The solid cylinder is rolling without slipping on a plane having inclination `theta` and the coeffecient of static friction `mu_s`. The relation between `theta` and `mu_s` is

A solid cylinder is rolling without slipping on a plane having inclination theta and the coefficient of static friction mu_(s) . The relation between theta and mu_(s) is

A solid cylinder is rolling down a rough inclined plane of inclination theta . Then

A solid sphere is in pure rolling motion on an inclined surface having inclination theta

If a solid cylinder rolls without slipping on an inclined plane of inclination 45°, then the minimum coefficient of friction required to support pure rolling is

If a solid cylinder rolls without slipping on an inclined plane of inclination '0' then the minimum coefficient of friction required to support pure rolling is

A cylinder is rolling without slipping on an inclined plane. Show that to prevent slipping the condition is mu_(s) ge 1/3 tan theta .

A solid sphere of mass m rolls without slipping on an inclined plane of inclination theta . The linear acceleration of the sphere is

Derive an expression for the acceleration of a solid cylinder rolling without slipping down an inclined plane. Also find the minimum coefficient of friction required for pure rolling

A solid sphere of mass m rolls without slipping on an inlined plane of inclination 0. what shoul be the minimum coefficient of static feiction to support pure rolling?

A rolling object rolls without slipping down an inclined plane (angle of inclination theta ), then the minimum acceleration it can have is ?