If `f(x) = x + tan x and g(x)` is the inverse of f(x), then g'(x) is equal to

If f(x)=x+tan x and g(x) is inverse of f(x) then g'(x) is equal to (1)(1)/(1+(g(x)-x)^(2))(2)(1)/(1-(g(x)-x)^(2))(1)/(2+(g(x)-x)^(2))(4)(1)/(2-(g(x)-x)^(2))

If f(x)=x+tanx and g(x) is inverse of f(x) then g^(')(x) is equal to

If f(x)=x+tan x and f is the inverse of g, then g'(x) is equal to

If f(x)=x+tan x and f(x) is inverse of g(x), then g'(x) is equal to (1)/(1+(g(x)-x)^(2)) (b) (1)/(1+(g(x)+x)^(2))(1)/(2-(g(x)-x)^(2)) (d) (1)/(2+(g(x)-x)^(2))

If ef(x)=log x and g(x) is the inverse function of f(x), then g'(x) is

If f (x) = x^(2) +x ^(4) +log x and g is the inverse of f, then g'(2) is:

Let e^(f(x))=ln x. If g(x) is the inverse function of f(x), then g'(x) equal to: e^(x)(b)e^(x)+xe^(x+e^(2))(d)

Let f(x)=log_(e)x+2x^(3)+3x^(5), where x>0 and g(x) is the inverse function of f(x) , then g'(5) is equal to: