Angular acceleration formula

The formula for angular acceleration (denoted as $\alpha$) is given by the rate of change of angular velocity $\omega$ over time $t$.

α=ΔωΔt\alpha = \frac{\Delta \omega}{\Delta t}α=ΔtΔω​

Where:

• $\alpha$ = Angular acceleration (in radians per second squared, rad/s2\text{rad/s}^2rad/s2)
• $\Delta \omega$ = Change in angular velocity (in radians per second, $\text{rad/s}$)
• $\Delta t$ = Change in time (in seconds)

If angular acceleration is constant, another useful kinematic equation is:

α=τI\alpha = \frac{\tau}{I}α=Iτ​

Where:

• $\tau$ = Torque (in Newton-meters)
• $I$ = Moment of inertia (in kg·m²)

This equation relates angular acceleration to the applied torque and the moment of inertia.