If a ball were dropped in a hole bored through the center of the earth, it would
ID: 1265444 • Letter: I
Question
If a ball were dropped in a hole bored through the center of the earth, it would be attracted toward the center with a force directly proportional to the distance of the body from the center. Find: the equation of motion.
Note:
when the body (mass = m) is on the surface of the earth,
the attraction force is F = GMm/R2, where M is the mass of the earth, and R is the radius of the earth.
When the body is "below" the surface, say, with distance y from the center.
You may think the body is on the surface of the "sub-earth" whose radius is y.
And the mass of the "sub-earth" is Ms = M (y/R)3.
So the attraction force now is F = GMsm/y2 = (GMm/R3)y which is proportional to y.
To do this problem, you will need to use numbers R=4000 miles and GM/R2 = g = 32 ft/sec2
Explanation / Answer
Mass of the ball = m
Mass of Earth = M
We will convert all given units (ft/s and miles) to SI units for our calculations
Earth Radius R = 4000 miles = 6437.4 km = 6.45 * 106 m
g = 32 ft/s2 = 9.75 m/s2
Force on the ball when it is on the surface of earth: F = GMm/R2
Force on ball due to earth's gravitational field = F = GMs m/y2
Where y = distance of ball from centre of earth
Ms = Mass of sphere with radius r' when the ball is below the surface of earth.
When ball is on surface of earth, y = R, Ms = M
Mass of sphere 'sub-earth': Ms = M (y/R)3
Thus, we can write F = GMs m/y2 = (G Mm/R3 ) * y
Now from Newton's second law of motion, force is also written as:
F' = ma = m * d2y/dt2
To find equation of motion of the ball, we equate the two forces above:
F' = F (however the direction of two forces are opposite)
So, F' = -F
or,
Now since the force of gravitational field is directed towards the centre of Earth (opposite to the displacement from the centre), we have put a -ve sign to take care of this in the above equation:
m * d2y/dt2 = -(G Mm/R3 ) * y
or,
d2y/dt2 = -(G M/R3 ) * y ................................................(1)
Now when ball is on the surface of earth,
We use it to find expression for g:
F = ma = mg = GM m /R2
or, g = GM/R2
Substitute this in (1) above:
d2y/dt2 = -(G M/R3 ) * y = -(GM/R2 ) * y/R = -(g/R) * y
Putting the given values of g and R, we have:
d2y/dt2 = -(9.75/6.45*106) * y = -1.5 * 10-6 y
This is the required equation of motion of the ball.
We can write this as:
d2y/dt2 = -1.5 * 10-6 y
or,
d2y/dt2 + 1.5 * 10-6 y = 0
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