Consider the two function `f: R to R ` given by ` f(x) = x-2 and g: R to R` given by `g(x) = x^(2)`
The expression for (gof) (x) is

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

Consider the function f:R -{1} to R -{2} given by f {x} =(2x)/(x-1). Then

If the function f: R->R be given by f(x)=x^2+2 and g: R->R be given by g(x)=x/(x-1) . Find fog and gof .

If f:R to R be defined by f(x)=3x^(2)-5 and g: R to R by g(x)= (x)/(x^(2)+1). Then, gof is

Consider the function f:R -{1} given by f (x)= (2x)/(x-1) Then f^(-1)(x) =

f:R to R"given by"f(x)=2x+|cos x|, is

f:R to R" given by "f(x)=x+sqrt(x^(2)) ,is

Let f : N rarr R be the function defined by f(x) = (2x-1)/(2) and g : Q rarr R be another function defined by g(x) = x + 2. Then (gof) ((3)/(2)) is

Consider a function f:[0,pi/2]->R given by f(x)=sin x and g:[0,pi/2]->R given by g(x)=cos x. Show that f and g are one-one, but f+g is not one-one.

Let f : R rarr R be defined by f(x) = x^(2) + 3x + 1 and g : R rarr R is defined by g(x) = 2x - 3, Find, (i) fog (ii) gof