Circular and Satellite Motion - Mission CG7 Detailed Help

The acceleration of gravity upon Earth's surface is 9.80 m/s/s. At a location of '2R' above Earth's surface (where 'R' is the radius of the Earth), the acceleration of gravity is closest to ____ m/s/s.

Note: The numerical values in your question were randomly selected and may differ from those shown above.


 
Acceleration of Gravity or Gravitational Field Strength:
The acceleration of gravity at any given location near or above a planet's surface is often referred to as the gravitational field constant of that planet. Such acceleration values are directly proportional to the planet's mass and inversely proportional to the square of the distance from the planet's center.


 
This question targets the relationship between separation distance and the acceleration of gravity. Placing an object a distance 2R above a planet's surface is comparable to tripling the distance of the object from the planet's center. Gravitational acceleration is inversely proportional to the square of the separation distance. The inverse nature of the law means that if the distance is increased, then the gravitational acceleration will be decreased. The inverse square nature of the law means the acceleration value will be decreased by the square of the factor by which the separation distance is increased. So if the separation distance becomes two times bigger, then the gravitational acceleration will become four times (22) smaller. The new gravitational acceleration would be one-fourth the original value. If the separation distance becomes three times bigger, then the gravitational acceleration will become nine times (32) smaller. The new gravitational acceleration would be one-ninth the original value.


 
The acceleration of gravity (g) is the acceleration an object experiences when the only force acting upon it is gravity. According to Newton's universal gravitation law, its value can be predicted by the following equation:
 
g = G • Mplanet / d2

where Mplanet represents the planet's mass and d represents the distance that the object is from the planet's center.