Two satellites A and B , have the ratio of their masses as `m_A : m_B = 3 : 1`, are in the circular orbits of radii r and 4r respectively . The ratio of total mechanical energy of A to that of B is

Two satellite A and B , ratio of masses 3 : 1 are in circular orbits of radii r and 4 r . Then ratio of total mechanical energy of A to B is

Two satellites P and Q ratio of masses 3:1 are in circular orbits of radii r and 8r . Then ratio of total mechanical energy of A to B is

Two satellite A and B, ratio of masses 3:1 are in circular orbits of radii r and 4r . Then ratio mechanical energy of A and B is

For a satellite moving in a circular orbit around the earth, the ratio of its total mechanical energy to kinetic energy

Two satellites A and B of masses m_(1) and m_(2)(m_(1)=2m_(2)) are moving in circular orbits of radii r_(1) and r_(2)(r_(1)=4r_(2)) , respectively, around the earth. If their periods are T_(A) and T_(B) , then the ratio T_(A)//T_(B) is

Two satellites, A and B, have masses m and 2m respectively. A is in a circular orbit of radius R, and B is in a circular orbit of radius 2R around the earth. The ratio of their kinetic energies, T_(A)//T_(B) , is :

Two satellites , A and B , have masses m and 2m respectively . A is in a circular orbit of radius R , and B is in a circular orbit of radius 2R around the earth . The ratio of their energies , K_A/K_B is :

If two circular discs A and B are of same mass but of radii r and 2r respectively, then the moment of inertia of A is

Two particles of equal masses are revolving in circular paths of radii r_(1) and r_(2) respectively with the same speed. The ratio of their centripetal force is

Two particles of equal masses are revolving in circular paths of radii, r_(1) and r_(2) respectively with the same period . The ratio of their centripetal force is -