Gravitational Potential Energy of a Two Mass System
Two masses M1...
Question
Two masses M1 & M2 are initially at rest and are separated by a very large distance. If the masses approach each other subsequently due to gravitational attraction between them, their relative velocity of approach at a separation d is
A
√2G(M1+M2)d
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B
√4G(M1+M2)d
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C
√4G(M1M2)d
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D
√G(M1+M2)d
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Solution
The correct option is A√2G(M1+M2)d
Relative velocity of M1 w.r.t. M2 or vice-versais, vrel=v1+v2........(1)
Initial energy of system, Ei=0,
Final energy of system, Ef=−GM1M2d+M1v212+M2v222
From conservation of energy, Ei=Ef −GM1M2d+M1v212+M2v222=0..........(2)
By momentum conservation, M1v1−M2v2=0 v2=M1M2v1
Substituting the value of v2 in (2) (M1)2(v1)22M2+M1(v1)22=GM1M2d v1=√2G(M2)2d(M1+M2) v2=√2G(M1)2d(M1+M2)
Substituting the value of v1,v2 in (1) we get vrel=√2G(M1+M2)d