Natural Numbers under Multiplication form Semigroup

Theorem
Let $\N$ be the set of natural numbers.

Let $\times$ denote the operation of multiplication on $\N$.

The structure $\struct {\N, \times}$ forms a semigroup.

We have that Natural Number Multiplication is Closed.

That is, $\struct {\N, \times}$ is closed.

We have that Natural Number Multiplication is Associative.

Thus the criteria are fulfilled for $\struct {\N, \times}$ to form a semigroup.