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Unit 8, Lesson 3

Sample Spaces

Geometry

3.1

Warm-up

Standards Alignment

Building On

Addressing

Building Toward

Instructional Routines

None

Materials

None

Activity Narrative

In this activity students are asked to write out all of the outcomes in the sample space for rolling two standard number cubes. This gives students an opportunity to share any methods they may have for keeping track of all of the different outcomes before being introduced to additional methods later in the lesson.

Launch

Arrange students in groups of 2. Tell students that standard number cubes will be referred to throughout this unit. A standard number cube is a cube with each side labeled with one of the numbers 1 through 6. Tell them that 1 on the first cube and 3 on the second cube is different from 3 on the first cube and 1 on the second cube. If possible, roll two different (by color or size) number cubes to demonstrate. Monitor for students who use an organized list, a table, or a tree diagram to record the sample space.

Activity

None

When rolling two standard number cubes, some of the possible outcomes are

1 and 1, 2 and 3, 5 and 5

What are the other possible outcomes?
How many outcomes are in the sample space?

Student Response

to access Student Response.

Building on Student Thinking

Activity Synthesis

The purpose of this discussion is to help students think about sample space and to have students share any methods that they used to find the sample space. Ask previously identified students to share their representation with the class. If students did not use an organized list, table, or tree diagram they will encounter those three representations later in this lesson.

Here are some questions for discussion.

“What strategy did you use to make sure you found all of the outcomes?” (I used an organized list to make sure that I did not miss any of the outcomes.)
“What strategy makes more sense for you to use?” (I thought that the organized list was easier to use. I started with a tree diagram, and I noticed a pattern that made it easy for me to create an organized list.)
“How many different outcomes are in the sample space? Were you able to determine how many there would be before you wrote out all of the outcomes? Explain your reasoning.” (There are 36 outcomes in the sample space. I knew that each of the 6 numbers would be paired with the 6 numbers from the other number cube. That means there are 6 groups of 6, so there are outcomes in total.)
“How did you make sure you found all of the outcomes without repeating any?” (I knew that there were 36 total outcomes so I just made sure I did not have any repeats in the 36 outcomes that I wrote down.)
“If the result of the rolls are added, how many different outcomes result in a sum of 4? What are the outcomes?” (3. They are 1 and 3, 2 and 2, 3 and 1.)
“What is the probability of rolling 2 standard number cubes and the result having a sum of 4? Explain your reasoning.” (Because each outcome is equally likely, the probability of getting a sum of 4 is or equivalent because there are 3 outcomes in the event and 36 outcomes in the sample space.)
“What is the probability of rolling 2 on the first die and a 2 on the second die?” ()
“What is the probability that the first die rolled is a 5?” ( or equivalent)

3.2

Activity

Instructional Routines

MLR5: Co-Craft Questions

Materials

None

Activity Narrative

In this activity, students are invited to use different methods for writing out the sample space for spinning three different spinners. After trying a list, table, and tree, students are asked to compare the methods and describe the benefits and drawbacks of the methods.

Students should use the structure of the organization methods to decide which methods they like to use best (MP7).

This activity uses the Co-Craft Questions math language routine to advance reading and writing as students make sense of a context and practice generating mathematical questions.

Launch

Arrange students in groups of 2. Tell students that the activity involves comparing three different methods for finding the sample space of an experiment.

Introduce the context of spinning the three spinners. Use Co-Craft Questions to orient students to the context and to elicit possible mathematical questions.

Display the three spinners and read this problem stem together: “Each of the three spinners is spun once.”
Then, display—one at a time—each statement about how the students represent the outcomes, as well as their accompanying representation.
- “Diego makes a list of the possible outcomes.”
- “Tyler makes a table for the first two spinners. Then he uses the outcomes from the table to include the third spinner.”
- “Lin creates a tree to keep track of the outcomes.”
Give students 1–2 minutes to write a list of mathematical questions that could be asked about the situation before comparing questions with a partner.
Invite several partners to share one question with the class. Record the questions for all to see. Ask the class to make comparisons among the shared questions and their own. Ask, “What do these questions have in common? How are they different?” Listen for and amplify language related to the learning goal, such as “outcomes” and “probability.”
Reveal the question “How many outcomes are in the sample space for this experiment?” and give students 1–2 minutes to compare it to their own question and those of their classmates. Invite students to identify similarities and differences by asking:
- “Which of your questions is most similar to or different from the one provided? Why?”
- “Is there a main mathematical concept that is present in both your questions and the one provided? If so, describe it.”

3.3

Activity

Instructional Routines

MLR7: Compare and Connect MLR8: Discussion Supports

Materials

None

Activity Narrative

In this activity, students continue using different methods to record the sample space for experiments involving multiple steps. Monitor for students who use these approaches:

Organized list
Tables
Trees
Other methods for writing the sample space

This activity uses the Compare and Connect math language routine to advance representing and conversing as students use mathematically precise language in discussion.

Launch

Arrange students in groups of 2. Tell students:

“All coins and number cubes mentioned in this unit are assumed to be fair unless otherwise noted. This means that there is a an equal chance for each of the outcomes to result.”
“After completing each question, compare your solution and your solution method to those of your partner.”

Allow students a few minutes to think of solutions on their own, before sharing with their partner.

Select students with different strategies, such as those described in the Activity Narrative, to share later.

MLR8 Discussion Supports. Display sentence frames to support small-group discussion. Examples:

“The outcomes are _____ because _____.”
“I chose this representation because _____.”
“I noticed _____, so I thought _____.”

Advances: Speaking, Representing

Action and Expression: Internalize Executive Functions. To support organization, provide students with blank tables with 4 columns and 5 rows, and blank tree diagrams to match each scenario.
Supports accessibility for: Language, Organization

Lesson Synthesis

The purpose of the discussion is for students to describe strategies for identifying the sample space of a chance experiment. They should also be able to articulate how a sample space is related to the probability of an event occurring.

Here are some questions for discussion.

“How do you use the sample space to calculate probabilities?” (When all outcomes in the sample space are known and are equally likely, the probability of an event is the number of outcomes in the event divided by the number of outcomes in the sample space.)
“How does using a tree diagram, organized list, or table help you to answer questions about probability?” (It helps because if you list all of the possible outcomes, then you can more easily find the number of outcomes in the sample space as well as determine which events might be a part of a stated event. Sometimes you can see patterns emerge while creating a tree diagram, organized list, or table to determine the sample space without writing out all of the possible outcomes. For example, when I made a tree diagram for the number cubes, I found that when the first number cube was 1, then there were six possibilities for the second cube. There were the same six possibilities when the number cube was 2, 3, 4, 5, and 6, so there are a total of outcomes in the sample space.)
“Draw two spinners divided into equally sized sections. Ask your partner a probability question about an event using the spinners you drew. What question did you ask or what question were you asked? What is the answer to the question?” (I drew a spinner with 4 equal sections labeled 1 through 4 and another with 5 equal sections labeled A through E. I asked my partner, “What is the probability of getting an even number and a vowel?” and the answer is 0.2.)

to access Cool-down.

Student Lesson Summary

Probability represents the proportion of the time an event will occur when repeating an experiment many, many times. For complex experiments, the sample space can get very large very quickly, so it is helpful to have some methods for keeping track of the outcomes in the sample space.

In some cases, it makes sense to list all the outcomes in the sample space. For example, when flipping 3 coins, the 8 outcomes in the sample space are:

HHH, HHT, HTH, THH, HTT, THT, TTH, TTT, where H represents heads and T represents tails.

With more outcomes possible, it can be difficult to make sure all the outcomes are represented and none are repeated, so other methods may be helpful.

Another option is to use tables. When a complex experiment is broken down into parts, tables can be used to find the outcomes of two parts at a time.

For example, when flipping 3 coins, we determine the outcomes for flipping just 2 coins. The possible outcomes are represented by the 4 options in the middle of the table: HH, HT, TH, and TT.

These outcomes can then be combined with the third coin flip in another table. Again, we see that the outcomes are HHH, HHT, HTH, HTT, THH, THT, TTH, and TTT.

	H	T
H	HH	HT
T	TH	TT

	H	T
HH	HHH	HHT
HT	HTH	HTT
TH	THH	THT
TT	TTH	TTT

Another way to keep track of the outcomes is to draw a tree structure. Each column represents another part of an experiment, with branches connecting each possible result from one part of the experiment to the possible results for the next part. By following the branches from left to right, each path represents an outcome for the sample space. The tree for flipping 3 coins would look like this. The path shown with the dashed line represents the HTH outcome. By following the other paths, the other 7 outcomes can be seen.

Each of the spinners is spun once.

<p>Spinner with two equal sections, A and B.<br>
</p>

<p>Spinner with 3 equal sections, L, M and N.<br>
</p>

<p>Spinner with 4 equal sections, W, X, Y and Z.<br>
</p>

Diego makes a list of the possible outcomes:

ALW, ALX, ALY, ALZ,
AMW, AMX, AMY, AMZ,
ANW, ANX, ANY, ANZ,
BLW, BLX, BLY, BLZ,
BMW, BMX, BMY, BMZ,
BNW, BNX, BNY, BNZ

Tyler makes a table for the first two spinners.

	L	M	N
A	AL	AM	AN
B	BL	BM	BN

Then he uses the outcomes from the table to include the third spinner.

	W	X	Y	Z
AL	ALW	ALX	ALY	ALZ
AM	AMW	AMX	AMY	AMZ
AN	ANW	ANX	ANY	ANZ
BL	BLW	BLX	BLY	BLZ
BM	BMW	BMX	BMY	BMX
BN	BNW	BNX	BNY	BNZ

Lin creates a tree to keep track of the outcomes.

How many outcomes are in the sample space for this experiment?
One of the outcomes from Diego’s list is BLX. Where does this show up in Tyler's method? Where is it in Lin’s method?
When spinning all three spinners, what is the probability that:
1. They point to the letters ANY? Explain your reasoning.
2. They point to the letters AMW, ANZ, or BNW? Explain your reasoning.
If a fourth spinner that has 2 equal sections labeled S and T is added, how would each of the methods need to adjust?

Activity Synthesis

The purpose of this discussion is for students to understand how each of the three representations can be used to represent the same sample space.

Here are some questions for discussion.

“How many cells will there be in Tyler's method for each table?” ( first, then )
“How many paths are in Lin’s method?” (The first level of the tree has 2 groups of 1 thing each. The second level has 2 groups of 3 things each. The third level has 6 groups of 4 things each. The number of paths is equal to the number of endpoints of the paths, and there are of these.)
“Which method do you think you would use to find probabilities of events for this experiment? Explain your reasoning.” (I would use the organized list. I just start with the sample space from the first spinner and then add to the list using the sample space from the second spinner, and so on. It is similar to a tree diagram, but I don’t actually create the tree diagram on paper.)
“How did you find the probabilities in this activity?” (I divided the number of outcomes in the event by the number of outcomes in the sample space.)

Tell students that probabilities can only be found in this way when each outcome is equally likely. If the section labeled A were larger than the section labeled B, then another method would need to be used to determine the probabilities of events. This will be addressed later in the unit.

If time permits, display each representation for all to see.

Organized list:

A and L and W, A and L and X, A and L and Y, A and L and Z,
A and M and W, A and M and X, A and M and Y, A and M and Z,
A and N and W, A and N and X, A and N and Y, A and N and Z,
B and L and W, B and L and X, B and L and Y, B and L and Z,
B and M and W, B and M and X, B and M and Y, B and M and Z,
B and N and W, B and N and X, B and N and Y, B and N and Z

Table:

	W	X	Y	Z
AL	ALW	ALX	ALY	ALZ
AM	AMW	AMX	AMY	AMZ
AN	ANW	ANX	ANY	ANZ
BL	BLW	BLX	BLY	BLZ
BM	BMW	BMX	BMY	BMX
BN	BNW	BNX	BNY	BNZ

Tree diagram:

Here are some questions for discussion.

“What are the benefits of each representation?” (The organized list summarizes the same information that is in the table and the tree diagram, and it is easy to see all of the information at once. The table organizes the information so that you can see where it comes from. The tree diagram helps you to see that you have all of the possibilities.)
“Why wouldn’t you use one representation over another?” (I prefer to use the organized list over the tree diagram because it is hard for me to see each of the combinations in the tree diagram. However, sometimes I do use the tree diagram to help me create my organized list.)
"How could you determine the new number of outcomes without writing out the sample space when we add the fourth spinner?" (I would double the number of outcomes because I know that there are two additional possibilities for each existing outcome.)

	W	X	Y	Z
AL	ALW	ALX	ALY	ALZ
AM	AMW	AMX	AMY	AMZ
AN	ANW	ANX	ANY	ANZ
BL	BLW	BLX	BLY	BLZ
BM	BMW	BMX	BMY	BMX
BN	BNW	BNX	BNY	BNZ

	W	X	Y	Z
AL	ALW	ALX	ALY	ALZ
AM	AMW	AMX	AMY	AMZ
AN	ANW	ANX	ANY	ANZ
BL	BLW	BLX	BLY	BLZ
BM	BMW	BMX	BMY	BMX
BN	BNW	BNX	BNY	BNZ

	W	X	Y	Z
AL	ALW	ALX	ALY	ALZ
AM	AMW	AMX	AMY	AMZ
AN	ANW	ANX	ANY	ANZ
BL	BLW	BLX	BLY	BLZ
BM	BMW	BMX	BMY	BMX
BN	BNW	BNX	BNY	BNZ

	W	X	Y	Z
AL	ALW	ALX	ALY	ALZ
AM	AMW	AMX	AMY	AMZ
AN	ANW	ANX	ANY	ANZ
BL	BLW	BLX	BLY	BLZ
BM	BMW	BMX	BMY	BMX
BN	BNW	BNX	BNY	BNZ

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Audience

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Lesson 3

Sample Spaces

Warm-up

Standards Alignment

Building On

7.SP.C.8.b

Addressing

Building Toward

HSS-CP.A.2

Instructional Routines

Materials

Activity Narrative

Launch

Activity

Student Response

Building on Student Thinking

Activity Synthesis

Activity

Instructional Routines

Materials

Activity Narrative

Launch

Activity

Instructional Routines

Materials

Activity Narrative

Launch

Lesson Synthesis

Student Lesson Summary

Activity

Student Response

Building on Student Thinking

Activity Synthesis

Activity

Student Response

Building on Student Thinking

Activity Synthesis

Standards Alignment

Building On

7.SP.C.8.b

Addressing

HSS-CP.A.1

Building Toward

HSS-CP.A.2

Standards Alignment

Building On

7.SP.C.8.b

Addressing

HSS-CP.A.1

Building Toward

HSS-CP.A.2

	W	X	Y	Z
AL	ALW	ALX	ALY	ALZ
AM	AMW	AMX	AMY	AMZ
AN	ANW	ANX	ANY	ANZ
BL	BLW	BLX	BLY	BLZ
BM	BMW	BMX	BMY	BMX
BN	BNW	BNX	BNY	BNZ

	W	X	Y	Z
AL	ALW	ALX	ALY	ALZ
AM	AMW	AMX	AMY	AMZ
AN	ANW	ANX	ANY	ANZ
BL	BLW	BLX	BLY	BLZ
BM	BMW	BMX	BMY	BMX
BN	BNW	BNX	BNY	BNZ