Copernicus

2016-Aug-13, 08:09 AM

Lets say we have two spherical universes touching and massive amounts of energy comes through the contact points. Roughly we have a spherical universe of 10^27 meters in radius. In the first 10 meters perpendicular to the tangent of contact the light travels. If one forms a cone from the center of the universe to that 10 meter spot a hypothetical radius of the base of the cone would extend to the edge of the universe. The base of that cone would have a radius as follows. r^2=(10^{27})^2-(10^{27}-10)^2 where r≈141421356237310 meters.

So the base of the cone expands very fast compared to the distance traveled into the new universe. Is this how fast the universe is projected to expand at the beginning of the big bang. "This" being the expansion of the cone radius.

So the base of the cone expands very fast compared to the distance traveled into the new universe. Is this how fast the universe is projected to expand at the beginning of the big bang. "This" being the expansion of the cone radius.