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Show that if a solid spherical ball rolls with an arbitrary horizontal velocity without slipping on...
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
Please Use Clear Handwriting, Thanks 1. If the ball rolls without slipping on a horizontal surface, determine the velocity of points A and B at this instant. 6 rad/s α-4 rad/s2 ω 0.15 m 1. If the ball rolls without slipping on a horizontal surface, determine the velocity of points A and B at this instant. 6 rad/s α-4 rad/s2 ω 0.15 m
(A) A ball with an initial velocity of 7.7 m/s rolls up a hill without slipping. Treating the ball as a spherical shell, calculate the vertical height it reaches.
A 0.2m diameter ball with an initial velocity of 8m/s rolls up a hill without slipping. Treating the ball as a spherical shell, calculate the vertical height it reaches.
A ball with an initial velocity of 7.91 m/s rolls up a hill without slipping. (a) Treating the ball as a spherical shell, calculate the vertical height (in m) it reaches. m (b) Repeat the calculation (in m) for the same ball if it slides up the hill without rolling. m
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 uniform hollow spherical ball of mass 1.75 kg and radius 40.0 cm rolls without slipping up a ramp that rises at 30.0° above the horizontal. The speed of the ball at the base of the ramp is 2.63 m/s. How do we know that acceleration of the ball is constant considering newtons second law of motion? we are not allowed to use conservation of energy. We are only to use newtons second law for rotation
What is the final velocity of a solid sphere that rolls without slipping down a 8.3 m high hill? Assume that it started from rest.
A solid cylinder of, mass.1.800 Kg rolls without slipping along a horizontal surface with a linear velocity of 6.0 m/s. It reaches an incline that makes an angle of 40 degree with the horizontal. Ignoring the losses due to the friction, to what distance does the cylinder rise on the incline? After reaching its maximum position on the incline, what will be its velocity at the bottom of the incline on its way back ?
Bowling Ball. A bowling ball rolls without slipping up a ramp that slopes upward at an angle to the horizontal. Treat the ball as a uniform solid sphere of mass M and radius R, ignoring the finger holes. a) Draw the free-body diagram for the ball. Explain why the friction force must be directed up the ramp. b )What is the acceleration of the center of mass of the ball? c) What minimum coefficient of static friction is needed to...