In the sum of first n terms of an A.P. is cn2. then the sum of squares of these n terms is
A
n(4n2−1)c26
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B
n(4n2+1)c23
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C
n(4n2−1)c23
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D
n(4n2+1)c26
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Solution
The correct option is Cn(4n2−1)c23 Given that for an A.P,Sn=cn2
Then Tn=Sn−Sn−1=cn2−c(n−1)2=(2n−1)c ∴ Sum of squares of n terms of this A.P. =∑T2n==∑(2n−1)2.c2=c2[4∑n2−4∑n+n]=c2[4n(n+1)(2n+1)6−4n(n+1)2+n]=c2n[2(2n2+3n+1)−6(n+1)+33]=c2n[4n2−13]=n(4n2−1)c23