Question

A uniform, spherical shell rolls without slipping along the floor and then up a ramp which is inclined at an angle of p. The shell momentarily stops when it has rolled a distance of d up along the ramp. (a) Find an equation for the initial translational speed of the shell. Your answer may include φ, d, and constants, but nothing else. (b) If the incline of the ramp is φ = 25° and the distance the shell rolls up the ramp before it stops is d-18 cm, what was the shell's initial translational speed?

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Answer 1

From conservation of energy 1/2 mv_0^2 + 1/2 Im_0^2 = mgh 1/2mv^2 + 1/2(2/3 mR^2(r^2/R^2)) = mgh 1/2mV^2 + 1/3mv^2 = mgh 5/6v^2 = g(d sin phi) V = squareroot (6/5 gd sin phi) V = squareroot 6/5 times 9.8 times 0.18 sin 25 degrees V = 0.95 m/s