8 Dimensional Sphere Packing
The sphere packing problem in dimension 8
Maryna S. Viazovska March 15, 2016
solve ((pi^4/4)+1.01467803160419205455) / (pi^4/384) = 100
solve (2/((pi^4/96)-1))+(3/4) = 137.00805243727
https://en.wikipedia.org/wiki/Fine-structure_constant
http://www.wolframalpha.com/input/?i=solve+(2%2F((pi%5E4%2F96)-1))%2B(3%2F4)
https://arxiv.org/pdf/1603.04246.pdf
solve (3e+8/(3e+5/433494437 +1)) = 299792528.4597414051208
https://www.wolframalpha.com/input/?i=solve+(3e%2B8%2F(3e%2B5%2F433494437+%2B1))
((e * cos(137035.9991232535539893 radians)) - 1) / phi = 1
http://i63.tinypic.com/16jophi.jpg
c/299792528.4597414051208 = 0.999999765 m / s
solve (3^4/2^2*pi^2/299.7925284597414051208 = Koide = 0.6666593398737696704066
Fibonacci Sphere Packing 2
Better to think of it as a (2D Sheet with 2 sides) + 1 of Time = Schwartz P Minimal Surface
https://goo.gl/photos/RNTRydYCy9f3asjL8
https://goo.gl/photos/5DGJ3Qu4qyQ6ar6C9
https://goo.gl/photos/awNprzkZHTW4dTZY6
https://goo.gl/photos/bMU9qHvDPnWhcKzp8
https://goo.gl/photos/LyQccZGBKSYhgWNCA
https://goo.gl/photos/BTVmh6YUgQdDUnHbA
I think it is considered 8D Sphere - Packing Maryna S. Viazovska
https://arxiv.org/pdf/1603.04246.pdf
Universe Solved to ALL DIGITS
solve (3e+8/(3e+5/433494437 +1)) = 299792528.4597414051208
solve (3e+8/(3e+5/433494437 +1)) = 2.997925284597414e+8
((e * cos(137035.9991232535539893 radians)) - 1) / phi = 1
https://en.wikipedia.org/wiki/Fine-structure_constant
http://i63.tinypic.com/16jophi.jpg
http://www.maths.surrey.ac.uk/hosted-sites/R.Knott/Fibonacci/fibtable.html
Fibonacci #43 : 433494437 (3^4/2^2 * pi^2 * 299.792458^-1 ) = 0.6666594965576469306355
https://en.wikipedia.org/wiki/Koide_formula
Pi^4/(2^7*3) =0.2536695079
Pi^8/(2^9*3*5^2) = 0.24709716187
((2^7*3)*10D ) = ((2^9*3*5^2)/10D)
38400/(2)/384 =50 = 1/(G*c)
((pi^(2^3)) / ((2^9) * 3 * (5^2))) / ((pi^(2^2)) / ((2^7) * 3)) = 0.97409091034
3e+8 * (0.97409091034^(1 / 38)) = 299792829.65