Ring Homomorphism from Field is Monomorphism or Zero Homomorphism/Proof 1

Theorem
Let $\left({F, +_F, \circ}\right)$ be a field whose zero is $0_F$.

Let $\left({S, +_S, *}\right)$ be rings whose zero is $0_S$.

Let $\phi: F \to S$ be a ring homomorphism.

Then either:
 * $(1): \quad \phi$ is a monomorphism (that is, $\phi$ is injective)

or
 * $(2): \quad \phi$ is the zero homomorphism (that is, $\forall a \in F: \phi \left({a}\right) = 0_S$).

Proof
We have by definition that a field is a division ring.

The result can be seen to be an application of Division Ring Domain Homomorphism is Injective.