Cauchy's Integral Formula/General Result

Theorem
Let $D = \set {z \in \C: \cmod z \le r}$ be the closed disk of radius $r$ in $\C$.

Let $f: U \to \C$ be holomorphic on some open set $U$ such that $D \subseteq U$. Let $n \in \N$ be a natural number.

Then for each $a$ in the interior of $D$:


 * $\displaystyle f^{\paren n} \paren a = \dfrac {n!} {2 \pi i} \int_{\partial D} \frac {\map f z} {\paren {z - a}^{n + 1} } \rd z$

where $\partial D$ is the boundary of $D$, and is traversed anticlockwise.

Proof
Proof by induction:

For all $n \in \N_{> 0}$, let $\map P n$ be the proposition:


 * $\displaystyle \map {f^{\paren n} } a = \frac {n!} {2 \pi i} \int_{\partial D} \frac {\map f z} {\paren {z - a}^{n + 1} } \rd z$

Basis for the Induction
$\map P 0$ holds, as this is:


 * $\displaystyle \map f a = \frac 1 {2 \pi i} \int_{\partial D} \frac {\map f z} {\paren {z - a}} \rd z$

which is Cauchy's Integral Formula.

This is our basis for the induction.

Induction Hypothesis
Now we need to show that, if $\map P k$ is true, where $k \ge 0$, then it logically follows that $\map P {k + 1}$ is true.

So this is our induction hypothesis:


 * $\displaystyle \map {f^{\paren k} } a = \frac {k!} {2 \pi i} \int_{\partial D} \frac {\map f z} {\paren {z - a}^{k + 1} } \rd z$

Then we need to show:


 * $\displaystyle \map {f^{\paren {k + 1} } } a = \frac {\paren {k + 1}!} {2 \pi i} \int_{\partial D} \frac {\map f z} {\paren {z - a}^{k + 2} } \rd z$

Induction Step
This is our induction step:

So $\map P k \implies \map P {k + 1}$ and the result follows by the Principle of Mathematical Induction.

Therefore:
 * $\displaystyle \forall n \in \N: \map {f^{\paren n} } a = \frac {n!} {2 \pi i} \int_{\partial D} \frac {\map f z} {\paren {z - a}^{n + 1} } \rd z$

Also known as
This result can also be referred to as Cauchy's Integral Formula for Derivatives.