If we abbreviate w=\sqrt[3]2, the left hand side is L=\frac1{\sqrt[3]9}(1-w+w^2). From (1+w)(1-w+w^2)=1+w^3=3 we see that L=\frac3{\sqrt[3]9(1+\sqrt[3]2)}, hence L^3=\frac{27}{9(1+w)^3}=\frac3{1+3w+3w^2+w^3}=\frac1{1+w+w^2} ...

Please see below. Explanation: \displaystyle{\left(\frac{{1}}{{2}}\right)}\sqrt{{{2}+\sqrt{{{2}+\sqrt{{2}}}}}} = \displaystyle\sqrt{{\frac{{{2}+\sqrt{{{2}+\sqrt{{2}}}}}}{{4}}}} = \displaystyle\sqrt{{\frac{{{1}+\frac{\sqrt{{{\left({2}+\sqrt{{2}}\right)}}}}{{2}}}}{{2}}}} ...

Let \sqrt[5]{\frac{123+\sqrt{15125}}{2}}+\sqrt[5]{\frac{123-\sqrt{15125}}{2}}=x Raise to the power of 5 on both sides, (\sqrt[5]{\frac{123+\sqrt{15125}}{2}}+\sqrt[5]{\frac{123-\sqrt{15125}}{2}})^5=x^5 ...

To complement the other answer: Hint: \frac12(\sqrt{n+4} - \sqrt{n+2}) + \frac12(\sqrt{n+2} - \sqrt{n}) = \frac12(\sqrt{n+4} - \sqrt{n}) + \frac12(\sqrt{n+2} - \sqrt{n+2}) = \frac12(\sqrt{n+4} - \sqrt{n}) ...

By binomial series \sqrt[3]{n+1}=\sqrt[3]{n}\left(1+\frac1n\right)^\frac13=\sqrt[3]{n}+O\left(\frac1{n^\frac23}\right) then \sqrt[3]{n+1}\cos{\sqrt{n+1}} - \sqrt[3]{n}\cos{\sqrt{n}}= =\sqrt[3]{n}(\cos{\sqrt{n+1}}-\cos{\sqrt{n}})+O\left(\frac{\cos{\sqrt{n+1}}}{n^\frac23}\right) ...

How much exactly that cosine is, is beside the point. Two things are important here. One is the fact, that you have to know which square root you take (in complex, we usually cut at the negative ...