Find gof and fog, if `f:R to R` and `g: R to R` are given by `f(x)=|x|` and `g(x)=|2x-5|`. Also, show that gof `!=` fog.

Let f:R toR and g:R to R be two functions given by f(x)=cosx and g(x)=3x^(2) . Show that gof!=fog .

If f(x)=|x| and g(x)=|5x-2| , then find gof.

If f(x)=1/x and g(x)=0 show that fog is not defined.

If f(x) = e^x and g(x) = logx , Show that fog = gof , given x>0 .

Let f:R to R and g: R to R be two functions defined by f(x)=|x|" and "g(x)=[x] , where [x] denotes the greatest integer less than or equal to x. Find (fog) (5.75) and (gof)(-sqrt(5)) .

Find the domain and range of the mapping f:R rarr R,defined by f(x)=x^2

If f : R rarr R be defined by f(x)=|x| , show that fof=f

If f(x)=x+7 and g(x)=x-7 , then find (fog) (7).

If f : R rarr R be defined by f(x)=2x-3 and g : R rarr R be defined by g(x)= (x+3)/2 , show that fog=gof=I_R

Let g:RrarrR and f:RrarrR is defined as f(x)=2x and g(x)=x^2 . Find f0g and g0f .