If `f:R to R` is given by `f(x)=(4^(x))/(4^(x)+2)` for all `x epsilon R`, prove that `f(x)+f(1-x)=1`

If f:R rarr R be given by f(x)=(4^(x))/(4^(4^(2)+2)) for all x in R. Then,f(x)=f(1-x)(b)f(x)+f(1-x)=0(c)f(x)+f(1-x)=1(d)f(x)+f(x-1)=1

If f:R rarr R such that f(x)=(4^(x))/(4^(x)+2) for all x in R then (A)f(x)=f(1-x)(B)f(x)+f(1-x)=0(C)f(x)+f(1-x)=1(D)f(x)+f(x-1)=1

If f:R rarr R be given by f(x)=(3-x^(4))^(1/4) ,then fof(x) is

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

If f:R rarr R be given by f(x)=(3-x^(4))^(1/4) then f@f(x) is

If f:R rarr R be given by f(x)=(a-x^(2))^(1/2) ,then f@f(x) is

Find whether f:R rarr R given by f(x)=x^(3)+2 for all x in R .

If f:R->R is a function such that f(x)=x^3+x^2f''(2)+f'''(3) for all xepsilonR then prove that f(2)=f(1)-f(0)

Let f : R to R be a function given by f(x+y) = f(x) + f(y) for all x,y in R such that f(1)= a Then, f (x)=

If f:R rarr R is defined by f(x)=x/(x^2+1) find f(f(2))