Monotone Additive Function is Linear/Proof 1

Proof
Denote $a = \map f 1$.

As Additive Function is Linear for Rational Factors:
 * $ \forall r \in \Q: \map f r = r \, \map f 1 = a r$

Let $x \in \R \setminus \Q$.

Let $\sequence {r_n}$ be an increasing sequence, with $r_n \in \Q$ for each $n \in \N$, such that $\ds \lim_{n \mathop \to \infty} r_n = x$.

Likewise, let $\sequence {s_n}$ be decreasing, with $s_n \in \Q$ for each $n \in \N$, such that $\ds \lim_{n \mathop \to \infty} s_n = x$.

From the Peak Point Lemma, it is always possible to construct sequences like these, for $\Q$ is dense in $\R$.

Now, by passing to $g = -f$ if necessary, we can assume that $f$ is increasing.

Then we have:
 * $\map f {r_n} \le \map f x \le \map f {s_n}$

for all $n \in \N$.

As we have $\map f {r_n} = a r_n$ and $\map f {s_n} = a s_n$, it follows that:


 * $a r_n \le \map f x \le a s_n$

Since both $a r_n$ and $a s_n$ converge to $a x$, we have $\map f x = a x$ by the Squeeze Theorem for Real Sequences.