Proper Ideal of Ring is Contained in Maximal Ideal

Theorem
Let $A$ be a commutative ring with unity.

Let $\mathfrak a \subseteq A$ be a proper ideal.

Then there exists a maximal ideal $\mathfrak m$ with $\mathfrak a \subseteq \mathfrak m$.

Proof
Let $A/\mathfrak a$ be the quotient ring.

By Proper Ideal iff Quotient Ring is Nontrivial, $A/\mathfrak a$ is nontrivial.

By Krull's Theorem, $A/\mathfrak a$ has a maximal ideal.

By Correspondence Theorem for Quotient Rings, $A$ has a maximal ideal containing $\mathfrak a$.