GCD of Integer and Divisor

Theorem
Let $a, b \in \Z^*_+$, i.e. integers such that $a, b > 0$.

Then $a \backslash b \implies \gcd \left\{{a, b}\right\} = a$.

Proof

 * $a \backslash b$ by hypothesis, $a \backslash a$ from Integer Divisor Results.

Thus $a$ is a common divisor of $a$ and $b$.


 * Note that $\forall x \in \Z: x \backslash a \implies x \le \left|{a}\right|$ from Integer Absolute Value Greater than Divisors.

As $a$ and $b$ are both positive, the result follows.