1. |
A planet is moving around the sun (mass Ms) in an elliptical orbit. When it is at a distance ro from the sun, its velocity is vo and the angle between the radius vecor ro and the velocity vector vo is equal to ø. Find the maximum and the minimum distance that will separate this planet from the sun. |
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2. |
An artificial satellite (mass m) of a planet (mass M) revolves in a circular orbit whose radius is n times the radius R of the planet. The satellite experiences a slight resistance due to cosmic dust. The resistance force is dependent on the satellite velocity as F = a v2, where a is a constant. Calculate how long the satellite will remain in orbit before it falls on to the planet's surface. |
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3. |
A particle of mass m is located on the outside of a uniform sphere of mass M at a distance r from its center. Find the potential energy of gravitational interaction between the particle and the sphere. |
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