Integer Divisor Results/Integer Divides Zero

Theorem
Let $n \in \Z_{\ne 0}$, i.e. let $n$ be an integer not equal to zero.

Then:
 * $n \mathop \backslash 0$

That is, $n$ divides $0$.

Proof
From Integers form Integral Domain, the concept divides is fully applicable to the integers.

Therefore this result follows directly from Every Element Divides Zero.