A wheel of radius 2 m rolls on the ground with uniform velocity `4 m s^(-1)`. . The relative acceleration of the topmost point of the wheel with respect to the bottom - most point of the wheel is

A wheel of radius R rolls on the ground with a uniform velocity v. The relative acceleration of topmost point of the wheel with respect to the bottommost point is:

A wheel of radius R=1 m rolls on ground with uniform velocity v=2 m/s . Calculate the relative acceleration of topmost point of wheel with respect to bottom most point (in m//s^(2) ).

A wheel of radius R rolls on the ground with a uniform velocity v. The velocity of topmost point relative to the bottommost point is

A wheel of radius 1 m rolls forward half a revolution on a horizontal ground. The magnitude of the displacement of the point of the wheel initially on contact with the ground is.

A point on the rim of a wheel 3 m in diameter has linear velocity of 18 ms^(-1) . The angular velocity of the wheel is

A wheel of mass 5 kg and radius 0.40 m is rolling on a road without sliding with angular velocity 10 rad s^-1 . The moment of ineria of the wheel about the axis of rotation is 0.65 kg m^2 . The percentage of kinetic energy of rotate in the total kinetic energy of the wheel is.

A constant horizontal force of 10 N is applied at the centre of a wheel of mass 10 kg and radius 0.30 m . The wheel rolls without slipping on the horizontal surface, and the acceleration of the centre of mass is 0.60 m//s^(2) . a. What are the magnitude and direction of the frictional force on the wheel? b. What is the rotational inertia of the wheel about an axis through its centre of mass and perpendicular to the plane of the wheel?

A wheel of radius R=0.1m is rolling without slipping on a horizontal surface as shown in the firgure. Centre of the wheel moves with a constant speed sqrt3m//s . The speed of the point P with respect to ground is

A point in the rim of a wheel 4 m in diameter has linear velocity of 16 ms ^(-1) The angular velocity of wheel is

A wheel of radius R , mass m and moment of inertia I is pulled along a horizontal surface by application of force F to as rope unwinding from the axel of radius, r as shown in figure. Friction is sufficient for pure rolling of the wheel. a. What is the linear acceleration of the wheel? b. Calculate the frictional force that acts on the wheel.