Respuesta :
Answer:
a) The angular momentum remains constant because the system is isolated
b) if the beetle walks
- In the direction of rotation of the disc, the angular velocity of the disc decreases.
- If the beetle goes in the opposite direction] to the disk the angular velocity increases
Explanation:
The angular momentum is
L = I w
For an isolated system the angular momentum must be preserved.
Let us define the system as formed by the beetle plus the disk, in this case when the beetle walks, the forces are an internal force (action and reaction), therefore the angular momentum is conserved. Let's write in two moments
Initial. Before the beetle movement
L₀ = I w₀
Final. When the beetle is moving
[tex]L_{f}[/tex] = I w + I₂ w₂
The moment is preserved
L₀ = [tex]L_{f}[/tex]
I w₀ = I w + I₂ w₂
We cleared the final angular speed of the disk
w = w₀ - w₂ I₂ / I
In general, the moment of inertia of the beetle is less than the moment of inertia of the disc and its angular velocity is also small.
Let's examine the questions.
a) The angular momentum remains constant because the system is isolated
b) The angular velocity of the system changes according to the previous equation, if the beetle walks
- In the direction of rotation of the disc, the angular velocity of the disc decreases.
- If the beetle goes in the opposite direction] to the disk the angular velocity increases
