Part A Suppose you are at the earth\'s equator and observe a satellite passing d
ID: 1477291 • Letter: P
Question
Part A
Suppose you are at the earth's equator and observe a satellite passing directly overhead and moving from west to east in the sky. Exactly 10.0 hours later, you again observe this satellite to be directly overhead. Assume a circular orbit. How far above the earth's surface is the satellite's orbit?
h = m
Part B
You observe another satellite directly overhead and traveling east to west. This satellite is again overhead in 10.0 hours. How far is this satellite's orbit above the surface of the earth?
h= m
Explanation / Answer
Mass of earth (m) = 5.98 e24 kg
Graviattional constant (a constant) = 6.673 e-11
Earths surface radius (R) = 6.371 e6 meters
r = satellite orbital radius in meters
A.
Earths sidereal rotation rate = 7.2921 e-5 rad/sec
Earths rotation in 10 hours ( 36,000 sec ) = 36,000 * 7.2921 e-5 = 2.625 radians
Rotation by satellite to catch up = ( 2 * pi ) + 2.625 = 8.905 radians
Sattelite rotation rate required = 8.905 / 36,000 = 2.4736 e-4 rad / sec
Equation build :
rad/sec = v / r , and v = square root ( G * m / r ), so :
rad /sec = ( square root ( ( G * m ) / r ) ) / r
Transpose to feature r :
r = cube root ( ( G * m ) / ( rad / sec ² ) )
r = 1.175 e7 meters (satellite orbital radius)
Satellite altitude = r - R = 0.5379 meters (ANSWER)
B.
Earths sidereal (360°) rotation time = 23.93446 h = 86,164 seconds
Earths rotation in 10 hours = ( 2 * pi ) * ( 36,000 / 86,164 ) = 2.624 radians
Rotation of satellite = ( 2 * pi ) - 2.624 = 3.656 radians
Rotation rate of satellite = 3.656 / 36,000 = 10.156 e-5 rad / sec
r = cube root ( ( G * m ) / ( rad / sec ² ) )
r = 3.37 e7 meters
Altitude = r - R = 2.735 e7 meters (ANSWER)