Weight above the surface of the Earth

AI Thread Summary
An astronaut weighing 800 N on Earth's surface will weigh significantly less at a height of 6.37 million kilometers above the surface. The gravitational force can be calculated using the formula F = G(m1)(m2)/(d)^2, where d must include the Earth's radius plus the altitude. After correcting for the distance to the Earth's center, the new weight calculation shows a force of approximately 800.05 N. It's important to convert the Earth's radius into meters for accurate results. This problem illustrates that as distance from Earth doubles, gravitational force decreases to one-fourth of its original value.
Sligh
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Homework Statement



An astronaut weighs 800 N on the surface of the Earth. What is the weight of the astronaut 6.37*10^6 km above the surface of the earth?

Homework Equations



F = G (m1)(m2)/(d)^2

W=ma

The Attempt at a Solution



I am sure that I need the previous equations I listed, although I am not quite sure how to actually solve this problem. A solution to this type of problem would be most appreciated. Thanks!
 
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you have your second equation wrong, it should read:
F = ma

G is constant, and you know d. So all you need are the two masses. Earth and astronaut.
 
Thanks for the assistance. Here's what I figured ->

F = 6.67E-11*(81.632kg)(5.9742E24kg) / (6.37E6)^2

F=801.624N

W=81.8014kg
Is this alright? Thanks!
 
Last edited:
Sligh said:
Thanks for the assistance. Here's what I figured ->

F = 6.67E-11*(81.632kg)(5.9742E24kg) / (6.37E6)^2

This would not give the weight at the point they are asking about. The d in the denominator of your equation is the distance to the center of the earth. So what would d be when the astronaut is at the height given?
 
Ah, you are correct. Then I must add the radius of the Earth plus the distance at which the astronaut is above the Earth, yes?

Here's my new results:

F = 6.67E-11*(81.632)(5.9742E24) / (6.37E6 + 6378.1)^2

F = 800.0514292 N

W = 81.63790094 kg

Is that it?

Thanks.
 
Sligh said:
Ah, you are correct. Then I must add the radius of the Earth plus the distance at which the astronaut is above the Earth, yes?

Here's my new results:

F = 6.67E-11*(81.632)(5.9742E24) / (6.37E6 + 6378.1)^2

Not quite; the Earth's radius is 6378.1 km, but you need to convert that to meters.
 
Got it. Thanks a lot!
 
You're welcome!

Notice in this problem that what they have done is set the altitude essentially equal to the Earth radius, so really the astronaut is doubling his distance from the center of the earth. In an inverse square law like gravity, if you double the separation, the force magnitude goes to one-fourth of its original value.
 

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