Natural Number Multiplication is Cancellable

Theorem
Let $\N$ be the natural numbers.

Let $\times$ be multiplication on $\N$.

Then:
 * $\forall x, y, z \in \N_{>0}: x \times z = y \times z \implies x = y$
 * $\forall x, y, z \in \N_{>0}: x \times y = x \times z \implies y = z$

That is, $\times$ is cancellable on $\N_{>0}$.

Proof
By Natural Number Multiplication is Commutative, proving one of the assertions suffices.

From Ordering on Natural Numbers is Compatible with Multiplication it follows that:


 * $\forall x, y, z \in \N: x < y \iff x \times z < y \times z$

Interchanging $x$ and $y$, we obtain:


 * $\forall x, y, z \in \N: y < x \iff y \times z < x \times z$

From Ordering on Natural Numbers is Trichotomy, the only remaining possibility is:


 * $\forall x, y, z \in \N: x = y \iff x \times z = y \times z$

Hence, $\times$ is cancellable on $\N_{>0}$.