How do I find the polar form of $3sqrt2 - 3sqrt2i$ ?

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Answer 1 · 2018-08-07T16:33:32

Polar form is $6(cos(-pi/4)+isin(-pi/4))$

First just find the absolute value of the complex number. We have it as $3sqrt2-3sqrt2i$ and its absolute value is

$sqrt((3sqrt2)^2+(-3sqrt2)^2)=sqrt(18+18)=sqrt36=6$

Hence number can be written as

$6((3sqrt2)/6-(3sqrt2)/6i)$

or $6(1/sqrt2-1/sqrt2i)$

As polar number is of the form $r(costheta+isintheta)$

we have $r=6$ and $costheta=1/sqrt2$ and $sintheta=-1/sqrt2$

As cosine is ratio is positive and sine ratio is negative,

$theta=pi/4$

Hence, polar form is $6(cos(-pi/4)+isin(-pi/4))$

How do I find the polar form of 3sqrt2 - 3sqrt2i3sqrt2 - 3sqrt2i?