1. Sequences and Series (Section 9.4 in Textbook)

3. How are these sets related? 3, 6, 9, 12, 15, 18, 21, 24, … 25, 20, 15, 10, 5, 0, -5, -10, … -21, 3, 27, 51, 75, 99, 123, …

4. Arithmetic Sequence An arithmetic sequence is defined as a sequence in which there is a common difference between consecutive terms. Recursive Formula: C o m m o n D i f f e r e n c e = 5 a n = a n-1 + d

5. Is the given sequence arithmetic? If so, identify the common difference. 1.2, 4, 8, 16, … 2.4, 6, 12, 18, 24, … 3.2, 5, 7, 12, … 4.48, 45, 42, 39, … 5.1, 4, 9, 16, … 6.10, 20, 30, 40, …

6. Arithmetic Sequence Explicit Formula The “nth” number in the sequence. Ex. a 5 is the 5 th number in the sequence. The 1 st number in the sequence. The same as the n in a n. If you’re looking for the 5 th number in the sequence, n = 5. The common difference. a n = a 1 + (n – 1) d

7. Examples: 1) Given the sequence -4, 5, 14, 23, 32, 41, 50,…, find the 14 th term. a n = a 1 + (n – 1) d 2) Given the sequence 79, 75, 71, 67, 63,…, find the term number that is -169.

8. For the arithmetic sequence: -5, -2, 1, 4,… find: The common difference: The 10 th term: Recursive rule for the nth term: Explicit rule for the nth term:

9. Example: Suppose you are saving up for a new gaming system. You have 100 dollars this year, and you plan to add 33 dollars each of the following years. How much money will you have in 7 years? a n = a 1 + (n – 1) d

10. Constructing Sequences The 4 th and 7 th terms of an arithmetic sequence are -8 and 4, respectively. Find the 1 st term and a explicit rule for the nth term.

12. Geometric sequences are different. See if you can spot the relationship! 3, 6, 12, 24, 48, 96,… 81, 27, 9, 3, 1, ⅓,… -2, 4, -8, 16, -32, 64, -128

13. Geometric Sequences An geometric sequence is defined as a sequence in which there is a common ratio between consecutive terms. C o m m o n R a t i o = 2 a n = a n-1  r Recursive Formula:

14. The 1 st number in the sequence. Geometric Sequence Formula The “nth” number in the sequence. Ex. a 5 is the 5 th number in the sequence. The common ratio. The same as the n in a n. If you’re looking for the 5 th number in the sequence, n = 5. a n = a 1 r (n-1)

15. Examples: 1) Given the sequence 4, 28, 196, 1372, 9604,…, find the 14 th term. a n = a 1 r (n-1) 2) Given the sequence 1, 5, 25, 125, 625,…, find the term number that is 9,765,625.

16. Example : Suppose you want a reduced copy of a photograph. The actual length of the photograph is 10 in. The smallest size the copier can make is 64% of the original. Find the length of the photograph after five reductions. a n = a 1 r (n-1)

17. The common ratio: The 8 th term: Recursive rule for the nth term: Explicit rule for the nth term: You Try! For the geometric sequence: 1, -2, 4, -8, 16,… find :

18. Fibonacci Sequence The Fibonacci sequence can be defined recursively by: a 1 = 1; a 2 = 1; a n = a n-2 + a n-1 (For all positive integers n ≥ 3) 0, 1, 1, 2, 3, 5, 8, 13, 21, 34, 55, 89, 144, … Link: http://www.maths.surrey.ac.uk/hosted- sites/R.Knott/Fibonacci/fibnat.html

19. Sum of numbers 1-100?

21. Series A series is the sum of the terms in a sequence. 3 + 6 + 9 + 12 + 15 + 18 + 21 + 24 + 27 = 135

22. Series Formulas Arithmetic Series S n = – (a 1 + a n ) Geometric Series S n = n2n2 a 1 (1 – r n ) (1 – r) ________

23. 1)Evaluate a series with the terms 1, 7, 13, 19, 25 for the first 13 terms. 1)Find the sum of the first 10 terms of the geometric series with a 1 = 6 and r = 2.

24. A philanthropist donates $50 to the SPCA. Each year, he pledges to donate 12 dollars more than the previous year. In 8 years, what is the total amount he will have donated?

25. Summation Notation Instead of saying: “Find the sum of the series denoted by a n = 3n + 2 from the 3 rd term to 7 th term,” mathematicians made up a symbol to deal with it. Sigma! I’m just a fancy way of saying, “Add everything up!”

26. sequence formula last term first term “Find the sum of the series denoted by a n = 3n + 2 from the 3 rd term to 7 th term” now looks like:

27. Evaluating Using Summation Notation

28. Ex) Use summation notation to write each series for the specified number of terms. 3 + 8 + 13 + 18 + …; n = 9

29. Sum of a Finite Arithmetic Sequence Let {a 1, a 2, a 3, ….} be a finite arithmetic sequence with common difference d. Then the sum of the terms of the sequence is

30. Find the sum of the arithmetic sequence: 1, 2, 3, 4, ……, 80

31. Rewrite the sum using Sigma Notation 5 + 9 + 13 +17 + … + 85

32. Sum of a Finite Geometric Sequence Let {a 1, a 2, a 3, ….., a n } be a finite geometric sequence with common ratio r ≠ 1. Then the sum of the terms of the sequence is

33. Ex) Find the sum of the geometric sequence 3, 6, 12, ……, 12288

34. Infinite Geometric Series Geometric series are special. Sometimes we can find their sum, even if they go on forever. In order to do this, we need to decide if the series is convergent or divergent.

35. Convergent Geometric Series The following series are convergent because the terms eventually approach 0.

36. Divergent Geometric Series The following series are divergent because the terms do not have a limit.

37. Sum of an Infinite Geometric Series The geometric series Converges if and only if. If it does converge, the sum is S=

38. Examples Determine whether each infinite geometric series diverges or converges. If it converges, find the sum. a) 1 – 1/3 + 1/9 - … b) 4 + 8 + 16 + …

39. Determine whether the infinite geometric series converges. If it does, find the sum.

40. Rational Numbers Repeating decimals are considered rational numbers because they can be represented as a ratio of two integers. A number is rational if you can write it in a form a/b where a and b are integers, b not zero.

41. Since 0.11111... = 1/9, then the decimal number 0.11111... is a rational number. In fact, every non-terminating decimal number that REPEATS a certain pattern of digits, is a rational number. For example, let's make up a decimal number 0.135135135135135... that never ends. Do you believe we CAN write it as a fraction, in the form a/b?

42. Express the rational numbers as a fractions of integers 1) 7.14141414 2) -17.268268268