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Algebra: Absolute Value Equations & Inequalities Chapter Exam

Exam Instructions:

Choose your answers to the questions and click 'Next' to see the next set of questions. You can skip questions if you would like and come back to them later with the yellow "Go To First Skipped Question" button. When you have completed the practice exam, a green submit button will appear. Click it to see your results. Good luck!

Page 1

Question 1 1. Solve the equation: |x| = 99.

Question 2 2. What number can we substitute for x that will make the absolute value of x = 12?

Question 3 3. Solve the equation: |2x + 5| = 11.

Question 4 4. Evaluate |r+s|-(r+s) when -s = r+8.

Question 5 5. What is the first step to solving the equation |4x - 2| = 5?

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Question 6 6. What is the first step to solving the equation |2x + 1| - 5 = 7?

Question 7 7. Absolute values make positive numbers _____ and negative numbers _____.

Question 8 8. Which inequality represents the following graph?

Question 9 9. Solve the equation: |3x - 9| = 27.

Question 10 10. Solve the equation: -2|x| = 10.

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Question 11 11. Solve the equation: 3|x - 2| - 1 = 11.

Question 12 12. What does a closed dot on a number line signify?

Question 13 13. What is correct expression for the absolute value of the following number: 8?

Question 14 14. Which inequality represents the following graph?

Question 15 15. Which of the following inequalities does not have a solution?

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Question 16 16. Absolute value symbols should be treated like which one of the following?

Question 17 17. Which symbol is used to represent absolute value?

Question 18 18. Which rule do you need to remember when solving a 1-variable absolute value inequality?

Question 19 19. Evaluate |5 - 3| + 4|3 - 5|

Question 20 20. Evaluate |4 + 7| - |4 - 7|

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Question 21 21. If a question requires us to know the value of y-x, but all we know is that x+2=y, what can we do?

Question 22 22.

Express the following absolute value inequality as two inequalities.

|x + 2| > 1

Question 23 23. Evaluate |r+4| - 3|s| when r = 5 and s = -1.

Question 24 24. Solve the equation: |2x - 5| = 5.

Question 25 25. If a question requires us to know the value of |2x + y|, but all we know is that |x + y| = 5, what can we do?

Page 6

Question 26 26. Solve the equation: |x + 8| = -1.

Algebra: Absolute Value Equations & Inequalities Chapter Exam Instructions

Choose your answers to the questions and click 'Next' to see the next set of questions. You can skip questions if you would like and come back to them later with the yellow "Go To First Skipped Question" button. When you have completed the practice exam, a green submit button will appear. Click it to see your results. Good luck!

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