2 Answers

RukTech · Answer 1 · 2018-11-07T11:22:54+0000

Answer:

$(\cos{(2\pi)/(7)}+i\sin{(2\pi)/(7)})^5 =\cos{((10\pi)/(7))}+i\sin{((10\pi)/(7))}$

Explanation:

Given the complex number

$(\cos{(2\pi)/(7)}+i\sin{(2\pi)/(7)})^5$

we have to write the complex number in trigonometric form using de moivre's theorem.

By de Moivre's formula,

$(\cos x+i \sin x)^ n=cos(nx)+isin(nx)$

∴
$(\cos{(2\pi)/(7)}+i\sin{(2\pi)/(7)})^5=\cos{5((2\pi)/(7))}+i\sin{5((2\pi)/(7))}$

$=\cos{((10\pi)/(7))}+i\sin{((10\pi)/(7))}$

which is required form

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