Let y=f(x) be a function satisfying the equation tan -1 y= tan -1 x+C where y=1 when x=0. Range of the function f ( x ), is

Question

Let y=f(x) be a function satisfying the equation tan -1 y= tan -1 x+C where y=1 when x=0. Range of the function f ( x ), is (A) R - -1  (B) (-1, ∞) (C) [1, ∞) (D) (-∞, 1]

Tardigrade Admin · Accepted Answer

tan -1 y = tan -1 x + C x =0 ; y =1 ⇒ C =(π/4) ⇒ tan -1 y = tan -1 x +(π/4) ⇒ note: even (-π/2)< tan -1 x +(π/4)<(π/2) ; (-π/2)< tan -1 x <(π/4) ;-∞< x < 1 ⇒ (A) x <1 Hence y= tan ( tan -1 x+(π/4))=((x+1/1-x)) ⇒ x=(y-1/y+1)<1 ⇒ (2/y+1)>0 ⇒ y ∈(-1, ∞)

Q. Let $y = f (x)$ be a function satisfying the equation $tan^{- 1} y = tan^{- 1} x + C$ where $y = 1$ when $x = 0$ . Range of the function $f (x)$ , is

$R - {- 1}$

$(- 1, \infty)$

$[1, \infty)$

$(- \infty, 1]$

Q. Let y=f(x) be a function satisfying the equation tan−1y=tan−1x+C where y=1 when x=0. Range of the function f(x), is

R−{−1}

(−1,∞)

[1,∞)

(−∞,1]

tan−1y=tan−1x+C x=0;y=1⇒C=4π​ ⇒tan−1y=tan−1x+4π​⇒<br/> note: even 2−π​<tan−1x+4π​<2π​;2−π​<tan−1x<4π​;−∞<x<1⇒ (A) x<1 Hence y=tan(tan−1x+4π​)=(1−xx+1​)⇒x=y+1y−1​<1 ⇒y+12​>0⇒y∈(−1,∞)

Q. Let $y = f (x)$ be a function satisfying the equation $tan^{- 1} y = tan^{- 1} x + C$ where $y = 1$ when $x = 0$ . Range of the function $f (x)$ , is

$R - {- 1}$

$(- 1, \infty)$

$[1, \infty)$

$(- \infty, 1]$