`"If "f:R to R, g:R and h:R to R` be three functions are given by `f(x)=x^(2)-1,g(x)=sqrt(x^(2)+1)and h(x)={{:(,0,x le0),(,x,xgt 0):}`
Then the composite functions (ho fog) (x)) is given by

The function f:R to R given by f(x)=x^(2)+x is

Let f:R to R, g: R to R be two functions given by f(x)=2x-3,g(x)=x^(3)+5 . Then (fog)^(-1) is equal to

If the functions f, g and h are defined from the set of real numbers R to R such that f(x)=x^(2)-1,g(x)=sqrt((x^(2)+1)) , h(x)={{:("0,","if",xle0),("x,","if",xge0):} Then find the composite function hofog and determine whether the function fog is invertible and h is the identity function.

If f: R to R, g , R to R be two funcitons, and h(x) = 2 "min" {f(x) - g(x),0} then h(x)=

Let f : R to R and g : R to R be given by f (x) = x^(2) and g(x) =x ^(3) +1, then (fog) (x)

Statement-1: If f:R to R and g:R to R be two functions such that f(x)=x^(2) and g(x)=x^(3) , then fog (x)=gof (x). Statement-2: The composition of functions is commulative.