Answer: 0.48 m/s
Step-by-step explanation:
Given
Mass of the cylinder, m = 0.1 kg
Coefficient of static friction, μ = 0.12
Radius of the turntable, r = 0.2 m
It is known that centrifugal forces always acts on the cylinders and tends to move away the rotating platform from the rotational axis. The centripetal force provide by the frictional force is given by
mv²/r = μmg
Making v the subject of formula, we get
v² = μrg
v = √μrg
If we substitute the values, we have
v = √(0.12 * 0.2 * 9.8)
v = √0.2352
v = 0.4849 m/s
Therefore, the maximum speed the cylinder can move without slipping is 0.48 m/s