Rationalizing every term .. i.e if the denominator is in the form of (a-b) then multiply the numerator and denominator with (a+b) In the first term here (a-b) = 2- sqrt(2) so by rationalizing we ...

\displaystyle{2}\sqrt{{{2}}}-{2} Explanation: Note that: \displaystyle\frac{{1}}{{\sqrt{{{n}}}+\sqrt{{{n}+{1}}}}}=\frac{{\sqrt{{{n}+{1}}}-\sqrt{{{n}}}}}{{{\left(\sqrt{{{n}+{1}}}-\sqrt{{{n}}}\right)}{\left(\sqrt{{{n}+{1}}}+\sqrt{{{n}}}\right)}}} ...

① Formula used :【proof: square both sides】 √{(a+b)±2√(a×b)}=√a±√b ②√{4±2√3}=√{(3+1)±2√(3×1)}=√3±√1=√3±1 ③ 4±2√3=(√3±1)² ④ Let's call GIVEN EXPRESSION : as (A/B)+(C/D) (i) ...

For an approximation, we might start (using a not generally adopted, but not unfamiliar notation) withH^{(-1/2)}_n=1 + \sqrt{2} + \ldots + \sqrt{n}=\frac{2}{3}n^{3/2} + \frac{\sqrt{n}}{2} + \zeta\left(-\frac12\right)+o(1), ...

As per the request of the OP I am posting my comment as an answer. If you square the expression \sqrt{2+\sqrt{3}} + \sqrt{2-\sqrt{3}} you will find that this is \sqrt{6}. This method works for ...

The expression is \frac{2}{\sqrt[3]{9}+\sqrt[3]{15}+\sqrt[3]{25}} Note that 9=3^2,\ 15=3\cdot 5, \ 25=5^2 so the denominator is of the form a^2+ab+b^2. Now you just use the formula (a-b)(a^2+ab+b^2)=a^3-b^3 ...