tan -1((2/4))+ tan -1((2/9))+ tan -1((2/16))+ tan -1((2/25))+ ldots ldots ldots ∞ equals

Question

tan -1((2/4))+ tan -1((2/9))+ tan -1((2/16))+ tan -1((2/25))+ ldots ldots ldots ∞ equals (A) π- tan -1(1) (B) (π/2)- tan -1(1) (C) π- tan -1(3) (D)  tan -1(3)

Tardigrade Admin · Accepted Answer

T 1= tan -1 3- tan -1 1 T 2= tan -1 4- tan -1 2 T 3= tan -1 5- tan -1 3 T n -1= tan -1( n +1)- tan -1( n -1) T n = tan -1( n +2)- tan -1( n ) ∴ S ∞=π-( tan -1(1)+ tan -1(2))= tan -1(3)

Q. $tan^{- 1} (\frac{2}{4}) + tan^{- 1} (\frac{2}{9}) + tan^{- 1} (\frac{2}{16}) + tan^{- 1} (\frac{2}{25}) + \dots\dots\dots \infty$ equals

$π - tan^{- 1} (1)$

$\frac{π}{2} - tan^{- 1} (1)$

$π - tan^{- 1} (3)$

$tan^{- 1} (3)$

$T_{1} = tan^{- 1} 3 - tan^{- 1} 1$
$T_{2} = tan^{- 1} 4 - tan^{- 1} 2$
$T_{3} = tan^{- 1} 5 - tan^{- 1} 3$
$T_{n - 1} = tan^{- 1} (n + 1) - tan^{- 1} (n - 1)$
$T_{n} = tan^{- 1} (n + 2) - tan^{- 1} (n)$
$∴ S_{\infty} = π - (tan^{- 1} (1) + tan^{- 1} (2)) = tan^{- 1} (3) < b r / >$

Q. tan−1(42​)+tan−1(92​)+tan−1(162​)+tan−1(252​)+………∞ equals

π−tan−1(1)

2π​−tan−1(1)

π−tan−1(3)

tan−1(3)