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Since it may have been a while since students encountered this notation, remind them that is read “ is greater than 1.”
Give students 2 minutes of quiet work time followed by a whole-class discussion.
The number line shows values of that make the inequality true.
Select all the values of from this list that make the inequality true.
3
-3
700
1.05
1
Some students may think 700 is not a solution to Tell students that since there is an arrow at the end of the dark line, it includes all values that are greater than 1, even the ones not shown.
Ask students to share a few more solutions to . After each student shares, ask the class whether they agree or disagree. Emphasize that this inequality has many solutions—in fact, any value greater than 1 is a solution.
To highlight the fact that “greater than 1” does not include 1, ask:
In this activity, students express an inequality that includes the boundary value using only the symbols and . This generates a need for the symbol , which is introduced in the Activity Synthesis. Students also recall the fact that a closed circle is used to graph an inequality that includes the boundary value.
Monitor for students who express the answer to the last question using words or using symbols. The responses to the last question will be used to introduce the new notation.
Students attend to precision (MP6) when they carefully choose the symbols to express the possible values for the height in the last question.
Arrange students in groups of 2. Allow students 5–10 minutes quiet work time and time to share their responses with a partner, followed by a whole-class discussion.
Use Collect and Display to create a shared reference that captures students’ developing mathematical language. Collect the language that students use to express the possible values for Noah’s friend’s height. Display words and phrases, such as “at least,” “greater than,” and “greater than or equal to.”
A sign next to a roller coaster says, “You must be at least 60 inches tall to ride.” Noah is happy to know that he is tall enough to ride.
Noah is inches tall. Which of the following can be true? Explain how you know.
On the number line, show all the possible heights that Noah’s friend could be.
Direct students’ attention to the reference created using Collect and Display. Ask students to share how they used the number line to show the possible heights and how they expressed the possible heights using symbols. Invite students to borrow language from the display as needed. As they respond, update the reference to include additional phrases. (For example, the display may have “height is greater than 60 or height is equal to 60” already on it and be updated with the more concise phrase “the height is greater than or equal to 60.”)
The purpose of this discussion is to introduce the symbols and . Ask selected students to share their response to the last question. They are likely to write something like “ or .” The and symbols are not enough to capture what we need here with a single mathematical statement. Introduce the new symbols and that mean “less than or equal to” and “greater than or equal to.” Invite students to use one of these new symbols to revise their answer to the last question. ( or ).
Inequalities can be used to describe a range of numbers. For example, in many places, people are eligible to get a driver’s license when they are at least 16 years old. If is the age of a person, then we can check if they are eligible to get a driver’s license by checking if their age makes the inequality (they are older than 16) or the equation (they are 16) true. The symbol , pronounced “greater than or equal to,” combines these two cases and we can just check if (their age is greater than or equal to 16).
The inequality can be represented on a number line. The closed, or filled in, circle at 16 shows that 16 is a solution. The shading and arrow pointing right from 16 shows that all numbers greater than 16 are also solutions.
If students are having trouble interpreting the first three questions or articulating their responses, encourage them to make use of the number line that appears in the fourth question.
The table shows four inequalities and four values for . Take turns with your partner to decide whether each value makes each inequality true, and complete the table with “true” or “false”.
| 0 | 100 | -100 | 25 | |
|---|---|---|---|---|
Students who try to apply what they know about solving equations to solve the inequalities algebraically may come up with incorrect solutions. For instance, may at first glance look equivalent to , since the “less than” sign appears. Students may incorrectly think that is equivalent to . Ask these students, for example, what the solution to means (25 is the value of that makes equal to 100). Then encourage these students to test values like 24 and 26 to see whether they are solutions to . This will be covered in greater detail in a later lesson, so this understanding does not need to be solidified at this time.