## What is Acceleration?

Acceleration is defined as

The rate of change of velocity with respect to time.

Acceleration is a vector quantity as it has both magnitude and direction. It is also the second derivative of position with respect to time or it is the first derivative of velocity with respect to time.

### What is Instantaneous Acceleration?

Instantaneous acceleration is defined as

The ratio of change in velocity during a given time interval such that the time interval goes to zero.

## What is Acceleration Formula?

Acceleration formula is given as:

\(acceleration = \frac{(final\;velocity)-(initial\;velocity)}{time}\) \(acceleration = \frac{change\;in\;velocity}{time}\) \(a= \frac{v_{f}-v_{i}}{t}\)\(a= \frac{\Delta v}{t}\) |

Where,

- a is the acceleration in m.s
^{-2} - v
_{f }is the final velocity in m.s^{-1} - v
_{i}is the initial velocity in m.s^{-1} - t is the time interval in s
- Δv is the small change in the velocity in m.s
^{-1}

## What is the Unit of Acceleration?

The SI unit of acceleration is given as:

SI unit | m/s^{2} |

## Types of Acceleration

### Uniform and Non-uniform acceleration

So can we have a situation when speed remains constant but the body is accelerated? Actually, it is possible in circular where speed remains constant but since the direction is changing hence the velocity changes, and the body is said to be accelerated.

### Average acceleration

The average acceleration over a period of time is defined as the total change in velocity in the given interval divided by the total time taken for the change. For a given interval of time, it is denoted as *ā*.

Mathematically,

Where *v _{2}* and

*v*are the instantaneous velocities at time

_{1}*t*and

_{2}*t*and

_{1}*ā*is the average acceleration.

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## Velocity-Time Graph

**Average acceleration:** In the velocity-time graph shown above, the slope of the line between the time interval *t _{1}* and

*t*gives the average value for the rate of change of velocity for the object during the time

_{2}*t*and

_{1}*t*.

_{2}**Instantaneous acceleration: **In a velocity-time curve, the instantaneous acceleration is given by the slope of the tangent on the v-t curve at any instant.

### Positive, negative and zero acceleration

Consider the velocity-time graph shown above. Here, between the time intervals of 0-2 seconds, the velocity of the particle is increasing with respect to time; hence the body is experiencing a positive acceleration as the slope of the v-t curve in this time interval is positive.

Between the time intervals of 2-3 seconds, the velocity of the object is constant with respect to time; hence the body is experiencing zero acceleration as the slope of the v-t curve in this time interval is 0.

Now, between the time intervals of 3-5 seconds, the velocity of the body is decreasing with respect to time; hence the body experiences a negative value of the rate of change of velocity as the slope of the v-t curve in this time interval is negative.

## Acceleration Example

Following are few solved examples of acceleration:

**Q1. What will be the acceleration of an object which moves with uniform velocity?**

**Ans:** Given,

The velocity is uniform, therefore the initial and final velocities are equal and is given as V.

∴From definition, acceleration is given as:

\(a= \frac{v_{f}-v_{i}}{t}\)
\(a=\frac{0}{t}\)
∴ a = 0

**Q2. A truck is moving with a constant velocity, v = 5 m.s ^{-1}. The driver stops for diesel and the truck accelerates forward. After 20 seconds, the driver stops accelerating to maintain a constant velocity, v = 25 m.s^{-1}. What is the truck’s acceleration?**

**Ans:**Given,

Initial velocity, v

_{i}= 5 m.s

^{-1}

Final velocity, v

_{f}= 25 m.s

^{-1}

Time interval, t = 20 s

∴ From definition, acceleration is given as:

\(a= \frac{v_{f}-v_{i}}{t}\) \(a=\frac{25-5}{20}\) ∴ a=1 m.s

^{-2}

**Q3. Find the final velocity of the ball that is dropped from the second floor if the ball takes 18 seconds before hitting the ground. The acceleration due to gravity is g = 9.80 m.s ^{-2}.**

**Ans:**Given,

Initial velocity, v

_{i}= 0 m.s

^{-1}

Final velocity, v

_{f}= ?

Acceleration due to gravity = a = g = 9.80 m.s

^{-2}

Time interval, t = 18 s

∴ From the definition, acceleration is given as:

\(a= \frac{v_{f}-v_{i}}{t}\) Rearranging the formula,

v

_{f}=v

_{i}+ at

v

_{f}= 0+(9.80×18)

v_{f}=176.4 m.s^{-1}

### What is the difference between Acceleration and Velocity

Following is the table of acceleration vs velocity:

Parameter |
Acceleration |
Velocity |

Definition | Acceleration is defined as the change in the velocity of an object with respect to time | Velocity is defined as the speed of an object in a particular direction |

Formula | Velocity/Time | Displacement/Time |

Unit | m.s^{-2} |
m.s^{-1} |

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