Monomorphism from Rational Numbers to Totally Ordered Field

Theorem
Let $\left({F, +, \circ, \le}\right)$ be a totally ordered field.

There is one and only one (ring) monomorphism from the totally ordered field $\Q$ onto $F$.

Its image is the prime subfield of $F$.

Proof
Follows from:
 * Characteristic of Ordered Integral Domain is Zero
 * Order Embedding between Quotient Fields is Unique.