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A mass m moves in a circular orbit (centered at the origin) in the field of an attractive central force with potential energy U = krn . Prove that T = nU/2.
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A mass m moves in a circular orbit (centered at the origin) in the field of an attractive central force with potential energy U = krn . Prove that T = nU/2.

User Liggliluff
by
6.2k points

1 Answer

1 vote

Hence the answer T = nU / 2 is proved.

Step-by-step explanation:

U = kr^n

F = -dU / dr

=
(d)/(dr) kr^(n)

=
- knr^(n-1)

At equation this force is equal to centripetal force.


- knr^(n-1) = (mv^(2) )/(r)


mv^(2) = nkr^(n)

Total energy = 1/2 mv^2

=
(1)/(2) nkr^(n)

=
n(kr^(n) )/(2)


T= (nU)/(2)

User BlueFox
by
5.7k points
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