- #1
epkid08
- 264
- 1
I still don't understand a few things.
Let's say we had a non-trivial zero counting function, [tex]Z_n(n)[/tex], for the riemann zeta function. Couldn't we fairly easily prove the riemann hypothesis by evaluating [tex]\zeta (\sigma+iZ_n)[/tex], solving for [tex] \sigma [/tex], then proving it for all n using induction?
On another note, I still need help in evaluating the actual function. Can someone show me, step by step, how to evaluate say, [tex]\zeta (1/2 + 5i)[/tex]? Please be specific
Let's say we had a non-trivial zero counting function, [tex]Z_n(n)[/tex], for the riemann zeta function. Couldn't we fairly easily prove the riemann hypothesis by evaluating [tex]\zeta (\sigma+iZ_n)[/tex], solving for [tex] \sigma [/tex], then proving it for all n using induction?
On another note, I still need help in evaluating the actual function. Can someone show me, step by step, how to evaluate say, [tex]\zeta (1/2 + 5i)[/tex]? Please be specific