- 19
- 6
I have been doing calculations (integrals and derivates) and i found a formula in order to get the Energy needed to disgregate gravitionally a spherical celestial body, it is accurated to calculations on wikipedia and other physics' pages cause the calculation gives the same number as is estimated by those sources. This formula assumes density is equal or grows as much deeper you go to the center of the celestial body. The formula is:
Energy (Low ball) = ( 3 x G x M x M ) / ( 5 x R ) --> Assumes density is constant among the celestial body (Minimum energy)
Energy (High ball) = ( 99 x G x M x M ) / ( 125 x R ) --> Assumes the density is all located at one centered point in the celestial body (Maximum energy)
Where:
G = Universal Gravitational Constant
M = Mass of celestial object
R = Radious of the celestial object
Just in case you want to compare just use the formula to the Earth and the Sun you will see is accurated.
Problem is: It may change the Tier system related to stars, planets and moons.
That is why i ask to have some opinions before posting it to revisions by the calculating staff and people who do calcs.
Energy (Low ball) = ( 3 x G x M x M ) / ( 5 x R ) --> Assumes density is constant among the celestial body (Minimum energy)
Energy (High ball) = ( 99 x G x M x M ) / ( 125 x R ) --> Assumes the density is all located at one centered point in the celestial body (Maximum energy)
Where:
G = Universal Gravitational Constant
M = Mass of celestial object
R = Radious of the celestial object
Just in case you want to compare just use the formula to the Earth and the Sun you will see is accurated.
Problem is: It may change the Tier system related to stars, planets and moons.
That is why i ask to have some opinions before posting it to revisions by the calculating staff and people who do calcs.
Last edited: