Hubble (64850.0814957 m / s) / Mpc = / (1 billion years) = 15.0780552
http://vixra.org/pdf/1310.0191vD.pdf
(8pi * G * (3.7037037037037e-28 kg)) / (3 * (((14041.8286558 * (m / s)) / Mpc)^2)) = 1 m^3
((8 * pi * G * (3.7037037037037e-28 kg)) / (3 * (((66700 * (m / s)) / Mpc)^2))) = 0.0443195836 m^3
1/0.0443195836 = 22.5633888853
(8*pi*G * (3.7037037037037e-28 * (5^0.5*10) kg)/(3*(66399.7082072 (m/s)/Mpc)^2)
(1 / 0.0443195836) * ((5^0.5) / 10) = 5.04532713502 = critical density
(1 / ((64850.0814957 (m / s)) / Mpc)) / (1 billion years) = 15.0780552
The density parameter,
, is defined as the ratio of the actual (or observed) density to the critical density of the Friedmann universe. The relation between the actual density and the critical density determines the overall geometry of the universe; when they are equal, the geometry of the universe is flat (Euclidean). In earlier models, which did not include a cosmological constant term, critical density was initially defined as the watershed point between an expanding and a contracting Universe.
To date, the critical density is estimated to be approximately five atoms (of monatomic hydrogen) per cubic metre, whereas the average density of ordinary matter in the Universe is believed to be 0.2–0.25 atoms per cubic meter
1 / ((8 * pi * G * (3.71295774e-28 kg)) / (3 * (((66482.6091997 * (m / s)) / Mpc)^2))) = 22.3606797
Critical Density / Actual Density = 22.3606769
(((5^0.5) * 10) + 10) / 2 = 16.1803398875
((((5^0.5) * 10) / 16.1803398875) - 1)^0.5 = 0.61803398875
Phi universe