490 Chapter 7
Proof We have
F(n)( z ) = n. I J (( f(() - z)n+l d(
'Yfor z E Ro and n = 1, 2,.... This formula applies also to F(z) if we
define p(o)(z) = F(z) and O! = 1. Since f is continuous along"( we have
J f ( () J S M for all ( E "f. Suppose that "f is contained in the disk J ( J < K.
Then, by Darboux's inequality, we obtain, for JzJ > K.
I
(n)( )J I ML("f)
F z S n. (JzJ - K)n+iSince the right-hand side tends to zero as z --+ oo in Ro, the conclusion
follows.
7.21 Cauchy's Formulas for the Derivatives
If f is analytic on and within the simple closed contour C we have,
by (7.17-1),
D.c(z)f(z) = ~ J J(()d(
27ri ( - z
cwhenever z r:/. C*. Hence as particular cases of (7.20-7), we have
n ( )!'( ) = ~ j J ( O d(
c z z 27ri ( ( - z )2
c" ( )!"( ) = ~ J J(()d(
HG z z 2?ri ( ( - z )3
cD.c(z)f(n)(z) = ~ J J(() d(
27ri ((-z)n+l
(7.21-1)
cIf z E Int C* and D.c(z) = +1, the formulas above become
J'(z) = ~ J J(() d(
27ri ((-z)2
c+J"(z) = ~ J J(() d(
27ri ((-z)3
c+