The ratio of centripetal forces on two clectrons which are revolving around nucleus of hydrogen alom in `2^nd` and `3^rd` orbits respectively is

Two satellites of masses m_1 and m_2 (m_1 gt m_2) are revolving around earth in circular orbits of radii r_1 and r_2 (r_1 gt r_2) respectively. Which of the following statements is true regarding their velocities V_1 and V_2

The gravitational force due to the earth also acts on the moon because of which it revolves around the earth. Similar situation exists for the artificial satellites orbiting the earth. The moon and the artificial satellites orbit the earth. The earth attracts them towards itself but unlike the falling apple,they do not fall on the earth, why?

Two particles of equal masses are revolving in circular paths of radii 2 m and 8 m respectively with the same period. Then the ratio of their centripetal forces is,

If the radius of curvature of the path of two particles of same masses are in the ratio 1 : 2 , then in order to have same centripetal force, their velocity, should be in the ratio of

Two satellites S1 and S2 revolve round a planet in coplanar circular orbits in the same sense. TI1eir periods of revolution are 2 hours and 16 hours respectively. If the radius of the orbit of S_1 is 10^4 , then the radius of the orbit of S_2 is

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

The equation of the straight line in the normal form which is parallel to the lines x+2y+3=0 and x+2y +8=0 and dividing the distance between these two lines in the ratio 1:2 internally is

Two planets revolve round the sun with frequencies N_(1) and N_(2) revolutions per year. If their average orbital radii be R_(1) and R_(2) respectively, then R_(1)//R_(2) is equal to

Imagine a light planet revolving around a very massive star in a circular orbit of radius R with a period of revolution T. if the gravitational force of attraction between the planet and the star is proportational to R^(-5//2) , then (a) T^(2) is proportional to R^(2) (b) T^(2) is proportional to R^(7//2) (c) T^(2) is proportional to R^(3//3) (d) T^(2) is proportional to R^(3.75) .