The spherical planets have the same mass but densities in the ratio `1: 8`. For these planets the :

The diameters of two planets are in the ratio 4:1 and their mean densities in the ratio 1:2 The acceleration due to gravity on the particles wil be in ratio.

Two planets A and B have the same material density. If the radius of A is twice that of B, then the ratio of the escape velocity V_(A)//V_(B) is

The mass of a planet is twice the mass of earth and diameter of the planet is thrie the diameter of the earth, then the acceleration due to gravity on the planet's surface is

The diameter and density of a planet are twice that of the earth. Assuming the earth and the planet to be of uniform density, find the ratio of the lengths of two simple pendulums, of equal time periods, on the surface of the planet and the earth.

Two planets of radii in the ratio 2 : 3 are made from the materials of density in the ratio 3 : 2 . Then the ratio of acceleration due to gravity g_(1)//g_(2) at the surface of two planets will be

Two planets have same density but different radii The acceleration due to gravity would be .

Two spherical planets P and Q have the same uniform density rho, masses M_p and M_Q and surface areas A and 4A respectively. A spherical planet R also has uniform density rho and its mass is (M_P + M_Q). The escape velocities from the plantes P,Q and R are V_P V_Q and V_R respectively. Then

Suppose that the acceleration of a free fall at the surface of a distant planet was found to be equal to that at the surface of the earth. If the diameter of the planet were twice the diameter of the earth, then the ratio of mean density of the planet to that of the earth would be

Astronomers observe two separate solar systems each consisting of a planet orbiting a sun. The two orbits are circular and have the same radius R . It is determined that the planets have angular momenta of the same magnitude L about their suns, and that the orbital periods are in the ratio of three to one, i.e. T_(1)=3T_(2) . The ratio m_(1)//m_(2) of the masses of the two planets is

Two hypothetical planets 1 and 2 are moving in the same eliptical path as shown in the figure. If the planets are situated at minimum and maximum distance from the sun and one of the planet, say 1 , has speed v . Find the relative angular speed of the planets for the given situation.