EinsteinJr

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UsernameEinsteinJr
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 #2
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$$\left\{ \begin{array}{l}{\mathtt{x}} = \left({\frac{\left(\left({\frac{\left({\sqrt{{\mathtt{3}}}}{\mathtt{\,\times\,}}{i}\right)}{{\mathtt{2}}}}\right){\mathtt{\,-\,}}\left({\frac{{\mathtt{1}}}{{\mathtt{2}}}}\right)\right)}{\left({\mathtt{9}}{\mathtt{\,\times\,}}{\left(\left({\frac{{\sqrt{{\mathtt{356\,845}}}}}{{{\mathtt{3}}}^{\left({\frac{{\mathtt{3}}}{{\mathtt{2}}}}\right)}}}\right){\mathtt{\,\small\textbf+\,}}\left({\frac{{\mathtt{3\,104}}}{{\mathtt{27}}}}\right)\right)}^{\left({\frac{{\mathtt{1}}}{{\mathtt{3}}}}\right)}\right)}}\right){\mathtt{\,\small\textbf+\,}}{\left(\left({\frac{{\sqrt{{\mathtt{356\,845}}}}}{{{\mathtt{3}}}^{\left({\frac{{\mathtt{3}}}{{\mathtt{2}}}}\right)}}}\right){\mathtt{\,\small\textbf+\,}}\left({\frac{{\mathtt{3\,104}}}{{\mathtt{27}}}}\right)\right)}^{\left({\frac{{\mathtt{1}}}{{\mathtt{3}}}}\right)}{\mathtt{\,\times\,}}\left({\mathtt{\,-\,}}\left({\frac{\left({\sqrt{{\mathtt{3}}}}{\mathtt{\,\times\,}}{i}\right)}{{\mathtt{2}}}}\right){\mathtt{\,-\,}}\left({\frac{{\mathtt{1}}}{{\mathtt{2}}}}\right)\right){\mathtt{\,-\,}}\left({\frac{{\mathtt{1}}}{{\mathtt{3}}}}\right)\\
{\mathtt{x}} = {\left(\left({\frac{{\sqrt{{\mathtt{356\,845}}}}}{{{\mathtt{3}}}^{\left({\frac{{\mathtt{3}}}{{\mathtt{2}}}}\right)}}}\right){\mathtt{\,\small\textbf+\,}}\left({\frac{{\mathtt{3\,104}}}{{\mathtt{27}}}}\right)\right)}^{\left({\frac{{\mathtt{1}}}{{\mathtt{3}}}}\right)}{\mathtt{\,\times\,}}\left(\left({\frac{\left({\sqrt{{\mathtt{3}}}}{\mathtt{\,\times\,}}{i}\right)}{{\mathtt{2}}}}\right){\mathtt{\,-\,}}\left({\frac{{\mathtt{1}}}{{\mathtt{2}}}}\right)\right){\mathtt{\,\small\textbf+\,}}\left({\frac{\left({\mathtt{\,-\,}}\left({\frac{\left({\sqrt{{\mathtt{3}}}}{\mathtt{\,\times\,}}{i}\right)}{{\mathtt{2}}}}\right){\mathtt{\,-\,}}\left({\frac{{\mathtt{1}}}{{\mathtt{2}}}}\right)\right)}{\left({\mathtt{9}}{\mathtt{\,\times\,}}{\left(\left({\frac{{\sqrt{{\mathtt{356\,845}}}}}{{{\mathtt{3}}}^{\left({\frac{{\mathtt{3}}}{{\mathtt{2}}}}\right)}}}\right){\mathtt{\,\small\textbf+\,}}\left({\frac{{\mathtt{3\,104}}}{{\mathtt{27}}}}\right)\right)}^{\left({\frac{{\mathtt{1}}}{{\mathtt{3}}}}\right)}\right)}}\right){\mathtt{\,-\,}}\left({\frac{{\mathtt{1}}}{{\mathtt{3}}}}\right)\\
{\mathtt{x}} = \left({\left(\left({\frac{{\sqrt{{\mathtt{356\,845}}}}}{{{\mathtt{3}}}^{\left({\frac{{\mathtt{3}}}{{\mathtt{2}}}}\right)}}}\right){\mathtt{\,\small\textbf+\,}}\left({\frac{{\mathtt{3\,104}}}{{\mathtt{27}}}}\right)\right)}^{\left({\frac{{\mathtt{1}}}{{\mathtt{3}}}}\right)}\right){\mathtt{\,\small\textbf+\,}}\left({\frac{{\mathtt{1}}}{\left({\mathtt{9}}{\mathtt{\,\times\,}}{\left(\left({\frac{{\sqrt{{\mathtt{356\,845}}}}}{{{\mathtt{3}}}^{\left({\frac{{\mathtt{3}}}{{\mathtt{2}}}}\right)}}}\right){\mathtt{\,\small\textbf+\,}}\left({\frac{{\mathtt{3\,104}}}{{\mathtt{27}}}}\right)\right)}^{\left({\frac{{\mathtt{1}}}{{\mathtt{3}}}}\right)}\right)}}\right){\mathtt{\,-\,}}\left({\frac{{\mathtt{1}}}{{\mathtt{3}}}}\right)\\
\end{array} \right\}$$

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May 12, 2015