Liste des Groupes | Revenir à p relativity |
Einstein plagiarized 1898 Gerber's equation, which gave the exact andOh, so you noticed that, ....
desired value for the advance of Mercury's perihelion.
>
Gerber final equation for the extra advance ε (giving the 43"/century)
was published as follows (I merged the two final Gerber's equations into
a single one):
>
𝜖 = 24π³ a²/[c² T² (1 - e²)]
>
On his Nov. 1915 paper, Einstein reached to this equation (N° 13, in
geometrical units)
>
𝜖 =3π [α/[a.(1 - e²)]]
>
The gravitational potential α had been declared in the first part of the
paper as Φ = -α/2r. So, he HACKED the value of α by DOUBLING IT, in
order to obtain Gerber's equation.
>
In the last equation of the 1915 paper, he transformed Eq. 13 into Eq.
14, which is EXACTLY the Gerber's equation written above.
>
To do so, and using an equivalence funded in the Third Kepler law, he
INSERTED in Eq.13 this value of α:
>
α = 8π² a³/[c² T²] = 2 GM/c² (curiously, it's the Schwarzschild radius
for the Sun).
>
The above equation is "based" on Kepler's 3rd. law, which states that:
>
a³ ∝ T² (proportional to)
>
By 1900, it was accepted that the proportion was:
>
a³/T² = GM/(4π²)
>
but the crook used THIS ONE:
>
a³/T² = 2GM/(8π²) , which allowed to match EXACTLY 1898 Gerber's
formula, by replacing α with it.
>
There is NO EXPLANATION in the 1915 paper on Mercury about THE REASON by
which he DOUBLED the value of α.
>
The only possible explanation is that he commited FRAUD, in order to
obtain the 43"/cy. Otherwise, he only would have got 21.5"/cy, very
close to what he written with his own hand (18") in some place of the 54
pages of the lost Einstein-Besso manuscript, that only saw the light in
1954, after Besso's death.
>
Finally, I'm shure that his ADVISOR Schwarzschild had a cut in the 1915
paper that he presented to the Prussian Academy of Science. Even when he
was serving as a Lieutenant on the Eastern Front (WWI), Schwarzschild
made sure to be present on that day (Nov. 18, 1915). After all, he was
not at the vanguard of the eastern front.
>
Just ONE MONTH AFTER THIS PRESENTATION, Schwarzschild came out with his
analytical solution that formally introduced what is known today as the
Schwarzschild´s radius formula.
>
TOO MANY COINCIDENCES AND TOO MUCH ROTTEN FISH AROUND GR INTRODUCTION IN
SOCIETY.
Les messages affichés proviennent d'usenet.