1 74 CHAPTER 5 • ELEMENTARY FUNCTIONS
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-2Figure 5. 6 Some of the values of 2 t+ ~.Some of the rules for exponents carry over from the real case. In the exercises
we ask you to show that if c and d are complex numbers and z f:. 0, thenwhere n is an integer.(5- 24)(5-25)(5- 26)(5- 27)The following example shows that Identity (5-27) does not hold if n is re-
placed with an arbitrary complex value.- EXAMPLE 5.9
(i^2 ); = exp[ilog(- 1)] = c (1+^2 nl", wher e n is an integer, and
(i)^2 ' =exp (2ilogi) = e-(1+^4 n)" , where n is an integer.
Since these sets of solutions are not equal, Identity (5- 27) does not always hold.We can compute the derivative of the principal branch of z<, which is t he
function f'(z) =exp [cLog (z)]. By the chain rule,f' (z) = ~exp [cLog (z)]. (5-28)
z