1. Expressing inequalities using interval notation Click here to begin the lesson Click here to begin the lesson

2. ∞ means infinity ∞ is NOT a number you can not do arithmetic with ∞ ∞ is a concept that means : “can grow large without bound” −∞ “negative infinity” means: “can grow large negative without bound” use ∞ as the right endpoint in interval notation when the interval has no number as its upper bound use −∞ as the left endpoint in interval notation when the interval has no number as its lower bound. BACK NEXT

3. Parentheses indicate that the endpoint of the interval is not included in the interval. Parentheses correspond to > and < symbols An “endpoint” of ∞ or − ∞ always has a parentheses. BACK NEXT Set Notation using InequalitiesInterval Notation { x such that x > −2}(−2, ∞ ) { x such that x < 0 }(−∞, 0) { x such that 1 < x < 5 }(1, 5) the set of all real numbers(−∞, ∞ )

4. Square Brackets indicate that the endpoint of the interval is included in the interval. Square brackets correspond to ≥ and ≤ symbols BACK NEXT Set Notation using InequalitiesInterval Notation { x such that x ≤ 5 }(− ∞, 5 ] { x such that x ≥ 7 }[ 7, ∞ ) { x such that −3 ≤ x ≤ 9 }[ −3, 9 ]

5. BACK NEXT Set Notation using InequalitiesInterval Notation one endpoint included{ x such that −3 < x ≤ 9 }( −3, 9 ] one endpoint excluded{ x such that −3 ≤ x < 9 }[ −3, 9 )

6. If a variable may be in one of several intervals, the intervals can be joined (united ) using a union symbol U = union U means OR mathematically BACK NEXT Set Notation using InequalitiesInterval Notation { x such that x 2 }(−∞, −2 ) U (2, ∞) { x such that 2 ≤ x < 4 or 7 < x ≤ 9 }[ 2, 4 ) U (7, 9 ] { x such that 2 ≤ x 8 } [ 2, 4 ) U (8, ∞)

7. A union symbol can be used to unite two or more intervals that have a “hole” A hole is a single number in between the intervals BACK NEXT Set Notation using InequalitiesInterval Notation { x such that x ≠ 6 } is the same as the set (−∞, 6 ) U (6, ∞) { x such that x 6 } { x such that x ≠ −1 and x ≠ 4 } is the same as the set (−∞, −1 ) U (−1, 4) U (4, ∞) { x such that x 4}

8. Practice Questions Need more help? Use the “Back” buttons to review the material Click the link below to watch a video about interval notation Video BACK

9. Correct! Try again NEXT BACK

10. Try again Correct! Try again NEXT BACK

11. Try Again Try again Correct NEXT BACK

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13. Try again Correct Try again NEXT BACK

14. Try again Correct! NEXT BACK

15. Correct! Try again NEXT BACK

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19. Try again Correct! Try again NEXT BACK

20. Correct! Try again NEXT BACK

21. You have completed today’s lesson on interval notation Please click the link to provide feedback about the lesson. Use the back buttons to revisit any practice problems or information Click next to watch a video about interval notati0n. BACK NEXT Feedback

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