Ring of Integers Modulo Prime is Field

Theorem
Let $m \in \Z: m \ge 2$.

Let $\left({\Z_m, +, \times}\right)$‎ be the ring of integers modulo $m$.

Then:
 * $m$ is prime


 * $\left({\Z_m, +, \times}\right)$ is a field.
 * $\left({\Z_m, +, \times}\right)$ is a field.

Prime Modulus
$\left({\Z_m, +, \times}\right)$‎ is a commutative ring with unity by definition.

From Integers Modulo m Coprime to m under Multiplication form Abelian Group, $\left({\Z'_m, \times}\right)$ is an abelian group.

$\Z'_m$ consists of all the elements of $\Z_m$ coprime to $m$.

Now when $m$ is prime, we have, from Set of Coprime Integers:
 * $\Z'_m = \left\{{\left[\!\left[{1}\right]\!\right]_m, \left[\!\left[{2}\right]\!\right]_m, \ldots, \left[\!\left[{m-1}\right]\!\right]_m}\right\}$

That is:
 * $\Z'_m = \Z_m \setminus \left\{{\left[\!\left[{0}\right]\!\right]_m}\right\}$

where $\setminus$ denotes set difference.

Hence the result.

Composite Modulus
Now suppose $m \in \Z: m \ge 2$ is composite.

From Ring of Integers Modulo Composite is not Integral Domain, $\left({\Z_m, +, \times}\right)$ is not an integral domain.

We have that a field is an integral domain.

Therefore $\left({\Z_m, +, \times}\right)$ is not a field.