Metacyclic group

In group theory, a metacyclic group is an extension of a cyclic group by a cyclic group. Equivalently, a metacyclic group is a group $G$ having a cyclic normal subgroup $N$ , such that the quotient $G/N$ is also cyclic.

Metacyclic groups are metabelian and supersolvable. In particular, they are solvable.

Definition

A group $G$ is metacyclic if it has a normal subgroup $N$ such that $N$ and $G/N$ are both cyclic.^[1]

Any cyclic group is metacyclic.
The direct product or semidirect product of two cyclic groups is metacyclic. These include the dihedral groups and the quasidihedral groups.
The dicyclic groups are metacyclic. (Note that a dicyclic group is not necessarily a semidirect product of two cyclic groups.)
Every finite group of squarefree order is metacyclic.
More generally every Z-group is metacyclic. A Z-group is a finite group whose Sylow subgroups are cyclic.

^ Kida, Masanari (2012). "On metacyclic extensions". Journal de Théorie des Nombres de Bordeaux. 24 (2): 339–353. ISSN 1246-7405.