I) Express Z1 in polar Form a) Z1=1-(2-√3)i (complex number)

asked Jul 18, 2023 129k views

9 votes

I) Express Z1 in polar Form
a) Z1=1-(2-√3)i (complex number)

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10 votes

Answer:

$z_1=1-(2-√(3))i=2\sqrt{2-√(3)}[cos((23\pi)/(12) )+isin((23\pi)/(12) )]$

Explanation:

Recall that
$a+bi=r(cos\theta+isin\theta)$ where
r=√(a^2+b^2) and
$\theta=tan^(-1)((b)/(a))$ .

Since
a=1 and
b=-2+√(3) , then
$r=\sqrt{(1)^2+(-2+√(3))^2}=2\sqrt{2-√(3)}$ and
$\theta=tan^(-1)((-2+√(3))/(1))=-(\pi)/(12)=(23\pi)/(12)$ .

Therefore,
$z_1=1-(2-√(3))i=2\sqrt{2-√(3)}[cos((23\pi)/(12) )+isin((23\pi)/(12) )]$

Eulanda answered Jul 19, 2023

3.3k points

3 votes

Explanation:

hope it will help you thank you

Grisel answered Jul 24, 2023

3.6k points

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