Answer: 2.39 rad/sec
Explanation:
Under the assumption that no external torques are applied, total angular momentum must be conserved:
L₁ = L₂
The initial angular momentum, is given by the following expression:
L₁ = I₁ ω₁ , where I₁, is the total rotational inertia of the system, and is equal to the sum of the rotational inertia of the disk, plus the one due to the student standing just in the rim of the disk, as follows:
I₁ = Id + Is = 4.68.10² Kg m² + 50.0 (2.00) ² kg.m²= 668 Kg.m²
So, L₁ = 668 kg. m² . 1.75 rad/s = 1,169 Kg.m². rad/s
Final angular momentum, is obtained as follows:
L₂ = I₂ . ω₂.
Now, I₂, is just the same term as in I₁, with the difference, that Is now given by the following expression:
Is₂ = 50. 0 . (0.65)² kg.m² = 21.1 kg.m²
So, total I₂ is as follows:
I₂ = 468 kg. m² + 21.1 kg.m² = 489.1 Kg.m²
So, equating L₁ and L₂, and solving for ω₂, we have:
489.1 Kg. m² . ω₂ = 1,169 kg. m² rad/sec ⇒ ω₂ = 2.39 rad/sec
