from dvapphysics.wikispaces, the free AP Physics wiki that anyone in Mr. Adkins's class can edit.

The conservation of momentum plays a huge role in physics. The main application of this concept is in collisions. Before we can start talking about that, however, we must first define a few terms and equations.

Momentum is the product of an object mass and velocity and therefore is a vector quantity. Momentum has a unit of kilogram-meter per second. The variable for momentum is p. The equation for momentum is:

Equation 1 The definition of momentum.

.

Elastic Collision

Collision in which both momentum and kinetic energy are conserved.

Inelastic Collision

Collision in which momentum is conserved but kinetic energy is not.

Perfectly Inelastic Collision

In a perfectly inelastic collision, momentum is conserved, kinetic energy is not, and the two objects stick together after the collision, so their final velocities are the same.

2d Inelastic Collisions

This just like a normal inelastic collision except that one or more of the objects can be moving at an angle.These types of collisions are not a major part of the AP test.

Conservation of Momentum Equation

The conservation of momentum equation is:

Equation 2 The conservation of momentum equation

.

This equation basically says that in an isolated system (a system with no external forces), the total momentum of a system stays the same. This form of the equation is the most basic and is generally used in collisions, as we will see in the next section. The law of conservation of momentum also says that momentum cannot be created or destroyed.

Important Equations

These equations are readily used when dealing with collisions.

Equation 2 This is the conservation of momentum equation. This equation is the first equation used when dealing with collision.

Equation 3 This equation is used mainly in elastic collisions. This equation can be substituted into Equation 2 when there is more than one unknown.

Equation 4 This is the conservation of energy equation and can be used to check your answer in an elastic collision.

General Guidelines for Solving 1d Collisions

Draw a picture and establish a coordinate system (Ex: Left is negative, right is positive)

Solve the conservation of momentum equation for the unknown.

In inelastic equations, remember that the objects stick together, so they have the same final velocity.

For elastic equations, you'll have to use Equation 3 to get rid of an unknown

Plug in values

Don't forget the units!

In an elastic equation, you can check your work by plugging in your values into Equation 4. The value on the left side of the equation (the initial energy) should equal to the value on the right side of the equation (the final energy).

Guidelines for Solving 2d Inelastic Collisions

1. Draw a picture and establish a coordinate axis. (Ex: Left is negative, right is positive. Up is positive and down is negative)
2. Break up the velocity into components as needed. (See Vector Components). 3. Write the conservation of momentum equation in the x direction and the y direction as shown in the table.

X

Y

4. Plug in the values you know.
5. Divide the momentum in the y direction by the momentum in the x direction.
6. Solve for the angle by taking the inverse tangent.
7. Substitute the angle back to get the final velocity.

Collision Examples

Perfectly Inelastic Collision Example

The first type of collision we will look at is a perfectly inelastic collision. This is the easiest type of collisions to work with because the problem gives you all of the values you need and there is only one unknown that you have to solve for.

An object of mass m= 20kg rolls with a velocity of 50 m/s towards another mass of m= 30 kg. What is the final velocity of the two objects given that they collide and stick together.

The first thing we need to do is draw a picture.

The next step is to write the conservation of momentum equation. Since the two objects have the same final velocity,we van factor out the final velocity as shown.

Next we solve for the final velocity.

Now that we have the equation solved for the quantity we are looking for, we can plug in numbers and obtain the answer.

Elastic Collision Example

The next example we will look at is an elastic collision example.

An object of mass m= 30 kg and traveling v= 20 m/s to the right towards another object with mass m= 50 kg and velocity v= 10 m/s to the left. What will be the final velocity for each?

The first step is to draw a picture.

Next, we have to establish a coordinate system. Let's say that right is positive and left is negative.

The next step is to plug in values into the conservation of momentum equation and simplify. Usually you are supposed to solve the equation without any variables, but in this case it is okay to, as you will see.

It seems now that we are stuck because we have one equation with two unknowns. To get rid of an unknown we have to use another equation. The equation that we have to use is Equation 3. plugging in values we obtain:

Now to solve for the final velocity of object 1, we have to back substitute.

Those are our answers and we are done with this problem. To check your work you can plug the numbers into Equation 4 and make sure you get the same answer on both sides of the equation.

2d Inelastic Collision

An object with mass 1.5 x 103 traveling east at a speed of 25.0 m/s collides at an intersection with another object with mass
2.5 x 103 kg that was traveling 20 m/s. Find the magnitude and direction of the collision, assuming that the objects stick together.

Draw a picture

Plug in values into the table.

X

Y

Divide the y equation by the x equation and simplify.

Now back substitute into the y equation and solve for the velocity.

So the wreckage travels at a velocity of 15.6 m/s at an angle of 53.1 degrees north of east.

References and Additional Links

All material was adapted from Serway, Raymond A (2006), College Physics (7th ed.): Brookscole ISBN 978-0-534-99723-6 including the definitions, equations, and the example problems.

For more help on conservation of momentum, visit these sites:

## Conservation of Momentum

from dvapphysics.wikispaces, the free AP Physics wiki that anyone in Mr. Adkins's class can edit.The conservation of momentum plays a huge role in physics. The main application of this concept is in collisions. Before we can start talking about that, however, we must first define a few terms and equations.

## Table of Contents

## Important Terms

## Momentum

Momentum is the product of an object mass and velocity and therefore is a vector quantity. Momentum has a unit of kilogram-meter per second. The variable for momentum is p. The equation for momentum is:.

## Elastic Collision

Collision in which both momentum and kinetic energy are conserved.## Inelastic Collision

Collision in which momentum is conserved but kinetic energy is not.## Perfectly Inelastic Collision

In a perfectly inelastic collision, momentum is conserved, kinetic energy is not, and the two objects stick together after the collision, so their final velocities are the same.## 2d Inelastic Collisions

This just like a normal inelastic collision except that one or more of the objects can be moving at an angle.These types of collisions are not a major part of the AP test.## Conservation of Momentum Equation

The conservation of momentum equation is:

This equation basically says that in an isolated system (a system with no external forces), the total momentum of a system stays the same. This form of the equation is the most basic and is generally used in collisions, as we will see in the next section. The law of conservation of momentum also says that momentum cannot be created or destroyed.

## Important Equations

These equations are readily used when dealing with collisions.

## General Guidelines for Solving 1d Collisions

## Guidelines for Solving 2d Inelastic Collisions

1. Draw a picture and establish a coordinate axis. (Ex: Left is negative, right is positive. Up is positive and down is negative)

2. Break up the velocity into components as needed. (See Vector Components).

3. Write the conservation of momentum equation in the x direction and the y direction as shown in the table.

4. Plug in the values you know.

5. Divide the momentum in the y direction by the momentum in the x direction.

6. Solve for the angle by taking the inverse tangent.

7. Substitute the angle back to get the final velocity.

## Collision Examples

## Perfectly Inelastic Collision Example

The first type of collision we will look at is a perfectly inelastic collision. This is the easiest type of collisions to work with because the problem gives you all of the values you need and there is only one unknown that you have to solve for.An object of mass m= 20kg rolls with a velocity of 50 m/s towards another mass of m= 30 kg. What is the final velocity of the two objects given that they collide and stick together.

The first thing we need to do is draw a picture.

The next step is to write the conservation of momentum equation. Since the two objects have the same final velocity,we van factor out the final velocity as shown.

Next we solve for the final velocity.

Now that we have the equation solved for the quantity we are looking for, we can plug in numbers and obtain the answer.

## Elastic Collision Example

The next example we will look at is an elastic collision example.An object of mass m= 30 kg and traveling v= 20 m/s to the right towards another object with mass m= 50 kg and velocity v= 10 m/s to the left. What will be the final velocity for each?

The first step is to draw a picture.

Next, we have to establish a coordinate system. Let's say that right is positive and left is negative.

The next step is to plug in values into the conservation of momentum equation and simplify. Usually you are supposed to solve the equation without any variables, but in this case it is okay to, as you will see.

It seems now that we are stuck because we have one equation with two unknowns. To get rid of an unknown we have to use another equation. The equation that we have to use is Equation 3. plugging in values we obtain:

Next we use elimination to cancel the final velocity for Object 1. (See Solving Systems of Equations)

Solving, we obtain

Now to solve for the final velocity of object 1, we have to back substitute.

Those are our answers and we are done with this problem. To check your work you can plug the numbers into Equation 4 and make sure you get the same answer on both sides of the equation.

## 2d Inelastic Collision

An object with mass 1.5 x 103 traveling east at a speed of 25.0 m/s collides at an intersection with another object with mass

2.5 x 103 kg that was traveling 20 m/s. Find the magnitude and direction of the collision, assuming that the objects stick together.

Draw a picture

Plug in values into the table.

X

Y

Divide the y equation by the x equation and simplify.

Now back substitute into the y equation and solve for the velocity.

So the wreckage travels at a velocity of 15.6 m/s at an angle of 53.1 degrees north of east.

## References and Additional Links

All material was adapted from Serway, Raymond A (2006),

College Physics(7th ed.): Brookscole ISBN 978-0-534-99723-6 including the definitions, equations, and the example problems.For more help on conservation of momentum, visit these sites:

Hyperphysics-Conservation of Momentum

Khan Academy

Physics Hypertextbook- Conservation of Momentum