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1. Five-Minute Check (over Lesson 1–6) Mathematical Practices Then/Now New Vocabulary Key Concept: Solving Systems of Inequalities Example 1: Intersecting Regions Example 2: Separate Regions Example 3: Real-World Example: Write and Use a System of Inequalities Example 4: Find Vertices Lesson Menu

2. A. B.(1, –1) C. D.(–1, 1) Solve the system of equations y = 3x – 2 and y = –3x + 2 by graphing. 5-Minute Check 1

3. A. B.(1, –1) C. D.(–1, 1) Solve the system of equations y = 3x – 2 and y = –3x + 2 by graphing. 5-Minute Check 1

4. Graph the system of equations 2x + y = 6 and 3y = –6x + 6. Describe it as consistent and independent, consistent and dependent, or inconsistent. A. consistent and independent B. consistent and dependent C. inconsistent 5-Minute Check 2

5. Graph the system of equations 2x + y = 6 and 3y = –6x + 6. Describe it as consistent and independent, consistent and dependent, or inconsistent. A. consistent and independent B. consistent and dependent C. inconsistent 5-Minute Check 2

6. A test has 30 questions worth a total of 100 points. Each multiple choice question is worth 4 points and each true/false question is worth 3 points. How many of each type of question are on the test? A. 5 multiple choice, 25 true/false B. 10 multiple choice, 20 true/false C. 15 multiple choice, 15 true/false D. 20 multiple choice, 10 true/false 5-Minute Check 3

7. A test has 30 questions worth a total of 100 points. Each multiple choice question is worth 4 points and each true/false question is worth 3 points. How many of each type of question are on the test? A. 5 multiple choice, 25 true/false B. 10 multiple choice, 20 true/false C. 15 multiple choice, 15 true/false D. 20 multiple choice, 10 true/false 5-Minute Check 3

8. Mathematical Practices 1 Make sense of problems and persevere in solving them. Content Standards A.REI.12 Graph the solutions to a linear inequality in two variables as a half-plane (excluding the boundary in the case of a strict inequality), and graph the solution set to a system of linear inequalities in two variables as the intersection of the corresponding half planes. A.CED.3 Represent constraints by equations or inequalities, and by systems of equations and/or inequalities, and interpret solutions as viable or nonviable options in a modeling context. MP

9. You solved systems of linear equations graphically and algebraically. • Solve systems of inequalities by graphing. • Determine the coordinates of the vertices of a region formed by the graph of a system of inequalities. Then/Now

10. system of inequalities Vocabulary

11. Concept

12. Solve the system of inequalities by graphing. y ≥ 2x – 3y < –x + 2 Intersecting Regions Solution of y ≥ 2x – 3 → Regions 1 and 2 Solution of y < –x + 2 → Regions 2 and 3 Example 1

13. Intersecting Regions Answer: Example 1

14. Intersecting Regions Answer: Example 1

15. A. B. C. D. Solve the system of inequalities by graphing.y≤ 3x – 3y > x + 1 Example 1

16. A. B. C. D. Solve the system of inequalities by graphing.y≤ 3x – 3y > x + 1 Example 1

17. Solve the system of inequalities by graphing. Separate Regions Graph both inequalities. The graphs do not overlap, so the solutions have no points in common and there is no solution to the system. Answer: Example 2

18. Solve the system of inequalities by graphing. Separate Regions Graph both inequalities. The graphs do not overlap, so the solutions have no points in common and there is no solution to the system. Answer: The solution set is Ø. Example 2

19. A. B. C. D. Solve the system of inequalities by graphing. Example 2

20. Solve the system of inequalities by graphing. A. B. C. D. Example 2

21. MEDICINE Medical professionals recommend that patients have a cholesterol level c below 200 milligrams per deciliter (mg/dL) of blood and a triglyceride level t below 150 mg/dL. Write and graph a system of inequalities that represents the range of cholesterol levels and triglyceride levels for patients. Let c represent the cholesterol levels in mg/dL. Write and Use a System of Inequalities It must be less than 200 mg/dL. Since cholesterol levels cannot be negative, we can write this as 0 ≤ c < 200. Example 3

22. Graph all of the inequalities. Any ordered pair in the intersection of the graphs is a solution of the system. Write and Use a System of Inequalities Let t represent the triglyceride levels in mg/dL. It must be less than 150 mg/dL. Since triglyceride levels also cannot be negative, we can write this as 0 ≤ t < 150. Answer: Example 3

23. Graph all of the inequalities. Any ordered pair in the intersection of the graphs is a solution of the system. Write and Use a System of Inequalities Let t represent the triglyceride levels in mg/dL. It must be less than 150 mg/dL. Since triglyceride levels also cannot be negative, we can write this as 0 ≤ t < 150. Answer: 0 ≤ c < 2000 ≤ t < 150 Example 3

24. A category 3 hurricane has wind speeds of 111-130 miles per hour and a storm surge of 9-12 feet above normal. Write and graph a system of inequalities to represent this situation. Example 3

25. A. B. C. D. Which graph represents this? Example 3

26. A. B. C. D. Which graph represents this? Example 3

27. Example 4 Find the coordinates of the vertices of the triangle formed by 2x – y≥ –1, x + y ≤ 4, and x + 4y ≥ 4. Find Vertices Graph each inequality. The intersection of the graphs forms a triangle. Answer:

28. Find the coordinates of the vertices of the triangle formed by 2x – y≥ –1, x + y ≤ 4, and x + 4y ≥ 4. Find Vertices Graph each inequality. The intersection of the graphs forms a triangle. Answer: The vertices of the triangle are at (0, 1), (4, 0), and (1, 3). Example 4

29. Find the coordinates of the vertices of the triangle formed by x + 2y ≥ 1, x + y ≤ 3, and –2x + y ≤ 3. A. (–1, 0), (0, 3), and (5, –2) B. (–1, 0), (0, 3), and (4, –2) C. (–1, 1), (0, 3), and (5, –2) D. (0, 3), (5, –2), and (1, 0) Example 4

30. Find the coordinates of the vertices of the triangle formed by x + 2y ≥ 1, x + y ≤ 3, and –2x + y ≤ 3. A. (–1, 0), (0, 3), and (5, –2) B. (–1, 0), (0, 3), and (4, –2) C. (–1, 1), (0, 3), and (5, –2) D. (0, 3), (5, –2), and (1, 0) Example 4