Exponential Function is Well-Defined/Real/Proof 4

Theorem
Let $x \in \R$ be a real number.

Let $\exp x$ be the exponential of $x$.

Then $\exp x$ is well-defined.

Proof
This proof assumes the definition of the exponential as the inverse of the logarithm.

From Logarithm is Strictly Increasing and Strictly Concave: Corollary, $\ln$ is  strictly monotone on $\R_{>0}$.

From Inverse of Strictly Monotone Function, $f$ permits an inverse mapping.

Hence the result, from Inverse Mapping is Unique.