Field of Characteristic Zero has Unique Prime Subfield/Proof 1

Theorem
Let $F$ be a field, whose zero is $0_F$ and whose unity is $1_F$, with characteristic zero.

Then there exists a unique $P \subseteq F$ such that:


 * $(1): \quad P$ is a subfield of $F$
 * $(2): \quad P$ is isomorphic to the field of rational numbers $\left({\Q, +, \times}\right)$.

That is, $P \cong \Q$ is a unique minimal subfield of $F$, and all other subfields of $F$ contain $P$.

This field $P$ is called the prime subfield of $F$.

Proof
Follows directly from:
 * Subring Generated by Unity of Ring with Unity
 * Quotient Theorem for Monomorphisms