Find the moment of inertia of a solid sphere (mass M, radius R) around a diameter. Do this by slicing the sphere into disks.
Find the moment of inertia of a solid sphere (mass M, radius R) around a diameter....
Find the moment of inertia of a solid sphere (mass M, radius R) around a diameter. Do this by slicing the sphere into disks.
Use equation I=∫r2dm to calculate the moment of inertia of a uniform, hollow sphere with mass M and radius R for an axis passing through one of its diameters. Express your answer in terms of the variables M and R. Use equation I=∫r2dm to calculate the moment of inertia of a uniform, solid cone with mass M, radius R and height H for its axis of symmetry. Express your answer in terms of the variables M and R.
Problem 6. Find the moment of inertia of a solid torus of mass M, inner radius r, and outer radius R about
1. A solid sphere with mass M- 10 kgand radius R 20 cmexperiences a tangential force F-200 N at its surface. Find the angular acceleration of the sphere. (Hint the moment of inertia of a solid sphere about its center of massisMR?) 1. A solid sphere with mass M- 10 kgand radius R 20 cmexperiences a tangential force F-200 N at its surface. Find the angular acceleration of the sphere. (Hint the moment of inertia of a solid sphere about...
4, A uniform solid sphere of mass M 10.0 kg and radius R 0.50 m rotates about a vertical axis on frictionless bearings. A massless cord passes around the equator of the sphere, over a pulley of rotational inertia 1-1.60 kg. m2, and radius r = 0.40 m, and is attached to a block of mass m 8.00 kg which is released from rest. The cord does not slip on the sphere or pulley, and the pulley bearings are frictionless....
1. A solid sphere of radius R, mass M. and mo- ment of Inertia I = MR is rolling down a hill. It starts at rest at a height h. Find its speed at the bottom of the hill. Compare this to the speed an object of mass M would have after sliding down a frictionless hill also of height h.
The sphere of mass M and radius R is rigidly attached to a thin rod of radius r that passes through the sphere at distance ½R from the center. A string wrapped around the rod pulls with tension T. (Figure 1) Part A Find an expression for the sphere's angular acceleration. The rod's moment of Inertia is negligible
A solid sphere of mass M and radius R starts from rest at the top of an inclined ramp, and rolls to the bottom. The upper end of the ramp is h meters higher than the lower end. (Note: The moment of inertia for a solid sphere rotating about an axis through its center is (2/5)MR2) Draw an energy bar chart & corresponding equation for this situation Symbolically, what is the linear speed of the sphere at the bottom of the ramp...
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 Moment of inertia of a solid uniform sphere around its axis of symmetry a) What is the volume element dV of a sphere? b) Assume a constant density p MIV, calculate the moment of inertia, remember that r is measured from the rotation axis for each volume element Use the volume of a sphere to get a solution that only depends on the mass M and radius R of the sphere. c) 2) Spinning DVD On a DVD, data...