A solid sphere is rolling without slipping on a level surface dat a constant speed of `2.0 ms^(-1)` How far can it roll up a `30^(@)` ramp before it stops ?

A solid disk is rolling without slipping on a level surface at a constant speed of 2.00m//s . How far can it roll up a 30^(@) ramp before it stops? (take g=9.8m//s^(2))

A solid disk is rolling without slipping on a level surface at a constant speed of 2.00m//s . How far can it roll up a 30^(@) ramp before it stops? (take g=9.8m//s^(2))

A solid disk is rolling without slipping on a level surface at a constant speed of 2.00m//s . How far can it roll up a 30^(@) ramp before it stops? (take g=9.8m//s^(2))

A solid sphere rolls without slipping down a 30^(@) inclined plane. If g=10 ms^(-2) then the acceleration of the rolling sphere is

A solid sphere rolls without slipping down a 30^@ inclined plane. If g=10ms^-2 then the acceleration of the rolling sphere is

A solid sphere of mass m and radius R rolls without slipping on a horizontal surface such that v_(c.m.)=v_(0) .

A solid sphere rolls down without slipping from rest on a 30^@ incline. Its linear acceleration is

A uniform sphere of mass 500 g rolls without slipping on a plane surface so that its centre moves at a speed of 0.02 m//s . The total kinetic energy of rolling sphere would be (in J )