A solid cylinder of mass `m` is attached to a horizontal spring with force constant `k`. The cylinder can roll without slipping along the horizontal plane. (See the accompanying figure.) Show that the center of mass of the cylinder executes simple harmonic motion with a period `T = 2pisqrt((3m)/(2k))`, if displaced from mean position.

A solid sphere of mass m is attached to a light spring of force constant k so that it can roll without slipping along a horizontal surface. Calculate the period of oscillation made by sphere.

A small solid cylinder of mass M attached to horizontal massless spring can roll without slipping along a horizontal surface. Show that if the cylinder is displaced slightly and released, it executes S.H.M. Also find its time period.

A solid cylinder of mass M and radius R rolls without slipping down an inclined plane of length L and height h . What is the speed of its center of mass when the cylinder reaches its bottom

A solid uniform cylinder of mass M attached to a massless spring of force constant k is placed on a horizontal surface in such a way that cylinder can roll without slipping. If system is released from the stretched position of the spring, then the period will be-

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 without slipping on a flat horizontal surface. Its moment of inertia about the line of contact is

A uniform solid cylinder having mass M and radius R is pulled by a horiozntal force F acting through the center as shown. The cylinder rolls to the right without slipping. What is the magnitude of the force of friction between the cylinder and the ground?

A particle of mass 3 kg , attached to a spring with force constant 48Nm^(-1) execute simple harmonic motion on a frictionless horizontal surface. The time period of oscillation of the particle, is seconds , is

Consider the situation in which one end of a massless spring of spring constant k is connected to a cylinder of mass m and the other to a rigid support. When cylinder is given a gentle push in horizontal direction it starts oscillating on the rough horizontal surface. During the oscillation cylinder rolls without slipping. When calculated, motion of cylinder is found to be S.H.M. with time period T=2pisqrt((3m)/(2K)) and equation of SHM is x=Asinomegat , where symbols have their usual meaning. : Q The minimum value of coefficient of friction such that the cylinder does not slip on the surface is:

Consider the situation in which one end of a massless spring of spring constant k is connected to a cylinder of mass m and the other to a rigid support. When cylinder is given a gentle push in horizontal direction it starts oscillating on the rough horizontal surface. During the oscillation cylinder rolls without slipping. When calculated, motion of cylinder is found to be S.H.M. with time period T=2pisqrt((3m)/(2K)) and equation of SHM is x=Asinomegat , where symbols have their usual meaning. At a distance x_(1) from the equilibrium position, kinetic energy of the oscillating system becomes equal to potential energy then, x_(1) is equal to: