A body of radius `R` and mass `m` is rolling smoothly with speed `v` on a horizontal surface. It then rolls up a hill to a maximum height `h`. If `h = 3 v^2//4g`. What might the body be ?

A body of mass M and radius R is rolling horizontally without slipping with speed v . It then rolls up a hill to a maximum height h . If h = (5v^(2))/(6g) , what is the M.I of the body ?

A body of radius R and mass m is rolling horizontally without slipping with a unifrom speed v. It then rolls up in an inclined plane to a maximum height of h. If h = (3v^2)/(4g) , determine the MI of the body about its axis of rotation.

An object of radius R and mass M is rolling horizontally without slipping with speed v . It then rolls up the hill to a maximum height h = (3v^(2))/(4g) . The moment of inertia of the object is ( g = acceleration due to gravity)

An object of radius R and mass M is rolling horizontally without slipping with speed v . It then rolls up the hill to a maximum height h = (3v^(2))/(4g) . The moment of inertia of the object is ( g = acceleration due to gravity)

An object of radius 'R' and mass 'M' is rolling horizontally without slipping with speed 'v'. It then rolls up the hill to a maximum height h = (3v^2)/(4g) The moment of inertia of the object is (g = acceleration due to gravity)

A symmetrical body of mass M and radius R is rolling without slipping on a horizontal surface with linear speed v. Then its angular speed is

A ball of radius R and mass m is rolling without slipping on a horizontal surface with velocity of its centre of mass v_(CM) . It then rolls wilthout slippig up a hill to a height h before momentarily coming to rest. Find h