Let `g: R rarr R ` be given by `g(x)=3+4x`. If `g^(n)(x)=gogo.....og(x)`, and `g^(n)(x)=A + Bx` then A and B are

If f : R rarr R and g: R rarr R are given by f(x)=|x| and g(x)={x} for each x in R , then |x in R : g(f(x)) le f(g(x))}=

If f:R rarr R, g:R rarr R are defined by f(x)= 5x-3,g(x)=x^(2)+3 , then (gof^(-1))(3)=

If f:R rarr R, g:R rarr R are defined by f(x)=4x-1, g(x)=x^(3)+2, then (gof)((a+1)/(4))=

If f:R rarr R, g:R rarr R are defined by f(x)=x^(2)+2x-3, g(x)=3x-4 , then (fog)(-1)=

If f:R rarr R, S: R rarr R are defined by f(x) = 3x-4, g(x) = 5x-1 then, (fog^(-1))(2) =

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

If f : R to R and g: R to R are given by f(x) =|x| and g(x) =[x] for each x in R , then {x in R: g(f(x)) le f(g(x))} =

If f: R to R and g: R to R are defined by f(x) =3x-4, g(x)=2+3x and 2(g^(-1) of^(-1)) (x) gt (f^(-1)og^(-1))(x) , then x in

f:R rarr R , defined by f(x)=sinx and g:R rarrR , defined by g(x)=x^(2), (f_(o)g)(x)=