Non-Zero Integer has Unique Positive Integer Associate

Theorem
Let $a \in \Z$ be an integer such that $a \ne 0$.

Then $a$ has a unique associate $b \in \Z_{>0}$.

Proof
Let $a \in \Z_{\ne 0}$.

By Integer Divides its Absolute Value:
 * $a \divides \size a$ and $\size a \divides a$

Hence $\size a$ is an associate of $a$.

Now we prove its uniqueness.

Let $b, c \in \Z_{\ne 0}$ such that $b > 0$ and $c > 0$.

Let $a \sim b$ and $a \sim c$ where $\sim$ denotes the relation of associatehood.

By definition of associatehood:
 * $a \divides b$ and $b \divides a$

and:
 * $a \divides c$ and $c \divides a$

From Divisor Relation is Antisymmetric/Corollary/Proof 2:
 * $a = \pm b$

and
 * $a = \pm c$

That is:
 * $\pm b = \pm c$

which means:
 * $b = c$ or $b = -c$

But as both $b > 0$ and $c > 0$:
 * $b = c$

Hence the result.