A solid sphere is allowed to roll without slipping down a 5.0 meter long board that...
A solid sphere is allowed to roll without slipping down a 5.0 meter long board that is tilted 20° with respect to the horizontal such that the board forms a ramp. If the sphere started at rest at the top of the ramp, what is the linear velocity of its center of mass when it reaches the bottom of the ramp?
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A solid sphere is allowed to roll without slipping down a 5.0
meter long board that...
A solid sphere of mass 1.5 kg and radius 15 cm rolls without slipping down...
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A uniform, solid sphere of radius 4.00 cm and mass 2.25 kg starts with a purely...
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A uniform, solid sphere of radius 4.00 cm and mass 4.50 kg starts with a purely...
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A uniform, solid sphere of radius 3.75 cm and mass 1.25 kg starts with a purely...
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Three objects roll without slipping from rest down an inclined plane. A solid sphere with 1,- 2/5 MR. a hallow cylinder Solid Cylinder I = MR', And a solid cylinder with I, - 1/2MR'. . Which of the objects will reach the bottom of the inclined plane first? Use conservation of energy for translation and rotational motion. RAMP (f) Solid cylinder (h) Solid sphere MRP (9) Thin-walled hollow cylinder R R OB JE(1 3 OBJECT 2 OBJECTI a) OBJECT S...
A uniform, solid sphere of radius 3.75 cm and mass 1.25 kg starts with a purely translational speed of 1.50 m/s at the top of an inclined plane. The surface of the incline is 1.75 m long, and is tilted at an angle of 35.0° with respect to the horizontal. Assuming the sphere rolls without slipping down the incline, calculate the sphere's final translational speed v2 at the bottom of the ramp. v2 = m/s
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