Consider the function `y = f(x)` satisfying the condition `f(x+ 1/x)=x^(2) + (1)/(x^(2))( != 0)`. Then the

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

If a function f statisfies the condition f(x+(1)/(x))=x^(2)+(1)/(x^(2)) (x ne 0) then domain of f(x) is

Consider the function f(x) satisfying the identity f(x) + f((x-1)/( x)) = 1+ x AA x in R - {0,1} , and g(x) =2f ( x)- x+1 The domain of y = sqrt( g(x) ) is

Consider the function f(x) satisfying the identity f(x) + f((x-1)/( x)) = 1+ x AA x in R - {0,1} , and g(x) =2f ( x)- x+1 The number of roots of the equation g(x)= 1 is

The function y=f(x) such that f(x+1/x) = x^(2)+(1)/(x^(2))

The function f: R rarr R satisfies the condition a f(x-1) + b f(-x)=2(|x|+1 . If f(-2)=5 and f(1)=1 , then 8(b-a)= _______