Let $G$ be an abelian group of order $pq$, where $p$ and $q$ are two distinct prime numbers. Prove that $G$ is cyclic. (Hint: use a theorem of Sylow: if $G$ is a group of order $n$ and $p$ is prime, and if $p$ divides $n$, then $G$ has en element of order $p$.)
Attempt at proof: Since $p$ divides $pq$, Sylow says that $G$ has an element $g_1$ with order $p$. Since $q$ divides $pq$, $G$ has also an element $g_2$ with order $q$. Now consider the element $g = g_1 g_2$. Then this element has order $pq$, since $G$ is abelian we have $$g^{pq} = (g_1 \ast g_2)^{pq} = (g_1^{pq} \ast g_2^{pq}) = (e^q \ast e^p) = (e \ast e) = e. $$ So I have shown that $G$ has an element with the same order as the order of the group. Can I conclude from this that $G$ is cyclic? Or do I still need to show explicitly that $g$ is a generator for $G$?
