Thursday, February 1, 2018

So many 13's...................13 is the 6th prime...........6 is the 1st perfect number..................if u start at 2........the 1st prime..........the 1st prime is 2........like 1/2.........the so called critical line.......................and take all primes under 100........there are 25 of them............................13 of them......starting at 2...........and taking every other one.......doing that..........produces many interesting patterns...........process........etc.....................

Under 100............the 1st number in triple digits..............base 10 number system anyways...................................10 squared is 100.............2 is very imp. in all this.........every negative even integer.........every other whole number on the X axis........negative X axis.................like 2pi.....................2............every other one.......2pi...........in circumference in the unit circle.............that is full circle.........the square root of 13.....starts out like the number of degrees in a full circle..........3.60...................................unit circle.......b/c its radius is one...................






14.13i............could be seen as both e and pi.....................14.13i...........14 + 13.....= 27.............e starts out...........2.7..............the 13 is under the dec point............pi starts out........3.14.............the beg to middle........end to middle............14 is 14........0.13i.........is 0.13.......is 13..........from end to middle.....31.........over lap the 1's...................and u have the beg of pi.......fractal patterns.......chaos theory...........



The above plot shows |zeta(1/2+it)| for t between 0 and 60. As can be seen, the first few nontrivial zeros occur at the values given in the following table (Wagon 1991, pp. 361-362 and 367-368; Havil 2003, p. 196; Odlyzko), where the corresponding negative values are also roots. The integers closest to these values are 14, 21, 25, 30, 33, 38, 41, 43, 48, 50, ... (OEIS A002410). The numbers of nontrivial zeros less than 10, 10^2, 10^3, ... are 0, 29, 649, 10142, 138069, 1747146, ... (OEIS A072080; Odlyzko).
nSloanet_n
1A05830314.134725
221.022040
325.010858
430.424876
532.935062

No comments:

Post a Comment