Integration 4934. Evaluate fc zP(l - z)q dz, where C: z = reit, 0 :::; t :::; 271", 1· > 1, and
p, q are integers. Consider all possible cases.- Let C: z = eit, 0:::; t :::; 271", and let m and n be integers.
(a) Show that
ifm= n
if m# n
(b) Assuming that n ;::: 0, use part (a) to prove2 ~i j z(z+1r(z+1)ndz= (~)
2
+ (~)2
+···+ (:)2c
( c) Also, show that~ J z( z + 1 re z + 1) n dz = ~ J z(2 + z + zr dz
27rz 27rz
c c
= _1 J (z + 1)2
n dz= (2n)
27ri zn+l n
c
thus deriving the identity(S. Minsker [22])- The Legendre polynomial Pn(z) is given by Rodrigues's formula,
Pn(z) = ___!__, Dn(z^2 - It, D = dd
2nn. z
(a) Use (7.21-2) to show that1 J ( (^2 - 1) n d(
Pn(z) = 2 7ri 2 n(( _ z)n+l
c+
where C is any simple closed contour around z.(b) By taking c+ to be the circle ( - z = reit, 0 :::; t < 27r, with
r = lz^2 - 11112 , derive the Laplace formulaPn(z) = -1111' (z + Vz2=l cos tr dt
7r 0
(c) Use the last formula to show that Po(z) = 1, P1(z) = z, P2(z) =(^1) M3z^2 - 1), and P 3 (z) = 1/z(5z^3 - 3z).