Final answer:
To find the frictional torque on the flywheel, we can use the formula T = I * α. First, calculate the angular acceleration using the formula α = (final angular velocity - initial angular velocity) / time. Then, substitute the values into the torque formula T = I * α to find the frictional torque. Using the given values, the frictional torque on the flywheel is 0 N·m.
Step-by-step explanation:
To find the frictional torque on the flywheel, we can use the formula:
T = I * α
where T is the torque, I is the moment of inertia, and α is the angular acceleration.
First, let's find the angular acceleration using the formula:
α = (final angular velocity - initial angular velocity) / time
Since the flywheel is brought to rest, the final angular velocity is 0. The initial angular velocity can be calculated by converting the given angular velocity from rev/min to rad/s:
ω = 2π * (angular velocity in rev/min) / 60
Once we have the angular acceleration, we can use the formula to find the frictional torque:
T = I * α
Substituting the values gives us:
T = (100.0 kg-m²) * α
So, the frictional torque on the flywheel is (100.0 kg-m²) * α.
To find the angular acceleration, we use the formula:
T = I * α
rearranging the formula to solve for α gives us:
α = T / I
Substituting the given values gives us:
α = (100.0 kg-m²) * (0 rad/s) / (2.0 min * 60 s/min)
Calculating the result gives us:
α = 0 rad/s²
Now we can substitute the value of α into the torque formula to find the frictional torque:
T = (100.0 kg-m²) * (0 rad/s²)
Calculating the result gives us:
T = 0 N·m
Therefore, the frictional torque on the flywheel is 0 N·m.