• This solid cylinder weighs 30 pounds, has a radius r=0.50 feet, and rolls without slipping....
A solid cylinder of radius R and mass m, and moment of inertia mR2/2, starts from rest and rolls down a hill without slipping. At the bottom of the hill, the speed of the center of mass is 4.7 m/sec. A hollow cylinder (moment of inertia mR2) with the same mass and same radius also rolls down the same hill starting from rest. What is the speed of the center of mass of the hollow cylinder at the bottom of...
A 13 kg solid cylinder with a 54 cm diameter rolls without slipping down a 30 degree incline from a height of 1.25 meters. If a solid cylinder has a moment of inertia, I=½(MR2), what will its speed be if it rolls from a height of 1.25 meters down a 60-degree incline? this as a Free Respons Question!
A solid uniform spherical ball of mass 2.0 kg and radius 0.50 m rolls without slipping down a ramp that makes a 15 degree angle with the horizontal. What is the center-of-mass speed (in m/s) of the ball after it rolls 0.50 m down the ramp? A) 1.8 B) 2.5 C) 4.5 D) 7.0 E) None of these
A solid cylinder has mass 1 kg and radius 5 cm. If it rolls without slipping along a level surface at linear speed 2 m/s, what is its total kinetic energy?
A solid uniform cylinder of mass 4.1 kg and radius 0.057 m rolls without slipping at a speed of 0.79 m/s. What is the cylinder’s total kinetic energy?
Problem 4. A solid sphere of mass m and radius r rolls without slipping along the track shown below. It starts from rest with the lowest point of the sphere at height h 3R above the bottom of the loop of radius R, much larger than r. Point P is on the track and it is R above the bottom of the loop. The moment of inertia of the ball about an axis through its center is I-2/S mr. The...
1) A solid ball of mass M and radius R rolls without slipping down a hill with slope tan θ. (That is θ is the angle of the hill relative to the horizontal direction.) What is the static frictional force acting on it? It is possible to solve this question in a fairly simple way using two ingredients: a) As derived in the worksheet when an object of moment of inertia I, mass M and radius R starts at rest...
A solid cylinder of radius 10 cm and mass 13 kg starts from rest and rolls without slipping a distance of 6.0 m down a house roof that is inclined at 30°. (See the figure.) What is the angular speed of the cylinder about its center as it leaves the house roof? The outside wall of the house is 5 m high. How far from the edge of the roof does the cylinder hit the level ground?
A solid 0.4750-kg ball rolls without slipping down a track toward a loop-the-loop of radius R- 0.7150 m. What minimum translational speed Vmin must the ball have wher it is a height H- 1.062 m above the bottom of the loop, in order to complete the loop without falling off the track'? Number "min0.294 m/s figure not to scale
A uniform cylinder of mass m, radius R and length h rolls without slipping at a constant angle φ relative to horizontal, and with the point of contact with the ground tracing out a circle of radius r. There is gravity g in the vertical direction. Write the torque equation, which determines the orbital frequency Ω.