Asked by Natsi
It can be shown that for a uniform sphere the force of gravity at a point inside the sphere depends only on the mass closer to the center than that point. The net force of gravity due to points outside the radius of the point cancels.
How far would you have to drill into the Earth in kilometers, to reach a point where your weight is reduced by 4.5% ? Approximate the Earth as a uniform sphere.
How far would you have to drill into the Earth in kilometers, to reach a point where your weight is reduced by 4.5% ? Approximate the Earth as a uniform sphere.
Answers
Answered by
bobpursley
Me(r)=Me (r/re)^3 for r<re
so you want g' to be .955g
g= GMe/re^2
g'=.955GMe/re^2 =GMe(r/re)^3
which reduces to..
.955re=r^3 so
r=re *cubrt(.955)
check my work.
you want, of course, the depth of drilling, re-r
so you want g' to be .955g
g= GMe/re^2
g'=.955GMe/re^2 =GMe(r/re)^3
which reduces to..
.955re=r^3 so
r=re *cubrt(.955)
check my work.
you want, of course, the depth of drilling, re-r
Answered by
kevin
^that is so wrong
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