Riemann Hypothesis. This is why it is true. (Other helps to those interested verify)

Review [v2] (Page 4 of 10). The main topic of this article concerns a simple graphical method to accurately position the symmetry axis of the funicular polygon; there is no symmetry if the real part of (s) is different from 1/2.

The symmetry concerns the vertices (extremes of the vectors) of the first half of the funicular polygon and the origins (shared between them) of the "pseudo-clotoids" that make up the second part of the funicular polygon.