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What is (1/2 + isqrt3/2)^5?
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4 votes
What is (1/2 + isqrt3/2)^5?

User Runofthemillgeek
by
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1 Answer

3 votes

Answer:


((1)/(2)+(√(3))/(2)i)^5=(1)/(2)-(√(3))/(2)i

Explanation:

Convert 1/2 + i√3/2 to rectangular form


\displaystyle z=a+bi=(1)/(2)+(√(3))/(2)i\\\\r=√(a^2+b^2)=\sqrt{\biggr((1)/(2)\biggr)^2+\biggr((√(3))/(2)\biggr)^2}=\sqrt{(1)/(4)+(3)/(4)}=√(1)=1\\\\\theta=\tan^(-1)\biggr((b)/(a)\biggr)=\tan^(-1)\biggr(((√(3))/(2))/((1)/(2))\biggr)=\tan^(-1)(√(3))=(\pi)/(3)\\\\z=\cos(\pi)/(3)+i\sin(\pi)/(3)

Use DeMoivre's Theorem


\displaystyle z^n=r^n(\cos(n\theta)+i\sin(n\theta))\\\\z^5=1^5\biggr(\cos\biggr((5\pi)/(3)\biggr)+i\sin\biggr((5\pi)/(3)\biggr)\biggr)\\\\z^5=(1)/(2)-(√(3))/(2)i

User James Knott
by
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