| 1. |
A small asteroid starts falling onto the sun from a distance equal to the radius of the Earth's orbit. Initially the body starts off with zero velocity. Using Kepler's law, find in terms of the Earth's orbital time period T how long the rock will take to fall into the sun. |
| |
|
| 2. |
A length of wire of mass M is bent into an arc of a circle of radius R, subtending an angle of ø at the center. A particle of mass m is placed at the center. What force does the wire apply on the particle? |
| |
|
| 3. |
A satellite of mass Ms is orbiting the Earth in a circular orbit of radius Rs. Due to a critical failure in its solar panels, it starts losing power at a constant rate C. If Me and Re denote the mass and radius of the Earth, then find the time it takes the satellite to fall to the surface of the Earth. |
| |
|
