How do you use demoivre's theorem to simplify 4(1-\sqrt{3}i)^{3}?

Nylah Church

Nylah Church

Answered question

2022-01-31

How do you use demoivre's theorem to simplify 4(13i)3?

Answer & Explanation

cevarnamvu

cevarnamvu

Beginner2022-02-01Added 12 answers

DeMoivre's theorem for exponents says that any complex number z can be written as r(cosθ+isinθ), or rcis(θ) for short.
It continues to say that when raising an imaginary number to a certain power, the result is:
zn=rncis(nθ)
To simplify this, let's first calculate (1i3)3.
We find r by using Pythagoras' theorem:
r=12+32=4=2
We find θ by taking the inverse tangent of Im(z)Re(z)
θ=tan1(31)=π3
So (1i3)=2cis(π3). Therefore,
(1i3)3=23cis(3(π3))=8cis(π)
Finally, we expand cis(π)
8cis(π)=8cosπ+8isinπ=8(1)+8i(0)=8
And don't forget to multiply by 4!
84=32
So 4(1i3)3=32

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