`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)) . Identical functions or not?

f(x)=cos^(-1)(x^(2)/sqrt(1+x^(2)))

f(x)=sqrt(log((3x-x^(2))/(x-1)))

Let f(x) = sqrt(1-sqrt(1-x^2) then f(x) is

int((sqrt(x)+1)(x^2-sqrt(x)))/(xsqrt(x)+x+sqrt(x))dx

Let g(x) be a function defined on [-1,1]dot If the area of the equilateral triangle with two of its vertices at (0,0)a n d(x ,g(x)) is (sqrt(3))/4 , then the function g(x) is g(x)=+-sqrt(1-x^2) g(x)=sqrt(1-x^2) g(x)=-sqrt(1-x^2) g(x)=sqrt(1+x^2)

If y = tan^(-1)((sqrt(1 + x^2) - sqrt(1 - x^2))/(sqrt(1 + x^2) + sqrt(1 - x^2))) , then show that (dy)/(dx) = x/(sqrt(1 - x^4))

f(x)= 1/([sqrt(|x|-x)]) . Domain of the function is :

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(x-1)+sqrt(2-x) and g(x)=x^(2)+bx+c are two given functions such that f(x) and g(x ) attain their maximum and minimum values respectively for same value of x , then