A plank with a body of mass `m` placed on it starts moving straight up according to the law `y = a(1 - cos omega t)`, where `y` is the displacement from the initial position, `omega = 11 rad//s`. Find
(a) The time independence of the force that the body exerts on the plank.
(b) The minimum amplitude of oscillations of the plank at which the body starts falling behind the plank.

A point moves in the plane xy according to the law x=a sin omegat , y=a(1-cos omega t) , where a and omega are positive constants. Find: (a) the distance s traversed by the point during the time tau ,

A particle moves in xy plane accordin to the law x=a sin w t and y=a (1- cos w t ) where a and w are costant . The particle traces.

A plank with a bar placed on it performs horizontal harmonic oscillations with amplitude a=10cm . Find the coefficient of friction between the bar and the plank if the former starts sliding along the plank when the amplitude of oscillation of the plank becomes less than T=1.0 s .

A plank with a uniform sphere placed on it rests on a smooth horizontal plane. The plank is pulled to the right by a constant force F . It the sphere does not slip over the plank, then

A plank of mass M is placed on a rough horizontal surface and a contant horizontal force F is applied on it . A man of mass m runs on the plank find the range of acceleration of the man that the plank does not move on the surface is mu .Assume that the does not slip on the plank

Find the total energy of oscillations if mass of the body is 100g A=1m , omega = 2

A wooden plank of mass 20kg is resting on a smooth horizontal floor. A man of mass 60kg starts moving from one end of the plank to the other end. The length of the plank is 10m . Find the displacement of the plank over the floor when the man reaches the other end of the plank.

A particle of mass 'm' is moving in the x-y plane such that its x and y coordinate vary according to the law x = a sin omega t and y = a cos omega t where 'a' and 'omega' are positive constants and 't' is time. Find (a) equation of the path. Name the trajectory (path) (b) whether the particle moves in clockwise or anticlockwise direction magnitude of the force on the particle at any time t .

Vertical displacement of a plank with a body of mass m on it is varying according to the law y=sinomegat+sqrt(3)cosomegat . The minimum value of omega for which the mass just breaks off the plank and the moment it occurs first time after t=0, are given by (y is positive towards vertically upwards).

Figure shown a small block A of mass m kept at the left end of a plank B of mass M = 2m and length l . The system can slide on a horizontal road. The system is started towards right with the initial velocity v . The friction coefficient between the road and the plank is 1//2 and that between the plank and the block is 1//4 . Find (a) the time elapsed before the block separates from the plank (b) displacement of block and plank relative to ground till that moment.