A solid uniform cylinder of mass `m` performs small oscillations due to the action of two springs of stiffness `k` each (figure). Find the period of these oscillation in the absence of sliding.
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A solid uniform cylinder of mass M performs small oscillations in horizontal plane if slightly displaced from its mean position shown in figure. If it is given that initially springs are in natural lengths and cylinder does not slip on ground during oscillaitons due to frications between ground and cylinder. Force constant of each spring is k . Find time period of these oscillation.

The time period of small oscillations of mass m :-

A small block oscillates back and forth on as smooth concave surface of radius R in figure. Find the time period of small oscillation.

A uniform cylinder of mass m and radius R is in equilibrium on an inclined by the action of a light spring of stiffnesk, gravity and reaction force acting on it .If the angle of inclination of the plane is phi , find the angular frequency of small oscillation of the cylinder

A uniform solid sphere of mass 'm' and radius R is in equilibrium on an inclined plane by the action of the light spring of stiffness k, gravity and on it. If the angle of inclination of the plane is 60^(@) , then find the time period of oscillation for small displancement.

Spring mass system is shown in figure. find the time period of vertical oscillations. The system is in vertical plane.

A solid cylinder of mass M is attached to the spring by means of a frintionless pivot. The cylinder is placed on floor. Find the time period of small oscillation of the system, if the floor is sufficiently rought to prevent any slipping of cylinder. Assume stiffness of spring to be K.

A solid cylinder of mass m length L and radius R is suspended by means of two ropes of length l each as shown. Find the time period of small angular oscillations of the cylinder about its axis AA'

A block of mass m can slide along a frictionless inclined plane, is attached to a ideal spring of spring constant as shown in the figure. Find the period of its oscillation. (Frame of reference attached to the wedge is at rest)

A disc of mass m hanged by a string is attached at P and a spring of stiffness k is attached at Q . Find the frequency of small angular oscillation of the disc if the string does not slide over the pulley. Assume l_(0) = Ml of the dise about O .