The function `f :R -> R` satisfies the condition `mf(x - 1) + nf(-x) = 2| x | + 1`. If `f(-2) = 5` and `f(1) = 1` find

The function f:R rarr R satisfies the condition mf(x-1)+nf(-x)=2|x|+1. If f(-2)=5 and f(1)=1 find

A function f:R rarr R satisfies the condition x^(2)f(x)+f(1-x)=2x-x^(4). Then f(x) is

The function y=f(x) satisfying the condition f(x+(1)/(x))=x^(3)+(1)/(x^(3)) is

The function f (x) satisfy the equation f (1-x)+ 2f (x) =3x AA x in R, then f (0)=

Function f satisfies the relation f(x)+2f((1)/(1-x))=x AA x in R-{1,0} then f(2) is equal to

Let f be any function defined on R and let it satisfy the condition : | f (x) - f(x) | le ( x-y)^2, AA (x,y) in R if f(0) =1, then :

A polynomial function f(x) satisfies the condition f(x)f((1)/(x))=f(x)+f((1)/(x)) for all x in R,x!=0. If f(3)=-26, then f(4)=

Consider the function y=f(x) satisfying the condition f(x+(1)/(x))=x^(2)+1/x^(2)(x!=0) Then the domain of f(x) is R domain of f(x) is R-(-2,2) range of f(x) is [-2,oo] range of f(x) is (2,oo)