1. Alternating Series; Conditional Convergence Objective: Find limits of series that contain both positive and negative terms.

2. Alternating Series Series whose terms alternate between positive and negative, called alternating series, are of special importance. Some examples are:

3. Alternating Series In general, an alternating series has one of the following two forms where the a k s are assumed to be positive in both cases.

4. Alternating Series The following theorem is the key result on convergence of alternating series.

5. Example 1 Use the alternating series test to show that the following series converge. (a) (b)

6. Example 1 Use the alternating series test to show that the following series converge. (a) (b) (a) This looks like the divergent harmonic series. However, this series converges since both conditions in the alternating series test are satisfied.

7. Example 1 Use the alternating series test to show that the following series converge. (a) (b) (b) This series converges since both conditions in the alternating series test are satisfied.

8. Approximating Sums of Alternating Series The following theorem is concerned with the error that results when the sum of an alternating series is approximated by a partial sum.

9. Approximating Sums of Alternating Series This is what the theorem means.

10. Example 2 Later, we will show that the sum of the alternating harmonic series is (a) Accepting this to be true, find an upper bound on the magnitude of error that results if ln2 is approximated by the sum of the first eight terms in the series.

11. Example 2 Later, we will show that the sum of the alternating harmonic series is (a) Accepting this to be true, find an upper bound on the magnitude of error that results if ln2 is approximated by the sum of the first eight terms in the series. As a check we look at the exact value of the error.

12. Example 2 Later, we will show that the sum of the alternating harmonic series is (b) Find a partial sum that approximates ln2 to one decimal-place accuracy (the nearest tenth).

13. Example 2 Later, we will show that the sum of the alternating harmonic series is (b) Find a partial sum that approximates ln2 to one decimal-place accuracy (the nearest tenth). For one decimal-place accuracy, we must choose a value of n for which |ln2 – s n | < 0.05. Since |ln2 – s n | < a n+1, so we need to choose n so that a n+1 <.05

14. Example 2 Later, we will show that the sum of the alternating harmonic series is (b) Find a partial sum that approximates ln2 to one decimal-place accuracy (the nearest tenth). We can use our calculator to find the value of n. Doing that, we see that a 20 =.05; this tells us that partial sum s 19 will provide the desired accuracy. We can also solve the equation

15. Absolute Convergence The series does not fit any of the categories studied so far- it has mixed signs but is not alternating. We will now develop some convergence tests that can be applied to such series.

16. Absolute Convergence First, a definition.

17. Example 3 Determine whether the following series converge or diverge. (a) (b)

18. Example 3 Determine whether the following series converge or diverge. (a) (b) (a) This series of absolute values is the convergent geometric series below, so it converges absolutely.

19. Example 3 Determine whether the following series converge or diverge. (a) (b) (b) This series of absolute values is the divergent harmonic series below, so it diverges absolutely.

20. Absolute Convergence It is important to distinguish between the notions of convergence and absolute convergence. For example, the series below converges by the alternating series test (alternating harmonic series), yet we demonstrated that it does not converge absolutely.

21. Absolute Convergence The following theorem shows that if a series converges absolutely, then it converges.

22. Example 4 Show that the following series converge. (a) (b)

23. Example 4 Show that the following series converge. (a) (b) (a) We already showed that this series converges absolutely in example 3, so by the theorem, it converges.

24. Example 4 Show that the following series converge. (a) (b) (b) We know that the cosine function will change signs, but not in an alternating fashion, so it is not an alternating series. Testing for absolute convergence, we see that it does, so the series converges.

25. Conditional Convergence Although the last theorem is a useful tool for series that converge absolutely, it provides no information about the convergence or divergence of a series that diverges absolutely.

26. Conditional Convergence Although the last theorem is a useful tool for series that converge absolutely, it provides no information about the convergence or divergence of a series that diverges absolutely. For example the two series both diverge absolutely since the series of absolute values is the divergent harmonic series.

27. Conditional Convergence Although the last theorem is a useful tool for series that converge absolutely, it provides no information about the convergence or divergence of a series that diverges absolutely. For example the two series both diverge absolutely since the series of absolute values is the divergent harmonic series. However, the first series converges by the alternating series test and is said to converge conditionally; the second is a constant times the divergent harmonic series, so it diverges.

28. Ratio Test for Absolute Convergence Although one cannot generally infer convergence or divergence, the following variation of the ratio test provides a way of deducing divergence from absolute divergence in certain situations.

29. Ratio Test for Absolute Convergence Although one cannot generally infer convergence or divergence, the following variation of the ratio test provides a way of deducing divergence from absolute divergence in certain situations.

30. Example 5 Use the ratio test for absolute convergence to determine whether the series converges. (a) (b)

31. Example 5 Use the ratio test for absolute convergence to determine whether the series converges. (a) (b) (a)

32. Example 5 Use the ratio test for absolute convergence to determine whether the series converges. (a) (b) (b)

33. Homework Page 673-674 1-37 odd Please refer to page 672 for a summary of the Convergence Tests we have studied. Make sure you understand and can use all of them. Think about when you would use each test. Some are for certain situations only.