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Question

If S=sinπn+sin3πn+sin5πn+ n terms.
Then the value nS is


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Solution

Given series S=sinπn+sin3πn+sin5πn++sin(α+(n1)β).

Comparing the given series with standard sine series

sinα+sin(α+β)+sin(α+2β)+sin(α+3β)+
Here,
α=πn
and β=2πn

Sum of the sine series =sinnβ2sinβ2sin(α+(n1)β2)

=sin(n×2π2×n)sin(2π2×n)sin(πn+(n1)2π2n)

=sinπsin(πn)×sin(πn+(n1)πn)

=0sin(πn)sin(πn+(n1)πn)

=0

nS=n×0=0


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