Answered: Let a, b, and c be any three nonzero…

Let a, b, and c be any three nonzero complex numbers. If |z| = 1 and 'z' satisfies the equation az + bz + c = 0, prove that aa = ce and |a| |b|= √√ac (5)².

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter8: Applications Of Trigonometry

Section8.5: Trigonometric Form For Complex Numbers

Problem 15E

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Question

Let a, b, and c be any three nonzero complex numbers. If
|z| = 1 and 'z' satisfies the equation az + bz + c = 0, prove that
aā= cc and |a| |b|= √ac (6) ²

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