If f(x)= sin -1((2 x/1+x2))-2 tan -1 x and g(x)= sin -1((1-x2/1+x2))+4 tan -1 x then range of ( f ( x )- g ( x )) for x ∈(-∞,-1], is

Question

If f(x)= sin -1((2 x/1+x2))-2 tan -1 x and g(x)= sin -1((1-x2/1+x2))+4 tan -1 x then range of ( f ( x )- g ( x )) for x ∈(-∞,-1], is (A) [0, (3 π/2)) (B) [(-3 π/2), π) (C) [-π, (-π/2)) (D) [π, (7 π/2))

Tardigrade Admin · Accepted Answer

∀ x ∈(-∞,-1] f(x)= sin -1((2 x/1+x2))-2 tan -1 x =-π-2 tan -1 x -2 tan -1 x =-π-4 tan -1 x g(x)= sin -1((1-x2/1+x2))+4 tan -1 x =(π/2)- cos -1((1-x2/1+x2))+4 tan -1 x =(π/2)-(-2 tan -1 x)+4 tan -1 x =(π/2)+6 tan -1 x Now, f(x)-g(x)=(-3 π/2)-10 tan -1 x ∀ x ∈(-∞,-1], tan -1 x ∈((-π/2), (-π/4)] So, .( f ( x )- g ( x )) ∈[π, (7 π/2))]

Q. If $f (x) = sin^{- 1} (\frac{2 x}{1 + x ^{2}}) - 2 tan^{- 1} x$ and $g (x) = sin^{- 1} (\frac{1 - x ^{2}}{1 + x ^{2}}) + 4 tan^{- 1} x$ then range of $(f (x) - g (x))$ for $x \in (- \infty, - 1]$ , is

$[0, \frac{3 π}{2})$

$[\frac{- 3 π}{2}, π)$

$[- π, \frac{- π}{2})$

$[π, \frac{7 π}{2})$

Q. If f(x)=sin−1(1+x22x​)−2tan−1x and g(x)=sin−1(1+x21−x2​)+4tan−1x then range of (f(x)−g(x)) for x∈(−∞,−1], is

[0,23π​)

[2−3π​,π)

[−π,2−π​)

[π,27π​)

Q. If $f (x) = sin^{- 1} (\frac{2 x}{1 + x ^{2}}) - 2 tan^{- 1} x$ and $g (x) = sin^{- 1} (\frac{1 - x ^{2}}{1 + x ^{2}}) + 4 tan^{- 1} x$ then range of $(f (x) - g (x))$ for $x \in (- \infty, - 1]$ , is

$[0, \frac{3 π}{2})$

$[\frac{- 3 π}{2}, π)$

$[- π, \frac{- π}{2})$

$[π, \frac{7 π}{2})$