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# Probability of Independent Events

## Two outcomes both occurring independently.

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Probability of Independent Events

On the way back from the amusement park, Mrs. Hawk gave her students a survey to fill out. She asked them to write down the rides that they enjoyed and to explain why they enjoyed them. All of the students had had a terrific time and riding on the coach bus to and from the amusement park had made everything wonderful!!

Mrs. Hawk collected 25 surveys. While there are 26 students in her class, one of them was ill and did not attend the trip. While the bus traveled home, Mrs. Hawk reviewed the student answers.

Based on their responses, she could see that the students had really enjoyed this class trip. She noticed that 18 students had enjoyed the roller coaster and 12 students had enjoyed the bumper cars. These were the two most popular rides. She also noticed that some of the students had enjoyed both of these rides.

Mrs. Hawk wondered what the likelihood was that this would happen. What was the likelihood that a student would like both the roller coaster and the bumper cars?

Can you figure this out? Both of the events are independent of each other. Therefore, the probability of liking both rides is independent-one does not depend on the other. In this Concept you will learn how to calculate the probability of independent events. At the end of this Concept you will be able to figure out the likelihood of a student liking both the roller coaster and the bumper cars.

### Guidance

When we think about probability, we think about the chances or the likelihood that something is going to happen. Sometimes, one event will happen and then a second event will happen right after that. Think about choosing a card from a deck of cards. We know that there are 52 cards in a deck, we can choose a card and there is a certain probability that it will be a red card. Then we can put the card back and choose again. The first outcome of choosing a card has nothing to do with the second outcome.

These outcomes are called independent events.

An independent event is an event that does not depend on another event to determine its outcome. When we have two independent events, one outcome does not impact the outcome of the second event. Choosing the card from the deck is a good example of an independent event.

We can calculate the probability of an independent event occurring.

Let’s say that I have four tiles flipped face down on a table.

On the side we can’t see are different images. Three of them have a sun and one of them has a four leaf clover.

What is the probability of selecting a sun on the first flip?

This is an independent event. Nothing else impacts the outcome except the flip. If there are three suns then we have a 3 out of 4 chance of flipping a sun.

$P = \frac{3}{4}$

We can also have two independent events. The events have nothing to do with each other, and yet we can calculate the probability of them occurring.

How can we find the probability of two independent events both occurring? Well, first there are a few things that you need to know. In order for two events to be dependent they can’t impact each other.

There are 9 marbles in a bag. There are three blue, three green and three orange. What is the probability of selecting one blue marble, then putting that one back and selecting one green marble?

First, notice that there are two independent events.

The first is to choose one blue marble.

The next is to choose one green marble.

Also notice that the first marble is put back into the bag before the next one is taken out-this is a key for independent events!!!

Now let’s think about the problem.

What is the probability of choosing a blue one first?

There are 9 marbles and 3 are blue.

$\frac{3}{9} = \frac{1}{3}$

What is the probability of choosing a green one next?

There are 9 marbles and 3 are green.

$\frac{3}{9} = \frac{1}{3}$

To find the likelihood of these two independent events occurring, we multiply the two probabilities.

$P(B \ \text{and} \ G) = \frac{1}{3} \cdot \frac{1}{3} = \frac{1}{9}$

What about three independent events occurring?

There are 9 marbles in a bag. There are three blue, three green and three orange. What is the probability of selecting one blue marble, then putting that one back and selecting one green marble, then putting that one back and selecting one orange marble?

Here we have the same work to do.

What is the probability of choosing a blue one first?

There are 9 marbles and 3 are blue.

$\frac{3}{9} = \frac{1}{3}$

What is the probability of choosing a green one next?

There are 9 marbles and 3 are green.

$\frac{3}{9} = \frac{1}{3}$

What is the probability of choosing an orange one next?

There are 9 marbles and 3 are orange.

$\frac{3}{9} = \frac{1}{3}$

Now we figure out the likelihood of three independent events occurring by multiplying each probability.

$P(B, \ \text{then} \ G, \ \text{then} \ O) = \frac{1}{3} \cdot \frac{1}{3} \cdot \frac{1}{3} = \frac{1}{27}$

There is a very small likelihood that this event will occur.

Now go back to the swimming and golf.

Out of 100 students at Riverview Middle, 50 enjoy swimming. Out of the same 100 students, 25 enjoy golf. What is the probability that a student would enjoy both swimming and golf?

Let’s add to this problem that 40 out of 100 enjoy basketball.

What is the likelihood that a student would enjoy all three?

$\frac{50}{100} & = \frac{1}{2}\\ \frac{25}{100} & = \frac{1}{4}\\ \frac{40}{100} & = \frac{2}{5}\\ \frac{1}{2} \cdot \frac{1}{4} \cdot \frac{2}{5} & = \frac{2}{40} = \frac{1}{20}$

There is a one out of 20 chance that a student would like all three.

We can look at this as a percent too and this will give us an idea of how small the likelihood is.

$\frac{1}{20} = 5 \%$

Practice calculating the likelihood of an independent event using a percent.

#### Example A

If 6 out of 24 students enjoy opera in a class, what is the probability that a student selected at random from the class will enjoy the opera?

Solution: $\frac{1}{4}$

#### Example B

If 4 our of 12 students like Math class the best, what is the probability that a student selected at random from the class will enjoy Math the best?

Solution: $\frac{1}{3}$

#### Example C

If 5 out of 10 like Drama best, what is this probability?

Solution: $\frac{1}{2}$

Now back to the amusement park.

Here is the original problem once again.

On the way back from the amusement park, Mrs. Hawk gave her students a survey to fill out. She asked them to write down the rides that they enjoyed and to explain why they enjoyed them. All of the students had had a terrific time and riding on the coach bus to and from the amusement park had made everything wonderful!!

Mrs. Hawk collected 25 surveys. While there are 26 students in her class, one of them was ill and did not attend the trip. While the bus traveled home, Mrs. Hawk reviewed the student answers.

Based on their responses, she could see that the students had really enjoyed this class trip. She noticed that 18 students had enjoyed the roller coaster and 12 students had enjoyed the bumper cars. These were the two most popular rides. She also noticed that some of the students had enjoyed both of these rides.

Mrs. Hawk wondered what the likelihood was that this would happen. What was the likelihood that a student would like both the roller coaster and the bumper cars?

First, we have to figure out the probability of each of the independent events.

18 out of 25 students enjoyed the roller coaster.

$\frac{18}{25}$

12 out of 25 enjoyed the bumper cars.

$\frac{12}{25}$

This is a tricky problem because the numbers are larger. We can convert each fraction to a decimal and then multiply the decimals. After doing that, we can convert the decimal to a percent and we will be able to determine the probability.

$\frac{18}{25} & = .72\\\frac{12}{25} & = .48\\.72 \times .48 & = .3456$

We move the decimal point two places to the right and add a percent sign.

34.56 %

The probability that a student would have chosen both the roller coaster and the bumper cars is 34.56 or approximately $34 \frac{1}{2} \%$ .

### Vocabulary

Here are the vocabulary words in this Concept.

Probability
the chances or likelihood that an event will occur
Independent Event
when the outcome of one event does not have anything to do with the outcome of another event. One does not alter or impact the other.

### Guided Practice

Here is one for you to try on your own.

Out of 100 students at Riverview Middle, 50 enjoy swimming. Out of the same 100 students, 25 enjoy golf. What is the probability that a student would enjoy both swimming and golf?

To figure this out we have to figure out the probability of each independent event and then multiply them.

$\frac{50}{100} & = \frac{1}{2}\\ \frac{25}{100} & = \frac{1}{4}\\ \frac{1}{2} \cdot \frac{1}{4} & = \frac{1}{8}$

There is a one out of eight chance that this will happen.

### Video Review

Here is a video for review.

### Practice

A bag has sixteen marbles in it. There are four of each color. There are four red, four blue, four green and four yellow.

1. What is the probability of pulling a green marble out of the bag?

2. What is the probability of pulling a yellow or a green marble out of the bag?

3. What is the probability of pulling a red marble out of the bag?

4. What is the probability of pulling a red, yellow or green marble out of the bag?

5. What is the probability of not pulling a red marble out of the bag?

6. What is the probability of pulling a green marble, then a red marble out of the bag?

7. What is the probability of pulling a yellow or blue marble out of the bag?

8. What is the probability of pulling a red, then a blue then a yellow out of the bag?

9. If I take out a red marble and a blue marble, what is the probability of pulling a green marble out of the bag?

10. What is the probability that you will pull a red marble out of the bag?

Directions: Now look at the probability fractions that you wrote for 1 -10. Convert each one to a decimal and then a percent. You may round when necessary.

11.

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### Vocabulary Language: English

Probability

Probability

Probability is the chance that something will happen. It can be written as a fraction, decimal or percent.