A hollow cylinder of radius b is placed near the top of a cylindrical cliff that...

A hollow sphere (mass M, radius R) starts from rest at the top of a hill...

A hollow sphere (mass M, radius R) starts from rest at the top of a hill of height H. It rolls down the hill without slipping. Find an expression for the speed of the ball's center of mass once it reaches the bottom of the hill.

A hollow cylinder, a solid cylinder, and a billiard ball are all released at the top...

A hollow cylinder, a solid cylinder, and a billiard ball are all released at the top of a ramp and roll to the bottom without slipping. PART A Rank them according to the fraction of the kinetic energy that is rotational as they roll. billiard ball/ solid cylinder/ hollow cylinder PART B What are the ratios of speeds of a hollow and a solid cylinders when they reach the bottom of the ramp? PART C What are the ratios of...

A long, hollow, cylindrical conductor (inner radius 8.0 mm, outer radius 16.0 mm) carries a current...

A long, hollow, cylindrical conductor (inner radius 8.0 mm, outer radius 16.0 mm) carries a current of 16 A distributed uniformly across its cross section. A long thin wire that is coaxial with the cylinder carries a current of 16 A in the opposite direction. What is the magnitude of the magnetic field at the following distances from the central axis of the wire and cylinder? (a) 4.0 mm. _______T (b) 12.0 mm. _______ T (c) 20.0 mm. _______ T

3) A Solid Ball, of mass M and radius R rolls from rest down a table-top...

3) A Solid Ball, of mass M and radius R rolls from rest down a table-top ramp of height H and then rolls (horizontally) across a table until it gets to the edge and rolls off the edge and drops a distance h to the floor. (a) At what horizontal distance D (from the table edge) does the ball hit the floor? (b) Rank the following objects from least D to greatest D : Solid Ball, Hollow Sphere, Solid Cylinder,...

A hollow cylinder, a solid cylinder, and a billiard ball are all released at the top...

A hollow cylinder, a solid cylinder, and a billiard ball are all released at the top of a ramp and roll to the bottom without slipping Part A Rank them according to the fraction of the kinetic energy that is rotational as they roll. Rank from greatest to least. To rank items as equivalent, overlap them. Part B What are the ratios of speeds of a hollow and a solid cylinders when they reach the bottom of the ramp? Express...

A hollow ball of mass 2.88 kg and radius 0.309 m sits at rest on top...

A hollow ball of mass 2.88 kg and radius 0.309 m sits at rest on top of a hill of height 6.88 m. The ball can either slide down the hill without rolling or roll down without slipping. What is the difference in the ball's speed (in m/s) at the bottom of the hill between these two scenarios?

A hollow sphere of radius 16cm and mass 10kg stars from rest and rolls without slipping...

A hollow sphere of radius 16cm and mass 10kg stars from rest and rolls without slipping a distance d=6.5m down a roof that is inclined at an angle of 36°. a. What is the angular speed of the hollow sphere about its center as it leaves the roof? b. The roof’s edge is at a height of 4.5m. How far horizontally from the roof’s edge does the hollow sphere hit the level ground?

A cylinder of mass, M, radius, and moment of inertia I = 1/2Mρ2 rolls without slipping...

A cylinder of mass, M, radius, and moment of inertia I = 1/2Mρ2 rolls without slipping at the bottom of a pipe of inside radius R. a) What is the equation of constraint? b) Find Lagrange’s equation of motion. c) Find the frequency of small oscillations (use the approximation: sin(θ) ≈ θ).

A tennis ball is a hollow sphere with a thin wall. It is set rolling without...

A tennis ball is a hollow sphere with a thin wall. It is set rolling without slipping at 4.10 m/s on a horizontal section of a track as shown in the figure below. It rolls around the inside of a vertical circular loop of radius r = 48.1 cm. As the ball nears the bottom of the loop, the shape of the track deviates from a perfect circle so that the ball leaves the track at a point h =...

A hollow cylinder (hoop) of mass M and radius R starts rolling without slipping (with negligible...

A hollow cylinder (hoop) of mass M and radius R starts rolling without slipping (with negligible initial speed) from the top of an inclined plane with angle theta. The cylinder is initially at a height h from the bottom of the inclined plane. The coefficient of friction is u. The moment of inertia of the hoop for the rolling motion described is I= mR^2. a) What is the magnitude of the net force and net torque acting on the hoop?...