How Do I Correctly Apply the Alternating Series Test?

In summary, a series is a sum of a sequence of numbers written in the form of Σan. Convergence refers to the behavior of a series as the number of terms approaches infinity, and a series is considered to converge if the sum of its terms approaches a finite number. There are two types of convergence, absolute and conditional, and a convergence test is used to determine which type a series has. The choice of convergence test depends on the properties of the series and it may be necessary to try multiple tests to determine convergence.
  • #1
chrisgoodie
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Hi guys, I am doing this question of alternating series test.

And I was following the below principles when solving the problem. Sorry I don't know how to type in the math language. I got 4, 8, 9, 10 as the answers. But the system rejected this without any explanation. Can someone throw a lifeline?

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  • #2
Hey chrisgoodie! Welcome to MHB! ;)

How about this one:
$$\sum_{n=1}^\infty (-1)^n \left( \frac{3n-1}{n^2} \right)^n$$
(Wondering)
 

Related to How Do I Correctly Apply the Alternating Series Test?

1. What is a series?

A series is a sum of a sequence of numbers. It can be written in the form of Σan, where n is the number of terms in the sequence and an is the nth term.

2. What is convergence?

Convergence refers to the behavior of a series as the number of terms approaches infinity. A series is considered to converge if the sum of its terms approaches a finite number as n increases.

3. What is the difference between absolute convergence and conditional convergence?

A series is said to have absolute convergence if the series of absolute values of its terms converges. If the series of absolute values diverges but the original series still converges, it is said to have conditional convergence.

4. What is the purpose of a convergence test?

A convergence test is used to determine whether a series converges or diverges. There are various tests that can be used, such as the ratio test, the comparison test, and the integral test.

5. How do I know which convergence test to use?

The choice of convergence test depends on the specific properties of the series. It is important to carefully consider the terms of the series and choose a test that is appropriate for the given situation. It may also be helpful to try multiple tests and compare the results.

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