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4. A uniform solid sphere and hoop each with equaled masses and radii are rolling without...
A uniform solid sphere is rolling without slipping along a horizontal surface with a speed of...
A uniform solid sphere is rolling without slipping along a horizontal surface with a speed of 5.5 m/s when it starts up a ramp that makes an angle of 25.0° with the horizontal. What is the speed of the sphere after it has rolled 3.0 m up the ramp, measured along the surface of the ramp?
2.2 A uniform solid sphere Mr) is rolling without slipping along a horizontal surface with a...
2.2 A uniform solid sphere Mr) is rolling without slipping along a horizontal surface with a speed of 7.44 m/s when it starts up a ramp that makes an angle of 29.7 with the horizontal. What is the speed of the sphere after it has rolled 2.66 m up the ramp, measured along the surface of the ramp? FinalNumber Units
A uniform solid sphere with a mass of M = 360 grams and a radius R...
A uniform solid sphere with a mass of M = 360 grams and a radius R = 18.0 cm is rolling without slipping on a horizontal surface at a constant speed of 2.50 m/s. It then encounters a ramp inclined at an angle of 17.0 degrees with the horizontal, and proceeds to roll without slipping up the ramp. Use g = 10.0 m/s2. How far does the sphere travel up the ramp (measure the distance traveled along the incline) before...
A solid cylinder, solid sphere, and a thin hoop which have different masses and different radii,...
A solid cylinder, solid sphere, and a thin hoop which have different masses and different radii, roll without slipping down an incline plane. Which object reaches the bottom first? The moments of inertia are Icylinder = 1/2 MR2; Isphere = 2/5 MR2 and Ihoop = MR2. (A)The solid cylinder (B) The sphere (C) The thin hoop (D) They all reach the bottom at the same time.
Part A A uniform solid sphere is rolling without slipping along a horizontal surface with a speed of 4.10 m/s when it s...
Part A A uniform solid sphere is rolling without slipping along a horizontal surface with a speed of 4.10 m/s when it starts up a ramp that makes an angle of 25.0° with the horizontal. What is the speed of the sphere after it has rolled 3.00 m up the ramp, measured along the surface of the ramp? 0+1.37i m/s 0+1.57i m/s 0+0.783i m/s 0+0.979i m/s 0+1.17i m/s Request Answer Submit
A solid uniform sphere and a uniform spherical shell, both having the same mass (m) and...
A solid uniform sphere and a uniform spherical shell, both having the same mass (m) and radius (R), rolls without slipping along a horizontal surface at a speed v. They then encounter a hill that rises at an angle (theta) above the horizontal. (I of the sphere = 2/5mR^2) and (I of the spherical shell = 2/3mR^2) (a) How high will the sphere roll before coming to rest? (b) How high will the spherical shell roll before coming to rest?...
A solid uniform sphere rolls without slipping along a horizontal surface with translational speed v, comes...
A solid uniform sphere rolls without slipping along a horizontal surface with translational speed v, comes to a ramp, and rolls without slipping up the ramp to height h, as shown. Assuming no losses to friction, heat, or air resistance, what is h in terms of v? The moment of inertia of a rolling solid sphere is Icm=2/5MR2. Assume acceleration due to gravity is g= 9.8 m/s2. A.7v^2/10g B.v^2/2g C.v^2/7g D.3v^2/10g
A uniform solid disk, a uniform solid sphere, and a uniform hoop are placed side by...
A uniform solid disk, a uniform solid sphere, and a uniform hoop are placed side by side at the top of an incline of height h. They are released from rest and roll without slipping. Place the objects in order of fastest to slowest at the bottom the incline. (Be sure to be able to explain why, in words, without equations.) Verify your answer by deriving a formula for their speeds when they reach the bottom in terms of h....
A uniform cylinder of radius r15.0 cm and mass m 1.70 kg is rolling without slipping...
A uniform cylinder of radius r15.0 cm and mass m 1.70 kg is rolling without slipping on a horizontal tabletop. The cylinder's center of mass is observed to have a speed of 4.60 m/s at a given instant. (a) What is the translational kinetic energy of the cylinder at that instant? J (b) What is the rotational kinetic energy of the cylinder around its center of mass at that instant? J (c) What is the total kinetic energy of the...
A thin hoop of radius r = 0.82 m and mass M = 7.3 kg rolls...
A thin hoop of radius r = 0.82 m and mass M = 7.3 kg rolls without slipping across a horizontal floor with a velocity v = 1.1 m/s. It then rolls up an incline with an angle of inclination theta = 44 degrees. a) What is the maximum height h reached by the hoop before rolling back down the incline? b) Now, suppose a uniform solid sphere is used instead of a hoop. Use the same values of r,...
2.2 A uniform solid sphere Mr) is rolling without slipping along a horizontal surface with a speed of 7.44 m/s when it starts up a ramp that makes an angle of 29.7 with the horizontal. What is the speed of the sphere after it has rolled 2.66 m up the ramp, measured along the surface of the ramp? FinalNumber Units
A solid cylinder, solid sphere, and a thin hoop which have different masses and different radii, roll without slipping down an incline plane. Which object reaches the bottom first? The moments of inertia are Icylinder = 1/2 MR2; Isphere = 2/5 MR2 and Ihoop = MR2. (A)The solid cylinder (B) The sphere (C) The thin hoop (D) They all reach the bottom at the same time.
Part A A uniform solid sphere is rolling without slipping along a horizontal surface with a speed of 4.10 m/s when it starts up a ramp that makes an angle of 25.0° with the horizontal. What is the speed of the sphere after it has rolled 3.00 m up the ramp, measured along the surface of the ramp? 0+1.37i m/s 0+1.57i m/s 0+0.783i m/s 0+0.979i m/s 0+1.17i m/s Request Answer Submit
A uniform solid disk, a uniform solid sphere, and a uniform hoop are placed side by side at the top of an incline of height h. They are released from rest and roll without slipping. Place the objects in order of fastest to slowest at the bottom the incline. (Be sure to be able to explain why, in words, without equations.) Verify your answer by deriving a formula for their speeds when they reach the bottom in terms of h....
A uniform cylinder of radius r15.0 cm and mass m 1.70 kg is rolling without slipping on a horizontal tabletop. The cylinder's center of mass is observed to have a speed of 4.60 m/s at a given instant. (a) What is the translational kinetic energy of the cylinder at that instant? J (b) What is the rotational kinetic energy of the cylinder around its center of mass at that instant? J (c) What is the total kinetic energy of the...
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