let `f:[7/4,oo)->[3/2,oo)` be defined by `f(x)=3/2+sqrt(x-7/4)` and `g(x)` be the inverse of `f(x)` then the value of `(f^-1og^-1)(17)` is equal to

let f:[(7)/(4),oo)rarr[(3)/(2),oo) be defined by f(x)=(3)/(2)+sqrt(x-(7)/(4)) and g(x) be the inverse of f(x) then the value of (f^(-1)og^(-1))(17) is equal to

Let f:[4,oo)to[4,oo) be defined by f(x)=5^(x^((x-4))) .Then f^(-1)(x) is

Let f:[4,oo)to[4,oo) be defined by f(x)=5^(x^((x-4))) .Then f^(-1)(x) is

Let f:R rarr R be defined by f(x)=x^(3)+3x+1 and g be the inverse of f .Then the value of g'(5) is equal to

Let f:[-oo,0]->[1,oo) be defined as f(x) = (1+sqrt(-x))-(sqrt(-x) -x) , then

Consider a function f(x)=x^(x), AA x in [1, oo) . If g(x) is the inverse function of f(x) , then the value of g'(4) is equal to

Consider a function f(x)=x^(x), AA x in [1, oo) . If g(x) is the inverse function of f(x) , then the value of g'(4) is equal to

Let f: R rarr R defined by f(x)=x^(3)+3x+1 and g is the inverse of 'f' then the value of g'(5) is equal to

Let f:(2,oo)to X be defined by f(x)= 4x-x^(2) . Then f is invertible, if X=

Let f:(2,oo)to X be defined by f(x)= 4x-x^(2) . Then f is invertible, if X=