158 CHAPTER 5 • ELEMENTARY FUNCTIONS
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- 2 - 1 l • 2
xFigure 5.1 T he points {zn} in the z plane (i.e., the xy plane) and their image wo =
exp (Zn) in thew plane (i.e., the uv plane).
same point in the w plane. Thus, the complex exponential function is periodic
with p eriod 27ri, which establishes Equation (5-2). We leave the verification of
Equations (5-3) and (5-4) as exercises.
- EXAMPLE 5 .1 For any integer n, the points
Zn=4^5 +i. (ll?r 6+2n7r )
in the z plane are mapped onto the single pointw 0 = exp(Zn)=e• • ( cosll?r.. ll?r)
6
+ism6
.J3 ~ , 1 ~
= - e• - i - e•
2 2
~ 3.02 - 1.75iin thew plane, as indicated in Figure 5 .LLet's look at t he range of the exponential function. If z = x + iy, we see
from Identity (5-1)-e• = e"'eiv = e" (cosy+ isiny)-that e• can never equal
zero, as ex is never zero, and the cosine and sine functions are never zero at the
same point. Suppose, then, that w = e • =/; 0. If we write w in its exponential
form as w = pei, Identity (5-1) gives
Using Identity (5-1), and Property (1-41) of Section 1.5, we getp = e"' and if!= y + 2n?r, where n is an integer. Therefore,
P = le'I = e"', and
if! E arg (e') = {Arg (e') + 2n7r : n is an integer}.(5-5)
(5-6)
(5-7)