# Acceleration

Acceleration, abbreviated as a, is the rate of change of velocity with time. Like velocity, this is a vector quantity that has a direction as well as a magnitude. Whenever a mass experiences a force, an acceleration is acting. An increase in velocity is commonly called acceleration while a decrease in velocity is deceleration.

Acceleration is a vector quantity having magnitude and direction, some of these include displacement, drag, force, lift, momentum, thrust, torque, velocity and weight.

### Acceleration Types

**Angular Acceleration**- An object is the rate at which the angle velocity changes with respect to time.**Centripetal Acceleration**- The change in the velocity, which is a vector, either in speed or direction as an object makes its way around a circular path.**Constant Acceleration**- An object is the constant rate in a straight line at which the velocity changes with respect to time.**Gravitational Acceleration**- The force on an object caused only by gravity.**Instantaneous Acceleration**- The acceleration at a particular moment in time along its path.**Linear Acceleration**- The change in linear velocity of an object in a straight line.**Tangential Acceleration**- How much the tangential velocity of a point at a radius changes with time.**Uniform Acceleration**- When an object is traveling in a straight line with a uniform increase in velocity at equal intervals of time.**Non-uniform Acceleration**- When an object is traveling with a uniform increase in velocity but not at equal intervals of time.

## Acceleration formulas |
||

\(\large{ a = \frac{ \Delta v }{ t } }\) \(\large{ a = \frac{ v_f \;-\; v_i }{ t } }\) |
||

Symbol |
English |
Metric |

\(\large{ a }\) = acceleration | \(\large{\frac{ft}{sec^2}}\) | \(\large{\frac{m}{s^2}}\) |

\(\large{ \Delta v }\) = average velocity |
\(\large{\frac{ft}{sec}}\) | \(\large{\frac{m}{s}}\) |

\(\large{ t }\) = time | \(\large{sec}\) | \(\large{s}\) |

\(\large{ v_f }\) = final velocity | \(\large{\frac{ft}{sec}}\) | \(\large{\frac{m}{s}}\) |

\(\large{ v_i }\) = initial velocity | \(\large{\frac{ft}{sec}}\) | \(\large{\frac{m}{s}}\) |

Tags: Acceleration