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Infinite Series Objective: We will try to find the sum of a series with infinitely many terms.

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Presentation on theme: "Infinite Series Objective: We will try to find the sum of a series with infinitely many terms."— Presentation transcript:

1 Infinite Series Objective: We will try to find the sum of a series with infinitely many terms.

2 Sums of Infinite Series
Our first objective is to define what is meant by the “sum” of infinitely many real numbers. We start with a definition:

3 Sums of Infinite Series
Our first objective is to define what is meant by the “sum” of infinitely many real numbers. We start with a definition:

4 Sums of Infinite Series
Since it is impossible to add infinitely many numbers directly, sums of infinite series are defined and computed by an indirect limiting process. We will consider the decimal … This can be viewed as the infinite series … or as Since this is the decimal expansion of 1/3, any reasonable definition for the sum of this series should yield 1/3.

5 Sums of Infinite Series
To obtain such a definition, consider the following sequence of (finite) sums.

6 Sums of Infinite Series
The sequence of numbers s1 , s2 , s3 , s4 , … can be viewed as a succession of approximations to the “sum” of the infinite series, which we want to be 1/3. As we progress through the sequence, more and more terms of the infinite series are used, and the approximations get better and better, suggesting that the desired sum of 1/3 might be the limit. We need to calculate the limit of the general term in the sequence, namely

7 Closed Form In formulas such as
The left side of the equality is said to express the sum in open form and the right side is said to express the sum in closed form. The open form indicates the summands and the closed form is an explicit formula for the sum. In other words, in closed form, if you know the value of n, you know the sum.

8 Closed Form Express in closed form.

9 Closed Form Express in closed form.

10 Closed Form Express in closed form.

11 Sums of Infinite Series
The problem with calculating is complicated by the fact that both the last term and the number of terms change with n. It is best to rewrite such limits in a closed form in which the number of terms does not vary, if possible. To do this, we multiply both sides of the equation for the general term by 1/10 to obtain:

12 Sums of Infinite Series
Now subtract the new equation from the original.

13 Sums of Infinite Series
Subtracting the new equation from the original gives

14 Sums of Infinite Series
The general term can now be written as

15 Sums of Infinite Series
Now, the limit becomes

16 Sums of Infinite Series
Motivated by the previous example, we are now ready to define the general concept of the “sum” of an infinite series

17 Sums of Infinite Series
Motivated by the previous example, we are now ready to define the general concept of the “sum” of an infinite series We begin with some terminology. Let sn denote the sum of the initial terms of the series, up to and including the term with index n. Thus,

18 Sums of Infinite Series
The number sn is called the nth partial sum of the series and the sequence is called the sequence of partial sums. As n increases, the partial sum sn = u1 + u2 + …+ un + … includes more and more terms of the series. Thus, if sn tends toward a limit as , it is reasonable to view this limit as the sum of all the terms in the series.

19 Sums of Infinite Series
This suggests the following definition:

20 Example 1 Determine whether the series 1 – 1 + 1 – 1 + 1- 1 +…
converges or diverges. If it converges, find the sum.

21 Example 1 Determine whether the series 1 – 1 + 1 – 1 + 1- 1 +…
converges or diverges. If it converges, find the sum. It is tempting to conclude that the sum of the series is zero by arguing that the positive and negative terms will cancel. This is not correct. We will look at the partial sums.

22 Example 1 Determine whether the series 1 – 1 + 1 – 1 + 1- 1 +…
converges or diverges. If it converges, find the sum. It is tempting to conclude that the sum of the series is zero by arguing that the positive and negative term will cancel. This is not correct. We will look at the partial sums. Thus, the sequence of partial sums is 1, 0, 1, 0, 1, … This is a divergent series and has no sum.

23 Geometric Series In many important series, each term is obtained by multiplying the preceding term by some fixed constant. Thus, if the initial term of the series is a and each term is obtained by multiplying the preceding term by r, then the series has the form

24 Geometric Series In many important series, each term is obtained by multiplying the preceding term by some fixed constant. Thus, if the initial term of the series is a and each term is obtained by multiplying the preceding term by r, then the series has the form Such series are called geometric series, and the number r is called the ratio for the series.

25 Geometric Series Here are some examples of geometric series.

26 Geometric Series The following theorem is the fundamental result on convergence or geometric series.

27 Example 2 The series is a geometric series with a = 5 and r = ¼. Since |r|=1/4 < 1, the series converges and the sum is

28 Example 3 Find the rational number represented by the repeating decimal ….

29 Example 3 Find the rational number represented by the repeating decimal …. We can write this as so the given decimal is the sum of a geometric series with a = and r = Thus, the sum is

30 Example 4 In each part, determine whether the series converges, and if so find its sum.

31 Example 4 In each part, determine whether the series converges, and if so find its sum. (a) This is a geometric series in a concealed form, since we can rewrite it as

32 Example 4 In each part, determine whether the series converges, and if so find its sum. (b) This is a geometric series with a = 1 and r = x, so it converges if |x| < 1 and diverges otherwise. When it converges its sum is

33 Telescoping Sums Determine whether the series converges or diverges.
If it converges, find the sum.

34 Telescoping Sums Determine whether the series converges or diverges.
If it converges, find the sum. To write this in closed form, we will use the method of partial fractions to obtain

35 Telescoping Sums Determine whether the series converges or diverges.
If it converges, find the sum.

36 Telescoping Sums Determine whether the series converges or diverges.
If it converges, find the sum.

37 Harmonic Series One of the most important of all diverging series is the harmonic series which arises in connection with the overtones produced by a vibrating musical string. It is not immediately evident that this series diverges. However, the divergence will become apparent when we examine the partial sums in detail.

38 Harmonic Series Because the terms in the series are all positive, the partial sums form a strictly increasing sequence. Thus, by Theorem there is no constant M that is greater than or equal to every partial sum, so the series diverges.

39 Homework Pages 1-15 odd


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