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Solve Problems Using Expressions, Equations, and Inequalities Common Core: Engage New York
Lesson 12- Standard 7.EE.B.4
Properties of Inequalities
What does 7.EE.B.4 cover?
Use variables to represent quantities in a real-world or mathematical problem, and construct simple equations and inequalities to solve problems by reasoning about the quantities.
Table of ContentsDate Title Page
1/27/14 FOCUS 7- InequalitiesEngage NY- Lesson 12
Fresh Left
Focus 7 - Learning Goal
Students will be able to extend their knowledge of equations
to include solving and graphing inequalities on a number line. Students will be able to solve real world problems involving
equations and inequalities.
Today, my learning target is to…
• Justify the properties of inequalities that are denoted by < (less than), ≤ (less than or equal), > (greater than), and ≥ (greater than or equal).
MY PROGRESS
CHART
Before we start the Learning Target
Lesson, think about the Learning Target
for today….
How much prior knowledge do you
have regarding that goal?
Chart your prior knowledge using your pre-target score icon.
Teacher DirectedOpening Exercise (10 mins)
Materials Needed: Copies of the sprints for each student
Directions: Students complete a two round sprint exercise where they practice their knowledge of solving linear equations in the form + = and ( + )=𝑝𝑥 𝑞 𝑟 𝑝 𝑥 𝑞 𝑟. Provide one minute for each round of the sprint. Follow the established protocol for a sprint exercise. Be sure to provide any answers not completed by the students.
Round 1 Sprint- Answer Key
Round 2 Sprint- Answer Key
Teacher Directed Example (22 mins)
What do the follow vocabulary terms mean?
• Preserves the inequality symbol:
Preserves the inequality symbol: means the inequality symbol stays the same.
• Reverses the inequality symbol:
Reverses the inequality symbol: means the inequality symbol switches less than with greater than and less than or equal to with greater than or equal to.
Example 1- Station RotationsMath Practices: MP2 & MP4
Materials Needed: Copies of Rotation Charts (#1-4), cut-out cubes in the Teachers’ materials or SMART Notebook computerized interactive dice (see next slide for directions).
Directions: Split students into 4 groups. Discuss the directions to the Opening Exercise: px+q=r and p(x+q)=r.
There are four stations. Provide each station with two cubes containing integers. At each station, students are to do the following, recording their results in their student materials or math notebooks: (an examples is provided for each student.)1. Roll each die, recording the numbers under the first and third columns.
Students are to write an inequality symbol that makes the statement true. Repeat this four times to complete the four rows in a table.
2. Perform the operation indicated at the station (adding or subtracting a number, writing opposites, multiplying or dividing by a number), writing a new inequality statement.
3. Determine if the inequality symbol is preserved or reversed when the operation is performed.
How to use SMART Notebook Computerized Interactive Dice
• Open SMART Notebook (you don’t need a SMART Board)• Click on the picture frame icon on the far left side• Search dice• Click on Interactive and Multimedia• Drag TWO blue “KEYWORD” dice onto the white page• Click on the upper left corner of each dice. A column of rows
should be present. Enter any integer, fraction, or decimal using opposite signs.
• Then click on the upper left corner again to “close” the dice. • Then click on the center of the dice to “roll” each one.• Save the Notebook in your Focus 7 to use again another time!• Have fun!!
Station 1 Chart- Add or Subtract a Number to Both Sides of the Inequality
Students Examine the Results from Station 1
•Make a statement about what you notice, and justify it with evidence.
When a number is added or subtracted to both numbers being
compared, the symbol stays the same and the inequality symbol is
preserved.
Station 2 Chart- Multiply each term by −1
Students Examine the Results from Station 2
•Make a statement about what you notice, and justify it with evidence.
When both numbers are multiplied by −𝟏, the symbol changes and the inequality
symbol is reversed.
Station 3 Chart- Multiply or Divide Both Sides of the Inequality by a Positive Number
Students Examine the Results from Station 3
•Make a statement about what you notice, and justify it with evidence.
When a positive number is multiplied or divided to both
numbers being compared, the symbol stays the same and the inequality symbol is preserved.
Station 4 Chart
Students Examine the Results from Station 4
•Make a statement about what you notice, and justify it with evidence.
When a negative number is multiplied or divided to both
numbers being compared, the symbol changes and the inequality
symbol is reversed.
Class DiscussionSummarize the Findings
To summarize, when did the inequality change and when did it stay the same?
The inequality reverses when we multiply or divide the expressions on both sides of the inequality by a negative number.
Student Practice Exercise (5 minutes)Complete the following chart using the given inequality, and determine an operation in which the inequality symbol is preserved and an operation in which the inequality symbol is reversed. Explain why this occurs.
Student Practice ExerciseAnswers may vary
Student Problem Set (part 1)
Student Problem Set (part 1) Answers
Closing (3 min)• What does it mean for an inequality to be preserved?
What does it mean for the inequality to be reversed? • When does a greater than become a less than?
Student Problem Set (part 2)If is a negative integer, then which of the number sentences is true? If the number sentence is NOT true, give a reason.
Student Problem Set (part 2)Answers
Student Exit Ticket (5 min)-Lesson 12-Properties of Inequalities
Part 1
Student Exit Ticket (5 min)-Lesson 12-Properties of Inequalities Part 2
Exit Ticket - Lesson 12 SolutionProperties of Inequalities Part 1
Exit Ticket - Lesson 12 SolutionProperties of Inequalities Part 2
Today, I achieved my learning target by…
• Justifying the properties of inequalities that are denoted by:• < (less than) •≤ (less than or equal)•> (greater than)•≥ (greater than or equal)
MY PROGRESS
CHART
Before we start the Learning Target
Lesson, think about the Learning Target
for today….
How much prior knowledge do you
have regarding that goal?
Chart your prior knowledge using your pre-target score icon.
The End of Lesson 12
Properties of Inequalities