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Chapter 7 Infinite Sequences and Series. 7.1 Sequences. A sequence is a list of numbers a 1 , a 2 , a 3 , …, a n ,… in a given order. Each of a 1 , a 2 , a 3 and so on represents a number. These are the terms of the sequence.
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7.1 Sequences • A sequence is a list of numbers a1, a2, a3, …, an,… in a given order. • Each of a1, a2, a3 and so on represents a number. These are the terms of the • sequence. • The integer n is called the index of an, and indicates where an occurs in the list. • Order is important. • We can think of sequence a1, a2, a3, …, an…as a function that sends 1 to a1, 2 to a2, • 3 to a3, and in general sends the positive integer n to the nth term an. For example, the function associated with the sequence 2, 4, 6, 8, …, 2n,… sends 1 to a1=2, 2 to a2=4, and so on. The general behavior of the sequence is described by the formula an=2n.
Remarks • We can equally well make the domain the integers larger than a given number n0 (may >1), and we allow the sequence of this type also. 2. Sequences can be described by writing rules that specify their terms, such as or by listing terms, We also sometimes write
Convergence and Divergence Sometimes the numbers in a sequence approach a single value as the index n Increases. For example, an=1/n whose terms approach 0 as n gets large, or an=1-1/n approach 1 as n gets large. On the other hand, some sequences like an=(-1)n+1n bounce back and forth Between 1 and -1, never converging to a single value.
This definition is very similar to the Definition of the limit of a function f(x) as x tends to
Examples Example: Example: any constant k.
Diverges to Infinity The sequence { } also diverges, because The sequence { 1, 02, 3, -4, 5, -6, 7, -8,…} and {1, 0, 2, 0, 3, 0,…} are examples of such divergence.
Calculating Limits of Sequences Since sequences are functions with domain restricted to the positive integers, we have
Remark • Theorem 1 does not say that, for example, that if the sum {an+ bn} has a limit, then each of the sequences {an} and {bn} have limits. • One consequence of Theorem 1 is that every nonzero multiple of a divergent sequence {an} diverges.
Sandwich Theorem for Sequences An immediate consequence of Theorem 2 is that , if |bn|cn and cn0, then bn 0 because –cn bn cn, we use this fact in the next example.
Continuous Function Theorem for Sequences Example: Show that
Example • Example: Show that
Recursive Definitions So far, we have calculated each an directly from the value of n. But sequences are often defined recursively by giving • The values (s) of the initial term or terms, and • A rule, called a recursion formula, for calculating any later term from terms that precede it. Example: • The statement a1=1, and an=an-1+1 define the sequences of positive integers. • The statement a1=1, a2=1, and an+1=an+an-1 defines the sequence of Fibonacci numbers.
Nondecreasing Sequences • Example: The following sequences are nondecreasing: • The sequence 1, 2, 3, …, n,… of natural numbers; • The sequence ½, 2/3, ¾, …, n/(n+1), … • The constant sequence {3}.
Bounded Nondecreasing Sequences Here are two kinds of nondecreasing sequences—those whose terms increase beyond any finite bound and those whose terms do not. • Examples: • The sequence 1, 2, 3, …, n has no upper bound. • The sequence ½, 2/3, 34, …, n/(n+1), …, is bounded above by M=1. 1 is also • the least upper bound.
A nondecreasing sequence that is bounded from above always has a least upper Bound. We also prove that if L is the least upper bound then the sequence converges to L.
The Nondecreasing Sequenc Theorem. Theorem 6 implies that a nondecreasing sequence converges when it is bounded from above. It diverges to infinity if it is non bounded from above. The analogous results hold for nonincreasing sequences.
7.2 Infinite Series An infinite series is the sum of an infinite sequence of numbers. a1+a2+a3+…+an+… The goal of this section is to understand the meaning of such an infinite sum and to develop methods to calculate it. The sum of the first n terms sn= a1+a2+a3+…+an is an ordinary finite sum, is called The nth partial sum. As n gets larger, we expect the nth partial sums to get closer and closer to a limiting value in the same sense that the terms of a sequence approach a limit.
Example For example, to assign meaning to an expression like 1+1/2+1/4+1/8+1/16+… We add the terms one at a time from the beginning and look for a pattern in how These partial sums grow.
The partial sums form a sequence whose nth term is The sequence of partial sums converges to 2 because . We say “the sum of the infinite series 1+1/2+1/4+1/2n-1+… is 2.”
Note: it is convenient to use sigma notation to write the series.
Geometric Series Geometric series are series of the form In which a and r are fixed real numbers and a0. The series can also be written as . The ratio r can be positive, or negative. The formula a/(1-r) for the sum of a geometric series applies only when the summation index begins with n=1 in ( or with n=0 in ).
Examples Example: The series converges.
Examples Example: Find the sum of the series
Divergent Series One reason that a series may fail to converge is that its terms don’t become small. Example The series diverges because the partial sums eventually outgrow Every preassigned number. Each term is greater than 1, so the sum of n terms is greater than n.
Examples Example: Example: The series 1+1/2+1/2+1/4+1/4+1/4+1/4, +…+1/2n+1/2n+…+1/2n+… This diverges, however, the terms of the series form a sequence that converges to 0.
Combining Series Note: (an+bn) can converge when an and bn both diverge.
Remarks • We can add a finite number of terms to a series or delete a finite number of terms without altering the series’ convergence or divergence, although in the case of the convergence this will usually change the sum. • As long as we preserve the order of its term, we can reindex any series without altering its convergence.
7.3 The Integral Test Given a series, we want to know whether it converges or not. In this section and the next two, we study series with nonnegative terms. Since the partial sums from a nondecreasing sequence, the Nondecreasing Sequence Theorem tell us the following:
Example The series is called the harmonic series. The harmonic series is divergent, but this doesn’t follow from the nth=Term Test. The reason it diverges is because there is no upper bound for its partial sums.
Example Example: Does the following series converge?
Error Estimation If a series an is shown to be convergent by the integral test, we may want to estimate the size of the remainder Rn between the total sum S of the series and its nth partial sum sn. If we add the partial sum sn to each side of the inequality in (1), we get
7.4 Comparison Tests We have seen how to determine the convergence of geometric series, p-series, and a few others. We can test the convergence of many more series by comparing Their terms to those of a series whose convergence is known.
The Limit Comparison Test We now introduce a comparison test that is particularly useful for series in which an is a ration function of n.
