359800 To project a body of mass \(m\) from earth's surface to infinity, the required kinetic energy is (assume, the radius of earth is \(R_{E}, g=\) acceleration due to gravity on the surface of earth)

359801 The escape velocity of a body from any planet, whose mass is six times the mass of earth and radius is twice the radius of earth will be \(\left(v_{e}=\right.\) escape velocity of a body from the earth's surface)

359802 Four equal masses (each of mass \(m\) ) are placed at the corners of a squal of side \(a\). The escape velocity of a body from the centre \(O\) of the square is

359803 The ratio of escape velocity of a planet to the escape velocity of earth will be (Given: Mass of the planet is 16 times mass of earth and radius of the planet is 4 times the radius of earth)

359804 If earth has a mass nine times and radius twice to that of a planet \(P\). Then \(\frac{{{v_e}}}{3}\sqrt x \,m{s^{ - 1}}\) will be the minimum velocity required by a rocket to pull out of gravitational force of \(P\), where \(v_{e}\) is escape velocity on earth. The value of \(x\) is

359800 To project a body of mass \(m\) from earth's surface to infinity, the required kinetic energy is (assume, the radius of earth is \(R_{E}, g=\) acceleration due to gravity on the surface of earth)

359801 The escape velocity of a body from any planet, whose mass is six times the mass of earth and radius is twice the radius of earth will be \(\left(v_{e}=\right.\) escape velocity of a body from the earth's surface)

359802 Four equal masses (each of mass \(m\) ) are placed at the corners of a squal of side \(a\). The escape velocity of a body from the centre \(O\) of the square is

359803 The ratio of escape velocity of a planet to the escape velocity of earth will be (Given: Mass of the planet is 16 times mass of earth and radius of the planet is 4 times the radius of earth)

359804 If earth has a mass nine times and radius twice to that of a planet \(P\). Then \(\frac{{{v_e}}}{3}\sqrt x \,m{s^{ - 1}}\) will be the minimum velocity required by a rocket to pull out of gravitational force of \(P\), where \(v_{e}\) is escape velocity on earth. The value of \(x\) is

359800 To project a body of mass \(m\) from earth's surface to infinity, the required kinetic energy is (assume, the radius of earth is \(R_{E}, g=\) acceleration due to gravity on the surface of earth)

359801 The escape velocity of a body from any planet, whose mass is six times the mass of earth and radius is twice the radius of earth will be \(\left(v_{e}=\right.\) escape velocity of a body from the earth's surface)

359802 Four equal masses (each of mass \(m\) ) are placed at the corners of a squal of side \(a\). The escape velocity of a body from the centre \(O\) of the square is

359803 The ratio of escape velocity of a planet to the escape velocity of earth will be (Given: Mass of the planet is 16 times mass of earth and radius of the planet is 4 times the radius of earth)

359804 If earth has a mass nine times and radius twice to that of a planet \(P\). Then \(\frac{{{v_e}}}{3}\sqrt x \,m{s^{ - 1}}\) will be the minimum velocity required by a rocket to pull out of gravitational force of \(P\), where \(v_{e}\) is escape velocity on earth. The value of \(x\) is

359800 To project a body of mass \(m\) from earth's surface to infinity, the required kinetic energy is (assume, the radius of earth is \(R_{E}, g=\) acceleration due to gravity on the surface of earth)

359801 The escape velocity of a body from any planet, whose mass is six times the mass of earth and radius is twice the radius of earth will be \(\left(v_{e}=\right.\) escape velocity of a body from the earth's surface)

359802 Four equal masses (each of mass \(m\) ) are placed at the corners of a squal of side \(a\). The escape velocity of a body from the centre \(O\) of the square is

359803 The ratio of escape velocity of a planet to the escape velocity of earth will be (Given: Mass of the planet is 16 times mass of earth and radius of the planet is 4 times the radius of earth)

359804 If earth has a mass nine times and radius twice to that of a planet \(P\). Then \(\frac{{{v_e}}}{3}\sqrt x \,m{s^{ - 1}}\) will be the minimum velocity required by a rocket to pull out of gravitational force of \(P\), where \(v_{e}\) is escape velocity on earth. The value of \(x\) is

359800 To project a body of mass \(m\) from earth's surface to infinity, the required kinetic energy is (assume, the radius of earth is \(R_{E}, g=\) acceleration due to gravity on the surface of earth)

359801 The escape velocity of a body from any planet, whose mass is six times the mass of earth and radius is twice the radius of earth will be \(\left(v_{e}=\right.\) escape velocity of a body from the earth's surface)

359802 Four equal masses (each of mass \(m\) ) are placed at the corners of a squal of side \(a\). The escape velocity of a body from the centre \(O\) of the square is

359803 The ratio of escape velocity of a planet to the escape velocity of earth will be (Given: Mass of the planet is 16 times mass of earth and radius of the planet is 4 times the radius of earth)

359804 If earth has a mass nine times and radius twice to that of a planet \(P\). Then \(\frac{{{v_e}}}{3}\sqrt x \,m{s^{ - 1}}\) will be the minimum velocity required by a rocket to pull out of gravitational force of \(P\), where \(v_{e}\) is escape velocity on earth. The value of \(x\) is