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Lesson 9-5 Pages 387-390

Lesson 9-5 Pages 387-390. Combinations. Lesson Check 9-4. What you will learn!. How to find the number of combinations of a set of objects. Vocabulary. What you really need to know!. An arrangement, or listing, of objects in which order is not important is called a combination.

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Lesson 9-5 Pages 387-390

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  1. Lesson 9-5 Pages 387-390 Combinations Lesson Check 9-4

  2. What you will learn! How to find the number of combinations of a set of objects.

  3. Vocabulary

  4. What you really need to know! An arrangement, or listing, of objects in which order is not important is called a combination.

  5. What you really need to know! You can find the number of combinations of objects by dividing the number of permutations of the entire set by the number of ways each smaller set can be arranged.

  6. Link to Pre-Made Lesson

  7. Example 1: Ada can select from seven paint colors for her room. She wants to choose two colors. How many different pairs of colors can she choose?

  8. Let’s use ROYGBIV to represent the colors.

  9. Let’s eliminate all duplicates in the list.

  10. There are 21 different pairs of colors.

  11. Example 1: Method 2 21 pairs of colors! There are 7 choices for the first color and 6 choices for the second color. There are 2 ways to arrange two colors.

  12. Example 2: Combination! Tell whether the situation represents a permutation or combination. Then solve the problem. From an eight-member track team, three members will be selected to represent the team at the state meet. How many ways can these three members be selected.

  13. There are 8 members for the first position, 7 for the second and 6 for the third. 3 people can be arranged in 6 ways.

  14. Example 3: Permutation! Tell whether the situation represents a permutation or combination. Then solve the problem. In how many ways can you choose the first, second, and third runners in a relay race from the eight members of the track team?

  15. There are 8 members for the first position, 7 for the second and 6 for the third.

  16. Page 389 Guided Practice #’s 4-6

  17. Read: Pages 387-388 with someone at home and study examples!

  18. Homework: Page 389-390 #’s 7-16 all #’s 19-32 Lesson Check 9-5

  19. Link to Lesson 9-5 Review Problems

  20. Page 586 Lesson 9-5

  21. Lesson Check 9-5

  22. Example 2: Ten managers attend a business meeting. Each person exchanges names with each other person once. How many introductions will there be?

  23. Example 2: 45 exchanges! There are 10 choices for one of the people exchanging names and 9 choices for the second person. There are 2 ways to arrange two people.

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