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Prove that w^49+w^101+w^150=0,where w is a complex cube root of unity

Prove that w^49+w^101+w^150=0,where w is a complex cube root of unity
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Prove that w^49+w^101+w^150=0,where w is a complex cube root of unity

User Longwen Ou
by
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1 Answer

1 vote
Because
w is a cube root of unity, you have
w^3=1. So


w^(49)=w(w^3)^(16)=w

w^(101)=w^2(w^3)^(33)=w^2

w^(150)=(w^3)^(50)=1

and so


w^(49)+w^(101)+w^(150)=1+w+w^2=(1-w^3)/(1-w)

provided that
w\\eq1. Any other cube root of unity will make the numerator vanish, so the equality holds.
User Stayingcool
by
7.4k points
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