Mass of the Earth M = 5.9737 * 10
24 kg (lot of disagreement on this one, going with wiki value)
Earth equatorial radius R = 6.3781 * 10
6 m
Gravitational Constant G = 6.6730 * 10
-11 N m
2 kg
-2F
g = G M m / R
2:. F (R) = 9.7990(m) N
:. F (R + 100000) = 9.4988(m) N
E.g. the weight force is about 3% weaker. The (m) is the mass of the object orbitting the Earth, if you leave it out, the answers are the actual gravitational acceleration in units of m s
-2.
NOTE, this doesn't take into account the lessening of the observed weight force due to circular acceleration.
For that;
Remember that for circular motion, the sum of ALL forces (grav + reaction force) = m v
2/R, where v is the tangential speed of the object, and the reaction force is what we perceive as weight, which is equal and opposite to gravity in a non-rotating frame.
Earth rotates once every 24 hours = 86400 s
If we assume a geostationary orbit,
:. Distance travelled at equator = 2*pi*R = 4.0075*10
7 m
:. V
R = 463.83 m/s
:. F
C R = 0.0337(m) N
Likewise for 100kms up,
:. Distance = 4.0703*10
7 m
:. V
R + H = 471.10 m/s
:. F
C R+H = 0.0343(m) N
Obviously, these are pretty damn negligible, but for the sake of completeness
:.Weight Force F
R = 9.7653(m) N
:.Weight Force F
R + H = 9.4645(m) N
So again, just over a 3% difference between the two.
Now, in future, please don't use these forums to do your physics homework
If you are going to ask about such a small difference, then it matters where on earth you are talking about. There are non-trivial differences in gravity in different parts of the globe (rule of thumb is things are heavier closer to the equator).
Other way round. Equator is further from the centre of the Earth, so things are lighter.
EDIT: One last thing... in reality, anything at 100 kms up won't weigh a damn thing, because there is nothing to push against and ergo, no reaction (weight) force. But hey, theoretical case and all that
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Topic: for you physicists or rocket scientists out there (Read 2700 times)