Assuming the distance of the Moon from the Earth `R=3.84xx10^(8)m` and Moon's period of revolution as 27.3 days, calculate the mass of the Moon.

You are given the following data :g=9.81ms^(-2) , radius of earth =6.37xx10^(6)m the distance of the Moon from the earth =3.84xx10^(8) m and the time period of the Moon's revolution =27.3days . Obtain the mass of the earth in two different ways. G=6.67xx10^(-11)Nm^(2)kg^(-2) .

You are given the following data :g=9.81ms^(-2) , radius of earth =6.37xx10^(6)m the distance the Moon from the earth =3.84xx10^(8) m and the time period of the Moon's revolution =27.3days . Obtain the mass of the earth in two different ways. G=6.67xx10^(-11)Nm^(2)kg^(2) .

You are given the following data :g=9.81ms^(-2) , radius of earth =6.37xx10^(6)m the distance the Moon from the earth =3.84xx10^(8) m and the time period of the Moon's revolution =27.3days . Obtain the mass of the earth in two different ways. G=6.67xx10^(-11)Nm^(2)kg^(2) .

our earth has several artificial satellites but the moon is the only natural satellite. distance to the moon from the Earth is 3.84×10^8m and the time period of moon's revolution is 27.3 days. obtain the mass of earth. (gravitational constant G=6.67×10^(-11)Nm^2kg^(-2)

If 'R' is the distance of the Moon from the Earth and 'T ' is the period of revolution of the Moon , then obtain the formula to calculate the mass of the Earth.