If `f:R->R` and `g:R->R` is 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 and g:R rarr R is given by f(x)=|x| and g(x)=[x] for each x in R then {x in R:g(f(x))<=f(g(x))}

If f:R rarr R and g:R rarr R are defined by f(x)=x-[x] and g(x)=[x] is x in R then f{g(x)}

Let f:R to R and g:R to R be given by f(x)=3x^(2)+2 and g(x)=3x-1 for all x to R . Then,

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->R and g: R->R be functions defined by f(x)=x^2+1 and g(x)=sinx , then find fog and gof .

If f : R -> R and g : R -> R defined f(x)=|x| and g(x)=[x-3] for x in R [.] denotes the greatest integer function then {g(f(x)):(-8)/(5)ltxlt(8)/(5)} =

Let f: R->R and g: R->R be defined by f(x)=x^2 and g(x)=x+1 . Show that fog!=gofdot

Find gof and fog when f: R->R and g: R->R is defined by f(x)=x and g(x)=|x|

If f:R rarr R and g:R rarr R defined f(x)=|x| and g(x)=[x-3] for x in R[.] denotes the greatest integer function

Let f : R to R and g : R to R be given by f (x) = x^(2) and g(x) =x ^(3) +1, then (fog) (x)