Answer:
Step-by-step explanation:
To find the angular acceleration of the flywheel, we can use the formula:
Angular acceleration (α) = (Final angular velocity - Initial angular velocity) / Time
First, we need to convert the given values to radians per minute since angular velocity is typically measured in radians. There are 2π radians in one revolution.
Initial angular velocity = 600 rev/min * 2π rad/rev = 1200π rad/min
Final angular velocity = 400 rev/min * 2π rad/rev = 800π rad/min
Next, we calculate the change in angular velocity:
Change in angular velocity = Final angular velocity - Initial angular velocity
Change in angular velocity = 800π rad/min - 1200π rad/min = -400π rad/min
Finally, we divide the change in angular velocity by the number of revolutions to get the angular acceleration:
Angular acceleration = Change in angular velocity / Number of revolutions
Angular acceleration = (-400π rad/min) / 40 revolutions = -10π rad/min^2
Therefore, the angular acceleration of the flywheel is -10π rad/min^2.