Find the quotient \frac{z_{1}}{z_{2}} of the complex numbers z_{1}=10(\cos10^{\circ}+i\sin10^{\circ}) and z_{2}=5(\cos5^{\circ}+i\sin5^{\circ}) Leave answers in

percibaa8

percibaa8

Answered question

2022-01-18

Find the quotient z1z2 of the complex numbers
z1=10(cos10+isin10)
and z2=5(cos5+isin5)
Leave answers in polar form.

Answer & Explanation

lovagwb

lovagwb

Beginner2022-01-19Added 50 answers

Step 1
z1z2=10(cos10+isin10)5(cos5+isin5)
z1z2=2(cos10+isin10)(cos5+isin5)
z1z2=2[(cos10+isin10)(cos5+isin5)×(cos5isin5)(cos5isin5)]
z1z2=2[cos10cos5isin5cos10+isin10cos5isin10isin5(cos5+isin5)(cos5isin5)]
z1z2=2[cos10cos5+isin5cos10isin10cos5+isin10isin5(cos5+isin5)(cos5isin5)]

Lynne Trussell

Lynne Trussell

Beginner2022-01-20Added 32 answers

Step 1
The quotient z1z2 of the complex number, and leave the answer in Polar form.
Given: The complex numbers are z1=10(cos10+isin10) and z2=5(cos5+isin5)
Concept used:
(cosθ+isinθ)=eiθ
Step 2
Calculation:
The quotient z1z2 can be obtained as,
z1z2=10(cos10+isin10)5(cos5+isin5)
=2e10ie5i
=2e(10i5i)
=2(cos5+isin5)
Thus, the quotient z1z2 of the complex numbers is z1z2=2(cos5+isin5)

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