7 .2 • TAYLOR SERIES REPRESENTATIONS 263- EXAMPLE 7.6 Use the Cauchy product of series to show that
1 00
--- 2 = L (n + 1) z", for z E Di(O).
(1-z) n=O
00
Solution We let f (z) = g(z) = 1 ~. = I: z", for z E D1 (0). In terms of
n = O
Theorem 7.6, we have a.,= bn = 1, for all n, a.nd thus Equation (7-17) gives - -^1 2 =h(z)=f(z)g(z)= L ""(" L:akbn- k ) z"= L^00 (n+l)z".
(1 -z) n=O k=O n=O