A solid disc of mass 2. kg and radius 0. 20 m rolls with velocity 3 m/s. What is the maximum height it can reach if it moves up on an inclined plane ? (Note: I = 0.5 MR 2 for a solid disc, and g = 9.80 m/s 2 .)
Two tensions are applied from opposite sides of a pulley as T1 = 20 N and T2=35 N. Pulley is a solid disc of radius 0.5 m and with mass m=4kg. Calculate moment of inertia of the pulley. Calculate its angular acceleration
A solid disc of mass 2. kg and radius 0. 20 m rolls with velocity 3...
Two tensions are applied from opposite sides of a pulley as T1 = 20 N and T2=35 N. Pulley is a solid disc of radius 0.5 m and with mass m=4kg. Calculate moment of inertia of the pulley. Calculate its angular acceleration.
Quention 4 A uniform disc of mass M 20 kg and radius R 0.45 m rolls without slipping down an inclined plane of length_45 m and slope of 30" The disk starts from rest at the top of the incline. Find the angular velocity at the bottom of the incline Not yet answered Marked out of 8.00 Flag question Select one 31.1 rad's 35.2 rad's 33.6 rad/s 38.1 rad/s AENG 2.20 PM 0
A uniform solid disk has a radius 1.60 m and a mass of 2.30 kg rolls without slipping to the bottom of an inclined plane. If the angular velocity is 4.09 rad/s at the bottom, what is the height of the inclined plane?
A solid disc of uniform mass density has mass of 2 kg and a radius of 10 cm. The disc is placed horizontally on a frictionless table. A vertical axle passes through the center of the disc. Starting from rest, what is the angular velocity of the disc after a tangential force of 2 N is applied at the rim of the disc over a 5 second period? 31.42 rad/s 10 rad/s 3.142 rad/s 100 rad/s
2) A solid sphere of mass 1.0 kg and radius 0.010 m rolls with a speed of 10 m/s. How high up an inclined plane can it climb before coming to rest?
A solid, uniform sphere of mass 2.0 kg and radius 1.7 m rolls without slipping down an inclined plane of height 2.9 m. What is the angular velocity of the sphere at the bottom of the inclined plane?
20.) A circular disc of mass M =500 gm and radius R = 20 cm is rotating about an axis perpendicular to it and passing through its centre. The initial angular speed of rotation of the disc is 30 rad/s. A bug of mass m = 25 gm which was originally on the disc at the rotating axis crawls outward and stops when it is 5 cm from the rim of the disc Calculate the new speed of rotation of...
thank you Problem 5 A solid sphere of mass M-2.00 ks (uniformly distributed) and radius R -0.100 m starts from rest at the top of an inclined plane of length L - 1.50 m and height H-0.500 m. The coefficient of static friction between the sphere and the inclined plane is H, -0.400. The sphere rolls without slipping down the inclined plane. The moment of inertia of the sphere about an axis through its center of mass is given by...
20. A disc of mass m and radius r rolls down an inclined plane without slipping from rest at a height h. The speed of its centre of mass, when it reaches the bottom, is : 21. A particle is located on the x axis at x = 2.0 m from the origin. A force of 25 N, directed 30° above the x axis in the x-y plane, acts on the particle. What is the torque about the origin on...
As shown in the figure below, two blocks are connected by a string of negligible mass passing over a pulley of radius 0.270 m and moment of inertia I. The block on the frictionless incline is moving with a constant acceleration of magnitude a = 1.20 m/s2. (Let m1 = 15.5 kg, m2 = 22.0 kg, and θ = 37.0°.) From this information, we wish to find the moment of inertia of the pulley. (a) What analysis model is appropriate...