7. Let f(z) be the principal branch of z-i. (a) Write f(z) explicitly and calculate f(i). (b) For Z₁, Z2 #0, show that f(Z1)f(Z2) f(Z122) = 1, е-2, or e²π You may use the following fact without proof: Arg(21) + Arg(22) - Arg(2122) = {0,2π, -2π}.

7. Let f(z) be the principal branch of z-i. (a) Write f(z) explicitly and calculate f(i). (b) For Z₁, Z2 #0, show that f(Z1)f(Z2) f(Z122) = 1, е-2, or e²π You may use the following fact without proof: Arg(21) + Arg(22) - Arg(2122) = {0,2π, -2π}.

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter4: Polynomial And Rational Functions

Section4.3: Zeros Of Polynomials

Problem 3E

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Question

please help me quickly handle

7. Let f(z) be the principal branch of z-i.
(a) Write f(z) explicitly and calculate f(i).
(b) For z₁,z2 #0, show that
f(z1)f(Z2)
f(Z1Z2)
= 1, е-2π, or e²
You may use the following fact without proof: Arg(z1) + Arg(22) - Arg(2₁22) =
{0,2π, -2π}.

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