Ok faggots. Its long overdue. Its time to solve this shit.
Any ideas of how to approach this problem?
>A Friendly Introduction to The Riemann Hypothesis
>http://www.math.jhu.edu/~wright/RH2.pdf
>>7947074
Its been done
>>7947074
>A Friendly Introduction to The Riemann Hypothesis
I tried to read that, but it makes me want to stab whoever wrote that. Its like an autistic person trying to be funny.
>>7947154
African mathematics
>>7947074
isn't that the integral of [math]\frac{1}{n^s}[/math] or am I retarded
>>7947074
>The best mathematicians in the world cannot find the roots of some series that looks like it could pop up in a Calc II course
This is why I cannot take these autists seriously.
[eqn] \sum_{n}^{inf} \frac{1}{n^{^{1/2+it}}} = \sum_{n}^{inf} \frac{1}{n^{^{1/2}}*n^{^{it}}} = \sum_{n}^{inf} \frac{1}{n^{^{1/2}}*(\cos (t\cdot Ln(n)))+i\cdot\sin (t\cdot Ln(n)))} [/eqn]
I think this is the catch. There is no way to analytically find the roots of that. The most probably thing is there is a way, but is not known yet. I always wonder what kind of mathematical techniques will be available in 200 years from now
>>7947316
pretty sure you are retarded