\displaystyle\frac{{3}}{{7}}{\left({3}+\sqrt{{{2}}}\right)}\leftarrow\ \text{ corrected solution} Explanation: A very useful relationship to remember is \displaystyle{a}^{{2}}-{b}^{{2}}={\left({a}-{b}\right)}{\left({a}+{b}\right)} ...

\displaystyle\sqrt{{5}} Explanation: Split the root so there is a separate numerator and denominator. \displaystyle\frac{\sqrt{{5}}}{\sqrt{{4}}}+\frac{\sqrt{{10}}}{\sqrt{{{4}\times{2}}}} = ...

The goal is remove roots from denominator. See below Explanation: \displaystyle\frac{\sqrt{{2}}}{{{2}\sqrt{{6}}-\sqrt{{2}}}}=\frac{{\sqrt{{2}}{\left({2}\sqrt{{6}}+\sqrt{{2}}\right)}}}{{{\left({2}\sqrt{{6}}-\sqrt{{2}}\right)}{\left({2}\sqrt{{6}}+\sqrt{{2}}\right)}}}=\frac{{{2}\sqrt{{2}}\sqrt{{6}}+{2}}}{{{24}-{2}}}=\frac{{{2}\sqrt{{12}}+{2}}}{{22}}=\frac{\sqrt{{2}}}{{11}}+\frac{{1}}{{11}}

I've confirmed that the value you computed for \tan (x/2)=-4-\sqrt{17} is right. Since 180{{}^\circ}<x<270{{}^\circ}, hence 90^\circ <x/2 <135^\circ , it's the negative solution of the equation ...

You were doing fine until the place where you tried to expand (2\sqrt2 - 4)(4 + \sqrt2). There are mnemonic techniques for this but I think plain old distributive law works well enough: ...

Hint : \{(1,0,1,0),(1,0,0,1)\} is already a basis on its own. Now, you need to make it orthonormal. For that, you first need to make it orthogonal. Use the Gramm-Schmidt procedure for that. But use ...