Find the complex fourth roots \[-\sqrt{3}+\iota \] in polar form.

asked Mar 4, 2020 30.5k views

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6 votes

Let
$z=-\sqrt3+i$ . Then

$|z|=√((-\sqrt3)^2+1^2)=2$

lies in the second quadrant, so

$\arg z=\pi+\tan^(-1)\left(-\frac1{\sqrt3}\right)=\frac{5\pi}6$

So we have

$z=2e^(i5\pi/6)$

and the fourth roots of
are

$2^(1/4)e^(i(5\pi/6+k\pi)/4)$

where
$k\in\{0,1,2,3\}$ . In particular, they are

$2^(1/4)e^(i(5\pi/6)/4)=2^(1/4)e^(i5\pi/24)$

$2^(1/4)e^(i(5\pi/6+2\pi)/4)=2^(1/4)e^(i17\pi/24)$

$2^(1/4)e^(i(5\pi/6+4\pi)/4)=2^(1/4)e^(i29\pi/24)$

$2^(1/4)e^(i(5\pi/6+6\pi)/4)=2^(1/4)e^(i41\pi/24)$

Osman Turan answered Mar 7, 2020

5.6k points

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