Let for n =1,2, ldots ldots, 50, S n be the sum of the infinite geometric progression whose first term is n 2 and whose common ratio is (1/(n+1)2). Then the value of (1/26)+ displaystyle∑n=150(Sn+(2/n+1)-n-1) is equal to

Question

Let for n =1,2, ldots ldots, 50, S n be the sum of the infinite geometric progression whose first term is n 2 and whose common ratio is (1/(n+1)2). Then the value of (1/26)+ displaystyle∑n=150(Sn+(2/n+1)-n-1) is equal to (A)  (B)  (C)  (D)

Tardigrade Admin · Accepted Answer

Sn=(n2/1-(1)(n+1)2)=(n(n+1)2/(n+2)) Sn=(n(n2+2 n+1)/(n+2)) Sn=(n[n(n+2)+1]/(n+2)) Sn=n[n+(1/n+2)] Sn=n2+(n+2-2/(n+2)) Sn=n2+1-(2/(n+2)) Now (1/26)+ displaystyle∑n=150[(n2-n)-2((1/n+2)-(1/n+1))] =(1/26)+[(50 × 51 × 101/6)-(50 × 51/2)-2((1/52)-(1/2))] =41651

Q. Let for n=1,2,……,50,Sn​ be the sum of the infinite geometric progression whose first term is n2 and whose common ratio is (n+1)21​. Then the value of 261​+n=1∑50​(Sn​+n+12​−n−1) is equal to

Sn​=1−(n+1)21​n2​=(n+2)n(n+1)2​ Sn​=(n+2)n(n2+2n+1)​ Sn​=(n+2)n[n(n+2)+1]​ Sn​=n[n+n+21​] Sn​=n2+(n+2)n+2−2​ Sn​=n2+1−(n+2)2​ Now 261​+n=1∑50​[(n2−n)−2(n+21​−n+11​)] =261​+[650×51×101​−250×51​−2(521​−21​)] =41651

Q. Let for $n = 1, 2, \dots\dots, 50, S_{n}$ be the sum of the infinite geometric progression whose first term is $n^{2}$ and whose common ratio is $\frac{1}{( n + 1 ) ^{2}}$ . Then the value of $\frac{1}{26} + n = 1 \sum 50 (S_{n} + \frac{2}{n + 1} - n - 1)$ is equal to