\displaystyle\frac{{{9}\sqrt{{2}}}}{{{4}\sqrt{{3}}}}-\frac{{{2}\sqrt{{6}}}}{{{4}\sqrt{{5}}}} Explanation: Okay this might be wrong as I have only briefly touched this topic but this is what I ...

\displaystyle\frac{{7}}{{{2}\sqrt{{15}}}} Explanation: Given that \displaystyle{3}\sqrt{{\frac{{5}}{{12}}}}+\sqrt{{\frac{{12}}{{5}}}}-\frac{{1}}{{3}}\sqrt{{{60}}} \displaystyle={3}\frac{\sqrt{{{5}}}}{{\sqrt{{12}}}}+\frac{\sqrt{{{12}}}}{{\sqrt{{5}}}}-\frac{{1}}{{3}}\sqrt{{{60}}} ...

\displaystyle\frac{{{102}+{29}\sqrt{{{12}}}}}{{{78}}} Explanation: \displaystyle{\left(\times\right)}\frac{{{3}\sqrt{{{6}}}+{5}\sqrt{{{2}}}}}{{{4}\sqrt{{{6}}}-{3}\sqrt{{{2}}}}} \displaystyle=\frac{{{\left({3}\sqrt{{{6}}}+{5}\sqrt{{{2}}}\right)}{\left({4}\sqrt{{{6}}}+{3}\sqrt{{{2}}}\right)}}}{{{\left({4}\sqrt{{{6}}}-{3}\sqrt{{{2}}}\right)}{\left({4}\sqrt{{{6}}}+{3}\sqrt{{{2}}}\right)}}} ...

You are incorrect about what elements of the field look like. The set of the form you specified isn't a field, because i\sqrt{3} is not in it, making it not closed under multiplication. This is a ...

(My labeling doesn't match OP's.) Consider tetrahedron OABC with faces (and face-areas) W, X, Y, Z opposite vertices O, A, B, C. Define a := |OA| \quad b := |OB| \quad c := |OC| \quad d := |BC| \quad e := |CA| \quad f := |AB| ...

It is not a linear combination, but \sqrt{21}=\frac12\sqrt 6\sqrt{14}.