Complex-Differentiable Function is Continuous/Proof 1

Proof
Let $\map {N_r} 0$ denote the $r$-neighborhood of $0$ in $\C$.

By the Epsilon-Function Complex Differentiability Condition, it follows that there exists $r \in \R_{>0}$ such that for all $h \in \map {N_r} 0 \setminus \set 0$:


 * $(1): \quad \map f {a + h} = \map f a + h \paren {\map {f'} a + \map \epsilon h}$

where $\epsilon: \map {N_r} 0 \setminus \set 0 \to \C$ is a complex function with $\ds \lim_{h \mathop \to 0} \map \epsilon h = 0$.

We rewrite the of $(1)$ to get:

By definition of continuous complex function, it follows that $f$ is continuous at $a$.