The value of displaystyle∑ r =1∞ cot -1(( r 2/2)+(15/8)) is equal to

Question

The value of displaystyle∑ r =1∞ cot -1(( r 2/2)+(15/8)) is equal to (A)  tan -1 1 (B)  tan -1 2 (C)  tan -13 (D)  tan -1 4

Tardigrade Admin · Accepted Answer

operatornameSum= displaystyle∑ r =1∞ cot -1(( r 2/2)+(15/8))= displaystyle∑ r =1∞ tan -1((1/( r 2)2+(15)8)= displaystyle∑/ r =1)∞ tan -1((2/ r 2+(15)4)) = displaystyle∑r=1∞ tan -1((2/4+r2-(1)4))=∑r=1∞ tan -1((2/4+(r+(1)2)(r-(1)2))= displaystyle∑/r=1)∞ tan -1(((1/2)/((r+(1)2/2))((r-(1)2/2)))) = displaystyle∑r=1∞ tan -1 (((r+(1/2))/2)-((r-(1/2))/2)/.1+((r+(1)2)/2) ⋅ ((r-(1)2)/2))) = undersetn arrow ∞ textLim displaystyle∑r=1n( tan -1((r+(1/2)/2))- tan -1((r-(1/2)/2))) = undersetn arrow ∞ textLim( tan -1 (3/4)- tan -1 (1/4))+( tan -1 (5/4)- tan -1 (3/4))+( tan -1 (7/4)- tan -1 (5/4))......... ( tan -1((n/2)+(1/4))- tan -1((n/2)-(1/4))) = undersetn arrow ∞ textLim ( tan -1((n/2)+(1/4))- tan -1 (1/4))=(π/2)- tan -1 (1/4)= cot -1 (1/4)= tan -1 4

Q. The value of $r = 1 \sum \infty cot^{- 1} (\frac{r ^{2}}{2} + \frac{15}{8})$ is equal to

$tan^{- 1} 1$

$tan^{- 1} 2$

$tan^{- 13}$

$tan^{- 1} 4$

Q. The value of r=1∑∞​cot−1(2r2​+815​) is equal to

tan−11

tan−12

tan−13

tan−14

Q. The value of $r = 1 \sum \infty cot^{- 1} (\frac{r ^{2}}{2} + \frac{15}{8})$ is equal to

$tan^{- 1} 1$

$tan^{- 1} 2$

$tan^{- 13}$

$tan^{- 1} 4$