A satellite is revolving very close to a planet of density D. What is the time period of that satellite?(a) [3/(D*G)]^1/2(b) [3/(D*G)]^3/2(c) [3/(2*D*G)]^1/2(d) [(3*G)/D]^1/2The question was posed to me in homework.My enquiry is from Gravitation topic in chapter Gravitation of Physics – Class 11

A satellite is revolving very close to a planet of density D. What is

1.	A satellite is revolving very close to a planet of density D. What is the time period of that satellite?(a) [3/(DG)]^1/2(b) [3/(DG)]^3/2(c) [3/(2DG)]^1/2(d) [(3*G)/D]^1/2The question was posed to me in homework.My enquiry is from Gravitation topic in chapter Gravitation of Physics – Class 11
Answer» Right choice is (c) [3/(2DG)]^1/2 For explanation I would say: The time period of a satellite flying very close to the surface of the earth is; T = 2 X pi x [R^3 / (G X M)]^1/2;[Height is negligible compared to the RADIUS of the earth]. Mass (M) = Density (D) x Volume M = D x (4/3 x pi x R^3) Substituting the RELATION of mass into the time period, we GET; T = [3/(2 x D x G)]^1/2

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A satellite is revolving very close to a planet of density D. What is the time period of that satellite?(a) [3/(D*G)]^1/2(b) [3/(D*G)]^3/2(c) [3/(2*D*G)]^1/2(d) [(3*G)/D]^1/2The question was posed to me in homework.My enquiry is from Gravitation topic in chapter Gravitation of Physics – Class 11

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A satellite is revolving very close to a planet of density D. What is the time period of that satellite?(a) [3/(DG)]^1/2(b) [3/(DG)]^3/2(c) [3/(2DG)]^1/2(d) [(3*G)/D]^1/2The question was posed to me in homework.My enquiry is from Gravitation topic in chapter Gravitation of Physics – Class 11