃=C₃	3
81	[81, 5]	C₃\(\times\)C₂₇	Abelian group of type [3, 27]	3
81	[81, 6]	C₂₇:C₃	The semidirect product of C₂₇ and C₃ acting faithfully	3
81	[81, 7]	C₃wrC₃	Wreath product of C₃ by C₃	3
81	[81, 8]	He3.C₃	The non-split extension by He3 of C₃ acting faithfully	3
81	[81, 9]	He3:C₃	2nd semidirect product of He3 and C₃ acting faithfully	3
81	[81, 10]	C₃.He3	4th central stem extension by C₃ of He3	3
81	[81, 11]	C₃²\(\times\)C₉	Abelian group of type [3, 3,9]	3
81	[81, 12]	C₃\(\times\)He3	Direct product of C₃ and He3	3
81	[81, 13]	C₃\(\times\)ES-(3, 1)	Direct product of C₃ and 3- 1+2	3
81	[81, 14]	C₉oHe3	Central product of C₉ and He3	3
81	[81, 15]	C₃⁴	Elementary abelian group of type [3, 3,3, 3]	3
82	[82, 1]	D₄₁	Dihedral group	2, 41
82	[82, 2]	C₈₂	Cyclic group	2, 41
83	[83, 1]	C₈₃	Cyclic group	83
84	[84, 1]	C₇:C₁₂	The semidirect product of C₇ and C₁₂ acting via C₁₂/C₂=C₆	2, 3, 7
84	[84, 2]	C₄\(\times\)C₇:C₃	Direct product of C₄ and C₇⋊C₃	2, 3, 7
84	[84, 3]	C₇\(\times\)Dic₃	Direct product of C₇ and Dic₃	2, 3, 7
84	[84, 4]	C₃\(\times\)Dic₇	Direct product of C₃ and Dic₇	2, 3, 7
84	[84, 5]	Dic₂₁	Dicyclic group	2, 3, 7
84	[84, 6]	C₈₄	Cyclic group	2, 3, 7
84	[84, 7]	C₂\(\times\)F₇	Direct product of C₂ and F₇	2, 3, 7
84	[84, 8]	S₃\(\times\)D₇	Direct product of S₃ and D₇	2, 3, 7
84	[84, 9]	C₂²\(\times\)C₇:C₃	Direct product of C₂² and C₇⋊C₃	2, 3, 7
84	[84, 10]	C₇\(\times\)A₄	Direct product of C₇ and A₄	2, 3, 7
84	[84, 11]	C₇:A₄	The semidirect product of C₇ and A₄ acting via A₄/C₂²=C₃	2, 3, 7
84	[84, 12]	C₆\(\times\)D₇	Direct product of C₆ and D₇	2, 3, 7
84	[84, 13]	S₃\(\times\)C₁₄	Direct product of C₁₄ and S₃	2, 3, 7
84	[84, 14]	D₄₂	Dihedral group	2, 3, 7
84	[84, 15]	C₂\(\times\)C₄₂	Abelian group of type [2, 42]	2, 3, 7
85	[85, 1]	C₈₅	Cyclic group	5, 17
86	[86, 1]	D₄₃	Dihedral group	2, 43
86	[86, 2]	C₈₆	Cyclic group	2, 43
87	[87, 1]	C₈₇	Cyclic group	3, 29
88	[88, 1]	C₁₁:C₈	The semidirect product of C₁₁ and C₈ acting via C₈/C₄=C₂	2, 11
88	[88, 2]	C₈₈	Cyclic group	2, 11
88	[88, 3]	Dic₂₂	Dicyclic group	2, 11
88	[88, 4]	C₄\(\times\)D₁₁	Direct product of C₄ and D₁₁	2, 11
88	[88, 5]	D₄₄	Dihedral group	2, 11
88	[88, 6]	C₂\(\times\)Dic₁₁	Direct product of C₂ and Dic₁₁	2, 11
88	[88, 7]	C₁₁:D₄	The semidirect product of C₁₁ and D₄ acting via D₄/C₂²=C₂	2, 11
88	[88, 8]	C₂\(\times\)C₄₄	Abelian group of type [2, 44]	2, 11
88	[88, 9]	D₄\(\times\)C₁₁	Direct product of C₁₁ and D₄	2, 11
88	[88, 10]	Q₈\(\times\)C₁₁	Direct product of C₁₁ and Q₈	2, 11
88	[88, 11]	C₂²\(\times\)D₁₁	Direct product of C₂² and D₁₁	2, 11
88	[88, 12]	C₂²\(\times\)C₂²	Abelian group of type [2, 2,22]	2, 11
89	[89, 1]	C₈₉	Cyclic group	89
90	[90, 1]	C₅\(\times\)D₉	Direct product of C₅ and D₉	2, 3, 5
90	[90, 2]	C₉\(\times\)D₅	Direct product of C₉ and D₅	2, 3, 5
90	[90, 3]	D₄₅	Dihedral group	2, 3, 5
90	[90, 4]	C₉₀	Cyclic group	2, 3, 5
90	[90, 5]	C₃²\(\times\)D₅	Direct product of C₃₂ and D₅	2, 3, 5
90	[90, 6]	S₃\(\times\)C₁₅	Direct product of C₁₅ and S₃	2, 3, 5
90	[90, 7]	C₃\(\times\)D₁₅	Direct product of C₃ and D₁₅	2, 3, 5
90	[90, 8]	C₅\(\times\)C₃:S₃	Direct product of C₅ and C₃⋊S₃	2, 3, 5
90	[90, 9]	C₃:D₁₅	The semidirect product of C₃ and D₁₅ acting via D₁₅/C₁₅=C₂	2, 3, 5
90	[90, 10]	C₃\(\times\)C₃₀	Abelian group of type [3, 30]	2, 3, 5
91	[91, 1]	C₉₁	Cyclic group	7, 13
92	[92, 1]	Dic₂₃	Dicyclic group	2, 23
92	[92, 2]	C₉₂	Cyclic group	2, 23
92	[92, 3]	D₄₆	Dihedral group	2, 23
92	[92, 4]	C₂\(\times\)C₄₆	Abelian group of type [2, 46]	2, 23
93	[93, 1]	C₃₁:C₃	The semidirect product of C₃₁ and C₃ acting faithfully	3, 31
93	[93, 2]	C₉₃	Cyclic group	3, 31
94	[94, 1]	D₄₇	Dihedral group	2, 47
94	[94, 2]	C₉₄	Cyclic group	2, 47
95	[95, 1]	C₉₅	Cyclic group	5, 19
96	[96, 1]	C₃:C₃₂	The semidirect product of C₃ and C₃₂ acting via C₃₂/C₁₆=C₂	2, 3
96	[96, 2]	C₉₆	Cyclic group	2, 3
96	[96, 3]	C₂³.3A₄	1st non-split extension by C₂₃ of A₄ acting via A₄/C₂²=C₃	2, 3
96	[96, 4]	S₃\(\times\)C₁₆	Direct product of C₁₆ and S₃	2, 3
96	[96, 5]	D₆.C₈	The non-split extension by D₆ of C₈ acting via C₈/C₄=C₂	2, 3
96	[96, 6]	D₄₈	Dihedral group	2, 3
96	[96, 7]	C₄₈:C₂	2nd semidirect product of C₄₈ and C₂ acting faithfully	2, 3
96	[96, 8]	Dic₂₄	Dicyclic group	2, 3
96	[96, 9]	C₄\(\times\)C₃:C₈	Direct product of C₄ and C₃⋊C₈	2, 3
96	[96, 10]	C₄².S₃	1st non-split extension by C₄₂ of S₃ acting via S₃/C₃=C₂	2, 3
96	[96, 11]	C₁₂:C₈	1st semidirect product of C₁₂ and C₈ acting via C₈/C₄=C₂	2, 3
96	[96, 12]	C₄²:₄S₃	3rd semidirect product of C₄₂ and S₃ acting via S₃/C₃=C₂	2, 3
96	[96, 13]	C₂³.6D₆	1st non-split extension by C₂₃ of D₆ acting via D₆/C₃=C₂²	2, 3
96	[96, 14]	C₆.Q₁₆	1st non-split extension by C₆ of Q₁₆ acting via Q₁₆/Q₈=C₂	2, 3
96	[96, 15]	C₁₂.Q₈	2nd non-split extension by C₁₂ of Q₈ acting via Q₈/C₂=C₂²	2, 3
96	[96, 16]	C₆.D₈	2nd non-split extension by C₆ of D₈ acting via D₈/D₄=C₂	2, 3
96	[96, 17]	C₆.SD₁₆	2nd non-split extension by C₆ of SD₁₆ acting via SD₁₆/D₄=C₂	2, 3
96	[96, 18]	C₂\(\times\)C₃:C₁₆	Direct product of C₂ and C₃⋊C₁₆	2, 3
96	[96, 19]	C₁₂.C₈	1st non-split extension by C₁₂ of C₈ acting via C₈/C₄=C₂	2, 3
96	[96, 20]	C₈\(\times\)Dic₃	Direct product of C₈ and Dic₃	2, 3
96	[96, 21]	Dic₃:C₈	The semidirect product of Dic₃ and C₈ acting via C₈/C₄=C₂	2, 3
96	[96, 22]	C₂₄:C₄	5th semidirect product of C₂₄ and C₄ acting via C₄/C₂=C₂	2, 3
96	[96, 23]	C₂.Dic₁₂	1st central extension by C₂ of Dic₁₂	2, 3
96	[96, 24]	C₈:Dic₃	2nd semidirect product of C₈ and Dic₃ acting via Dic₃/C₆=C₂	2, 3
96	[96, 25]	C₂₄:₁C₄	1st semidirect product of C₂₄ and C₄ acting via C₄/C₂=C₂	2, 3
96	[96, 26]	C₂₄.C₄	1st non-split extension by C₂₄ of C₄ acting via C₄/C₂=C₂	2, 3
96	[96, 27]	D₆:C₈	The semidirect product of D₆ and C₈ acting via C₈/C₄=C₂	2, 3
96	[96, 28]	C₂.D₂₄	2nd central extension by C₂ of D₂₄	2, 3
96	[96, 29]	C₁₂.53D₄	10th non-split extension by C₁₂ of D₄ acting via D₄/C₂²=C₂	2, 3
96	[96, 30]	C₁₂.46D₄	3rd non-split extension by C₁₂ of D₄ acting via D₄/C₂²=C₂	2, 3
96	[96, 31]	C₁₂.47D₄	4th non-split extension by C₁₂ of D₄ acting via D₄/C₂²=C₂	2, 3
96	[96, 32]	D₁₂:C₄	4th semidirect product of D₁₂ and C₄ acting via C₄/C₂=C₂	2, 3
96	[96, 33]	C₃:D₁₆	The semidirect product of C₃ and D₁₆ acting via D₁₆/D₈=C₂	2, 3
96	[96, 34]	D₈.S₃	The non-split extension by D₈ of S₃ acting via S₃/C₃=C₂	2, 3
96	[96, 35]	C₈.6D₆	3rd non-split extension by C₈ of D₆ acting via D₆/S₃=C₂	2, 3
96	[96, 36]	C₃:Q₃₂	The semidirect product of C₃ and Q₃₂ acting via Q₃₂/Q₁₆=C₂	2, 3
96	[96, 37]	C₁₂.55D₄	12nd non-split extension by C₁₂ of D₄ acting via D₄/C₂²=C₂	2, 3
96	[96, 38]	C₆.C₄²	5th non-split extension by C₆ of C₄₂ acting via C₄₂/C₂×C₄=C₂	2, 3
96	[96, 39]	D₄:Dic₃	1st semidirect product of D₄ and Dic₃ acting via Dic₃/C₆=C₂	2, 3
96	[96, 40]	C₁₂.D₄	8th non-split extension by C₁₂ of D₄ acting via D₄/C₂=C₂²	2, 3
96	[96, 41]	C₂³.7D₆	2nd non-split extension by C₂₃ of D₆ acting via D₆/C₃=C₂²	2, 3
96	[96, 42]	Q₈:2Dic₃	1st semidirect product of Q₈ and Dic₃ acting via Dic₃/C₆=C₂	2, 3
96	[96, 43]	C₁₂.10D₄	10th non-split extension by C₁₂ of D₄ acting via D₄/C₂=C₂²	2, 3
96	[96, 44]	Q₈:3Dic₃	2nd semidirect product of Q₈ and Dic₃ acting via Dic₃/C₆=C₂	2, 3
96	[96, 45]	C₃\(\times\)C₂.C₄²	Direct product of C₃ and C₂.C₄₂	2, 3
96	[96, 46]	C₄\(\times\)C₂₄	Abelian group of type [4, 24]	2, 3
96	[96, 47]	C₃\(\times\)C₈:C₄	Direct product of C₃ and C₈⋊C₄	2, 3
96	[96, 48]	C₃\(\times\)C₂²:C₈	Direct product of C₃ and C₂²⋊C₈	2, 3
96	[96, 49]	C₃\(\times\)C₂³:C₄	Direct product of C₃ and C₂₃⋊C₄	2, 3
96	[96, 50]	C₃\(\times\)C₄.D₄	Direct product of C₃ and C₄.D₄	2, 3
96	[96, 51]	C₃\(\times\)C₄.10D₄	Direct product of C₃ and C₄.10D₄	2, 3
96	[96, 52]	C₃\(\times\)D₄:C₄	Direct product of C₃ and D₄⋊C₄	2, 3
96	[96, 53]	C₃\(\times\)Q₈:C₄	Direct product of C₃ and Q₈⋊C₄	2, 3
96	[96, 54]	C₃\(\times\)C₄wrC₂	Direct product of C₃ and C₄≀C₂	2, 3
96	[96, 55]	C₃\(\times\)C₄:C₈	Direct product of C₃ and C₄⋊C₈	2, 3
96	[96, 56]	C₃\(\times\)C₄.Q₈	Direct product of C₃ and C₄.Q₈	2, 3
96	[96, 57]	C₃\(\times\)C₂.D₈	Direct product of C₃ and C₂.D₈	2, 3
96	[96, 58]	C₃\(\times\)C₈.C₄	Direct product of C₃ and C₈.C₄	2, 3
96	[96, 59]	C₂\(\times\)C₄₈	Abelian group of type [2, 48]	2, 3
96	[96, 60]	C₃\(\times\)M₅(2)	Direct product of C₃ and M₅(2)	2, 3
96	[96, 61]	C₃\(\times\)D₁₆	Direct product of C₃ and D₁₆	2, 3
96	[96, 62]	C₃\(\times\)SD₃₂	Direct product of C₃ and SD₃₂	2, 3
96	[96, 63]	C₃\(\times\)Q₃₂	Direct product of C₃ and Q₃₂	2, 3
96	[96, 64]	C₄²:S₃	The semidirect product of C₄₂ and S₃ acting faithfully	2, 3
96	[96, 65]	A₄:C₈	The semidirect product of A₄ and C₈ acting via C₈/C₄=C₂	2, 3
96	[96, 66]	Q₈:Dic₃	The semidirect product of Q₈ and Dic₃ acting via Dic₃/C₂=S₃	2, 3
96	[96, 67]	U(2, 3)	Unitary group on 𝔽₃²	2, 3
96	[96, 68]	C₂\(\times\)C₄²:C₃	Direct product of C₂ and C₄₂⋊C₃	2, 3
96	[96, 69]	C₄\(\times\)SL(2, 3)	Direct product of C₄ and SL₂(𝔽₃)	2, 3
96	[96, 70]	C₂⁴:C₆	1st semidirect product of C₂₄ and C₆ acting faithfully	2, 3
96	[96, 71]	C₄²:C₆	1st semidirect product of C₄₂ and C₆ acting faithfully	2, 3
96	[96, 72]	C₂³.A₄	2nd non-split extension by C₂₃ of A₄ acting faithfully	2, 3
96	[96, 73]	C₈\(\times\)A₄	Direct product of C₈ and A₄	2, 3
96	[96, 74]	C₈.A₄	The central extension by C₈ of A₄	2, 3
96	[96, 75]	C₄\(\times\)Dic₆	Direct product of C₄ and Dic₆	2, 3
96	[96, 76]	C₁₂:₂Q₈	1st semidirect product of C₁₂ and Q₈ acting via Q₈/C₄=C₂	2, 3
96	[96, 77]	C₁₂.6Q₈	3rd non-split extension by C₁₂ of Q₈ acting via Q₈/C₄=C₂	2, 3
96	[96, 78]	S₃\(\times\)C₄²	Direct product of C₄₂ and S₃	2, 3
96	[96, 79]	C₄²:₂S₃	1st semidirect product of C₄₂ and S₃ acting via S₃/C₃=C₂	2, 3
96	[96, 80]	C₄\(\times\)D₁₂	Direct product of C₄ and D₁₂	2, 3
96	[96, 81]	C₄:D₁₂	The semidirect product of C₄ and D₁₂ acting via D₁₂/C₁₂=C₂	2, 3
96	[96, 82]	C₄²:₇S₃	6th semidirect product of C₄₂ and S₃ acting via S₃/C₃=C₂	2, 3
96	[96, 83]	C₄²:₃S₃	2nd semidirect product of C₄₂ and S₃ acting via S₃/C₃=C₂	2, 3
96	[96, 84]	C₂³.16D₆	1st non-split extension by C₂₃ of D₆ acting via D₆/S₃=C₂	2, 3
96	[96, 85]	Dic₃.D₄	1st non-split extension by Dic₃ of D₄ acting via D₄/C₂²=C₂	2, 3
96	[96, 86]	C₂³.8D₆	3rd non-split extension by C₂₃ of D₆ acting via D₆/C₃=C₂²	2, 3
96	[96, 87]	S₃\(\times\)C₂²:C₄	Direct product of S₃ and C₂²⋊C₄	2, 3
96	[96, 88]	Dic₃:₄D₄	1st semidirect product of Dic₃ and D₄ acting through Inn(Dic₃)	2, 3
96	[96, 89]	D₆:D₄	1st semidirect product of D₆ and D₄ acting via D₄/C₂²=C₂	2, 3
96	[96, 90]	C₂³.9D₆	4th non-split extension by C₂₃ of D₆ acting via D₆/C₃=C₂²	2, 3
96	[96, 91]	Dic₃:D₄	1st semidirect product of Dic₃ and D₄ acting via D₄/C₂²=C₂	2, 3
96	[96, 92]	C₂³.11D₆	6th non-split extension by C₂₃ of D₆ acting via D₆/C₃=C₂²	2, 3
96	[96, 93]	C₂³.21D₆	6th non-split extension by C₂₃ of D₆ acting via D₆/S₃=C₂	2, 3
96	[96, 94]	Dic₆:C₄	5th semidirect product of Dic₆ and C₄ acting via C₄/C₂=C₂	2, 3
96	[96, 95]	C₁₂:Q₈	The semidirect product of C₁₂ and Q₈ acting via Q₈/C₂=C₂²	2, 3
96	[96, 96]	Dic₃.Q₈	The non-split extension by Dic₃ of Q₈ acting via Q₈/C₄=C₂	2, 3
96	[96, 97]	C₄.Dic₆	3rd non-split extension by C₄ of Dic₆ acting via Dic₆/Dic₃=C₂	2, 3
96	[96, 98]	S₃\(\times\)C₄:C₄	Direct product of S₃ and C₄⋊C₄	2, 3
96	[96, 99]	C₄:C₄:₇S₃	1st semidirect product of C₄⋊C₄ and S₃ acting through Inn(C₄⋊C₄)	2, 3
96	[96, 100]	Dic₃:₅D₄	2nd semidirect product of Dic₃ and D₄ acting through Inn(Dic₃)	2, 3
96	[96, 101]	D₆.D₄	2nd non-split extension by D₆ of D₄ acting via D₄/C₂²=C₂	2, 3
96	[96, 102]	C₁₂:D₄	1st semidirect product of C₁₂ and D₄ acting via D₄/C₂=C₂²	2, 3
96	[96, 103]	D₆:Q₈	1st semidirect product of D₆ and Q₈ acting via Q₈/C₄=C₂	2, 3
96	[96, 104]	C₄.D₁₂	5th non-split extension by C₄ of D₁₂ acting via D₁₂/D₆=C₂	2, 3
96	[96, 105]	C₄:C₄:S₃	6th semidirect product of C₄⋊C₄ and S₃ acting via S₃/C₃=C₂	2, 3
96	[96, 106]	S₃\(\times\)C₂\(\times\)C₈	Direct product of C₂×C₈ and S₃	2, 3
96	[96, 107]	C₂\(\times\)C₈:S₃	Direct product of C₂ and C₈⋊S₃	2, 3
96	[96, 108]	C₈oD₁₂	Central product of C₈ and D₁₂	2, 3
96	[96, 109]	C₂\(\times\)C₂₄:C₂	Direct product of C₂ and C₂₄⋊C₂	2, 3
96	[96, 110]	C₂\(\times\)D₂₄	Direct product of C₂ and D₂₄	2, 3
96	[96, 111]	C₄oD₂₄	Central product of C₄ and D₂₄	2, 3
96	[96, 112]	C₂\(\times\)Dic₁₂	Direct product of C₂ and Dic₁₂	2, 3
96	[96, 113]	S₃\(\times\)M₄(2)	Direct product of S₃ and M₄(2)	2, 3
96	[96, 114]	D₁₂.C₄	The non-split extension by D₁₂ of C₄ acting via C₄/C₂=C₂	2, 3
96	[96, 115]	C₈:D₆	1st semidirect product of C₈ and D₆ acting via D₆/C₃=C₂²	2, 3
96	[96, 116]	C₈.D₆	1st non-split extension by C₈ of D₆ acting via D₆/C₃=C₂²	2, 3
96	[96, 117]	S₃\(\times\)D₈	Direct product of S₃ and D₈	2, 3
96	[96, 118]	D₈:S₃	2nd semidirect product of D₈ and S₃ acting via S₃/C₃=C₂	2, 3
96	[96, 119]	D₈:₃S₃	The semidirect product of D₈ and S₃ acting through Inn(D₈)	2, 3
96	[96, 120]	S₃\(\times\)SD₁₆	Direct product of S₃ and SD₁₆	2, 3
96	[96, 121]	Q₈:₃D₆	2nd semidirect product of Q₈ and D₆ acting via D₆/S₃=C₂	2, 3
96	[96, 122]	D₄.D₆	4th non-split extension by D₄ of D₆ acting via D₆/S₃=C₂	2, 3
96	[96, 123]	Q₈.7D₆	2nd non-split extension by Q₈ of D₆ acting via D₆/S₃=C₂	2, 3
96	[96, 124]	S₃\(\times\)Q₁₆	Direct product of S₃ and Q₁₆	2, 3
96	[96, 125]	Q₁₆:S₃	2nd semidirect product of Q₁₆ and S₃ acting via S₃/C₃=C₂	2, 3
96	[96, 126]	D₂₄:C₂	5th semidirect product of D₂₄ and C₂ acting faithfully	2, 3
96	[96, 127]	C₂²\(\times\)C₃:C₈	Direct product of C₂² and C₃⋊C₈	2, 3
96	[96, 128]	C₂\(\times\)C₄.Dic₃	Direct product of C₂ and C₄.Dic₃	2, 3
96	[96, 129]	C₂\(\times\)C₄\(\times\)Dic₃	Direct product of C₂×C₄ and Dic₃	2, 3
96	[96, 130]	C₂\(\times\)Dic₃:C₄	Direct product of C₂ and Dic₃⋊C₄	2, 3
96	[96, 131]	C₁₂.48D₄	5th non-split extension by C₁₂ of D₄ acting via D₄/C₂²=C₂	2, 3
96	[96, 132]	C₂\(\times\)C₄:Dic₃	Direct product of C₂ and C₄⋊Dic₃	2, 3
96	[96, 133]	C₂³.26D₆	2nd non-split extension by C₂₃ of D₆ acting via D₆/C₆=C₂	2, 3
96	[96, 134]	C₂\(\times\)D₆:C₄	Direct product of C₂ and D₆⋊C₄	2, 3
96	[96, 135]	C₄\(\times\)C₃:D₄	Direct product of C₄ and C₃⋊D₄	2, 3
96	[96, 136]	C₂³.28D₆	4th non-split extension by C₂₃ of D₆ acting via D₆/C₆=C₂	2, 3
96	[96, 137]	C₁₂:₇D₄	1st semidirect product of C₁₂ and D₄ acting via D₄/C₂²=C₂	2, 3
96	[96, 138]	C₂\(\times\)D₄:S₃	Direct product of C₂ and D₄⋊S₃	2, 3
96	[96, 139]	D₁₂:₆C₂²	4th semidirect product of D₁₂ and C₂² acting via C₂²/C₂=C₂	2, 3
96	[96, 140]	C₂\(\times\)D₄.S₃	Direct product of C₂ and D₄.S₃	2, 3
96	[96, 141]	D₄\(\times\)Dic₃	Direct product of D₄ and Dic₃	2, 3
96	[96, 142]	C₂³.23D₆	8th non-split extension by C₂₃ of D₆ acting via D₆/S₃=C₂	2, 3
96	[96, 143]	C₂³.12D₆	7th non-split extension by C₂₃ of D₆ acting via D₆/C₃=C₂²	2, 3
96	[96, 144]	C₂³:₂D₆	1st semidirect product of C₂₃ and D₆ acting via D₆/C₃=C₂²	2, 3
96	[96, 145]	D₆:₃D₄	3rd semidirect product of D₆ and D₄ acting via D₄/C₄=C₂	2, 3
96	[96, 146]	C₂³.14D₆	9th non-split extension by C₂₃ of D₆ acting via D₆/C₃=C₂²	2, 3
96	[96, 147]	C₁₂:₃D₄	3rd semidirect product of C₁₂ and D₄ acting via D₄/C₂=C₂²	2, 3
96	[96, 148]	C₂\(\times\)Q₈:₂S₃	Direct product of C₂ and Q₈⋊2S₃	2, 3
96	[96, 149]	Q₈.11D₆	1st non-split extension by Q₈ of D₆ acting via D₆/C₆=C₂	2, 3
96	[96, 150]	C₂\(\times\)C₃:Q₁₆	Direct product of C₂ and C₃⋊Q₁₆	2, 3
96	[96, 151]	Dic₃:Q₈	2nd semidirect product of Dic₃ and Q₈ acting via Q₈/C₄=C₂	2, 3
96	[96, 152]	Q₈\(\times\)Dic₃	Direct product of Q₈ and Dic₃	2, 3
96	[96, 153]	D₆:₃Q₈	3rd semidirect product of D₆ and Q₈ acting via Q₈/C₄=C₂	2, 3
96	[96, 154]	C₁₂.23D₄	23rd non-split extension by C₁₂ of D₄ acting via D₄/C₂=C₂²	2, 3
96	[96, 155]	D₄.Dic₃	The non-split extension by D₄ of Dic₃ acting through Inn(D₄)	2, 3
96	[96, 156]	D₄:D₆	2nd semidirect product of D₄ and D₆ acting via D₆/C₆=C₂	2, 3
96	[96, 157]	Q₈.13D₆	3rd non-split extension by Q₈ of D₆ acting via D₆/C₆=C₂	2, 3
96	[96, 158]	Q₈.14D₆	4th non-split extension by Q₈ of D₆ acting via D₆/C₆=C₂	2, 3
96	[96, 159]	C₂\(\times\)C₆.D₄	Direct product of C₂ and C₆.D₄	2, 3
96	[96, 160]	C₂⁴:₄S₃	1st semidirect product of C₂₄ and S₃ acting via S₃/C₃=C₂	2, 3
96	[96, 161]	C₂\(\times\)C₄\(\times\)C₁₂	Abelian group of type [2, 4,12]	2, 3
96	[96, 162]	C₆\(\times\)C₂²:C₄	Direct product of C₆ and C₂²⋊C₄	2, 3
96	[96, 163]	C₆\(\times\)C₄:C₄	Direct product of C₆ and C₄⋊C₄	2, 3
96	[96, 164]	C₃\(\times\)C₄²:C₂	Direct product of C₃ and C₄₂⋊C₂	2, 3
96	[96, 165]	D₄\(\times\)C₁₂	Direct product of C₁₂ and D₄	2, 3
96	[96, 166]	Q₈\(\times\)C₁₂	Direct product of C₁₂ and Q₈	2, 3
96	[96, 167]	C₃\(\times\)C₂²wrC₂	Direct product of C₃ and C₂²≀C₂	2, 3
96	[96, 168]	C₃\(\times\)C₄:D₄	Direct product of C₃ and C₄⋊D₄	2, 3
96	[96, 169]	C₃\(\times\)C₂²:Q₈	Direct product of C₃ and C₂²⋊Q₈	2, 3
96	[96, 170]	C₃\(\times\)C₂².D₄	Direct product of C₃ and C₂².D₄	2, 3
96	[96, 171]	C₃\(\times\)C₄.4D₄	Direct product of C₃ and C₄.4D₄	2, 3
96	[96, 172]	C₃\(\times\)C₄².C₂	Direct product of C₃ and C₄₂.C₂	2, 3
96	[96, 173]	C₃\(\times\)C₄²:₂C₂	Direct product of C₃ and C₄₂⋊2C₂	2, 3
96	[96, 174]	C₃\(\times\)C₄:₁D₄	Direct product of C₃ and C₄⋊1D₄	2, 3
96	[96, 175]	C₃\(\times\)C₄:Q₈	Direct product of C₃ and C₄⋊Q₈	2, 3
96	[96, 176]	C₂²\(\times\)C₂₄	Abelian group of type [2, 2,24]	2, 3
96	[96, 177]	C₆\(\times\)M₄(2)	Direct product of C₆ and M₄(2)	2, 3
96	[96, 178]	C₃\(\times\)C₈oD₄	Direct product of C₃ and C₈○D₄	2, 3
96	[96, 179]	C₆\(\times\)D₈	Direct product of C₆ and D₈	2, 3
96	[96, 180]	C₆\(\times\)SD₁₆	Direct product of C₆ and SD₁₆	2, 3
96	[96, 181]	C₆\(\times\)Q₁₆	Direct product of C₆ and Q₁₆	2, 3
96	[96, 182]	C₃\(\times\)C₄oD₈	Direct product of C₃ and C₄○D₈	2, 3
96	[96, 183]	C₃\(\times\)C₈:C₂²	Direct product of C₃ and C₈⋊C₂²	2, 3
96	[96, 184]	C₃\(\times\)C₈.C₂²	Direct product of C₃ and C₈.C₂²	2, 3
96	[96, 185]	A₄:Q₈	The semidirect product of A₄ and Q₈ acting via Q₈/C₄=C₂	2, 3
96	[96, 186]	C₄\(\times\)S₄	Direct product of C₄ and S₄	2, 3
96	[96, 187]	C₄:S₄	The semidirect product of C₄ and S₄ acting via S₄/A₄=C₂	2, 3
96	[96, 188]	C₂\(\times\)CSU(2, 3)	Direct product of C₂ and CSU₂(𝔽₃)	2, 3
96	[96, 189]	C₂\(\times\)GL(2, 3)	Direct product of C₂ and GL₂(𝔽₃)	2, 3
96	[96, 190]	Q₈.D₆	2nd non-split extension by Q₈ of D₆ acting via D₆/C₂=S₃	2, 3
96	[96, 191]	C₄.S₄	2nd non-split extension by C₄ of S₄ acting via S₄/A₄=C₂	2, 3
96	[96, 192]	C₄.6S₄	3rd central extension by C₄ of S₄	2, 3
96	[96, 193]	C₄.3S₄	3rd non-split extension by C₄ of S₄ acting via S₄/A₄=C₂	2, 3
96	[96, 194]	C₂\(\times\)A₄:C₄	Direct product of C₂ and A₄⋊C₄	2, 3
96	[96, 195]	A₄:D₄	The semidirect product of A₄ and D₄ acting via D₄/C₂²=C₂	2, 3
96	[96, 196]	C₂\(\times\)C₄\(\times\)A₄	Direct product of C₂×C₄ and A₄	2, 3
96	[96, 197]	D₄\(\times\)A₄	Direct product of D₄ and A₄	2, 3
96	[96, 198]	C₂²\(\times\)SL(2, 3)	Direct product of C₂² and SL₂(𝔽₃)	2, 3
96	[96, 199]	Q₈\(\times\)A₄	Direct product of Q₈ and A₄	2, 3
96	[96, 200]	C₂\(\times\)C₄.A₄	Direct product of C₂ and C₄.A₄	2, 3
96	[96, 201]	Q₈.A₄	The non-split extension by Q₈ of A₄ acting through Inn(Q₈)	2, 3
96	[96, 202]	D₄.A₄	The non-split extension by D₄ of A₄ acting through Inn(D₄)	2, 3
96	[96, 203]	Q₈:A₄	1st semidirect product of Q₈ and A₄ acting via A₄/C₂²=C₃	2, 3
96	[96, 204]	C₂³:A₄	2nd semidirect product of C₂₃ and A₄ acting faithfully	2, 3
96	[96, 205]	C₂²\(\times\)Dic₆	Direct product of C₂² and Dic₆	2, 3
96	[96, 206]	S₃\(\times\)C₂²\(\times\)C₄	Direct product of C₂²×C₄ and S₃	2, 3
96	[96, 207]	C₂²\(\times\)D₁₂	Direct product of C₂² and D₁₂	2, 3
96	[96, 208]	C₂\(\times\)C₄oD₁₂	Direct product of C₂ and C₄○D₁₂	2, 3
96	[96, 209]	C₂\(\times\)S₃\(\times\)D₄	Direct product of C₂, S₃ and D₄	2, 3
96	[96, 210]	C₂\(\times\)D₄:₂S₃	Direct product of C₂ and D₄⋊2S₃	2, 3
96	[96, 211]	D₄:₆D₆	2nd semidirect product of D₄ and D₆ acting through Inn(D₄)	2, 3
96	[96, 212]	C₂\(\times\)S₃\(\times\)Q₈	Direct product of C₂, S₃ and Q₈	2, 3
96	[96, 213]	C₂\(\times\)Q₈:₃S₃	Direct product of C₂ and Q₈⋊3S₃	2, 3
96	[96, 214]	Q₈.15D₆	1st non-split extension by Q₈ of D₆ acting through Inn(Q₈)	2, 3
96	[96, 215]	S₃\(\times\)C₄oD₄	Direct product of S₃ and C₄○D₄	2, 3
96	[96, 216]	D₄oD₁₂	Central product of D₄ and D₁₂	2, 3
96	[96, 217]	Q₈oD₁₂	Central product of Q₈ and D₁₂	2, 3
96	[96, 218]	C₂³\(\times\)Dic₃	Direct product of C₂₃ and Dic₃	2, 3
96	[96, 219]	C₂²\(\times\)C₃:D₄	Direct product of C₂² and C₃⋊D₄	2, 3
96	[96, 220]	C₂³\(\times\)C₁₂	Abelian group of type [2, 2,2, 12]	2, 3
96	[96, 221]	D₄\(\times\)C₂\(\times\)C₆	Direct product of C₂×C₆ and D₄	2, 3
96	[96, 222]	Q₈\(\times\)C₂\(\times\)C₆	Direct product of C₂×C₆ and Q₈	2, 3
96	[96, 223]	C₆\(\times\)C₄oD₄	Direct product of C₆ and C₄○D₄	2, 3
96	[96, 224]	C₃\(\times\)ES+(2, 2)	Direct product of C₃ and 2+ 1+4	2, 3
96	[96, 225]	C₃\(\times\)ES-(2, 2)	Direct product of C₃ and 2- 1+4	2, 3
96	[96, 226]	C₂²\(\times\)S₄	Direct product of C₂² and S₄	2, 3
96	[96, 227]	C₂²:S₄	The semidirect product of C₂² and S₄ acting via S₄/C₂²=S₃	2, 3
96	[96, 228]	C₂³\(\times\)A₄	Direct product of C₂₃ and A₄	2, 3
96	[96, 229]	C₂\(\times\)C₂²:A₄	Direct product of C₂ and C₂²⋊A₄	2, 3
96	[96, 230]	S₃\(\times\)C₂⁴	Direct product of C₂₄ and S₃	2, 3
96	[96, 231]	C₂⁴\(\times\)C₆	Abelian group of type [2, 2,2, 2,6]	2, 3
97	[97, 1]	C₉₇	Cyclic group	97
98	[98, 1]	D₄₉	Dihedral group	2, 7
98	[98, 2]	C₉₈	Cyclic group	2, 7
98	[98, 3]	C₇\(\times\)D₇	Direct product of C₇ and D₇	2, 7
98	[98, 4]	C₇:D₇	The semidirect product of C₇ and D₇ acting via D₇/C₇=C₂	2, 7
98	[98, 5]	C₇\(\times\)C₁₄	Abelian group of type [7, 14]	2, 7
99	[99, 1]	C₉₉	Cyclic group	3, 11
99	[99, 2]	C₃\(\times\)C₃₃	Abelian group of type [3, 33]	3, 11
100	[100, 1]	Dic₂₅	Dicyclic group	2, 5
100	[100, 2]	C₁₀₀	Cyclic group	2, 5
100	[100, 3]	C₂₅:C₄	The semidirect product of C₂₅ and C₄ acting faithfully	2, 5
100	[100, 4]	D₅₀	Dihedral group	2, 5
100	[100, 5]	C₂\(\times\)C₅₀	Abelian group of type [2, 50]	2, 5
100	[100, 6]	C₅\(\times\)Dic₅	Direct product of C₅ and Dic₅	2, 5
100	[100, 7]	C₅²:₆C₄	2nd semidirect product of C₅₂ and C₄ acting via C₄/C₂=C₂	2, 5
100	[100, 8]	C₅\(\times\)C₂₀	Abelian group of type [5, 20]	2, 5
100	[100, 9]	C₅\(\times\)F₅	Direct product of C₅ and F₅	2, 5
100	[100, 10]	D₅.D₅	The non-split extension by D₅ of D₅ acting via D₅/C₅=C₂	2, 5
100	[100, 11]	C₅:F₅	1st semidirect product of C₅ and F₅ acting via F₅/C₅=C₄	2, 5
100	[100, 12]	C₅²:C₄	4th semidirect product of C₅₂ and C₄ acting faithfully	2, 5
100	[100, 13]	D₅²	Direct product of D₅ and D₅	2, 5
100	[100, 14]	D₅\(\times\)C₁₀	Direct product of C₁₀ and D₅	2, 5
100	[100, 15]	C₂\(\times\)C₅:D₅	Direct product of C₂ and C₅⋊D₅	2, 5
100	[100, 16]	C₁₀²	Abelian group of type [10, 10]	2, 5
101	[101, 1]	C₁₀₁	Cyclic group	101
102	[102, 1]	S₃\(\times\)C₁₇	Direct product of C₁₇ and S₃	2, 3, 17
102	[102, 2]	C₃\(\times\)D₁₇	Direct product of C₃ and D₁₇	2, 3, 17
102	[102, 3]	D₅₁	Dihedral group	2, 3, 17
102	[102, 4]	C₁₀₂	Cyclic group	2, 3, 17
103	[103, 1]	C₁₀₃	Cyclic group	103
104	[104, 1]	C₁₃:₂C₈	The semidirect product of C₁₃ and C₈ acting via C₈/C₄=C₂	2, 13
104	[104, 2]	C₁₀₄	Cyclic group	2, 13
104	[104, 3]	C₁₃:C₈	The semidirect product of C₁₃ and C₈ acting via C₈/C₂=C₄	2, 13
104	[104, 4]	Dic₂₆	Dicyclic group	2, 13
104	[104, 5]	C₄\(\times\)D₁₃	Direct product of C₄ and D₁₃	2, 13
104	[104, 6]	D₅₂	Dihedral group	2, 13
104	[104, 7]	C₂\(\times\)Dic₁₃	Direct product of C₂ and Dic₁₃	2, 13
104	[104, 8]	C₁₃:D₄	The semidirect product of C₁₃ and D₄ acting via D₄/C₂²=C₂	2, 13
104	[104, 9]	C₂\(\times\)C₅₂	Abelian group of type [2, 52]	2, 13
104	[104, 10]	D₄\(\times\)C₁₃	Direct product of C₁₃ and D₄	2, 13
104	[104, 11]	Q₈\(\times\)C₁₃	Direct product of C₁₃ and Q₈	2, 13
104	[104, 12]	C₂\(\times\)C₁₃:C₄	Direct product of C₂ and C₁₃⋊C₄	2, 13
104	[104, 13]	C₂²\(\times\)D₁₃	Direct product of C₂² and D₁₃	2, 13
104	[104, 14]	C₂²\(\times\)C₂₆	Abelian group of type [2, 2,26]	2, 13
105	[105, 1]	C₅\(\times\)C₇:C₃	Direct product of C₅ and C₇⋊C₃	3, 5, 7
105	[105, 2]	C₁₀₅	Cyclic group	3, 5, 7
106	[106, 1]	D₅₃	Dihedral group	2, 53
106	[106, 2]	C₁₀₆	Cyclic group	2, 53
107	[107, 1]	C₁₀₇	Cyclic group	107
108	[108, 1]	Dic₂₇	Dicyclic group	2, 3
108	[108, 2]	C₁₀₈	Cyclic group	2, 3
108	[108, 3]	C₉.A₄	The central extension by C₉ of A₄	2, 3
108	[108, 4]	D₅₄	Dihedral group	2, 3
108	[108, 5]	C₂\(\times\)C₅₄	Abelian group of type [2, 54]	2, 3
108	[108, 6]	C₃\(\times\)Dic₉	Direct product of C₃ and Dic₉	2, 3
108	[108, 7]	C₉\(\times\)Dic₃	Direct product of C₉ and Dic₃	2, 3
108	[108, 8]	C₃²:C₁₂	The semidirect product of C₃₂ and C₁₂ acting via C₁₂/C₂=C₆	2, 3
108	[108, 9]	C₉:C₁₂	The semidirect product of C₉ and C₁₂ acting via C₁₂/C₂=C₆	2, 3
108	[108, 10]	C₉:Dic₃	The semidirect product of C₉ and Dic₃ acting via Dic₃/C₆=C₂	2, 3
108	[108, 11]	He3:₃C₄	2nd semidirect product of He3 and C₄ acting via C₄/C₂=C₂	2, 3
108	[108, 12]	C₃\(\times\)C₃₆	Abelian group of type [3, 36]	2, 3
108	[108, 13]	C₄\(\times\)He3	Direct product of C₄ and He3	2, 3
108	[108, 14]	C₄\(\times\)ES-(3, 1)	Direct product of C₄ and 3- 1+2	2, 3
108	[108, 15]	He3:C₄	The semidirect product of He3 and C₄ acting faithfully	2, 3
108	[108, 16]	S₃\(\times\)D₉	Direct product of S₃ and D₉	2, 3
108	[108, 17]	C₃²:D₆	The semidirect product of C₃₂ and D₆ acting faithfully	2, 3
108	[108, 18]	C₉\(\times\)A₄	Direct product of C₉ and A₄	2, 3
108	[108, 19]	C₉:A₄	The semidirect product of C₉ and A₄ acting via A₄/C₂²=C₃	2, 3
108	[108, 20]	C₃\(\times\)C₃.A₄	Direct product of C₃ and C₃.A₄	2, 3
108	[108, 21]	C₃².A₄	The non-split extension by C₃₂ of A₄ acting via A₄/C₂²=C₃	2, 3
108	[108, 22]	C₃²:A₄	The semidirect product of C₃₂ and A₄ acting via A₄/C₂²=C₃	2, 3
108	[108, 23]	C₆\(\times\)D₉	Direct product of C₆ and D₉	2, 3
108	[108, 24]	S₃\(\times\)C₁₈	Direct product of C₁₈ and S₃	2, 3
108	[108, 25]	C₂\(\times\)C₃²:C₆	Direct product of C₂ and C₃₂⋊C₆	2, 3
108	[108, 26]	C₂\(\times\)C₉:C₆	Direct product of C₂ and C₉⋊C₆	2, 3
108	[108, 27]	C₂\(\times\)C₉:S₃	Direct product of C₂ and C₉⋊S₃	2, 3
108	[108, 28]	C₂\(\times\)He3:C₂	Direct product of C₂ and He3⋊C₂	2, 3
108	[108, 29]	C₆\(\times\)C₁₈	Abelian group of type [6, 18]	2, 3
108	[108, 30]	C₂²\(\times\)He3	Direct product of C₂² and He3	2, 3
108	[108, 31]	C₂²\(\times\)ES-(3, 1)	Direct product of C₂² and 3- 1+2	2, 3
108	[108, 32]	C₃²\(\times\)Dic₃	Direct product of C₃₂ and Dic₃	2, 3
108	[108, 33]	C₃\(\times\)C₃:Dic₃	Direct product of C₃ and C₃⋊Dic₃	2, 3
108	[108, 34]	C₃³:₅C₄	3rd semidirect product of C₃₃ and C₄ acting via C₄/C₂=C₂	2, 3
108	[108, 35]	C₃²\(\times\)C₁₂	Abelian group of type [3, 3,12]	2, 3
108	[108, 36]	C₃\(\times\)C₃²:C₄	Direct product of C₃ and C₃₂⋊C₄	2, 3
108	[108, 37]	C₃³:C₄	2nd semidirect product of C₃₃ and C₄ acting faithfully	2, 3
108	[108, 38]	C₃\(\times\)S₃²	Direct product of C₃, S₃ and S₃	2, 3
108	[108, 39]	S₃\(\times\)C₃:S₃	Direct product of S₃ and C₃⋊S₃	2, 3
108	[108, 40]	C₃²:₄D₆	The semidirect product of C₃₂ and D₆ acting via D₆/C₃=C₂²	2, 3
108	[108, 41]	C₃²\(\times\)A₄	Direct product of C₃₂ and A₄	2, 3
108	[108, 42]	S₃\(\times\)C₃\(\times\)C₆	Direct product of C₃×C₆ and S₃	2, 3
108	[108, 43]	C₆\(\times\)C₃:S₃	Direct product of C₆ and C₃⋊S₃	2, 3
108	[108, 44]	C₂\(\times\)C₃³:C₂	Direct product of C₂ and C₃₃⋊C₂	2, 3
108	[108, 45]	C₃\(\times\)C₆²	Abelian group of type [3, 6,6]	2, 3
109	[109, 1]	C₁₀₉	Cyclic group	109
110	[110, 1]	F₁₁	Frobenius group	2, 5, 11
110	[110, 2]	C₂\(\times\)C₁₁:C₅	Direct product of C₂ and C₁₁⋊C₅	2, 5, 11
110	[110, 3]	D₅\(\times\)C₁₁	Direct product of C₁₁ and D₅	2, 5, 11
110	[110, 4]	C₅\(\times\)D₁₁	Direct product of C₅ and D₁₁	2, 5, 11
110	[110, 5]	D₅₅	Dihedral group	2, 5, 11
110	[110, 6]	C₁₁₀	Cyclic group	2, 5, 11
111	[111, 1]	C₃₇:C₃	The semidirect product of C₃₇ and C₃ acting faithfully	3, 37
111	[111, 2]	C₁₁₁	Cyclic group	3, 37
112	[112, 1]	C₇:C₁₆	The semidirect product of C₇ and C₁₆ acting via C₁₆/C₈=C₂	2, 7
112	[112, 2]	C₁₁₂	Cyclic group	2, 7
112	[112, 3]	C₈\(\times\)D₇	Direct product of C₈ and D₇	2, 7
112	[112, 4]	C₈:D₇	3rd semidirect product of C₈ and D₇ acting via D₇/C₇=C₂	2, 7
112	[112, 5]	C₅₆:C₂	2nd semidirect product of C₅₆ and C₂ acting faithfully	2, 7
112	[112, 6]	D₅₆	Dihedral group	2, 7
112	[112, 7]	Dic₂₈	Dicyclic group	2, 7
112	[112, 8]	C₂\(\times\)C₇:C₈	Direct product of C₂ and C₇⋊C₈	2, 7
112	[112, 9]	C₄.Dic₇	The non-split extension by C₄ of Dic₇ acting via Dic₇/C₁₄=C₂	2, 7
112	[112, 10]	C₄\(\times\)Dic₇	Direct product of C₄ and Dic₇	2, 7
112	[112, 11]	Dic₇:C₄	The semidirect product of Dic₇ and C₄ acting via C₄/C₂=C₂	2, 7
112	[112, 12]	C₄:Dic₇	The semidirect product of C₄ and Dic₇ acting via Dic₇/C₁₄=C₂	2, 7
112	[112, 13]	D₁₄:C₄	The semidirect product of D₁₄ and C₄ acting via C₄/C₂=C₂	2, 7
112	[112, 14]	D₄:D₇	The semidirect product of D₄ and D₇ acting via D₇/C₇=C₂	2, 7
112	[112, 15]	D₄.D₇	The non-split extension by D₄ of D₇ acting via D₇/C₇=C₂	2, 7
112	[112, 16]	Q₈:D₇	The semidirect product of Q₈ and D₇ acting via D₇/C₇=C₂	2, 7
112	[112, 17]	C₇:Q₁₆	The semidirect product of C₇ and Q₁₆ acting via Q₁₆/Q₈=C₂	2, 7
112	[112, 18]	C₂³.D₇	The non-split extension by C₂₃ of D₇ acting via D₇/C₇=C₂	2, 7
112	[112, 19]	C₄\(\times\)C₂₈	Abelian group of type [4, 28]	2, 7
112	[112, 20]	C₇\(\times\)C₂²:C₄	Direct product of C₇ and C₂²⋊C₄	2, 7
112	[112, 21]	C₇\(\times\)C₄:C₄	Direct product of C₇ and C₄⋊C₄	2, 7
112	[112, 22]	C₂\(\times\)C₅₆	Abelian group of type [2, 56]	2, 7
112	[112, 23]	C₇\(\times\)M₄(2)	Direct product of C₇ and M₄(2)	2, 7
112	[112, 24]	C₇\(\times\)D₈	Direct product of C₇ and D₈	2, 7
112	[112, 25]	C₇\(\times\)SD₁₆	Direct product of C₇ and SD₁₆	2, 7
112	[112, 26]	C₇\(\times\)Q₁₆	Direct product of C₇ and Q₁₆	2, 7
112	[112, 27]	C₂\(\times\)Dic₁₄	Direct product of C₂ and Dic₁₄	2, 7
112	[112, 28]	C₂\(\times\)C₄\(\times\)D₇	Direct product of C₂×C₄ and D₇	2, 7
112	[112, 29]	C₂\(\times\)D₂₈	Direct product of C₂ and D₂₈	2, 7
112	[112, 30]	C₄oD₂₈	Central product of C₄ and D₂₈	2, 7
112	[112, 31]	D₄\(\times\)D₇	Direct product of D₄ and D₇	2, 7
112	[112, 32]	D₄:₂D₇	The semidirect product of D₄ and D₇ acting through Inn(D₄)	2, 7
112	[112, 33]	Q₈\(\times\)D₇	Direct product of Q₈ and D₇	2, 7
112	[112, 34]	Q₈:₂D₇	The semidirect product of Q₈ and D₇ acting through Inn(Q₈)	2, 7
112	[112, 35]	C₂²\(\times\)Dic₇	Direct product of C₂² and Dic₇	2, 7
112	[112, 36]	C₂\(\times\)C₇:D₄	Direct product of C₂ and C₇⋊D₄	2, 7
112	[112, 37]	C₂²\(\times\)C₂₈	Abelian group of type [2, 2,28]	2, 7
112	[112, 38]	D₄\(\times\)C₁₄	Direct product of C₁₄ and D₄	2, 7
112	[112, 39]	Q₈\(\times\)C₁₄	Direct product of C₁₄ and Q₈	2, 7
112	[112, 40]	C₇\(\times\)C₄oD₄	Direct product of C₇ and C₄○D₄	2, 7
112	[112, 41]	C₂\(\times\)F₈	Direct product of C₂ and F₈	2, 7
112	[112, 42]	C₂³\(\times\)D₇	Direct product of C₂₃ and D₇	2, 7
112	[112, 43]	C₂³\(\times\)C₁₄	Abelian group of type [2, 2,2, 14]	2, 7
113	[113, 1]	C₁₁₃	Cyclic group	113
114	[114, 1]	C₁₉:C₆	The semidirect product of C₁₉ and C₆ acting faithfully	2, 3, 19
114	[114, 2]	C₂\(\times\)C₁₉:C₃	Direct product of C₂ and C₁₉⋊C₃	2, 3, 19
114	[114, 3]	S₃\(\times\)C₁₉	Direct product of C₁₉ and S₃	2, 3, 19
114	[114, 4]	C₃\(\times\)D₁₉	Direct product of C₃ and D₁₉	2, 3, 19
114	[114, 5]	D₅₇	Dihedral group	2, 3, 19
114	[114, 6]	C₁₁₄	Cyclic group	2, 3, 19
115	[115, 1]	C₁₁₅	Cyclic group	5, 23
116	[116, 1]	Dic₂₉	Dicyclic group	2, 29
116	[116, 2]	C₁₁₆	Cyclic group	2, 29
116	[116, 3]	C₂₉:C₄	The semidirect product of C₂₉ and C₄ acting faithfully	2, 29
116	[116, 4]	D₅₈	Dihedral group	2, 29
116	[116, 5]	C₂\(\times\)C₅₈	Abelian group of type [2, 58]	2, 29
117	[117, 1]	C₁₃:C₉	The semidirect product of C₁₃ and C₉ acting via C₉/C₃=C₃	3, 13
117	[117, 2]	C₁₁₇	Cyclic group	3, 13
117	[117, 3]	C₃\(\times\)C₁₃:C₃	Direct product of C₃ and C₁₃⋊C₃	3, 13
117	[117, 4]	C₃\(\times\)C₃₉	Abelian group of type [3, 39]	3, 13
118	[118, 1]	D₅₉	Dihedral group	2, 59
118	[118, 2]	C₁₁₈	Cyclic group	2, 59
119	[119, 1]	C₁₁₉	Cyclic group	7, 17
120	[120, 1]	C₅\(\times\)C₃:C₈	Direct product of C₅ and C₃⋊C₈	2, 3, 5
120	[120, 2]	C₃\(\times\)C₅:₂C₈	Direct product of C₃ and C₅⋊2C₈	2, 3, 5
120	[120, 3]	C₁₅:₃C₈	1st semidirect product of C₁₅ and C₈ acting via C₈/C₄=C₂	2, 3, 5
120	[120, 4]	C₁₂₀	Cyclic group	2, 3, 5
120	[120, 5]	SL(2, 5)	Special linear group on 𝔽₅²	2, 3, 5
120	[120, 6]	C₃\(\times\)C₅:C₈	Direct product of C₃ and C₅⋊C₈	2, 3, 5
120	[120, 7]	C₁₅:C₈	1st semidirect product of C₁₅ and C₈ acting via C₈/C₂=C₄	2, 3, 5
120	[120, 8]	D₅\(\times\)Dic₃	Direct product of D₅ and Dic₃	2, 3, 5
120	[120, 9]	S₃\(\times\)Dic₅	Direct product of S₃ and Dic₅	2, 3, 5
120	[120, 10]	D₃₀.C₂	The non-split extension by D₃₀ of C₂ acting faithfully	2, 3, 5
120	[120, 11]	C₁₅:D₄	1st semidirect product of C₁₅ and D₄ acting via D₄/C₂=C₂²	2, 3, 5
120	[120, 12]	C₃:D₂₀	The semidirect product of C₃ and D₂₀ acting via D₂₀/D₁₀=C₂	2, 3, 5
120	[120, 13]	C₅:D₁₂	The semidirect product of C₅ and D₁₂ acting via D₁₂/D₆=C₂	2, 3, 5
120	[120, 14]	C₁₅:Q₈	The semidirect product of C₁₅ and Q₈ acting via Q₈/C₂=C₂²	2, 3, 5
120	[120, 15]	C₅\(\times\)SL(2, 3)	Direct product of C₅ and SL₂(𝔽₃)	2, 3, 5
120	[120, 16]	C₃\(\times\)Dic₁₀	Direct product of C₃ and Dic₁₀	2, 3, 5
120	[120, 17]	D₅\(\times\)C₁₂	Direct product of C₁₂ and D₅	2, 3, 5
120	[120, 18]	C₃\(\times\)D₂₀	Direct product of C₃ and D₂₀	2, 3, 5
120	[120, 19]	C₆\(\times\)Dic₅	Direct product of C₆ and Dic₅	2, 3, 5
120	[120, 20]	C₃\(\times\)C₅:D₄	Direct product of C₃ and C₅⋊D₄	2, 3, 5
120	[120, 21]	C₅\(\times\)Dic₆	Direct product of C₅ and Dic₆	2, 3, 5
120	[120, 22]	S₃\(\times\)C₂₀	Direct product of C₂₀ and S₃	2, 3, 5
120	[120, 23]	C₅\(\times\)D₁₂	Direct product of C₅ and D₁₂	2, 3, 5
120	[120, 24]	C₁₀\(\times\)Dic₃	Direct product of C₁₀ and Dic₃	2, 3, 5
120	[120, 25]	C₅\(\times\)C₃:D₄	Direct product of C₅ and C₃⋊D₄	2, 3, 5
120	[120, 26]	Dic₃₀	Dicyclic group	2, 3, 5
120	[120, 27]	C₄\(\times\)D₁₅	Direct product of C₄ and D₁₅	2, 3, 5
120	[120, 28]	D₆₀	Dihedral group	2, 3, 5
120	[120, 29]	C₂\(\times\)Dic₁₅	Direct product of C₂ and Dic₁₅	2, 3, 5
120	[120, 30]	C₁₅:₇D₄	1st semidirect product of C₁₅ and D₄ acting via D₄/C₂²=C₂	2, 3, 5
120	[120, 31]	C₂\(\times\)C₆₀	Abelian group of type [2, 60]	2, 3, 5
120	[120, 32]	D₄\(\times\)C₁₅	Direct product of C₁₅ and D₄	2, 3, 5
120	[120, 33]	Q₈\(\times\)C₁₅	Direct product of C₁₅ and Q₈	2, 3, 5
120	[120, 34]	S₅	Symmetric group on 5 letters	2, 3, 5
120	[120, 35]	C₂\(\times\)A₅	Direct product of C₂ and A₅	2, 3, 5
120	[120, 36]	S₃\(\times\)F₅	Direct product of S₃ and F₅	2, 3, 5
120	[120, 37]	C₅\(\times\)S₄	Direct product of C₅ and S₄	2, 3, 5
120	[120, 38]	C₅:S₄	The semidirect product of C₅ and S₄ acting via S₄/A₄=C₂	2, 3, 5
120	[120, 39]	D₅\(\times\)A₄	Direct product of D₅ and A₄	2, 3, 5
120	[120, 40]	C₆\(\times\)F₅	Direct product of C₆ and F₅	2, 3, 5
120	[120, 41]	C₂\(\times\)C₃:F₅	Direct product of C₂ and C₃⋊F₅	2, 3, 5
120	[120, 42]	C₂\(\times\)S₃\(\times\)D₅	Direct product of C₂, S₃ and D₅	2, 3, 5
120	[120, 43]	C₁₀\(\times\)A₄	Direct product of C₁₀ and A₄	2, 3, 5
120	[120, 44]	D₅\(\times\)C₂\(\times\)C₆	Direct product of C₂×C₆ and D₅	2, 3, 5
120	[120, 45]	S₃\(\times\)C₂\(\times\)C₁₀	Direct product of C₂×C₁₀ and S₃	2, 3, 5
120	[120, 46]	C₂²\(\times\)D₁₅	Direct product of C₂² and D₁₅	2, 3, 5
120	[120, 47]	C₂²\(\times\)C₃₀	Abelian group of type [2, 2,30]	2, 3, 5