If `f: R to R and g: R to R` are defined by `f(x)=x^(5) and g(x)=x^(4)` then check if f, g are one-one and fog is one-one?

If f,g : RR to RR are defined by f(x) = |x| +x and g(x) = |x|-x, find g o f and f o g.

Let a in R and let f: R to R be given by f(x) =x^(5) -5x+a. then

If f:R→R, g:R→R are given by f(x)=(x+1)^2 and g(x)=x^2+1 , then write the value of fog(−3) .

If f, g : RR to RR are defined by f(x) = |x| - x , and g(x) = |x| - x , find g^(@) f and f^(@)g .

Consider the functions f(x) and g(x), both defined from R rarrR and are defined as f(x)=2x-x^(2) and g(x)=x^(n) where n in N . If the area between f(x) and g(x) is 1/2, then the value of n is

Find gof and fog, if f: R to R and g : R to R are given by f (x) = cos x and g (x) = 3x ^(2). Show that gof ne fog.

Let f and g be the two functions from R to R defined by f(x)-3x-4 and g(x)=x^(2)+3 . Find gof and fog.