Konstantinos Michailidis Apr 24, 2016 It is \displaystyle\frac{{2}}{{{4}-\sqrt{{6}}}}=\frac{{{2}\cdot{\left({4}+\sqrt{{6}}\right)}}}{{{\left({4}-\sqrt{{6}}\right)}\cdot{\left({4}+\sqrt{{6}}\right)}}}=\frac{{{2}\cdot{\left({4}+\sqrt{{6}}\right)}}}{{{4}^{{2}}-{\left(\sqrt{{6}}\right)}^{{2}}}}={2}\cdot\frac{{{4}+\sqrt{{6}}}}{{{16}-{6}}}=\frac{{2}}{{10}}\cdot{\left({4}+\sqrt{{6}}\right)}=\frac{{1}}{{5}}\cdot{\left({4}+\sqrt{{6}}\right)}

It is √3/q + i/q. It can’t be simplified any further or be expressed more elegantly. Could it be that you saw that expression in a discussion of arithmetic in a cyclotomic field? In the very specific ...

Multiply both numerator and denominator by \displaystyle{\left({6}+\sqrt{{{5}}}\right)} and simplify to find: \displaystyle\frac{{4}}{{{6}-\sqrt{{{5}}}}}=\frac{{{24}+{4}\sqrt{{{5}}}}}{{31}} ...

Nghi N. May 12, 2015 Multiply both numerator and denominator by \displaystyle{\left({6}+{s}{q}{r}{7}\right)} \displaystyle\frac{{{4}{\left({6}+{s}{q}{r}{7}\right)}}}{{{36}-{7}}} ...

See a solution process below: Explanation: First, use this rule for radicals to rewrite the expression: \displaystyle{\sqrt[{{3}}]{{\frac{{{16}{a}}}{{{27}}}}}}\Rightarrow\frac{{\sqrt[{{3}}]{{{\left({16}{a}\right)}}}}}{{\sqrt[{{3}}]{{{\left({27}\right)}}}}}\Rightarrow\frac{{\sqrt[{{3}}]{{{\left({8}\cdot{2}{a}\right)}}}}}{{\sqrt[{{3}}]{{{\left({27}\right)}}}}}\Rightarrow\frac{{\sqrt[{{3}}]{{{\left({2}^{{3}}\cdot{2}{a}\right)}}}}}{{\sqrt[{{3}}]{{{\left({3}^{{3}}\right)}}}}} ...

Surely the best way to do this is to rationalise the denominator of b first. Now a + b = 2 – √3 + 8 + 4√3 = 10 + 3√3