Unit 8, Lesson 21
Odd and Even Numbers
Extra Support Materials for Algebra 1
21.1
Warm-up
Standards Alignment
Building On
Addressing
Building Toward
HSN-RN.B.3
Explain why the sum or product of two rational numbers is rational; that the sum of a rational number and an irrational number is irrational; and that the product of a nonzero rational number and an irrational number is irrational.
Materials
NoneActivity Narrative
The purpose of this Math Talk is to elicit strategies and understandings students have for adding and multiplying numbers. It encourages students to think about generalizing ideas and to rely on patterns to mentally solve problems. The understanding elicited here will be helpful later in this lesson when students will need to be able to justify whether the results of combining even and odd numbers in different ways are even or odd.
To evaluate each expression, students need to look for and make use of structure (MP7).
Launch
Tell students to close their books or devices (or to keep them closed). Reveal one problem at a time. For each problem:
- Give students quiet think time, and ask them to give a signal when they have an answer and a strategy.
- Invite students to share their strategies, and record and display their responses for all to see.
- Use the questions in the Activity Synthesis to involve more students in the conversation before moving to the next problem.
Keep all previous problems and work displayed throughout the talk.
Action and Expression: Internalize Executive Functions. To support working memory, provide students with sticky notes or mini whiteboards.
Supports accessibility for: Memory, Organization
Supports accessibility for: Memory, Organization
Activity
NoneEvaluate mentally.
Activity Synthesis
The goal of this discussion is to review students’ strategies for evaluating expressions involving addition and multiplication.
To involve more students in the conversation, consider asking:
- “Who can restate ’s reasoning in a different way?”
- “Did anyone have the same strategy but would explain it differently?”
- “Did anyone solve the problem in a different way?”
- “Does anyone want to add on to ’s strategy?”
- “Do you agree or disagree? Why?”
- “What connections to previous problems do you see?”
MLR8 Discussion Supports. Display sentence frames to support students when they explain their strategy. Examples:
Advances: Speaking, Representing
- “First, I because .”
- “I noticed , so I .”
Advances: Speaking, Representing
21.2
Activity
Instructional Routines
MLR3: Critique, Correct, ClarifyMaterials
NoneActivity Narrative
In this activity, students examine some properties of even and odd numbers. In the associated Algebra 1 lesson, students prove some concepts about rational and irrational values. The work of this activity supports students with concrete examples before the abstract proof of the next activity and the work with rational and irrational numbers in the Algebra 1 lesson.
In this activity, students critique a statement or response that is intentionally unclear, incorrect, or incomplete and improve it by clarifying meaning, correcting errors, and adding details (MP3).
This activity uses the Critique, Correct, Clarify math language routine to advance representing and conversing as students critique and revise mathematical arguments.
Launch
Arrange students in groups of 2.
Activity
None21.3
Activity
Instructional Routines
NoneMaterials
NoneActivity Narrative
The goal of this activity is to introduce students to a proof by contradiction before they examine a similar proof in the associated Algebra 1 lesson. Students follow a proof by contradiction for why the sum of an even and an odd number is always odd. Throughout the process, students answer questions explaining some of the steps. As students analyze a proof by contradiction they reason abstractly and quantitatively (MP2).
Launch
Arrange students in groups of 3–4. Introduce the idea of a proof by contradiction. Explain that the goal of this proof is to prove that must be odd. To do that, start by assuming the opposite. Then, when it does not work, the assumption must be wrong, meaning must be odd.