Answer:
See explanation
Step-by-step explanation:
a. same. Zero applied torque.
- When he jumps radially the moment of inertia of the system (child + merry-go-round) remains the same. Since, Torque T = I*α , then the angular acceleration is zero. Hence, angular speed remains same.
b. increases. Since he applies torque along the direction of motion.
- A torque is applied by the feet of the child on to the merry-go-round in the direction of motion. The moment of inertia of the system (child + merry-go-round) remains the same. Since, Torque T = I*α , then the angular acceleration increases as Torque applied is in the same direction. Hence, angular speed also increases.
c. increases. Since the moment of inertia decreases.
- The moment of inertia of the system (child + merry-go-round) as child is no longer part of the system. The angular speed (squared) is inversely proportional to moment of inertia. Hence, as inertia decreases the angular speed increases.
d. decreases. Since he applies torque opposite to direction of motion.
- A torque is applied by the feet of the child on to the merry-go-round against the direction of motion. The moment of inertia of the system (child + merry-go-round) remains the same. Since, Torque T = I*α , then the angular acceleration decreases as Torque applied is in the opposite direction. Hence, angular speed also decreases. (Braking Torque)