\displaystyle\frac{{{4}\sqrt{{3}}}}{\sqrt{{2}}} Explanation: Given: \displaystyle{4}\times\sqrt{{3}}\div\sqrt{{2}} . \displaystyle={4}\sqrt{{3}}\div\sqrt{{2}} \displaystyle=\frac{{{4}\sqrt{{3}}}}{\sqrt{{2}}}

\displaystyle\frac{{3}}{{2}} Explanation: note : \displaystyle\sqrt{{a}}\times\sqrt{{a}}={a} hence \displaystyle\frac{\sqrt{{3}}}{{2}}\times\frac{\sqrt{{3}}}{{1}}=\frac{{\sqrt{{3}}\times\sqrt{{3}}}}{{{2}\times{1}}}=\frac{{3}}{{2}}

Any radical expression exists in a tower of radical extensions of \Bbb Q(x). For instance, consider T(x)=\sqrt{\sqrt{x+1}-\sqrt{x-1}}+\sqrt{x}-3. Then T exists in the top of the tower of ...

\sqrt{35+35/35}=6 This can be extended to 6^{2n}-1 with more square roots. 16/\sqrt{16}+\sqrt{\sqrt{16}}=6\\144/(\sqrt{144}+\sqrt{144})=6 Other operators I have seen are concatenation, so \sqrt {33+3}=6 ...