I dont think you change the equations because one can not constantly accelerate realistically. A small problem called the speed of light kind of messes things up. So I dont think you can just plug in the change in youre velocity in for V for the lorentz equation. If you have an equation f(x) and x always increases then f always increases for a given finite value of x, i know it doesnt sound right but it makes sense. Then as f approaches infinity... see it makes no sence. There is a constant time dialation and therefor there must be a constant v that is associated with a specific force from a gravitational field! How does one calculate this?
2006-06-22 14:53:25 · 3 answers · asked by Goose 2 in Science & Mathematics ➔ Physics
Gravitational time dilation caused by a spherically symmetric, nonrotating massive body can be computed exactly by using the Schwarzschild solution to the Einstein field equations. This is also a good approximation to a slowly rotating, roughly spherical body like the Earth. The time dilation given is:
t0=t1√(1-2GM/(rc²)) where:
t0 is the time between two events for an observer within the gravitational field
t1 is the time between those same events for an observer well outside the gravitational field
G is Newton's gravitational constant
M is the mass of the object creating the gravitational field
r is the distance of the observer in the gravitational field from the center of said field
c is the speed of light
2006-06-22 15:15:12 · answer #1 · answered by Pascal 7 · 0⤊ 1⤋
besides the undeniable fact that there is not any actual relationship between gravitational and electric fields, there are good purchase of mathematical similarities, a minimum of on the classical point: - the two are crucial forces - the two die off in distance in accordance to the inverse sq. regulation - the two can enable good orbits (besides the undeniable fact that orbits on the atomic scale require quantum descriptions) - the two obey Gauss' regulation - the two are created by a "fee" (mass for gravity, electric fee for electric fields) - the two can journey radiated waves of their fields by empty area the massive ameliorations are: - electric fee could be advantageous or adverse on an identical time as mass is often advantageous - gravity can by no ability be shielded the way electric fields can - gravity is often eye-catching, on an identical time as electric forces could be eye-catching or repulsive
2016-12-08 11:41:01 · answer #2 · answered by ? 4 · 0⤊ 0⤋
metaphysics
2006-06-29 14:32:41 · answer #3 · answered by 6 · 0⤊ 0⤋