| Central product of D16 and Z4 | 32 (42) |
| Direct product of D16 and Z2 | 32 (39) |
| Direct product of D16 and Z4 | 64 (118) |
| Direct product of D8 and D8 | 64 (226) |
| Direct product of D8 and Z2 | 16 (11) |
| Direct product of D8 and Z4 | 32 (25) |
| Direct product of Q16 and Z2 | 32 (41) |
| Direct product of Q16 and Z4 | 64 (120) |
| Direct product of Q8 and Z2 | 16 (12) |
| Direct product of Q8 and Z4 | 32 (26) |
| Direct product of SD16 and Z2 | 32 (40) |
| Direct product of SD16 and Z4 | 64 (119) |
| Direct product of SmallGroup(16,13) and Z2 | 32 (48) |
| Direct product of Z16 and Z2 | 32 (16) |
| Direct product of Z16 and Z4 | 64 (26) |
| Direct product of Z27 and Z3 | 81 (5) |
| Direct product of Z27 and Z9 | 243 (10) |
| Direct product of Z32 and Z2 | 64 (50) |
| Direct product of Z4 and Z2 | 8 (2) |
| Direct product of Z4 and Z4 | 16 (2) |
| Direct product of Z8 and D8 | 64 (115) |
| Direct product of Z8 and Z2 | 16 (5) |
| Direct product of Z8 and Z4 | 32 (3) |
| Direct product of Z8 and Z8 | 64 (2) |
| Direct product of Z81 and Z3 | 243 (23) |
| Direct product of Z9 and Z3 | 27 (2) |
| Direct product of Z9 and Z9 | 81 (2) |
| Direct product of cyclic group of prime-cube order and cyclic group of prime order | |
| Direct product of cyclic group of prime-square order and cyclic group of prime order | |
| Direct product of cyclic group of prime-square order and cyclic group of prime-square order | |
| Elementary abelian group of prime-square order | |
| Elementary abelian group:E9 | 9 (2) |
| Klein four-group | 4 (2) |
| M16 | 16 (6) |
| M27 | 27 (4) |
| M32 | 32 (17) |
| M64 | 64 (51) |
| Nontrivial semidirect product of Z4 and Z8 | 32 (12) |
| Nontrivial semidirect product of Z9 and Z9 | 81 (4) |
| Semidirect product of Z8 and Z4 of M-type | 32 (4) |
| Semidirect product of Z8 and Z4 of dihedral type | 32 (14) |
| Semidirect product of Z8 and Z4 of semidihedral type | 32 (13) |
| Semidirect product of cyclic group of prime-square order and cyclic group of prime order | |
| Sylow subgroup of holomorph of Z27 | 243 (22) |
| Unitriangular matrix group:UT(3,9) | 729 (469) |
| Wreath product of D8 and Z2 | 128 (928) |
| Wreath product of Z4 and Z2 | 32 (11) |
