The composite mapping fog of the maps `f:R to R , f(x)=sin x and g:R to R, g(x)=x^(2)`, is

Let :R rarr R;f(x)=sin x and g:R rarr Rg(x)=x^(2) find fog and gof.

A mapping R defined on the set of real numbers such that f(x)=sin x,x in R and g(x)=x^(2)x in R prove that gof!= fog

Find fog(2) and gof(1) when: f:R rarr R;f(x)=x^(2)+8 and g:R rarr R;g(x)=3x^(3)+1

If f:R rarr R,f(x)=2x-1 and g:R rarr R,g(x)=x^(2) then (gof)(x) equals

Let R be the set of real number and the mapping f :R to R and g : R to R be defined by f (x)=5-x^(2)and g (x)=3x-4, then the value of (fog) (-1) is

If f:R rarr R and g:R rarr R given by f(x)=x-5 and g(x)=x^(2)-1, Find fog

If f : R rarr R and g : R rarr R be two mapping such that f(x) = sin x and g(x) = x^(2) , then find the values of (fog) (sqrt(pi))/(2) "and (gof)"((pi)/(3)) .

If f:R to R, f(x) =x^(2)+2x -3 and g:R to R, g(x) =3x-4 then the value of fog(x) is :