Two particles move about each other in circular orbits under the influ- ence of gravitational forces, with a period 7, Their motion is suddenly stopped at a given instant of time and they are then released and allowed to fall into each other. Prove that they collide after a time T/(4√2). You will need the following integral: 3 dx SO VAGE-1) - 2 VA (
Two particles move about each other in circular orbits under the influ- ence of gravitational forces, with a period 7, Their motion is suddenly stopped at a given instant of time and they are then released and allowed to fall into each other. Prove that they collide after a time T/(4√2). You will need the following integral: 3 dx SO VAGE-1) - 2 VA (
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Transcribed Image Text:Two particles move about each other in circular orbits under the influ-
ence of gravitational forces, with a period 7, Their motion is suddenly
stopped at a given instant of time and they are then released and
allowed to fall into each other. Prove that they collide after a time
T/(4√2).
You will need the following integral:
3
dx
SO VAGE-1) - 2 VA
(
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