Do you think the Riemann Hypothesis is true? Will anyone ever prove it?
Many of math's greatest minds have tried to prove Bernhard Riemann's sweeping claim that there's order hiding beneath the apparent randomness of prime numbers. Do you think, like most mast mathematicians do, that Riemann was right? And even if he was, will we ever know for sure, or will it forever remain beyond the reach of mathematical proof?
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Hi, this post about RH which interested me. Which might link to what I been found.
The link below is an equation to locator the not trivial zeros in RH. It’s can be locator from 1st not trivial zeros in RH, event it’s at N10^35. Here the equations.
ACore locator:
ρ_n = 1/2 + iγ_n
theta midpoint:
θ(T)/π = n - 3/2
Hardy refine:
Z(t)=exp(iθ(t))ζ(1/2+it)
find Z(γ_n)=0
N1 zero
known/refined γ = 14.134725141735
locator T0 = 14.517919628262
Hardy refine = 14.134725141735
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