Power Function on Base Greater than One is Strictly Increasing/Real Number

Theorem
Let $a \in \R$ be a real number such that $a > 1$.

Let $f: \R \to \R$ be the real function defined as:
 * $f \left({x}\right) = a^x$

where $a^x$ denotes $a$ to the power of $x$.

Then $f$ is strictly increasing.

Proof
Let $x, y \in \R$ be such that $x < y$.

Let $\delta = \dfrac {y - x} 2$.

From Rational Sequence Decreasing to Real Number, there is some rational sequence $\left\langle{x_n}\right\rangle$ that decreases to $x$.

From Rational Sequence Increasing to Real Number, there is some rational sequence $\left\langle{y_n}\right\rangle$ that increases to $y$.

From Convergent Real Sequence is Bounded:
 * $\exists N_1 \in \N: n \ge N_1 \implies x - \delta < x_n < x + \delta$

Since $\left\langle{ x_n }\right\rangle$ is decreasing:
 * $n \ge N_1 \implies x \le x_n < x + \delta$

From Convergent Real Sequence is Bounded:
 * $\exists N_2 \in \N : n \ge N_2 \implies y - \delta < y_n < y + \delta$

Since $\left\langle{ y_n }\right\rangle$ is increasing:
 * $n \ge N_2 \implies y - \delta < y_n \le y$

Let $N = \max \left\{ {N_1, N_2}\right\}$

Then, for $n \ge N$:

From Power Function on Strictly Positive Base is Continuous and Sequential Continuity is Equivalent to Continuity in the Reals:
 * $x_n \to x \implies a^{x_n} \to a^x$
 * $y_n \to y \implies a^{y_n} \to a^y$

Also, from Power Function on Base Greater than One is Strictly Increasing: Rational Number:
 * $\left\langle{a^{x_n} }\right\rangle$ decreases to $a^x$

and:
 * $\left\langle{a^{y_n} }\right\rangle$ increases to $a^y$.

So, for $n \ge N$:

Hence the result.