A Flywheel with a mass of 320 Kg and radius of gyration of 26 cm accelerates from rest to 750 rpm in

To calculate the torque required for this acceleration, we can use the formula:

Torque = I * α

Where:
I = moment of inertia of the flywheel
α = angular acceleration

First, we need to calculate the moment of inertia of the flywheel using the formula:

I = m * r^2

Where:
m = mass of the flywheel
r = radius of gyration

I = 320 kg * (0.26 m)^2
I = 320 kg * 0.0676 m^2
I = 21.632 kg m^2

Next, we need to calculate the angular acceleration using the formula:

ω = ω_0 + α*t

Where:
ω = final angular velocity (in rad/s) = 750 rpm * 2π/60
ω = 78.54 rad/s
ω_0 = initial angular velocity = 0 rad/s
t = time taken = 10 s

α = (ω - ω_0) / t
α = (78.54 rad/s - 0 rad/s) / 10 s
α = 7.854 rad/s^2

Now, we can calculate the torque:

Torque = 21.632 kg m^2 * 7.854 rad/s^2
Torque = 169.85 Nm

Therefore, the torque required for this acceleration is 169.85 Nm.