Determine the escape velocity of a planet with mass `3xx10^(25)"kg and radius" 9xx10^(6)m.`

The escape velocity from the surface of earth is V_(e) . The escape velocity from the surface of a planet whose mass and radius are 3 times those of the earth will be

If the force of gravitation between the Earth and an object of mass 'm' is 9xx10^7N . Find the mass of an object if the mass ofhte Earth 6xx10^24 kg and its radius is 6.4xx10^6 m.

Calculate the escape velocity on the surface of the Moon given the mass and radius of the Moon to be 7.34xx10^(22) kg and 1.74xx10^(6)m respectively.

Solve the following examples / numerical problems: Find the escape velocity of a body from the earth. [M_(earth)= 6xx10^24 kg, R_(earth)=6.4xx10^6m,G=6.67xx10^-11 N-m^2/kg^2]

Calculate the escape velocity on the surface of the Moon given the amss and radius of the Moon to be 7.4xx10^22 kg and 1.74xx10^6 m respectively

Suppose the orbit of a satellite is exactly 35780 km above the earth's surface. Determine the tangential velocity of the satellite (G=6.67xx10^(-11) Nm^2//kg^2, mass of the earth= 6xx10^(24) kg, Radius of the earth = 6.4xx10^6m )

The mass of planet Jupiter is 1.9xx10^(27)kg and that of the Sun is 1.9xx10^(30)kg . The mean distance of Jupiter from the Sun is 7.8xx10^(11) m. Calculate te gravitational force which Sun exerts on Jupiter. Assuming that Jupiter moves in circular orbit around the Sun, also calculate the speed of Jupiter G=6.67xx10^(-11)Nm^(2)kg^(-2) .

The ratio of escape velocity at earth (v_(e)) to the escape velocity at a planet (v_(y)) whose radius and density are twice

Solve the following examples / numerical problems: Find the escape velocity of a body from the earth. [R_(earth)= 6.4xx10^6 m, rho_(earth)= 5.52xx10^3 kg/m^3,G=6.67xx10^-11 N-m^2/kg^2]

An electron is moving with a velocity of 0.25 c and rest mass is 9.1 xx 10^-31 kg . Calculate the de Broglie wavelength linked with the electron.