If α is the nth root of unity, then 1+2α+3α2+… to n terms is equal to
A
−n(1−α)2
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B
−n1−α
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C
−2n1−α
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D
−2n(1−α)2
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Solution
The correct option is B−n1−α Let S=1+2α+3α2+…+nαn−1
or, αS=α+2α2+3α3+…+(n−1)αn−1+nαn
On substracting, we get S(1−α)=1+[α+α2+…+αn−1]−nαn =1+α(1−αn−1)1−α−nαn
or, S=11−α+α−αn(1−α)2−nαn1−α =11−α+α−1(1−α)2−n1−α =−n1−α