If the radii of circular paths of two particles of same masses are in the ratio of ` 6:8`, then to have a constant centripetal force, their velocities should be in a ratio of.

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

If the radius of curvature of the path of two particles of same mass are in the ratio 3:2,then in order to have constant centripetal force,their velocities will be in the ratio of:

If the radii of circular path of two particles are in the ratio of 1 :2 , then in order to have same centripatal acceleration, their speeds should be in the ratio of :

Two wires have the same material and length, but their masses are in the ratio of 4:3 . If they are stretched by the same force, their elongations will be in the ratio of

The base radii of two right circular cones of the same height are in the ratio 5:5. Find the ratio of their volumes.

The base radii of two right circular cones of the same height are in the ratio 3:5. Find the ratio of their volumes.

The Base radii of two Right circular cone of the same height are in the ratio 3:5. Find the ratio of the volumes.

The radius of the circular path of a particle is doubled but its frecuency of rotation remains unchanged . If the initial centripetal force be F, then the final centripetal force will be

Consider two wires of same material having their ratio of radii to be 2 : 1. If these two wires are stretched by equal force, the ratio of stress produced in them is :

Two particles of masses m and 3m are moving under their mutual gravitational force, around their centre of mass, in circular orbits. The separation between the masses is r. The gravitational attraction the two provides nessary centripetal force for circular motion The ratio of centripetal forces acting on the two masses will be