The `50kg` homogeneous smooth sphere rests on the `30^(@)` incline `A` and against the smooth vertical wall `B`. Calculate the contact the forces at `A` and `B`

If a ladder is not in balance against a smooth vertical wall, then it can be made in balance by :-

At the bottom edge of a smooth wall, an inclined plane is kept at an angle of 45^@ . A uniform ladder of length l and mass M rests on the inclined plane against the wall such that it is perpendicular to the incline. a. If the plane is also smooth, which way will the ladder slide? b. What is the minimum coefficient of friction necessary so that the ladder does not slip on the incline.

The speed of a homogeneous solid sphere after rolling down an inclined plane of vertical height h from rest without slipping will be.

The speed of a homogenous solid sphere after rolling down an inclined plane of vertical height h, from rest without sliding is

The speed of a homogeneous solid sphere after rolling down an inclined plane of vertical height h from rest without slipping will be.

A rod of length I leans by its upper end against a smooth vertical wall, while its other end leans against the floor. The end that leans against the wall moves uniformly downward. Then:

A point A on a sphere of weight w rests in contact with a smooth vertical wall and is supported by a string joining a point B on the sphere to a point C on the wall. Draw free body diagrame of the spheres.

A smooth sphere of mass m is moving on a horizontal plane with a velocity (3hati +hat j) . It collides with smooth a vertical wall which is parallel to the vector hatj . If coefficient of restitution e = 1/2 then impulse that acts on the sphere is

Two blocks A and B of masses 2 kg and 8 kg respectively are kept in contact and pressed against a roguh vertical wall by applying a horizontal force F = 50 N as shown, The frictional force acting between the two blocks is

A uniform ladder which is 5m long has a mass of 25kg , leans with its upper end against a smooth vertical wall and its lower end on rough ground. The bottom of the ladder is 3m from the wall. Calculate the frictional force between the ladder and the ground . (g=10ms^(-2) )