\( \zeta_{\bigl(s\bigr)} = M \sum_{v=1}^{v=\infty} v sin \Biggl( N\pi\Gamma^2...-8\pi\Gamma^2+7\pi\Gamma^2-6\pi \Gamma^2 + 5\pi\Gamma^2-4\pi\Gamma^2+3\pi\Gamma^2-2\pi \Gamma^2 + \pi\Gamma^2 \Biggr)\) Transcendental? ipso facto...
Does it help your skizo mind if you sub in some of Ramanujan's equations that fit the numerical values for the matching symbol for Pi! ? Cause it makes my brain hurt just thinking about doing that!!!
\( \sum \frac{4^n(n!)^3}{(6n+1)(\frac{1}{2})_n^3} \Gamma^2 -\frac{16^n(2n+1)}{\frac{2n}{n}}\Gamma^2 {+\frac{(2n)^2}{(2n)^2-1}\Gamma^2-\frac{(8n-1)^2}{8n(2n+1)} \) Basically π/n= E formula. http://en.wikipedia.org/wiki/Pi or did I do something wrong.
Moderator note: Lady Historica has been permanently banned from sciforums as a sock puppet of a previously-banned member.