Answer:
I = 4.4 kg*m^2
Explanation:
- As no external torques are present, total angular momentum must be conserved, as follows:
[tex]L_{o} = L_{f} (1)[/tex]
- The initial angular momentum of the two disks rotating separately, can be written as follows:
[tex]L_{o} =I_{A} * \omega_{oA} + I_{B} * \omega_{oB} (2)[/tex]
- Replacing by the givens, we get:
[tex]L_{o} = 3.4kg*m2 * 7.2rad/s + I_{B} * (-9.8 rad/s) (3)[/tex]
- The final angular momentum Lf, as the axis of rotation remains the same, is the product of the moment of inertia of both disks rotating as one, and the common angular velocity ωf, as follows:
[tex]L_{f} = (I_{A} + I_{B}) *\omega_{f} (4)[/tex]
- Replacing by the givens, we get:
[tex]L_{f} = (3.4 kg*m2 + I_{B} ) * (-2.4 rad/s) (5)[/tex]
- From (3) and (5), we can solve for IB, as follows:
- IB = 4.4 kg*m2
