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Question

(4) If and , find (1) (iii)

Ask by Goodwin Bond. in Nigeria
Mar 30,2025

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Tutor-Verified Answer

Answer


Solution

Let
and
Then, since a complex number in polar form is written as
the product and quotient can be found by multiplying/dividing the moduli and adding/subtracting the angles.
  1. For the product, we have
That is,
  1. For the quotient, we have
That is,

Answered by UpStudy AI and reviewed by a Professional Tutor

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Simplify this solution

Mind Expander

First, let’s clarify that the expressions you provided for and seem a little inconsistent since you mention twice with different values. But, let’s assume and .
  1. To find :
    Using the multiplication of complex numbers in polar form, we combine the magnitudes and add the angles:
  2. To find :
    This simplifies to:
    Which can be rewritten as:
So, the final results are:

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