A uniform round object of mass `M`, radius `R` and moment of inertia about its centre of mass `I_(cm)` has a light, thin string wrapped several times around its circumference. The free end of string is attaced to the celling and the object is released from rest. Find the acceleration of centre of the object and tension n the string. [ Take `(I_(cm))/(MR^(2))=k`]

A disc of mass M has a light, thin string wrapped several times around its circumference. The free end of string is attaced to the ceiling and the disc is released from rest. Find the acceleration of the disc and the tension in the string.

On the surface of a solid cylinder of mass 2 kg and radius 25 cm a string is wound several times and the end of the string is held stationary while the cylinder is released from rest. What is the acceleration of the cylinder and the tension in the string ?

A uniform disc of radius R and mass M is free to rotate only about its axis. A string is wrapped over its rim and a body of mass m is tied to the free end of the string as shown in the figure. The body is released from rest. Then the acceleration of the body is

A uniform disc of radius R and mass M is free to rotate only about its axis. A string is wrapped over its rim and a body of mass m is tied to the free end of the string as shown in the figure. The body is released from rest. Then the acceleration of the body is

A wheel of moment of inertia I and radius r is free to rotate about its centre as shown in figure. A string is wrapped over its rim and a block of mass m is attached to the free end of the string. The system is released from rest. Find the speed of the block as it descends through a height h.

A disc of mass m and radius r is free to rotate about its centre as shown in the figure. A string is wrapped over its rim and a block of mass m is attached to the free end of the string. The system is released from rest. The speed of the block as it descends through a height h, is :-

A uniform round body of radius R and mass m and its moment of inertia about centre of mass O is I_(cm) is given. A force F is applied at a height h above the centre of the round body. Find the height h at which force should be applied so that it rolls without friction.

A force F is applied at center of a uniform round object of mass m radius R and moment of inertia about its centre of mass I_(cm) . Find (if (I_(cm))/(mR^(2))=k ). (a) Acceleration of center of the round object if it rolls without slipping. (b) Minimum coefficient of fricition required so that the round object rolls without slipping.

A body of mass m , radius R and moment of inertia I (about an axis passing through the centre of mass and perpendicular to plane of motion) is released from rest over a sufficiently rough ground (to provide accelerated pure rolling) find linear acceleration of the body.

A uniform round object of mass m , radius R and moment of inertia about its centre of mas I_(cm) is thrown with speed v . (Without any rotation) on a rough horizontal surface of coefficient of fricition mu . Find (take (I_(cm))/(mR^(2))=k ) (a) Time after which slipping stops (b) Speed of the round object after slipping stops (c ) Angular speed of the round object after slipping stops