A uniform solid sphere of mass M and radius R is lying on a rough horizonal plane. A constant force `F=4Mg` acts vertically downwards at point P such that the line OP makes an angle of `60^(@)` with the horizontal as shown in the figure. The minimum value of the coefficient of friction `mu` so that sphere performs pure rolling, is

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 uniform solid sphere of mass m and radius R is suspended in vertical plane from a point on its periphery. The time period of its oscillation is

Uniform solid cylinder of mass m and radius R is placed on a rough horizontal surface. A horizontal constant force is applied at the top point P of the cylinder so that it start pure rolling .In the above question, the frictional force on the cylinder is

A block of mass m lying on a rough horizontal plane is acted upon by a horizontal force P and another force Q inclined at an angle theta to the vertical. The minimum value of coefficient of friction of friction between the block and the surface for which the block will remain in equilibrium is

A block of mass m lying on a rough horizontal plane is acted upon by a horizontal force P and another force Q inclined at an angle theta to the vertical. The minimum value of coefficient of friction of friction between the block and the surface for which the block will remain in equilibrium is

A block of mass m lying on a rough horizontal plane is acted upon by a horizontal force P and another force Q inclined at an angle theta to the vertical. The minimum value of coefficient of friction of friction between the block and the surface for which the block will remain in equilibrium is

A uniform sphere of mass 20kg and radius 10cm is placed on a rough horizontal surface . The coefficient of friction between the sphere and the surface is 0.5.If a force of magnitude 14.14 N is applied on the sphere at an angle of 45^(@) with horizontal as shown in the figure, calculate (a) frictional force (b) acceleration of the sphere (c ) angular acceleration of the sphere

A sphere of mass m and radius r is placed on a rough plank of mass M . The system is placed on a smooth horizontal surface. A constant force F is applied on the plank such that the sphere rolls purely on the plank. Find the acceleration of the sphere.

A solid sphere of mass 10 kg is placed on a rough surface having coefficient of frictio mu=0.1A constant force F=7N is applied along a line passing through the centre of the sphere as shown in the figure. The value of frictional force on the sphere is

A plank of mass m is placed on a smooth surface. Now, a uniform solid sphere of equal mass m and radius R is placed on the plank as shown in the figure. A force F is applied at topmost point of the sphere at an angle of 45^(@) to the horizontal. Surface between the plank and the sphere is extremely rough so that there is no slip between the plank and the sphere. The force of firction acting between the plank and the sphere is (F)/(ksqrt(2)) . Find the value of k .