If tan -1 x+ cos -1((y/√1+y2))= tan -1 4 where x, y ∈ N, then the number of possible values of x, is

Question

If tan -1 x+ cos -1((y/√1+y2))= tan -1 4 where x, y ∈ N, then the number of possible values of x, is (A) 0 (B) 1 (C) 2 (D) 3

Tardigrade Admin · Accepted Answer

tan -1((1/y))= tan -1((4-x/1+4 x)) ∴ y=(4 x+1/4-x) ⇒ 4 y-x y=4 x+1 ⇒ x(y+4)=4 y-1 ⇒ x=(4 y-1/y+4) x=(4(y+4-4)-1/y+4)=4-(17/y+4) y+4=1 ⇒ y=-3 text (Rejected) y+4=17 ⇒ y=13, x=3 ∴ 1

Q. If tan−1x+cos−1(1+y2​y​)=tan−14 where x,y∈N, then the number of possible values of x, is

0

1

2

3

tan−1(y1​)=tan−1(1+4x4−x​) ∴y=4−x4x+1​⇒4y−xy=4x+1⇒x(y+4)=4y−1⇒x=y+44y−1​ x=y+44(y+4−4)−1​=4−y+417​ y+4=1⇒y=−3 (Rejected) y+4=17⇒y=13,x=3 ∴1

Q. If $tan^{- 1} x + cos^{- 1} (\frac{y}{1 + y ^{2}}) = tan^{- 1} 4$ where $x, y \in N$ , then the number of possible values of $x$ , is