If during revolving around the Earth’s orbit, the mass of a satellite is doubled due to any reason, then what would be the effect on time period?

If during revolving around the Earth’s orbit, the mass of a satellit

1.	If during revolving around the Earth’s orbit, the mass of a satellite is doubled due to any reason, then what would be the effect on time period?
Answer» The time period of the satellite, T = \(2 \pi \sqrt{\frac{r^{3}}{G M}}\) where, r = radius of the orbit, M mass of Earth. In above formula, the mass of the satellite (m) is not used. Therefore the time period T will not depend on m. Hence, on doubling the mass of the satellite, its time period will remain unchanged.

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If during revolving around the Earth’s orbit, the mass of a satellite is doubled due to any reason, then what would be the effect on time period?

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