f(x)=sqrt(x-[x])

The range of f(x)=sqrt(|x|-x) is:

The domain of f(x)=sqrt(|x|-x) is

" The Domain of the function "f(x)=sqrt(|x|-x)" is: "

Prove that f(x)=sqrt(|x|-x) is continuous for all x>=0

Prove that f(x)=sqrt(|x|-x) is continuous for all x>=0

Write the domain of the function f(x)=sqrt(|x|-x)

Prove that f(x)=sqrt(|x|-x) is continuous for all xgeq0.

Prove that f(x)=sqrt(|x|-x) is continuous for all xgeq0 .

Find the domains fo the following real valued functions: (i) f(x) = sqrt(4x-x^(2)) (ii) f(x) =sqrt(2-x) + sqrt(1+x) (iii) f(x) = (sqrt(3+x) + sqrt(3-x))/x (iv) f(x) = sqrt(|x|-x) , (v) f(x) = sqrt(x-|x|) (vi) f(x) = sqrt(|x|-x)