\displaystyle\frac{{{2}\sqrt{{3}}}}{{3}} Explanation: We have the following: \displaystyle\frac{\sqrt{{20}}}{\sqrt{{15}}} \displaystyle{20}={4}\cdot{5} and \displaystyle{15}={3}\cdot{5} ...

\displaystyle\frac{\sqrt{{10}}}{{5}} Explanation: \displaystyle\sqrt{{2}}÷\sqrt{{5}}=\frac{\sqrt{{2}}}{\sqrt{{5}}} \displaystyle\frac{\sqrt{{2}}}{\sqrt{{5}}}\cdot\frac{\sqrt{{5}}}{\sqrt{{5}}} ...

\displaystyle\frac{\sqrt{{{3}}}}{{3}} Explanation: \displaystyle\sqrt{{{2}}}:\sqrt{{{6}}}=\sqrt{{\frac{{2}}{{6}}}}=\sqrt{{\frac{{1}}{{3}}}} Usually, we don't use square roots below ...

\displaystyle={2}-\sqrt{{2}} Explanation: \displaystyle\frac{{10}}{{{2}+\sqrt{{2}}}} \displaystyle=\frac{{10}}{{{2}+\sqrt{{2}}}}\cdot\frac{{{2}-\sqrt{{2}}}}{{{2}-\sqrt{{2}}}} \displaystyle=\frac{{{10}{\left({2}-\sqrt{{2}}\right)}}}{{{2}+\sqrt{{2}}{\left({2}-\sqrt{{2}}\right)}}} ...

Alan P. May 5, 2015 \displaystyle{\left({4}\right)}\sqrt{{{3}}}\div\sqrt{{{2}}} \displaystyle=\frac{{{\left({2}{\left(\sqrt{{{2}}}\right)}{\left(\sqrt{{{2}}}\right)}\right)}\sqrt{{{3}}}}}{\sqrt{{{2}}}} ...

\displaystyle{\left(\Rightarrow{2}\sqrt{{6}}\right.} Explanation: \displaystyle\frac{{{6}\sqrt{{2}}}}{\sqrt{{3}}} \displaystyle\Rightarrow\frac{{{6}\sqrt{{2}}\sqrt{{3}}}}{{\sqrt{{3}}\sqrt{{3}}}} ...