What is the moment of inertia of an object that rolls without slipping down a 2.57...
an object rools without slipping down a 2.05m high incline. what is the moment of inertia of the object starting from rest if it has a final velocity of 5.6m/s? express the moment of inertia as a multiple of MR^2 I/(MR^2)=?
(11 %) Problem 7: An object rolls without slipping down a 2.01 m high incline. Randomized Variables d 2.01 m v 5.8 m/s What is the moment of inertia of the object starting from rest if it has a final velocity of 5.8 m/s? Express the moment of inertia as a multiple of MR2, where M is the mass of the object and R is its radius. Grade Summary Deductions Potential Late Work % 75% 0% 400%
A solid cylinder of radius R and mass m, and moment of inertia mR2/2, starts from rest and rolls down a hill without slipping. At the bottom of the hill, the speed of the center of mass is 4.7 m/sec. A hollow cylinder (moment of inertia mR2) with the same mass and same radius also rolls down the same hill starting from rest. What is the speed of the center of mass of the hollow cylinder at the bottom of...
A hollow cylinder is released from rest and rolls down the incline without slipping. The incline has an angle of thera=40 degrees with the horizontal. The mass and radius of the cylinder is M=5kg and R=0.55m respectively. Moment of inertia of a hollow cylinder is I=MR^2. a)Draw the free body diagram of the hollow cylinder showing all the forces and their components. b) Using newtons 2nd law for linear and rotational motion, derive an expression for linear acceleration of the...
Calculate the final speed of a cylindrical hoop that rolls without slipping down a 2.00 m high incline. The hoop starts from rest, has a mass of 0.750 kg, and a radius of 4.00 cm.
A solid sphere of mass 1.5 kg and radius 15 cm rolls without slipping down a 35° incline that is 7.9 m long. Assume it started from rest. The moment of inertia of a sphere is given by I = 2/5MR2. (a) Calculate the linear speed of the sphere when it reaches the bottom of the incline. (b) Determine the angular speed of the sphere at the bottom of the incline.
What is the final velocity (in m/s) of a hoop that rolls without slipping down a 4.00-m-high hill, starting from rest? m/s
What is the final velocity of a hoop that rolls without slipping down a 8.00 m high hill, starting from rest? _m/s
A solid disk (radius R=2.5 cm , mass M =0.35 kg) rolls without slipping down an 30 degree-incline. If the incline is 4.2 m long and the disk starts from rest, what is the linear velocity of its center of mass at the bottom of the incline (in m/s)?
What is the final velocity of a solid sphere that rolls without slipping down a 8.3 m high hill? Assume that it started from rest.