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2-1 Absolute Value Equations TEKS FOCUS VOCABULARY ĚAbsolute value – The absolute TEKS (6)(E) Solve absolute value linear equations. value of a real number x, written |x|, is its distance from zero on a number line. TEKS (1)(B) Use a problem–solving model that incorporates analyzing given information, formulating a plan or strategy, determining a solution, justifying the solution, and evaluating the problem–solving process and the reasonableness of the solution. formulate a plan or strategy to solve a problem. ĚStrategy – a plan or method for solving a problem ĚExtraneous solution – An extraneous ĚReasonableness – the quality of solution is a solution derived from an original equation that is not a solution to the original equation. being within the realm of common sense or sound reasoning. The reasonableness of a solution is whether or not the solution makes sense. ĚFormulate – create with careful Additional TEKS (1)(D), (1)(E), (6)(D) effort and purpose. You can ESSENTIAL UNDERSTANDING An absolute value quantity is nonnegative. Since opposites have the same absolute value, an absolute value equation can have two solutions. Key Concept Absolute Value Definition Numbers The absolute value of a real number x, written 0 x 0 , is its distance from zero on the number line. Absolute Value Equation 0x0 = a 040 = 4 0 -4 0 = 4 Meaning the distance between x and 0 is a units Symbols 0 x 0 = x, if x Ú 0 0 x 0 = -x, if x 6 0 Graph and Solution Problem 1 P a 0 a x = -a or x = a TEKS Process Standard (1)(E) Solving an Absolute Value Equation How is solving this equation different from solving a linear equation? In the absolute value equation, 2x - 1 can represent two opposite quantities. What is the solution of ∣ 2x − 1 ∣ = 5? Graph the solution. W 0 2x - 1 0 = 5 2x - 1 = 5 Lesson 2-1 2x - 1 = -5 2x = 6 x=3 3 2 1 36 or 0 2x = -4 x = -2 or 1 Absolute Value Equations 2 3 Rewrite as two equations. 2x 1 could be 5 or 5. Add 1 to each side of both equations. Divide each side of both equations by 2. continued on next page ▶ Problem 1 continued Check 0 2(3) - 1 0 ≟ 5 0 2( -2) - 1 0 ≟ 5 06 - 10 ≟5 0 -4 - 1 0 ≟ 5 050 = 5 ✔ 0 -5 0 = 5 ✔ Problem bl 2 Solving a Multi-Step Absolute Value Equation Is there a simpler way to think of this problem? Solving 30x + 20 - 1 = 8 is similar to solving 3y - 1 = 8. What is the solution of 3 ∣ x + 2 ∣ − 1 = 8? Graph the solution. W 30x + 20 - 1 = 8 30x + 20 = 9 Add 1 to each side. 0x + 20 = 3 Divide each side by 3. x+2=3 or x + 2 = -3 x=1 or x = -5 5 4 3 2 1 0 1 2 Rewrite as two equations. Subtract 2 from each side of both equations. 3 Check 3 0 (1) + 2 0 - 1 ≟ 8 3 0 ( -5) + 2 0 - 1 ≟ 8 3030 - 1≟8 3 0 -3 0 - 1 ≟ 8 8=8 ✔ 8=8 ✔ Problem P bl 3 Can you solve this the same way as you solved Problem 1? Yes, let 3x + 2 equal 4x + 5 and -(4x + 5). Checking for Extraneous Solutions C What is the solution of ∣ 3x + 2 ∣ = 4x + 5? Check for extraneous solutions. W 0 3x + 2 0 = 4x + 5 3x + 2 = 4x + 5 or -x = 3 3x + 2 = -(4x + 5) Rewrite as two equations. 3x + 2 = -4x - 5 Solve each equation. 7x = -7 x = -3 or Check 0 3( -3) + 2 0 ≟ 4( -3) + 5 0 -9 + 2 0 ≟ -12 + 5 0 -7 0 ≠ -7 ✘ x = -1 0 3( -1) + 2 0 ≟ 4( -1) + 5 0 -3 + 2 0 ≟ -4 + 5 0 -1 0 = 1 ✔ Since x = -3 does not satisfy the original equation, -3 is an extraneous solution. The only solution to the equation is x = -1. PearsonTEXAS.com 37 Problem 4 P TEKS Process Standard (1)(B) Formulating an Absolute Value Equation You drive 8 miles from home to a gym. After your workout, you drive to a farm that is m miles from your home on the same road as your home and the gym. After buying some fruits and vegetables, you drive back to the gym where you have left your cell phone. So far, you have driven a total of 15 miles. Formulate an absolute value equation to represent this situation. You know the distance from home to the gym. The distance from home to the farm is m. The farm is m miles from home, in either direction from the gym. So, use absolute value to represent the distance from the gym to the farm. Write an equation. You traveled the distance between the gym and the farm twice. distance to gym = 8 distance to farm = m distance from gym to farm = |8 – m| total distance traveled 15 = 8 + |8 – m| + |8 – m| NLINE HO ME RK O An absolute value equation representing this situation is 15 = 8 + 2 0 8 - m 0 . WO PRACTICE and APPLICATION EXERCISES Scan page for a Virtual Nerd™ tutorial video. Solve each equation. Check your answers. For additional support when completing your homework, go to PearsonTEXAS.com. 1. 0 3x 0 = 18 2. 0 -4x 0 = 32 3. 0 x - 3 0 = 9 4. 2 0 3x - 2 0 = 14 5. 0 3x + 4 0 = -3 6. 0 2x - 3 0 = -1 7. 0 x + 4 0 + 3 = 17 8. 0 4 - z 0 - 10 = 1 Solve each equation. Check for extraneous solutions. 9. 0 x - 1 0 = 5x + 10 38 Lesson 2-1 10. 0 2z - 3 0 = 4z - 1 11. 0 3x + 5 0 = 5x + 2 12. 0 2y - 4 0 = 12 13. 3 0 4w - 1 0 - 5 = 10 14. 0 2x + 5 0 = 3x + 4 Absolute Value Equations 15. Write an absolute value equation to describe the graph. 4 2 0 2 4 Solve each equation. 16. - 0 4 - 8b 0 = 12 17. 4 0 3x + 4 0 = 4x + 8 18. 0 3x - 1 0 + 10 = 25 1 19. 2 0 3c + 5 0 = 6c + 4 20. 5 0 6 - 5x 0 = 15x - 35 21. 7 0 8 - 3h 0 = 21h - 49 22. 6 0 2x + 5 0 = 6x + 24 23. 14 0 4x + 7 0 = 8x + 16 24. 23 0 3x - 6 0 = 4(x - 2) Create Representations to Communicate Mathematical Ideas (1)(E) Write an absolute value equation that represents each set of numbers. 25. all real numbers exactly 6 units from 0 26. all real numbers exactly 5 units from 3 Apply Mathematics (1)(A) Write an absolute value equation to represent each situation. 27. A fence extends from the side of a house. A dog is tied to a fence post ten feet from the side of the house. The dog’s leash is six feet long. Let d be the greatest and least distance from the house that the dog can reach along the fence. 10 ft 28. A factory produces widgets whose length must be within 1.5 mm of an ideal length of 47 mm. A factory supervisor wants to mark rulers with the least and greatest acceptable length for each widget for workers to use in quality control inspections. Let ℓ be the length of the markings along the ruler. 6 ft 29. You and your friends Jose and Sarah all live on the same street. You know that Jose lives five blocks away from you. Jose says that Sarah lives two blocks from him, but he didn’t say whether she lives closer to you than he does or further. Let b be the number of blocks Sarah might live from you. Is the absolute value equation always, sometimes, or never true? Explain. 30. 0 x 0 = -6 31. 0 x 0 = x 32. 0 x 0 + 0 x 0 = 2x 33. 0 x + 2 0 = x + 2 Solve each equation for x. 34. 0 ax 0 - b = c 35. 0 cx - d 0 = ab 36. a 0 bx - c 0 = d Write an absolute value equation that has the given solution. 37. - 3 and 3 38. 2 and 4 39. - 1 and 5 40. 3 and 4 41. 0 42. 7 43. - 11 44. no solution 45. infinitely many solutions PearsonTEXAS.com 39 Use Multiple Representations to Communicate Mathematical Ideas (1)(D) In the diagram, your office is shown as 12 miles from home. The question marks represent possible locations of a pizza parlor, which is x miles from your home. Use the diagram for Exercises 46–49. Office Home ? 12 miles 46. Formulate an absolute value equation to represent d, where d represents the distance from the office to the pizza parlor. 47. Formulate an absolute value equation to represent e, where e represents the total distance to drive from the office to the pizza parlor, and then back to the office. 48. If f = 12 + 0 12 - x 0 , describe in words what the distance f might represent. 49. Is it possible to formulate an absolute value equation to represent g, if g is the total distance driven from home to the office, to the pizza parlor, and then home? Explain. TEXAS Test Practice T 50. What is the positive solution of 0 3x + 8 0 = 19? 51. What is the solution of 0 2x - 4 0 = 16? A. 10 C. 10, - 6 B. 10, - 10 D. 6, - 6 52. How many solutions does the equation 0 4x + 7 0 = -3 have? F. 0 G. 1 H. 2 J. infinitely many 53. The packing material for a particular computer needs to be within 0.5 mm of the desired thickness, which is 27.5 mm. Which equation represents the limits of the width of the packing material? 40 Lesson 2-1 A. 0 w + 27.5 0 = 0.5 C. 0 w + 0.5 0 = 27.5 B. 0 w - 0.5 0 = 27.5 D. 0 w - 27.5 0 = 0.5 Absolute Value Equations ?