Begin by rewriting it without the difference on fractions in the numerator of a fraction. Then see where that leads. Explanation: \displaystyle\frac{{\frac{{1}}{\sqrt{{x}}}-\frac{{1}}{\sqrt{{2}}}}}{{{x}-{2}}}=\frac{{{\left(\frac{{1}}{\sqrt{{x}}}-\frac{{1}}{\sqrt{{2}}}\right)}}}{{{\left({x}-{2}\right)}}}\cdot\frac{\sqrt{{{2}{x}}}}{\sqrt{{{2}{x}}}} ...

Note that \frac{1+\sqrt{x+1}}{1-\sqrt{x+1}} = \frac{1+\sqrt{x+1}}{1-\sqrt{x+1}}\cdot \frac{1+\sqrt{x+1}}{1+\sqrt{x+1}} = \frac{1+2\sqrt{x+1}+(x+1)}{1-(x+1)} \\ = -\frac{2+2\sqrt{x+1}+ x}{x} = -\frac{2}{x} -\frac{2\sqrt{x+1}}{x} -1

Well, we have that: x+\sqrt{x\left(x-\text{a}\right)}=\text{b}+\frac{\text{a}}{2}\tag1 Subtract x from both sides: \sqrt{x\left(x-\text{a}\right)}=\text{b}+\frac{\text{a}}{2}-x\tag2 Square ...

Jose Luis F. Apr 14, 2015 The result is \displaystyle\frac{\sqrt{{x}}}{{x}} . The reason is the following: 1st) You have to rationalize \displaystyle\frac{{1}}{\sqrt{{x}}} . This ...

\displaystyle{20}{y}-{\left({3}+\sqrt{{5}}\right)}{x}+{5}-{35}\sqrt{{5}}={0} Explanation: Tangent Line to a Curve \displaystyle{y}=\sqrt{{{x}+{15}}}-\frac{{x}}{{{x}-{15}}} Substitute for \displaystyle{x} ...

Let a=\sqrt{2011}/2, for simplicity. Then you have \sqrt{x+a}-\sqrt{x-a}=y Therefore \frac{(x+a)-(x-a)}{\sqrt{x+a}+\sqrt{x-a}}=y so \sqrt{x+a}+\sqrt{x-a}=\frac{2a}{y} Sum up and ...