See a solution process below: Explanation: First, simplify the constants: \displaystyle\frac{{{20}{\sqrt[{{4}}]{{{128}{n}^{{6}}}}}}}{{-{2}{\sqrt[{{4}}]{{{4}{n}}}}}}\Rightarrow \displaystyle\frac{{-{10}{\sqrt[{{4}}]{{{128}{n}^{{6}}}}}}}{{\sqrt[{{4}}]{{{4}{n}}}}} ...

\displaystyle\frac{{{3}\sqrt{{{10}}}{n}^{{2}}+{2}\sqrt{{5}}{n}}}{{10}} Explanation: Mutiply by \displaystyle\frac{{\sqrt{{10}}}}{{\sqrt{{10}}}} \displaystyle\frac{{{3}{n}^{{2}}+\sqrt{{{2}{n}^{{2}}}}}}{{\sqrt{{{10}{n}}}}}\times\frac{{\sqrt{{10}}}}{{\sqrt{{10}}}} ...

If the moment of inertia of the 1x1x1 about body diagonal be I, then the moment if inertia of the 2x2x2 about its body diagonal will be 8I because it has 8 times as much mass. This is the source of ...

Here is my version (up to computaitonal errors). Information on Lambert's W function W(z) can be found in (Corless, Gonnet, Hare, Jeffrey, & Knuth, "On the Lambert W Function"). Begin with ...

Using the idendity 2\sin(t)\cos(t)=sin(2t) we can conclude that the maximum is at \ t=\frac{\pi}{4}\ because of \ \sin(\frac{\pi}{2})=1\

We are accustomed to solving the equation ax^2+bx+c=0 by using the Quadratic Formula x=\frac{-b\pm \sqrt{b^2-4ac}}{2a}. Alternately, we can use the Citardauq Formula x=\frac{2c}{-b\mp \sqrt{b^2-4ac}}. ...