Angular Acceleration

Written by Jerry Ratzlaff on 24 February 2018. Posted in Classical Mechanics

acceleration angular Angular acceleration ( \(\alpha\) (Greek symbol alpha) ) (also called rotational acceleration) of an object is the rate at which the angle velocity changes with respect to time.

Angular Acceleration Formula

\(\large{ \alpha = \frac { d \omega } { d t } }\)

\(\large{ \alpha = \frac { a_t } { r } }\)

\(\large{ \alpha = \frac { \tau } { I } }\)

Where:

\(\large{ \alpha }\) (Greek symbol alpha) = angular acceleration

\(\large{ d \omega }\) (Greek symbol omega) = angular velocity differential

\(\large{ a_t }\) = lineat tangential path

\(\large{ I }\) = mass moment of inertia or angular mass

\(\large{ r }\) = radius of circular path

\(\large{ dt }\) = time differential

\(\large{ \tau }\) (Greek symbol tau) = torque

Tags: Equations for Acceleration

Angular Acceleration Formula

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