A hollow ball has mass M=2.0kg, radius R=0.35m, and moment ofinertia about the center of mass I=(2/3)MR2. The ball isthrown without bouncing, to the right with an initial speed 2.0m/sand backspin. The hoop moves across the rough floor (coefficient ofsliding friction = 0.25) and returns to its original position witha speed of 0.5 m/s. All surfaces and the hoop may be treated asideally rigid. Develop an expression for angular velocity of thehoop as a function of time while it is rolling with slipping.Determine the backspin with which the hoop must be released as wellas the furthest distance travelled to the right.
