`f(x)=sqrt(1-x^(2)), g(x)=sqrt(1-x)*sqrt(1+x)` . Identical functions or not?

f(x)=1/abs(x), g(x)=sqrt(x^(-2)) , idential or not?

If function f(x) = (sqrt(1+x) - root(3)(1+x))/(x) is continuous function at x = 0, then f(0) is equal to

f(x)=sqrt(2-abs(x))+sqrt(1+abs(x)) . Find the domain of f(x).

Let f(x)= sqrt(1+x^(2)) then,

x=sqrt(1+2sqrt(1+3sqrt(1+4sqrt(1+... , then x is

Find the domain of f(x)=sqrt(1-sqrt(1-sqrt(1-x^2)))

Find the range of f(x)=sqrt(x-1)+sqrt(5-x)

The function f : R -> R defined as f (x) =1/2 In (sqrt(sqrt(x^2+1)+x) + sqrt(sqrt(x^2+1)-x)) is (a)one-one and onto both (b)one-one but not onto (c)onto but not one-one (d)Neither one-one nor onto

if: f(x)=(sinx)/(sqrt(1+tan^2x))-(cosx)/(sqrt(1+cot^2x)), then find the range of f(x)