Unit 6, Lesson 1
Reviewing Exponents
Extra Support Materials for Algebra 1
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The purpose of this activity is for students to recall how to interpret expressions that use exponents. This will be useful when students have the opportunity to use exponents to represent a situation in the associated Algebra 1 lesson. As students recall how to write equivalent expressions involving exponents, they reason abstractly and quantitatively (MP2).
Before beginning the activity, pose the following question.
“Kiran thinks that is 9. Han thinks that is 6. Who do you agree with and why?”
Before students do calculations or any other work, ask the class whether they agree with Kiran or Han. Ask selected students to explain why they chose one and did not choose the other. Ask others if they agree or have something to add.
Display the table for all to see. Explain that the “expanded form” column shows the factors being multiplied, and the “exponential form” column shows how to write the repeated multiplication more succinctly with exponents. Arrange students in groups of 2. After a few minutes of quiet work time, ask students to compare their responses to their partner’s and decide if they are both correct, even if they look different. Follow with a whole-class discussion.
Complete the table.
| expanded form | exponential form |
|---|---|
The goal of this activity is for students to evaluate how well they understand exponential notation. Select students to share their responses. Here are some questions for discussion:
The purpose of this activity is for students to recall how to write expressions using exponents. Students apply what they know about exponents to represent money doubling each week. They use multiplication to express a different quantity growing linearly each week. This will be useful when students represent two situations and compare them in the associated Algebra 1 lesson. When students write an expression in terms of , they express regularity in repeated reasoning (MP8).
Arrange students in groups of 2, or allow them to work individually.
Use Three Reads to support reading comprehension and sense-making about this problem. Display only the problem stem, without revealing the table and question.
Clare has a summer job. She wants to save money to spend on the family vacation at the end of summer. She is going to save \$5 per week for each of the 10 weeks she is working.
Tyler also has a summer job, and he, too, would like to save money to spend on a family vacation. His aunt gives him \$1 to start saving, and Tyler decides to double the amount he saves each week.
Complete the table showing how much money each of them will have saved at the end of each week for the 10 weeks.
| week | 0 | 1 | 2 | 3 | 4 | 5 | 6 | 7 | 8 | 9 | 10 | |
|---|---|---|---|---|---|---|---|---|---|---|---|---|
| Clare | 0 | 5 | 10 | 15 | ||||||||
| Tyler | 1 | 2 | 4 | 8 |
The goal is to discuss how students created their expressions for finding the amount of money that Clare and Tyler had at the end of each week, and if each plan is reasonable. Ask students to discuss how they developed their expressions. Here are some questions for discussion:
In this partner activity, students take turns using exponent rules to analyze expressions and identify equivalent ones. As students trade roles explaining their thinking and listening, they have opportunities to explain their reasoning and critique the reasoning of others (MP3). The practice will prepare students to compare growth patterns and interpret graphs to answer questions from a context in the associated Algebra 1 lesson.
If desired, demonstrate that expressions can be rewritten by substituting expressions of equal value. For example, if we were looking for an expression equivalent to , we might try replacing each 16 with the product of two 4s, like . This might help us recognize a matching expression like .
Arrange students in groups of 2. Display the task for all to see. Tell students that for each expression in List A, there is an equivalent expression in List B and List C. If time allows, choose a student to be your partner and demonstrate how to set up and do the activity. Otherwise, share these steps:
To encourage reasoning about equivalent expressions, it would be best if students tackled this activity without access to a calculator.
Choose an expression from List A, and match it with an equivalent expression from List B and from List C. Be prepared to explain your reasoning.
List A
List B
List C
18
512
729
1,000
Much discussion takes place between partners. Invite students to share how they determined which expressions were matches. Select groups to share their matches and how they sorted their expressions. Ask if other groups have different matches of expressions. Choose as many different groups as time allows. Attend to the language that students use to describe their pairing, and give them opportunities to describe their relationships more precisely. Highlight the use of terms like “expanded notation,” “exponents,“ “factors,“ “multiplication,“ and “addition.“ The purpose of this discussion is to highlight the meaning of an exponent. Here are some questions for discussion: