Prove $\forall n \ge 3$ there is a non-commutative group of exponent $n$

Question

Prove $\forall n \ge 3$ there is a non-commutative group of exponent $n$

The exponent of a group $G$ is the lowest $n$ such that $x^n=e, \forall x \in G$

I cannot use strong theorem like classification of finite groups, so I tried using permutation group to get the result, to no avail.