Q7P Test the following series for co... [FREE SOLUTION]

Chapter 1: Q7P (page 17)

Test the following series for convergence
${鈭�}_{n = 0}^{^{鈭�}} \frac{(- 1)^{n} n}{1 + n^{2}}$

Short Answer

Expert verified

The series ${鈭�}_{n = 0}^{^{鈭�}} \frac{(- 1)^{n} n}{1 + n^{2}}$ is, converges.

Step by step solution

Significance of alternating series

If the terms' absolute values gradually decline to zero, or if $| a_{n + 1} | 鈮� | a_{n} |$ and $\underset{_{n 鈫� 鈭�}}{l i m} a_{n} = 0 .$ , then an alternating series converges.

Use a test to check for convergence.

The alternating series is ${鈭�}_{n = 0}^{鈭�} \frac{(- 1)^{n} n}{1 + n^{2}}$ .

Let test the series for convergence by using the following test

$| a_{n + 1} | 鈮� | a_{n} |$ and $l i m_{n 鈫� 鈭�} a_{n} = 0 .$

The series converges if satisfies the condition. So,

$a_{n} = \frac{n {(- 1)}^{n}}{1 + n^{2}} |a_{n}| = \frac{n}{1 + n^{2}} a n d |a_{n - 1}| = \frac{n}{1 + n^{2}}$

Perform the test of convergence

Now check if $| a_{n + 1} | 鈮� | a_{n} |$ using the following method.

Forlocalid="1658727024584" $\frac{| a_{n} + 1 |}{| a_{n} |} < 1$ this means $| a_{n + 1} | 鈮� | a_{n} |$ .

Forlocalid="1658726433620" $\frac{| a_{n} + 1 |}{| a_{n} |} > 1$ this means $| a_{n + 1} | 鈮� | a_{n} |$

Using the method for the series get:

$\frac{| a_{n} + 1 |}{| a_{n} |} = \frac{\frac{n + 1}{1 + {(n + 1)}^{2}}}{\frac{n}{n + 1^{2}}} \frac{| a_{n} + 1 |}{| a_{n} |} = \frac{(n + 1) (1 + n^{2})}{n (1 + {(1 + n)}^{2})} = \frac{n^{3} + n^{2} + n + 1}{n^{3} + 2 n^{2} + 2 n}$

Check if both conditions are met

From the expression from the previous step,

If $(n^{3} + n^{2} + n + 1) - (n^{3} + 2 n^{2} + 2 n) < 0$ then $\frac{n^{3} + n^{2} + n + 1}{n^{3} + 2 n^{2} + 2 n} < 1$

role="math" localid="1658726957852" $(n^{3} + n^{2} + n + 1) - (n^{3} + 2 n^{2} + 2 n) < 0 = 1 - n^{2} - n$

When $n 鈮� 1, 1 - n^{2} - n < 0$

Hence,

role="math" localid="1658727082841" $\frac{| a_{n} + 1 |}{| a_{n} |} < 1, | a_{n} + 1) | < | a_{n} |$

$\underset{n 鈫� 鈭�}{l i m} a_{n} = 0 = \lim_{n 鈫� 鈭�} \frac{n}{1 + n^{2}}$

Hence, the series ${鈭�}_{n = 0}^{鈭�} \frac{(- 1)^{n} n}{1 + n^{2}}$ is, converges

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91影视

Test the following series for convergence
${鈭�}_{n = 0}^{^{鈭�}} \frac{(- 1)^{n} n}{1 + n^{2}}$

Short Answer

Step by step solution

Significance of alternating series

Use a test to check for convergence.

Perform the test of convergence

Check if both conditions are met

One App. One Place for Learning.

Most popular questions from this chapter

Recommended explanations on Physics Textbooks

Fields in Physics

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91影视

Test the following series for convergence鈭�n=0鈭�(-1)nn1+n2

Short Answer

Step by step solution

Significance of alternating series

Use a test to check for convergence.

Perform the test of convergence

Check if both conditions are met

One App. One Place for Learning.

Most popular questions from this chapter

Recommended explanations on Physics Textbooks

Fields in Physics

Circular Motion and Gravitation

Physics of Motion

Space Physics

Rotational Dynamics

Further Mechanics and Thermal Physics

Study anywhere. Anytime. Across all devices.

Test the following series for convergence
${鈭�}_{n = 0}^{^{鈭�}} \frac{(- 1)^{n} n}{1 + n^{2}}$