A solid cylinder of mass M and of radius R is fixed on a frictionless axle over a well. A rope negligible mass is wrapped around the cylinder. A bucket of uniform mass m is suspended from it. The linear acceleration bucket will:

A uniform solid cylinder of mass M and of radius R rotates about a frictionless axle. Two masses are suspended from a rope wrapped arround the cylinder. If the system is released from rest, the tension in each rope is?

A uniform disc of mass M and radius R is mounted on an axle supported in frictionless bearings. A light cord is wrapped around the rim of the disc and a steady downward pull T is exerted on the cord. The angular acceleration of the disc is

A solid cylinder of mass m and radius r is rolling on a rough inclined plane of inclination theta . The coefficient of friction between the cylinder and incline is mu . Then.

A cylinder of mass m and radius R rolls down an inclined plane of inclination theta . Calculate the linear acceleration of the axis of cylinder.

A cylinder of mass m and radius R rolls down an inclined plane of inclination theta . Calculate the linear acceleration of the axis of cylinder.

A uniform solid cylinder of mass m and radius R is placed on a rough horizontal surface. A horizontal constant force F is applied at the top point P of the cylinder so that it start pure rolling. The acceleration of the cylinder is

A solid cylinder of mass M and radius R rolls down an inclined plane of height h. The angular velocity of the cylinder when it reaches the bottom of the plane will be :

A solid cylinder of mass M and radius R has a light thin tape wound around it as shown in the figure. The tape passes over a light, smooth fixed pulley to a block of mass m. Find the linear acceleration of the cylinder's axis up the incline (in) assuming no slipping. Given mass of the block = 1.5Kg, mass of the cylinder = 2 kg, the angle inclination = 30° and take g= 10 ms^(-2)