A planet of mass M, has two natural sate...

A planet of mass M, has two natural satellites with masses m1 and m2. The radii of their circular orbits are `R_(1)` and `R_(2)` respectively. Ignore the gravitational force between the satellites. Define `v_(1), L_(1), K_(1)` and `T_(1)` to be, respectively, the orbital speed, angular momentum, kinetic energy and time period of revolution of satellite 1 , and `v_(2), L_(2), K_(2)` and `T_(2)` to be he corresponding quantities of satellite 2. Given `m_(1)//m_(2) = 2` and `R_(1)//R_(2) = 1//4`, match the ratios in List-I to the numbers in List-II.

`P rarr 4 , Q rarr 2 , R rarr 1 , S rarr 3`

`P rarr 3 , Q rarr 2 , R rarr 4 , S rarr 1`

`P rarr 2 , Q rarr 3 , R rarr 1 , S rarr 4`

`P rarr 2 , Q rarr 3 , R rarr 4 , S rarr 1`

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A planet of mass , has two natural satellites with masses and . The radii of their circular orbits are and respectively. Ignore the gravitational force between the satellites. Define , and to be, respectively, the orbital speed, angular momentum, kinetic energy and time period of revolution of satellite 1, and , , and to be the corresponding quantities of satellite 2. Given//2 and //1//4 , match the ratios in List-I to the numbers in List-II.

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