Answer:
Question: What is the turntable's angular velocity, in rpm, just after this event?
A: 39.6 rpm
Step-by-step explanation:
Assuming that no external torques act on the system (turntable + blocks) during the collision, total angular momentum must be conserved.
Just before that the two blocks fell down on the turntable, the angular momentum is as follows:
L = I * ω
For a solid disk, the moment of inertia is mr²/2, so we can write I as follows:
I = (2.5*((0.2)²/4)) kg.m² = 0.0125 kg.m²
Taking ω as 70 rpm, we get the value of the initial L as follows:
L = 0.0125 kg.m² * 70 rpm = 0.875 kg.m²*rpm
After the collision, the system has a new moment of inertia, that can be expressed as follows:
If = 0.0125 kg.m² + (2*0.48 kg * ((0.2)² / 4)) = 0.0221 kg.m²
As the total angular momentum must be conserved, we can write the following equation:
L = If * ωf
Solving for ωf:
⇒ ωf = L/If = 0.875 kg.m².rpm / 0.0221 kg.m² = 39.6 rpm