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Get out your notebooks! Todayβs Objectives: You will be able to solve absolute value equations. Warm Up Solve the following equations. 1. β2 3π₯ β 5 β 4 π₯ + 10 = β50 2. 3 π₯ β 9 β 2 6π₯ β 3 = 6 1.4 Solving Absolute Values Find the distance between the following two points on the real number line. -5 -4 -3 -2 -1 0 1 2 3 4 5 1. 2 πππ β 5 3. β3 πππ β 1 2. β5 πππ 2 4. 1 πππ β 3 Distance The distance between two real numbers is the absolute value of their ___________. 1. 2 πππ β 5 3. β3 πππ β 1 2. β5 πππ 2 4. 1 πππ β 3 Distance Statements Rewrite the absolute value statements as distance statements. 1. 3 β 2 is the same as saying βthe distance between ____ and ____.β 2. 5 + 2 is the same as saying βthe distance between ____ and ____.β Distance Statements Rewrite the absolute value statements as distance statements. 1. π₯ β 4 is the same as saying βthe distance between ____ and ____.β 2. π₯ is the same as saying βthe distance between ____ and ____.β Distance Therefore, distances are always positive because an absolute value is always positive. Scenario Sarahβs height is "π" inches and Jessicaβs height is "π" inches. Their father wants to know how many inches separate his two daughters. Write an equation for this difference in such a way that the result will always be positive no matter which sister is taller. Copy This Downβ¦ Sarah is at mile marker 44. She is 7 miles from her exit. At what mile marker could Sarahβs exit be located? Scenario Make a visual representation on a number line of βthe distance from mile marker 44 to Sarahβs exit x is 7.β Expanded solution: How might we write a mathematical equation for this visual representation? Examples Write a sentence in words, draw a graph, and identify the solutions. 1. π₯β0 =2 words: the distance from π₯ to 0 is _____. -5 -4 -3 -2 -1 0 1 2 3 4 π =______ or π =______ 5 Examples Write a sentence in words, draw a graph, and identify the solutions. 2. π₯ =5 words: _____________________________. -5 -4 -3 -2 -1 0 1 2 3 4 π =______ or π =______ 5 Examples Write a sentence in words, draw a graph, and identify the solutions. 3. π₯β1 =3 words: _____________________________. -5 -4 -3 -2 -1 0 1 2 3 4 π =______ or π =______ 5 Examples Write a sentence in words, draw a graph, and identify the solutions. 4. 1βπ₯ =3 words: _____________________________. -5 -4 -3 -2 -1 0 1 2 3 4 π =______ or π =______ 5 Examples Write a sentence in words, draw a graph, and identify the solutions. 5. π₯+1 =4 words: _____________________________. -5 -4 -3 -2 -1 0 1 2 3 4 π =______ or π =______ 5 Examples Write a sentence in words, draw a graph, and identify the solutions. 6. π₯+2 =3 words: _____________________________. π =______ or π =______ Examples Write a sentence in words, draw a graph, and identify the solutions. 7. π₯β5 =0 words: _____________________________. π =______ or π =______ Examples Write a sentence in words, draw a graph, and identify the solutions. 8. π₯ + 3 = β4 words: _____________________________. π =______ or π =______ Generalizing 9. π₯βπ =π words: _______________________________. Which value (π or π) is plotted first?_____ Which value tells the difference?_____ π =______ or π =______ Word Problem Identical vacation cottages, equally spaced along a street, are numbered consecutively. Maria lives in cottage #17. Joshua lives 4 cottages away from Maria. If π represents Joshuaβs cottage number, then write an inequality that expresses this situation. Draw a visual representation on a number line, and solve the inequality. Examples 10. 2 = 22 2 π₯ β 6 = 22 π =______ or π =______ Examples 11. 9 + 3 = 12 9 + 3 π₯ + 8 = 12 π =______ or π =______ Examples 12. 4π₯ β 2 = 10 4π₯ ππ =______ or ππ =______ π =______ or π =______ Examples 13. 200 β 3π₯ = 896 3π₯ ππ =______ or ππ =______ π =______ or π =______ Examples 14. 2π₯ + 3 = 5 Examples 15. 70 + 5π₯ = 15 Examples 16. 3 2π₯ β 3 β 5 = 4 Examples 17. β2 5π¦ β 1 = β48 Ticket Out The Door 1. Write an absolute value equation that corresponds toβ¦ The carnival guesser tried to guess Aidenβs weight, but she was off by 9 pounds. Aiden actually weights 168 lbs. There are two guesses she could have made, what are they? 2. Draw a visual representation on a number line, and 3. Solve the equation. Homework Lesson 1.4 Pg. 30 #βs 23-24, 27-32
