Answer:
[tex]L_{B}[/tex] / [tex]L_{A}[/tex] = [tex]\frac{5mvl}{mvl}[/tex]= 5
Explanation:
Find the given attachment
The definitions of angular momentum allow to find the result for the relationship between the two angular moments is:
[tex]\frac{L_B}{L_A} = 5[/tex]
The angular momentum is the vector product of momentum and vector position.
L = r x p
Where the bold letters indicate vectors, r is the position vector and p the moment. In the body that is in a rotation can be written as a function of the moment of inertia and the angular velocity.
L = I w
Linear and angular variables are related.
v = w L
We substitute
L = I v L
The moment of inertia of a disk with respect to its center is:
I = ½ m r²
Let's write the angular momentum for each disk.
Disc A
[tex]L_A[/tex] = ½ [tex]m_A r^2 v_A L_A[/tex]
Disc B
[tex]L_B[/tex] = ½ [tex]m_B r^2 v_B L_B[/tex]
They indicate that the mass of disk A is m and that of disk b is 20m, the length of the string is l for disk A and l / 4 for disk B.
We substitute
[tex]L_A[/tex] = ½ m r² v l
[tex]L_B[/tex] = ½ (20m) r² v ( [tex]\frac{l}{4}[/tex] )
The relationship between the angular moments is
[tex]\frac{L_B}{L_A} = \frac{20m \frac{l}{4} }{m l}\\ \frac{L_B}{L_A} = 5[/tex]
Consequently using the definitions of angular momentum we can find the result for the relationship between the two angular moments is:
[tex]\frac{L_B}{L_A} = 5[/tex]
Learn more here: brainly.com/question/25303285
