A billiard ball (of radius R), initially at rest is given a harp impulse by a cue. The cue is held horizontally a distance h above the central line. The ball leaves the cue with a speed V0, eventually acquires a final speed of 97V0. Find h.
4R13
Let v0 be the linear velocity and w0 be the angular velocity imparted.
⇒ linear impulse = intFdt=mv0
Angular impulse=∫Fhdt=Iω0⇒h=25mR2ω0mv0⇒v0=2R2ω05h .....(1)
As linear velocity increases to 97v0, friction must be in forward direction & hence opposes angular motion.
For linear motion: friction (μ mg R) increases velocity. (a=μ g) (t = time taken to start rolling)
For rotation: frictional torque (μ mg R) opposes rotation & hence decreases
ω.α=−μmgRI⇒ω=ω0−μmgR(25mR2)t
After time t V=97v0=Rω
combining all the equation 97v0−v0=−(9v07R−ω0)2R5 (eliminating μgt)
substituting for v0 from I.27(25R2ω0h)=(ω0−972Rω05h)2R5⇒h=4R5