f(x) and and g(x) are identical or not ? `f(x)=Sec^(-1)x+Cosec^(-1)x,g(x)=pi/2`

Check whether pairs of function are identical or not ? f(x) = sec (sec^(-1) x) & g(x) = cosec (cosec^(-1) x)

Examine whether the folloiwng pair of function are identical or not: f(x)=cosec^(2)(x)-cot^(2)x and g(x)=1

Examine whether following pair of functions are identical or not? (i) f(x)=(x^(2)-1)/(x-1) and g(x)=x+1 (ii) f(x)=sin^(2)x+cos^(2)x and g(x)=sec^(2)x-tan^(2)x

The range of function f(x)=cot^(-1)x+sec^(-1)x+ cosec^(-1)x is

The range of function f(x)=cot^(-1)x+sec^(-1)x+cosec^(-1)x is

Let f (x) and g (x) be two differentiable functions, defined as: f (x)=x ^(2) +xg'(1)+g'' (2) and g (x)= f (1) x^(2) +x f' (x)+ f''(x). The value of f (1) +g (-1) is:

Let f and g be two differential functions such that f(x)=g'(1)sin x+(g''(2)-1)xg(x)=x^(2)-f'((pi)/(2))x+f''((-pi)/(2))

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) and g(f) are two differentiable functions and g(x)!=0, then show trht (f(x))/(g(x)) is also differentiable (d)/(dx){(f(x))/(g(x))}=(g(x)(d)/(pi){f(x)}-g(x)(d)/(x){g(x)})/([g(x)]^(2))