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SECTION 12.1-12.3 REVIEW Arithmetic and Geometric Sequences and Series

SECTION 12.1-12.3 REVIEW Arithmetic and Geometric Sequences and Series. 12.1 Arithmetic Sequences and Series. Arithmetic Series. Geometric Series. Sum of Terms. Sum of Terms. An introduction…………. Arithmetic Sequences. Geometric Sequences. ADD To get next term. MULTIPLY

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SECTION 12.1-12.3 REVIEW Arithmetic and Geometric Sequences and Series

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  1. SECTION 12.1-12.3 REVIEW Arithmetic and Geometric Sequences and Series

  2. 12.1 Arithmetic Sequences and Series

  3. Arithmetic Series Geometric Series Sum of Terms Sum of Terms An introduction………… Arithmetic Sequences Geometric Sequences ADD To get next term MULTIPLY To get next term

  4. Find the next four terms of –9, -2, 5, … Arithmetic Sequence 7 is referred to as the common difference (d) Common Difference (d) – what we ADD to get next term Next four terms……12, 19, 26, 33

  5. Find the next four terms of 0, 7, 14, … Arithmetic Sequence, d = 7 21, 28, 35, 42 Find the next four terms of x, 2x, 3x, … Arithmetic Sequence, d = x 4x, 5x, 6x, 7x Find the next four terms of 5k, -k, -7k, … Arithmetic Sequence, d = -6k -13k, -19k, -25k, -32k

  6. Vocabulary of Sequences (Universal)

  7. Given an arithmetic sequence with x 38 15 NA -3 X = 80

  8. -19 353 ?? 63 x 6

  9. 1.5 x 16 NA 0.5 Try this one:

  10. 9 633 x NA 24 X = 27

  11. -6 20 29 NA x

  12. The two arithmetic means are –1 and 2, since –4, -1, 2, 5 forms an arithmetic sequence Find two arithmetic means between –4 and 5 -4, ____, ____, 5 -4 5 4 NA x

  13. The three arithmetic means are 7/4, 10/4, and 13/4 since 1, 7/4, 10/4, 13/4, 4 forms an arithmetic sequence Find three arithmetic means between 1 and 4 1, ____, ____, ____, 4 1 4 5 NA x

  14. Find n for the series in which 5 y x 440 3 Graph on positive window X = 16

  15. The sum of the first n terms of an infinite sequence is called the nth partial sum. Example: The nth Partial Sum

  16. Example 6. Find the 150th partial sum of the arithmetic sequence, 5, 16, 27, 38, 49, …

  17. Example 7. An auditorium has 20 rows of seats. There are 20 seats in the first row, 21 seats in the second row, 22 seats in the third row, and so on. How many seats are there in all 20 rows?

  18. Example 8. A small business sells $10,000 worth of sports memorabilia during its first year. The owner of the business has set a goal of increasing annual sales by $7500 each year for 19 years. Assuming that the goal is met, find the total sales during the first 20 years this business is in operation. So the total sales for the first 2o years is $1,625,000

  19. 12.2 Geometric Sequences and Series

  20. Arithmetic Series Geometric Series Sum of Terms Sum of Terms Arithmetic Sequences Geometric Sequences ADD To get next term MULTIPLY To get next term

  21. Vocabulary of Sequences (Universal)

  22. Find the next three terms of 2, 3, 9/2, ___, ___, ___ 3 – 2 vs. 9/2 – 3… not arithmetic

  23. 1/2 x 9 NA 2/3

  24. The two geometric means are 6 and -18, since –2, 6, -18, 54 forms an geometric sequence Find two geometric means between –2 and 54 -2, ____, ____, 54 -2 54 4 NA x

  25. -3, ____, ____, ____

  26. x 9 NA

  27. x 5 NA

  28. *** Insert one geometric mean between ¼ and 4*** *** denotes trick question 1/4 3 NA

  29. 1/2 7 x

  30. Section 12.3 – Infinite Series

  31. 1, 4, 7, 10, 13, …. No Sum Infinite Arithmetic Finite Arithmetic 3, 7, 11, …, 51 Finite Geometric 1, 2, 4, …, 64 1, 2, 4, 8, … Infinite Geometric r > 1 r < -1 No Sum Infinite Geometric -1 < r < 1

  32. Find the sum, if possible:

  33. Find the sum, if possible:

  34. Find the sum, if possible:

  35. Find the sum, if possible:

  36. Find the sum, if possible:

  37. 50 40 40 32 32 32/5 32/5 The Bouncing Ball Problem – Version A A ball is dropped from a height of 50 feet. It rebounds 4/5 of it’s height, and continues this pattern until it stops. How far does the ball travel?

  38. 100 100 75 75 225/4 225/4 The Bouncing Ball Problem – Version B A ball is thrown 100 feet into the air. It rebounds 3/4 of it’s height, and continues this pattern until it stops. How far does the ball travel?

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