A solid sphere `(radius = R)` rolls without slipping in a cylindrical throuh`(radius = 5R)`. Findthe time period of small oscillations.

A solid sphere of (radius = R ) rolls without slipping in a cylindrical vessel (radius = 5R ). Find the time period of small of oscillations of the sphere in s^(-1) . Take R = (1)/(14)m and g = 10 m//s^(2) . (axis is cylinder is fixed and horizontal).

A ring of mass m and radius r rolls without slipping on a fixed hemispherical surface of radius R as shown. The time period of small oscillations of ring is 2pisqrt((n(R-r))/(3g)) then find the value of n.

A ring of mass m and radius r rolls without slipping on a fixed hemispherical surface of radius R as shown. The time period of small oscillations of ring is 2pisqrt((n(R-r))/(3g)) then find the value of n.

A semi cylindrical shell with negligible thickness oscillates without slipping on a horizontal surface. The time period of small oscillations is R

A ball of radius r is made to oscillate in a bowl of radius R. Find the time period of oscillation.

A spherical ball of mass m and radius r rolls without slipping on a rough concave surface of large radius R. It makes small oscillations about the lowest point. Find the time period.

A spherical ball of mass m and radius r rolls without slipping on a rough concave surface of large radius R. It makes small oscillations about the lowest point. Find the time period.