Minimal Polynomial is Irreducible

Theorem
Let $L/K$ be a field extension and $\alpha\in L$ be algebraic over $K$.

Then the minimal polynomial of $\alpha$ over $K$ is irreducible.

Proof
Let $f$ be a minimal polynomial of $\alpha$ over $K$ and suppose that $f$ is not irreducible.

Then there exists non-constant polynomials $g,h\in K[x]$ such that $f = gh$.

Applying the evaluation homomorphism to both sides of this equation at $\alpha$ we get the equality
 * $0 = f(\alpha) = g(\alpha)h(\alpha)$,

in $K$. Since $K$ is a field, it is an integral domain and thus either $g(\alpha) = 0$ or $h(\alpha) = 0$ which contradicts the minimality of the degree of $f$.