Feed: Dr. Myron Evans
Posted on: Wednesday, August 10, 2011 5:42 AM
Author: metric345
Subject: 192(2): Proof that General Relativity does not give a Static Ellipse
| This is the final version of note 192(2). If it is assumed that general relativity in any spherical spacetime gives a static ellipse then the resulting m(r) function must be Eq. (29). In order to give a static ellipse the Newtonian limit must be reached, in which case m(r) must go to unity. It only reaches this limit if the ellipse becomes a circle. The standard model asserts that a precessing ellipse is obtained from
m(r) = 1 – r0 / r However, if GR is to reduce to a precessing ellipse, the m(r) function must again be Eq. (29). The properties of Eq. (29) can be evaluated by computer for various alpha and epsilon, a and b. So UFT 192 can again be a two authored paper. Also, these calculations can be checked by computer. It is pointless claiming precision tests of GR when the basic Einsteinian theory is so wrong. It is also pointless challenging computer algebra.
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