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The importance of sequences and infinite series in calculus stems from Newton’s idea of representing functions as sums of infinite series.  For instance,

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Presentation on theme: "The importance of sequences and infinite series in calculus stems from Newton’s idea of representing functions as sums of infinite series.  For instance,"— Presentation transcript:

1 The importance of sequences and infinite series in calculus stems from Newton’s idea of representing functions as sums of infinite series.  For instance, in finding areas, he often integrated a function by first expressing it as a series and then integrating each term of the series. INFINITE SEQUENCES AND SERIES

2 We will pursue his idea in a later section in order to integrate such functions as e -x 2.  Recall that we have previously been unable to do this. INFINITE SEQUENCES AND SERIES

3 Many of the functions that arise in physics and chemistry, such as Bessel functions, are defined as sums of series.  It is important to be familiar with the basic concepts of convergence of infinite sequences and series. INFINITE SEQUENCES AND SERIES

4 Physicists also use series in another way; they use them to approximate functions in certain situations.  In studying fields as diverse as optics, special relativity, and electromagnetism, they analyze phenomena by replacing a function with the first few terms in the series that represents it. INFINITE SEQUENCES AND SERIES

5 11.1 Sequences In this section, we will learn about: Various concepts related to sequences. INFINITE SEQUENCES AND SERIES

6 SEQUENCE A sequence can be thought of as a list of numbers written in a definite order: a 1, a 2, a 3, a 4, …, a n, …  The number a 1 is called the first term, a 2 is the second term, and in general a n is the nth term or general term.

7 SEQUENCES We will deal exclusively with infinite sequences.  So, each term a n will have a successor a n+1.

8 SEQUENCES Notice that, for every positive integer n, there is a corresponding number a n. So, a sequence can be defined as:  A function whose domain is the set of positive integers

9 SEQUENCES However, we usually write a n instead of the function notation f (n) for the value of the function at the number n. The sequence { a 1, a 2, a 3,...} is also denoted by:

10 SEQUENCES In the following examples, we give three descriptions of the sequence: 1. Using the preceding notation 2. Using the defining formula 3. Writing out the terms of the sequence Example 1

11 SEQUENCES  In this and the subsequent examples, notice that n does not have to start at 1. Example 1 a Preceding Notation Defining Formula Terms of Sequence

12 SEQUENCES Example 1 b Preceding Notation Defining Formula Terms of Sequence

13 SEQUENCES Example 1 c Preceding Notation Defining Formula Terms of Sequence

14 SEQUENCES Example 1 d Preceding Notation Defining Formula Terms of Sequence

15 SEQUENCES Find a formula for the general term a n of the sequence assuming the pattern of the first few terms continues. Example 2

16 SEQUENCES We are given that: Example 2

17 SEQUENCES Notice that the numerators of these fractions start with 3 and increase by 1 whenever we go to the next term.  The second term has numerator 4 and the third term has numerator 5.  In general, the nth term will have numerator n+2. Example 2

18 SEQUENCES The denominators are the powers of 5.  Thus, a n has denominator 5 n. The signs of the terms are alternately positive and negative.  Hence, we need to multiply by a power of –1. Example 2

19 SEQUENCES In Example 1 b, the factor (–1) n meant we started with a negative term. Here, we want to start with a positive term. Thus, we use (–1) n–1 or (–1) n+1. Therefore, Example 2

20 SEQUENCES We now look at some sequences that do not have a simple defining equation. Example 3

21 SEQUENCES The sequence {p n }, where p n is the population of the world as of January 1 in the year n Example 3 a

22 SEQUENCES If we let a n be the digit in the nth decimal place of the number e, then {a n } is a well-defined sequence whose first few terms are: {7, 1, 8, 2, 8, 1, 8, 2, 8, 4, 5, …} Example 3 b

23 FIBONACCI SEQUENCE The Fibonacci sequence {f n } is defined recursively by the conditions f 1 = 1 f 2 = 1 f n = f n–1 + f n–2 n  3  Each is the sum of the two preceding term terms.  The first few terms are: {1, 1, 2, 3, 5, 8, 13, 21, …} Example 3 c

24 FIBONACCI SEQUENCE This sequence arose when the 13th-century Italian mathematician Fibonacci solved a problem concerning the breeding of rabbits. Example 3

25 SEQUENCES A sequence such as that in Example 1 a [a n = n/(n + 1)] can be pictured either by:  Plotting its terms on a number line  Plotting its graph

26 SEQUENCES Note that, since a sequence is a function whose domain is the set of positive integers, its graph consists of isolated points (1, a 1 ) (2, a 2 ) (3, a 3 ) … (n, a n ) …

27 SEQUENCES From either figure, it appears that the terms of the sequence a n = n/(n + 1) are approaching 1 as n becomes large.

28 SEQUENCES In fact, the difference can be made as small as we like by taking n sufficiently large.  We indicate this by writing

29 SEQUENCES In general, the notation means that the terms of the sequence {a n } get arbitrarily close to L as n becomes large. This, of course, needs to be defined more precisely.

30 SEQUENCES Notice that the following definition of the limit of a sequence is very similar to the definition of a limit of a function at infinity given in Section 1.4

31 LIMIT OF A SEQUENCE A sequence {a n } has the limit L, and we write if we can make the terms a n as close to L as we like, by taking n sufficiently large.  If exists, the sequence converges (or is convergent).  Otherwise, it diverges (or is divergent). Definition 1

32 LIMIT OF A SEQUENCE Here, Definition 1 is illustrated by showing the graphs of two sequences that have the limit L.

33 LIMIT OF A SEQUENCE A more precise version of Definition 1 is as follows.

34 LIMIT OF A SEQUENCE A sequence {a n } has the limit L, if for every ε > 0 there is a corresponding integer N such that: if n > N then |a n – L| < ε In this case we write: Definition 2

35 LIMIT OF A SEQUENCE Definition 2 is illustrated by the figure, in which the terms a 1, a 2, a 3,... are plotted on a number line.

36 LIMIT OF A SEQUENCE No matter how small an interval (L – ε, L + ε) is chosen, there exists an N such that all terms of the sequence from a N+1 onward must lie in that interval.

37 LIMIT OF A SEQUENCE Another illustration of Definition 2 is given here.  The points on the graph of {a n } must lie between the horizontal lines y = L + ε and y = L – ε if n > N.

38 LIMIT OF A SEQUENCE This picture must be valid no matter how small ε is chosen.  Usually, however, a smaller ε requires a larger N.

39 LIMITS OF SEQUENCES If you compare Definition 2 with Definition 7 in Section 1.4, you will see that the only difference between and is that n is required to be an integer.  Thus, we have the following theorem.

40 LIMITS OF SEQUENCES If and f (n) = a n when n is an integer, then Theorem 3

41 LIMITS OF SEQUENCES Theorem 3 is illustrated here.

42 LIMITS OF SEQUENCES In particular, since we know that when r > 0 we have: Equation 4

43 LIMITS OF SEQUENCES If a n becomes large as n becomes large, we use the notation  The following precise definition is similar to that given for functions.

44 LIMIT OF A SEQUENCE means that, for every positive number M, there is an integer N such that ifn > N thena n > M Definition 5

45 LIMITS OF SEQUENCES If, then the sequence {a n } is divergent, but in a special way.  We say that {a n } diverges to .

46 LIMITS OF SEQUENCES The Limit Laws given in Section 1.3 also hold for the limits of sequences and their proofs are similar. Suppose {a n } and {b n } are convergent sequences and c is a constant.

47 LIMIT LAWS FOR SEQUENCES Then

48 LIMIT LAWS FOR SEQUENCES Also,

49 LIMITS OF SEQUENCES The Squeeze Theorem can also be adapted for sequences, as follows.

50 SQUEEZE THEOREM FOR SEQUENCES If a n  b n  c n for n  n 0 and, then

51 LIMITS OF SEQUENCES Another useful fact about limits of sequences is given by the following theorem.  The proof is left as an exercise.

52 LIMITS OF SEQUENCES Theorem 6 If then

53 LIMITS OF SEQUENCES Find  The method is similar to the one we used in Section 2.6  We divide the numerator and denominator by the highest power of n and then use the Limit Laws. Example 4

54 LIMITS OF SEQUENCES Thus,  Here, we used Equation 4 with r = 1. Example 4

55 LIMITS OF SEQUENCES Calculate  Notice that both the numerator and denominator approach infinity as n → ∞. Example 5

56 LIMITS OF SEQUENCES Here, we cannot apply l’Hospital’s Rule directly.  It applies not to sequences but to functions of a real variable. Example 5

57 LIMITS OF SEQUENCES However, we can apply l’Hospital’s Rule to the related function f (x) = (ln x)/x and obtain: Example 5

58 LIMITS OF SEQUENCES Therefore, by Theorem 3, we have: Example 5

59 LIMITS OF SEQUENCES Determine whether the sequence a n = (–1) n is convergent or divergent. If we write out the terms of the sequence, we obtain: { – 1, 1, – 1, 1, – 1, 1, – 1, …} Example 6

60 LIMITS OF SEQUENCES The graph of the sequence is shown.  The terms oscillate between 1 and –1 infinitely often.  Thus, a n does not approach any number. Example 6

61 LIMITS OF SEQUENCES Thus, does not exist. That is, the sequence {(–1) n } is divergent. Example 6

62 LIMITS OF SEQUENCES Evaluate if it exists.   Thus, by Theorem 6, Example 7

63 LIMITS OF SEQUENCES The following theorem says that, if we apply a continuous function to the terms of a convergent sequence, the result is also convergent.

64 LIMITS OF SEQUENCES If and the function f is continuous at L, then  The proof is left as an exercise. Theorem 7

65 LIMITS OF SEQUENCES Find  The sine function is continuous at 0.  Thus, Theorem 7 enables us to write: Example 8

66 LIMITS OF SEQUENCES Discuss the convergence of the sequence a n =n!/n n, where n! = 1. 2. 3. …. N. Both the numerator and denominator approach infinity as n → ∞. However, here, we have no corresponding function for use with l’Hospital’s Rule.  x! is not defined when x is not an integer. Example 9

67 LIMITS OF SEQUENCES Let us write out a few terms to get a feeling for what happens to a n as n gets large: Therefore, Example 9

68 LIMITS OF SEQUENCES From these expressions and the graph here, it appears that the terms are decreasing and perhaps approach 0. Example 9

69 LIMITS OF SEQUENCES To confirm this, observe from Equation 8 that  Notice that the expression in parentheses is at most 1 because the numerator is less than (or equal to) the denominator. Example 9

70 LIMITS OF SEQUENCES Thus,  We know that 1/n → 0 as n → ∞.  Therefore a n → 0 as n → ∞ by the Squeeze Theorem. Example 9

71 LIMITS OF SEQUENCES For what values of r is the sequence {r n } convergent?  From the graphs of the exponential functions, we know that for a > 1, and for 0 < a < 1. Example 10

72 LIMITS OF SEQUENCES Thus, putting a = r and using Theorem 3, we have:  It is obvious that Example 10

73 LIMITS OF SEQUENCES If –1 < r < 0, then 0 < |r | < 1.  Thus,  Therefore, by Theorem 6, Example 10

74 LIMITS OF SEQUENCES If r  –1, then {r n } diverges as in Example 6. Example 10

75 LIMITS OF SEQUENCES The figure shows the graphs for various values of r. Example 10

76 LIMITS OF SEQUENCES The case r = –1 was shown earlier. Example 10

77 LIMITS OF SEQUENCES The results of Example 10 are summarized for future use, as follows. The sequence {r n } is convergent if –1 < r  1 and divergent for all other values of r. Equation 9

78 LIMITS OF SEQUENCES A sequence {a n } is called:  Increasing, if a n < a n+1 for all n  1, that is, a 1 < a 2 < a 3 < · · · < a n < · · ·  Decreasing, if a n > a n+1 for all n  1  Monotonic, if it is either increasing or decreasing Definition 10

79 DECREASING SEQUENCES The sequence is decreasing because and so a n > a n+1 for all n  1. Example 11

80 DECREASING SEQUENCES Show that the sequence is decreasing. Example 12

81 DECREASING SEQUENCES We must show that a n+1 < a n, that is, E. g. 12—Solution 1

82 DECREASING SEQUENCES This inequality is equivalent to the one we get by cross-multiplication: E. g. 12—Solution 1

83 DECREASING SEQUENCES Since n  1, we know that the inequality n 2 + n > 1 is true.  Therefore, a n+1 < a n.  Hence, {a n } is decreasing. E. g. 12—Solution 1

84 DECREASING SEQUENCES Consider the function E. g. 12—Solution 2

85 DECREASING SEQUENCES Thus, f is decreasing on (1, ∞).  Hence, f (n) > f (n + 1).  Therefore, {a n } is decreasing. E. g. 12—Solution 2

86 BOUNDED SEQUENCES A sequence {a n } is bounded:  Above, if there is a number M such that a n  M for all n  1  Below, if there is a number m such that m  a n for all n  1  If it is bounded above and below Definition 11

87 BOUNDED SEQUENCES For instance,  The sequence a n = n is bounded below (a n > 0) but not above.  The sequence a n = n/(n+1) is bounded because 0 < a n < 1 for all n.

88 BOUNDED SEQUENCES We know that not every bounded sequence is convergent.  For instance, the sequence a n = (–1) n satisfies –1  a n  1 but is divergent from Example 6. Similarly, not every monotonic sequence is convergent (a n = n → ∞).

89 BOUNDED SEQUENCES However, if a sequence is both bounded and monotonic, then it must be convergent.  This fact is proved as Theorem 12.  However, intuitively, you can understand why it is true by looking at the following figure.

90 BOUNDED SEQUENCES If {a n } is increasing and a n  M for all n, then the terms are forced to crowd together and approach some number L.

91 BOUNDED SEQUENCES The proof of Theorem 12 is based on the Completeness Axiom for the set of real numbers.  This states that, if S is a nonempty set of real numbers that has an upper bound M (x  M for all x in S), then S has a least upper bound b.

92 BOUNDED SEQUENCES This means:  b is an upper bound for S.  However, if M is any other upper bound, then b  M. The Completeness Axiom is an expression of the fact that there is no gap or hole in the real number line.

93 Every bounded, monotonic sequence is convergent. Theorem 12 MONOTONIC SEQ. THEOREM

94 Suppose {a n } is an increasing sequence.  Since {a n } is bounded, the set S = {a n |n  1} has an upper bound.  By the Completeness Axiom, it has a least upper bound L. Theorem 12—Proof

95 Given ε > 0, L – ε is not an upper bound for S (since L is the least upper bound).  Therefore, a N > L – ε for some integer N MONOTONIC SEQ. THEOREM Theorem 12—Proof

96 However, the sequence is increasing. So, a n  a N for every n > N.  Thus, if n > N, we have a n > L – ε  Since a n ≤ L, thus 0 ≤ L – a n < ε MONOTONIC SEQ. THEOREM Theorem 12—Proof

97 MONOTONIC SEQ. THEOREM Thus, |L – a n | N Therefore, Theorem 12—Proof

98 MONOTONIC SEQ. THEOREM A similar proof (using the greatest lower bound) works if {a n } is decreasing. Theorem 12—Proof

99 MONOTONIC SEQ. THEOREM The proof of Theorem 12 shows that a sequence that is increasing and bounded above is convergent.  Likewise, a decreasing sequence that is bounded below is convergent.

100 MONOTONIC SEQ. THEOREM This fact is used many times in dealing with infinite series.

101 MONOTONIC SEQ. THEOREM Investigate the sequence {a n } defined by the recurrence relation Example 13

102 MONOTONIC SEQ. THEOREM We begin by computing the first several terms:  These initial terms suggest the sequence is increasing and the terms are approaching 6. Example 13

103 MONOTONIC SEQ. THEOREM To confirm that the sequence is increasing, we use mathematical induction to show that a n+1 > a n for all n  1.  Mathematical induction is often used in dealing with recursive sequences. Example 13

104 MONOTONIC SEQ. THEOREM That is true for n = 1 because a 2 = 4 > a 1. Example 13

105 MONOTONIC SEQ. THEOREM If we assume that it is true for n = k, we have:  Hence, and  Thus, Example 13

106 MONOTONIC SEQ. THEOREM We have deduced that a n+1 > a n is true for n = k + 1. Therefore, the inequality is true for all n by induction. Example 13

107 MONOTONIC SEQ. THEOREM Next, we verify that {a n } is bounded by showing that a n < 6 for all n.  Since the sequence is increasing, we already know that it has a lower bound: a n  a 1 = 2 for all n Example 13

108 MONOTONIC SEQ. THEOREM We know that a 1 < 6. So, the assertion is true for n = 1. Example 13

109 MONOTONIC SEQ. THEOREM Suppose it is true for n = k.  Then,  Thus, and  Hence, Example 13

110 MONOTONIC SEQ. THEOREM This shows, by mathematical induction, that a n < 6 for all n. Example 13

111 MONOTONIC SEQ. THEOREM Since the sequence {a n } is increasing and bounded, Theorem 12 guarantees that it has a limit.  However, the theorem does not tell us what the value of the limit is. Example 13

112 MONOTONIC SEQ. THEOREM Nevertheless, now that we know exists, we can use the recurrence relation to write: Example 13

113 MONOTONIC SEQ. THEOREM Since a n → L, it follows that a n+1 → L, too (as n → , n + 1 →  too).  Thus, we have:  Solving this equation for L, we get L = 6, as predicted. Example 13


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