Chapter 14: Q21P (page 678)

Differentiate Cauchy’s formula (3.9) or (3.10) to get
$f' (z) = \frac{1}{2 πi} \oint_{C} \frac{f (w) dw}{{(w - z)}^{2}}$ or $f' (a) = \frac{1}{2 πi} \oint_{C} \frac{f (z) dz}{{(z - α)}^{2}}$
By differentiating n times, obtain
$f^{(n)} (z) = \frac{n!}{2 πi} \oint_{C} \frac{f (w) dw}{{(w - z)}^{n + 1}}$ or $f^{(n)} (α) = \frac{n!}{2 πi} \oint_{C} \frac{f (z) dz}{{(z - a)}^{n + 1}}$

Short Answer

Expert verified

The value is as follows:

$f^{(n)} (z) = \frac{n!}{2 π i} \oint \frac{f (w)}{{(w - z)}^{n + 1}} d w$

Step by step solution

Introduction

The Cauchy’s formula defined as the values of a holomorphic function inside a disk, which are determine by the values of the function on the boundary of disk.

Considering the formula

$f (α) = \frac{1}{2 π i} \oint \frac{f (z)}{z - 1} d z$ …… (1)

Note that both sides are function of $α$ ,so differentiating both sides with respect to $α$ ,

We get

$\begin{array}{l} f' (α) = \frac{d}{d α} (\frac{1}{2 π i} \oint \frac{f (z)}{z - α} d z) \\ = \frac{1}{2 π i} \oint \frac{d}{d α} (\frac{f (z)}{z - α}) d z \\ = \frac{1}{2 π i} \oint \frac{f (z)}{{(z - α)}^{2}} d z \end{array}$

Hence,

$f' (α) = \frac{1}{2 π i} \oint \frac{f (z)}{{(z - α)}^{2}} d z$

Differentiating both sides of this with respect to $α$ , we get

$\begin{array}{l} f'' (α) = \frac{1}{2 π i} \oint \frac{d}{d α} (\frac{f (z)}{{(z - α)}^{2}}) d z \\ = \frac{2}{2 π i} \oint \frac{f (z)}{{(z - α)}^{3}} d z \end{array}$

Differentiating both sides of this with respect to $α$ ,we get

$\begin{array}{l} f''' (α) = \frac{1}{2 π i} \oint \frac{d}{d α} (\frac{f (z)}{{(z - α)}^{3}}) d z \\ = \frac{2 \times 3}{2 π i} \oint \frac{f (z)}{{(z - α)}^{4}} d z \end{array}$

Hence, we see that after differentiating equation (1) for n times, we get

$f^{(n)} (α) = \frac{2 \times 3 \times . . . \times n}{2 π i} \oint \frac{f (z)}{{(z - α)}^{n + 1}} d z$

Hence,

$f^{(n)} (α) = \frac{n!}{2 π i} \oint \frac{f (z)}{{(z - α)}^{n + 1}} d z$

Differentiating the formula

Consider the following formula

$f (z) = \frac{1}{2 π i} \oint \frac{f (w)}{w - z} d w$ ………. (2)

Note that both sides are function ofso differentiating both sides with respect to z,

We get

$\begin{array}{l} f' (z) = \frac{d}{d z} (\frac{1}{2 π i} \oint \frac{f (w)}{w - z} d w) \\ = \frac{1}{2 π i} \oint \frac{d}{d z} (\frac{f (w)}{w - z}) d w \\ = \frac{1}{2 π i} \oint \frac{f (w)}{{(w - z)}^{2}} d z \end{array}$

Hence,

$f^{'} (z) = \frac{1}{2 π i} \oint (\frac{f (w)}{{(w - z)}^{2}}) d z$

Differentiating both sides of this with respect to z,

we get

$\begin{array}{l} f'' (z) = \frac{1}{2 π i} \oint \frac{d}{d z} (\frac{f (w)}{{(w - z)}^{2}}) d w \\ = \frac{2 \times 3}{2 π i} \oint \frac{f (w)}{{(w - z)}^{3}} d w \end{array}$

Differentiating both sides of this with respect to z,

we get

$\begin{array}{l} f''' (z) = \frac{1}{2 π i} \oint \frac{d}{d z} (\frac{f (w)}{{(w - z)}^{3}}) d w \\ = \frac{2 \times 3}{2 π i} \oint \frac{f (w)}{{(w - z)}^{4}} d w \end{array}$

Hence, we see that after differentiating equation (2) for n times,

we get

$f^{(n)} (z) = \frac{2 \times 3 \times . . . \times n}{2 π i} \oint \frac{f (w)}{{(w - z)}^{n + 1}} d w$

Hence,

$f^{(n)} (z) = \frac{n!}{2 π i} \oint \frac{f (w)}{{(w - z)}^{n + 1}} d w$

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Differentiating the formula

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Differentiate Cauchy’s formula (3.9) or (3.10) to getf'z=12πi∮Cfwdww-z2orf'a=12πi∮Cfzdzz-α2By differentiating n times, obtainfnz=n!2πi∮Cfwdww-zn+1orfnα=n!2πi∮Cfzdzz-an+1

Short Answer

Step by step solution

Introduction

Considering the formula

Differentiating the formula

One App. One Place for Learning.

Most popular questions from this chapter

Recommended explanations on Physics Textbooks

Physical Quantities And Units

Rotational Dynamics

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