Cauchy's Integral Formula/General Result

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

Let $f:U \to \C$ be holomorphic on some open set containing $D$.

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


 * $\displaystyle f^{\left({n}\right)} \left({a}\right) = \frac {n!} {2\pi i} \int_{\partial D} \frac{f \left({z}\right)} {\left({z - a}\right)^{n+1} } \ \mathrm d z$

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

Proof
By Cauchy's Integral Formula we have:


 * $\displaystyle f \left({a}\right) = \frac 1 {2 \pi i} \int_{\partial D} \frac{f \left({z}\right)} {\left({z - a}\right)} \ \mathrm d z$

so for $n = 0$ the proof is finished.

Now suppose that:


 * $\displaystyle f^{(n-1)} \left({a}\right) = \frac {\left({n-1}\right)!}{2\pi i}\int_{\partial D} \frac{f \left({z}\right)}{\left({z - a}\right)^n }\ \mathrm d z$

We find that

Therefore we are done by induction.