: Absolute Value Equations and Inequalities Warm-Up Exercise 1. Watch the absolute value video on YouTube Math Shorts Episode 10 and then answer the questions below. https://www.youtube.com/watch?v=wrof6dw63es A. 1.3 = B. 4.75 = C. 10 + 4 = D. 11 21 = E. if x = 4.5, then x= or F. if x + 3 = 6, then x= or 2. Use the number lines below to graph each inequality. A. x < 4 B. x > -1 C. 2 + x < 5 : Absolute Value Equations and Inequalities Date: 4/26/16 S.165
Exploratory Exercise First, let s look at absolute value equations, like we saw in Exercise 1E and 1F. 3. For each absolute value equation below, think about any values of x that will make the equation true. Are there two solutions for each one? A. x 2= 4 B. x 2 = 4 C. 2 x = 4 D. x = 4 4. Kyle wrote the following steps to solve absolute value equations. 1. Get the absolute value term alone. You can add, subtract, multiply or divide to get it alone. 2. You have to make two equations. Take what is in the absolute value symbol and make it equal to the number on the other side of the equal sign and also take that same inside part and set it equal to the opposite of the number on the other side of the equal sign. 3. Solve each equation. 4. Check your work. A. Use Kyle s steps to solve x + 1 2= 7. B. What other steps should be added to Kyle s steps to cover all absolute value situations? : Absolute Value Equations and Inequalities Date: 4/26/16 S.166
Hart Interactive Algebra 1 5. Play the Who Wants to be a Hundredaire Game and record your work and answers below. The questions below are mixed up so you ll have to look carefully for the one that is being played on the video. There are two extra problem below that are not on the video. http://www.math-play.com/absolute-valueequations/absolute-value-millionaire.html A. k + 9 = 2 B. 2x = 12 C. 2 3x = 24 D. 2 x + 10 = 14 E. 2 x 4 = 14 F. n +1 = 7 G. 2 + x = 1 H. 10 10n = 50 I. a 6 =7 K. n 4 =3 L. 5y 10 = 15 J. 3x = 48 : Date: Absolute Value Equations and Inequalities 4/26/16 S.167
Next, we ll combine two ideas inequalities and absolute value. 6. For each inequality below, think about all the points that would make the inequality true and plot those points. What type of endpoint should each inequality have? Are there other points that would also make the inequality true? A. x < 4 B. x 1 C. 1+ x 3 Tanja says that there is a better way to get the solutions, rather than just guessing. Below are her steps. Isolate the absolute value expression on the left side of the inequality. Your equation either has no solution or all real numbers as solutions. Use the sign of each side of your inequality to decide which of these cases holds. Remove the absolute value bars by setting up a compound inequality. The type of inequality sign in the problem will tell us how to set up the compound inequality. (stuff inside absolute value) > (number) - (number) < (stuff inside absolute value) < (number) OR (stuff inside absolute value) < - (number) Think greator! Think less thand! : Absolute Value Equations and Inequalities Date: 4/26/16 S.168
5. A. Follow Tanja s steps for the absolute value inequality 23x 1< 20. Be sure to show each step. B. Graph the solution set on the number line. 6. A. Follow Tanja s steps for the absolute value inequality 1 2x + 3 + 6< 5. Be sure to show each step. 2 B. Graph the solution set on the number line. 7. A. Follow Tanja s steps for the absolute value inequality 3x + 2 + 6 5. Be sure to show each step. B. Graph the solution set on the number line. C. Does Tanya s steps work for < or > absolute value problems? Explain. : Absolute Value Equations and Inequalities Date: 4/26/16 S.169
Compare and Contrast Kyle and Tanja s Absolute Value Steps 8. Work with your partner to find at least two true statements for each section of the Venn diagram. In the overlapping section, write two statements that are true for both procedures. Kyle s Absolute Value Steps Tanja s Absolute Value Steps : Absolute Value Equations and Inequalities Date: 4/26/16 S.170
Homework Problem Set Solve each absolute value equation. Write your answer in set notation. 1. k 6 = 10 2. a + 6= 13 3. 10 + n = 4 8 4. 3r = 27 5. n = 2 4 6. 6 7r + 4= 38 7. 810+ p 6= 22 8. 10 + 3 2r = 22 9. 2+ 8 7k 2 = 42 10. 73n + 5 7= 0 : Absolute Value Equations and Inequalities Date: 4/26/16 S.171
Solve and graph each absolute value inequality. 11. r < 1 12. p 10 < 15 13. n 9 5 14. r 1+ > 0 10 15. k 5 > 13 16. 4 7n 3 > 2 17. 10 p 7 > 97 18. 8 5+ 6m 7 49 : Absolute Value Equations and Inequalities Date: 4/26/16 S.172
19. Lindsey is making some home-made toffee. The recipe says that she must bring the mixture to a boil at 285 degrees. If she is 7 degrees above or below, the toffee should turn out fine. A. Write and solve an absolute value equation to model the minimum and maximum temperatures that would still create yummy toffee. B. Write, solve, and graph an absolute value inequality to model the range of temperatures that will make yummy toffee. CHALLENGE PROBLEMS 20 22 20. Solve for x using the inequality ax b+ c d. Assume that d c > 0. : Absolute Value Equations and Inequalities Date: 4/26/16 S.173
21. Write a simple inequality with an absolute value symbol whose solution would be represented by the graph shown below. 22. A student made an error in the following problem. Determine where the error was made and then complete the problem correctly. x + 3 + 9< 5 x + 3 < 4 4< x + 3< 4 1< x < 7 : Absolute Value Equations and Inequalities Date: 4/26/16 S.174