Let G be an abelian group. Let V be an irreducible faithful CG-module. Prove that dimV = 1 and G is cyclic.

Question

I was wondering if I could get some help with the following problem. I know how to prove it with Schur's Lemma but I'm having problems without it.

Let G be an abelian group. Let V be an irreducible faithful CG-module. Prove that dimV = 1 and G is cyclic without using Schur's Lemma.