x \left( \frac{\sqrt{x}}{\sqrt{x+1}} - 1 \right) =x\frac{\sqrt{x}-\sqrt{x+1}}{\sqrt{x+1}} =x\frac{(\sqrt{x}-\sqrt{x+1})(\sqrt{x}+\sqrt{x+1})}{\sqrt{x+1}(\sqrt{x}+\sqrt{x+1})} =-\frac{x}{\sqrt{x+1}(\sqrt{x}+\sqrt{x+1})} \to -\frac12, \quad x \to \infty.

By definition, limit of a function is lim x→y (f(x) - f(y))/(x-y) So, the problem can also be read as.. Find the limit of the function f(x) = sqrt(x(1−x)) when x tends to y. Answer is to find the ...

We have \lim_{h \to 0} \sqrt h = 0, and \lim_{x \to \infty} 1/x = 0. Therefore, your quotient is simply \frac{0}{0}, which is undefined. In general, the equality \lim_{x \to a} \frac{f(x)}{g(x)} = \frac{\lim_{x \to a}f(x)}{\lim_{x \to a}g(x)} ...

The "rationalization" trick are the same, but this may be the rigorous \varepsilon-\delta proof you want. Write \sqrt{(x + a)(x + b)} - x - \frac{a + b}{2} = \frac{(x + a)(x + b) - \left(x + \frac{a + b}{2}\right)^2}{\sqrt{(x + a)(x + b)} + \left(x + \frac{a + b}{2}\right)} = \frac{-\frac{(a - b)^2}{4}}{\sqrt{(x + a)(x + b)} + \left(x + \frac{a + b}{2}\right)}. ...

The main problem with this exercise is the following: The expression \Psi(x,y):={x-y\over\sqrt{x}-\sqrt{y}} is undefined when x<0 or y<0, or x=y. In this situation one can argue in two ...

Hint. Note that by AM-GM inequality , (xyz)^{1/6}\leq \frac{\sqrt{x} + \sqrt{y} + \sqrt{z}}{3}. Therefore for x> 0, y> 0, z> 0, 0\leq {\frac{xyz}{\sqrt{x} + \sqrt{y} + \sqrt{z}}} \leq \frac{xyz}{3(xyz)^{1/6}}=\frac{(xyz)^{5/6}}{3}.