Precalculus: Mathematics for Calculus - 6th Edition

6th Edition

ISBN: 9780840068071

Author: Stewart, James, Redlin, Lothar, Watson, Saleem

Publisher: Cengage Learning

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Question

Chapter 8.3, Problem 67E

To determine

To calculate: To write the complex numbers in polar form and then find the product and the quotient of the given complex numbers and express the answer in polar form

Expert Solution & Answer

Answer to Problem 67E

Polar form of complex numbers are z1=20(cosπ+isinπ) and z2=2(cosπ6+isinπ6)

Product is z1z2=40(cos7π6+isin7π6)

Quotient is z1z2=10(cos5π6+isin5π6)

Explanation of Solution

Given information: Complex numbers are z1=−20 and z2=3+i

Formula Used:

Complex number is a number that can be expressed in the form of a+bi , where a and b are real numbers

z=a+bi

Polar form of the complex number is given as

z=r(cosθ+isinθ)

Product of two complex numbers z1=r1(cosθ1+isinθ1) and z2=r2(cosθ2+isinθ2) is given as

z1z2=r1r2(cos(θ1+θ2)+isin(θ1+θ2))

Quotient of two complex numbers z1=r1(cosθ1+isinθ1) and z2=r2(cosθ2+isinθ2) is given as

z1z2=r1r2(cos(θ1−θ2)+isin(θ1−θ2))

Calculation:

Complex number are given as

z1=−20z2=3+i

Consider complex number:

z1=−20

Polar form of complex number is

z1=r1(cosθ1+isinθ1)−−(1)

Calculating the value of r1

r1=(−20)2+(0)2r1=400r1=20

Calculating the value of θ1

tanθ1=0−20θ1=tan−10−20θ1=π−0θ1=π

Hence, complex number in polar form is

z1=20(cosπ+isinπ)

Consider complex number:

z2=3+i

Polar form of complex number is

z2=r2(cosθ2+isinθ2)−−(1)

Calculating the value of r2

r2=(3)2+(1)2r2=3+1r2=4r2=2

Calculating the value of θ2

tanθ2=13θ2=tan−113θ2=π6

Hence, complex number in polar form is

z2=2(cosπ6+isinπ6)

Thus, complex numbers in polar form are:

z1=20(cosπ+isinπ)z2=2(cosπ6+isinπ6)

Product of complex number is calculated as

z1z2=r1r2(cos(θ1+θ2)+isin(θ1+θ2))

Substituting the values, product is

z1z2=20⋅2(cos(π+π6)+isin(π+π6))z1z2=40(cos(7π6)+isin(7π6))z1z2=40(cos7π6+isin7π6)

Quotient of complex number is calculated as

z1z2=r1r2(cos(θ1−θ2)+isin(θ1−θ2))

Substituting the values, product is

z1z2=202(cos(π−π6)+isin(π−π6))z1z2=10(cos(5π6)+isin(5π6))z1z2=10(cos5π6+isin5π6)

Conclusion:

Hence, Product is z1z2=40(cos7π6+isin7π6)

Quotient is z1z2=10(cos5π6+isin5π6)

Chapter 8.3, Problem 66E

Chapter 8.3, Problem 68E

Chapter 8 Solutions

Precalculus: Mathematics for Calculus - 6th Edition

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