The wheels of a wagon can be approximated as the combination of a thin outer hoop, of radius ?h=0.527 m and mass 4.70 kg , and two thin crossed rods of mass 8.66 kg each. A farmer would like to replace his wheels with uniform disks ?d=0.0651 m thick, made out of a material with a density of 6450 kg per cubic meter. If the new wheel is to have the same moment of inertia about its center as the old wheel about its center, what should the radius of the disk be?
The wheels of a wagon can be approximated as the combination of a thin outer hoop,...
The wheels of a wagon can be approximated as the combination of a thin outer hoop, of radius ?h=0.368 m and mass 4.32 kg , and two thin crossed rods of mass 7.37 kg each. A farmer would like to replace his wheels with uniform disks ?d=0.0462 m thick, made out of a material with a density of 7370 kg per cubic meter. If the new wheel is to have the same moment of inertia about its center as the...
Everyone's favorite flying sport disk can be approximated as the combination of a thin outer hoop and a uniform disk, both of diameter Da=0.273 m. The mass of the hoop part is mh = 0.130 kg and the mass of the disk part is me=0.040 kg. Imagine making a boomerang that has the same total moment of inertia around its center as the sport disk. The boomerang is to be constructed in the shape of an "X," which can be...
One type of wagon wheel consists of a 2.0-kg hoop fitted with four 0.80-kg thin rods placed along diameters of the hoop so as to make eight evenly spaced spokes. For a hoop of radius 0.38 m , what is the rotational inertia of the wheel about an axis perpendicular to the plane of the wheel and through the center?
8. Th e moment of inertia for a wagon wheel can be calculated by taking the sum of the moment of inertia for a hoop (radius 1.2 m) rotating about a Cylinder axis (mass 3 kg) and three rods of length 1.2 m, rotating about their center perpendicular to their length, each of mass o.8 kg. If the wheel is rotating at an angular speed of 2.5 rad/s, what is the wagon wheel's kinetic energy as it spins in place?...
a wheel consists of a thin hoop (m= 0.50 kg and radius= 0.50 m) with 16 spokes (m= 0.010 kg and length 0.50 m). What is the wheels moment of inertia?
6. A rigid sculpture consists of a thin hoop of mass m and radius R and two thin rods each of mass m and length L = 2R. The sculpture can pivot around a horizontal axis in the plane of the hoop passing through its center. What is the sculpture's rotational inertia I about the rotation axis in terms of m and R. rotation axis Answer | 1 = 58mR2
A wagon wheel is constructed as shown in the figure (Figure 1). The radius of the wheel is 0.300 m, and the rim has mass 1.41 kg . Each of the eight spokes, that lie along a diameter and are 0.300 m long, has mass 0.210 kg. What is the moment of inertia of the wheel about an axis through its center and perpendicular to the plane of the wheel?
A wagon wheel is constructed as shown in the figure (Figure 1) . The radius of the wheel is 0.300 m, and the rim has mass 1.37 kg . Each of the eight spokes, that lie along a diameter and are 0.300 m long, has mass 0.250 kg . What is the moment of inertia of the wheel about an axis through its center and perpendicular to the plane of the wheel?
Two thin disks are attached as shown to the right. The angle θ = 22.5°, and the masses and radii of the disks are listed in the table below. Disk A ---- Radius 19.8 cm------Mass.701 kg Disk B ---- Radius 5.70 cm------Mass.337 kg What is the moment of inertia of this composite object about an axis perpendicular to the screen, through point p?
Two thin disks are attached as shown to the right. The angle ? = 39.1°, and the masses and radii of the disks are listed in the table below. What is the moment of inertia of this composite object about an axis perpendicular to the screen, through point p? Two thin disks are attached as shown to the right. The angle ? = 39.1°, and the masses and radii of the disks are listedin the table below Disk radius (cm)Mass...