Abelian not implies cyclic

This article gives the statement, and possibly proof, of a basic fact in group theory.
View a complete list of basic facts in group theory
VIEW FACTS USING THIS: directly | directly or indirectly, upto two steps | directly or indirectly, upto three steps|
VIEW: Survey articles about this

Statement

An abelian group is not necessarily a cyclic group.

Proof

The smallest non-cyclic abelian group is the Klein four-group, a group of order 4.

There are infinitely many examples. The elementary abelian groups of a prime power ${\displaystyle p^{a}}$ with ${\displaystyle a\geq 2}$ is a family of abelian non-cyclic groups.

See also

• Cyclic implies abelian