help A uniform, spherical shell rolls without slipping along the floor and then up a ramp...
A uniform, solid sphere rolls without slipping along a floor, and then up a ramp inclined at 17º. It momentarily stops when it has rolled 0.85 m along the ramp. 1) Solve for an algebraic expression for the linear speed of the sphere. 2) What was the sphere's initial linear speed?
A uniform solid ball rolls smoothly along a floor, then up a ramp inclined at 20.6 o. It momentarily stops when it has rolled 0.857 m along the ramp. What was its initial speed?
A uniform solid ball rolls smoothly along a floor, then up a ramp inclined at 17.8 °. It momentarily stops when it has rolled 0.846 m along the ramp. What was its initial speed? Number Units the tolerance is +/-2%
Question 14 A uniform solid ball rolls smoothly along a floor, then up a ramp inclined at 10.5 °. It momentarily stops when it has rolled 1.33 m along the ramp. What was its initial speed? Number Units
1a. A uniform solid ball rolls smoothly along a floor, then up a ramp inclined at 24.1 o. It momentarily stops when it has rolled 2.40 m along the ramp. What was its initial speed? 1b. Vector a lies in the yz plane 53.0° from the positive direction of the y-axis, has a positive z component, and has a magnitude 3.10 m. Vector b lies in the xz plane 41.0° from the positive direction of the x-axis, has a positive...
1a. 1b. 1c. A uniform solid ball rolls smoothly along a floor, then up a ramp inclined at 24.1. It momentarily stops when it has rolled 2.40 m along the ramp. What was its initial speed? NumberT4.38 Unitsm's A certain gyroscope consists of a uniform disk with a 33.0 cm radius mounted at the center of an axle that is 11.0 cm long and of negligible mass. The axle is horizontal and supported at one end. If the disk is...
A uniform hollow spherical shell of mass M and radius R rolls without slipping down an inclined plane. The plane has a length of L and is at an angle (theta). What is its speed at the bottom?
A cylinder of radius 3.09cm and a spherical shell of radius 7.22cm are rolling without slipping along the same floor. The two objects have the same mass. If they are to have the same total KE, what should the ratio of the cylinders angular speed to the spherical shell's speed be?
A solid uniform sphere rolls without slipping along a horizontal surface with translational speed v, comes to a ramp, and rolls without slipping up the ramp to height h, as shown. Assuming no losses to friction, heat, or air resistance, what is h in terms of v? The moment of inertia of a rolling solid sphere is Icm=2/5MR2. Assume acceleration due to gravity is g= 9.8 m/s2. A.7v^2/10g B.v^2/2g C.v^2/7g D.3v^2/10g
A solid sphere of uniform density starts from rest and rolls without slipping a distance of d = 2 m down a θ = 20° incline. The sphere has a mass M = 5.8 kg and a radius R = 0.28 m. 1. Of the total kinetic energy of the sphere, what fraction is translational? KE tran/KEtotal 2)What is the translational kinetic energy of the sphere when it reaches the bottom of the incline? KE tran = 3. What is the...