bp Apr 4, 2015 To rationalize, multiply the numerator and the denominator by the conjugate of 5- \displaystyle\sqrt{{2}} . This is 5+ \displaystyle\sqrt{{2}} . Accordingly it is ...

To rationalize the fraction multiply by the appropriate form of \displaystyle{1} which is: \displaystyle\frac{\sqrt{{{2}}}}{\sqrt{{{2}}}} Explanation: \displaystyle\frac{{1}}{{{5}\sqrt{{{2}}}}}\times\frac{\sqrt{{{2}}}}{\sqrt{{{2}}}}\Rightarrow ...

The expression simplifies to \displaystyle-\sqrt{{14}} . Explanation: \displaystyle=-{4}\sqrt{{\frac{{7}}{{8}}}} \displaystyle=-{4}\cdot\sqrt{{\frac{{7}}{{8}}}} \displaystyle=-{4}\cdot\frac{\sqrt{{7}}}{\sqrt{{8}}} ...

\displaystyle\frac{{1}}{{-\sqrt{{{48}}}}}=-\frac{\sqrt{{{3}}}}{{12}}\approx-\frac{{195}}{{1351}}\approx-{0.1443375} Explanation: Note that: \displaystyle{48}={4}^{{2}}\cdot{3} \displaystyle\sqrt{{{a}{b}}}=\sqrt{{{a}}}\sqrt{{{b}}}\ \text{ }\ ...

\displaystyle-\sqrt{{3}}+{2} Explanation: \displaystyle\frac{{2}}{{{2}\sqrt{{3}}-{4}}} First, factor \displaystyle{2} from the denominator: \displaystyle\frac{{2}}{{{2}{\left(\sqrt{{3}}-{2}\right)}}} ...

Use the second one. Negative means you go backwards (clockwise) so -5π/4 would be 3π/4. After edit: That seems right :)