270 Chapter^5
yxFig. 5.~!2
Exercises 5.3
1. Let ai, a 2 , ... , an be n given distinct complex numbers and /31, /32,
... , f3n be any given complex numbers. Prove that there is a unique
polynomial P( z) of degree less than n such that P( a k) = /3 k ( k =
1,2, ... ,n).
If Qk(z) = I]i#(z -aj), show that P(z) is given by the Lagrange
interpolation formula- Under the mapping defined by w = z^2 , find:
(a) The images of the hyperbolas x^2 - y^2 = a and xy = b (a, b
constants).
(b) The images of the lines x = c1 and y = c2 ( c1 , c2 con st ants).
( c) The image of any straight line not passing through the origin.
( d) Also show that the images of the circles lz -rl = r (r > 0) are the
cardioids p = 2r^2 (1 + cos'lj;), where w = peiiP. - Determine the order of the following rational functions and find their
zeros and poles:
z^4 -16
(a) w-- --z (^5) +1 (b) w = z4+1
z^2 + 9