Chapter 7: Q. 11 (page 656)

For the series $\sum_{k = 0}^{\infty} (\frac{(1 / 2)^{k}}{\ln (k + 2)} - \frac{(1 / 2)^{k + 1}}{\ln (k + 3)})$ that follow,
Part (a): Provide the first five terms in the sequence of partial sums $\{S_{k}\}$ .
Part (b): Provide a closed formula for $S_{k}$ .
Part (c): Find the sum of the series by evaluating $\lim_{k \to \infty} S_{k}$ .

Short Answer

Expert verified

Part (a): The first five terms of partial sums for the given series is $\{\frac{1}{\ln (2)} - \frac{(1 / 2)}{\ln (3)}, \frac{1}{\ln (2)} - \frac{(1 / 2)^{2}}{\ln (4)}, \frac{1}{\ln (2)} - \frac{(1 / 2)^{3}}{\ln (5)}, \frac{1}{\ln (2)} - \frac{(1 / 2)^{4}}{\ln (6)}, \frac{1}{\ln (2)} - \frac{(1 / 2)^{5}}{\ln (7)}\}$ .

Part (b): The general term $S_{k}$ in its sequence of partial sums is $S_{k} = \frac{1}{\ln (2)} - \frac{(1 / 2)^{k + 1}}{\ln (k + 3)}$ .

Part (c): The sum of the series is $\frac{1}{\ln 2}$ .

Step by step solution

Part (a) Step 1. Given information.

Consider the given question,

$\sum_{k = 0}^{\infty} (\frac{(1 / 2)^{k}}{\ln (k + 2)} - \frac{(1 / 2)^{k + 1}}{\ln (k + 3)})$

Part (a) Step 2. Find the first two terms in the sequence.

The first term of the given series is obtained by substituting $k = 0$ ,

$= \frac{(1 / 2)^{k}}{\ln (k + 2)} - \frac{(1 / 2)^{k + 1}}{\ln (k + 3)} = \frac{1}{\ln (2)} - \frac{(1 / 2)}{\ln (3)}$

First term is $\frac{1}{\ln (2)} - \frac{(1 / 2)}{\ln (3)}$ .

The second term of the given series is obtained by substituting $k = 1$ ,

$= \frac{(1 / 2)^{k}}{\ln (k + 2)} - \frac{(1 / 2)^{k + 1}}{\ln (k + 3)} = \frac{(1 / 2)}{\ln (3)} - \frac{(1 / 2)^{2}}{\ln (4)}$

Second term is $\frac{(1 / 2)}{\ln (3)} - \frac{(1 / 2)^{2}}{\ln (4)}$ .

Part (a) Step 3. Find the third, fourth terms in the sequence.

The third term of the given series is obtained by substituting $k = 2$ ,

$= \frac{(1 / 2)^{k}}{\ln (k + 2)} - \frac{(1 / 2)^{k + 1}}{\ln (k + 3)} = \frac{(1 / 2)^{2}}{\ln (4)} - \frac{(1 / 2)^{3}}{\ln (5)}$

Third term is $\frac{(1 / 2)^{2}}{\ln (4)} - \frac{(1 / 2)^{3}}{\ln (5)}$ .

The fourth term of the given series is obtained by substituting $k = 3$ ,

$= \frac{(1 / 2)^{k}}{\ln (k + 2)} - \frac{(1 / 2)^{k + 1}}{\ln (k + 3)} = \frac{(1 / 2)^{3}}{\ln (5)} - \frac{(1 / 2)^{4}}{\ln (6)}$

Fourth term is $\frac{(1 / 2)^{3}}{\ln (5)} - \frac{(1 / 2)^{4}}{\ln (6)}$ .

Part (a) Step 4. Find the fifth terms in the sequence.

The fifth term of the given series is obtained by substituting $k = 4$ ,

$= \frac{(1 / 2)^{k}}{\ln (k + 2)} - \frac{(1 / 2)^{k + 1}}{\ln (k + 3)} = \frac{(1 / 2)^{4}}{\ln (6)} - \frac{(1 / 2)^{5}}{\ln (7)}$

Fifth term is $\frac{(1 / 2)^{4}}{\ln (6)} - \frac{(1 / 2)^{5}}{\ln (7)}$ .

The first and second terms in the sequence of partial sum is given below,

$S_{1} = \frac{1}{\ln (2)} - \frac{(1 / 2)}{\ln (3)} S_{2} = S_{1} + a_{2} = \frac{1}{\ln (2)} - \frac{(1 / 2)}{\ln (3)} + \frac{(1 / 2)}{\ln (3)} - \frac{(1 / 2)^{2}}{\ln (4)} = \frac{1}{\ln (2)} - \frac{(1 / 2)^{2}}{\ln (4)}$

Part (a) Step 5. Find the partial sums.

The third, fourth and fifth terms in the sequence of partial sum is given below,

$\begin{aligned} S_{3} = S_{2} + a_{3} \\ = \frac{1}{\ln (2)} - \frac{(1 / 2)^{2}}{\ln (4)} + \frac{(1 / 2)^{2}}{\ln (4)} - \frac{(1 / 2)^{3}}{\ln (5)} \\ = \frac{1}{\ln (2)} - \frac{(1 / 2)^{3}}{\ln (5)} \\ S_{4} = S_{3} + a_{4} \\ = \frac{1}{\ln (2)} - \frac{(1 / 2)^{3}}{\ln (5)} + \frac{(1 / 2)^{3}}{\ln (5)} - \frac{(1 / 2)^{4}}{\ln (6)} \\ = \frac{1}{\ln (2)} - \frac{(1 / 2)^{4}}{\ln (6)} \\ S_{5} = S_{4} + a_{5} \\ = \frac{1}{\ln (2)} - \frac{(1 / 2)^{4}}{\ln (6)} + \frac{(1 / 2)^{4}}{\ln (6)} - \frac{(1 / 2)^{5}}{\ln (7)} \\ = \frac{1}{\ln (2)} - \frac{(1 / 2)^{5}}{\ln (7)} \end{aligned}$

Part (b) Step 1. Write a close formula for Sk.

The kth term in the sequence of the partial sums is given below,

$S_{k} = (\frac{1}{\ln (2)} - \frac{(1 / 2)}{\ln (3)}) + (\frac{(1 / 2)}{\ln (3)} - \frac{(1 / 2)^{2}}{\ln (4)}) + \dots (\frac{(1 / 2)^{k}}{\ln (k + 2)} - \frac{(1 / 2)^{k + 1}}{\ln (k + 3)})$

In each two consecutive pairs, the second term of a pair cancels with the first term of the subsequent pair.

Thus, the series is telescopic.

The general term in its sequence of partial sums is $S_{k} = \frac{1}{\ln (2)} - \frac{(1 / 2)^{k + 1}}{\ln (k + 3)}$ .

Part (c) Step 1. Find the sum of the series.

The $S_{k}$ in its sequence of partial sums is $S_{k} = \frac{1}{\ln (2)} - \frac{(1 / 2)^{k + 1}}{\ln (k + 3)}$ .

The value of $\lim_{k \to \infty} S_{k}$ is given below,

$\begin{aligned} lim_{k \to \infty} S_{k} = lim_{k \to \infty} (\frac{1}{\ln (2)} - \frac{(1 / 2)^{k + 1}}{\ln (k + 3)}) \\ = \frac{1}{\ln 2} - 0 (A s \frac{b^{k}}{\ln k} \to 0, k \to \infty) \\ = \frac{1}{\ln 2} \end{aligned}$

Unlock Step-by-Step Solutions & Ace Your Exams!

Full Textbook Solutions
Get detailed explanations and key concepts
Unlimited Al creation
Al flashcards, explanations, exams and more...
Ads-free access
To over 500 millions flashcards
Money-back guarantee
We refund you if you fail your exam.

Start your free trial

Over 30 million students worldwide already upgrade their learning with Vaia!

Recommended explanations on Math Textbooks

View all explanations

What do you think about this solution?

We value your feedback to improve our textbook solutions.

Short Answer

Step by step solution

Part (a) Step 1. Given information.

Part (a) Step 2. Find the first two terms in the sequence.

Part (a) Step 3. Find the third, fourth terms in the sequence.

Part (a) Step 4. Find the fifth terms in the sequence.

Part (a) Step 5. Find the partial sums.

Part (b) Step 1. Write a close formula for Sk.

Part (c) Step 1. Find the sum of the series.

One App. One Place for Learning.

Most popular questions from this chapter

Recommended explanations on Math Textbooks

Calculus

Pure Maths

Statistics

Probability and Statistics

Discrete Mathematics

Applied Mathematics

Study anywhere. Anytime. Across all devices.

For the series ∑k=0∞ (1/2)kln(k+2)−(1/2)k+1ln(k+3)that follow,Part (a): Provide the first five terms in the sequence of partial sums Sk.Part (b): Provide a closed formula for Sk.Part (c): Find the sum of the series by evaluatinglimk→∞Sk.

Short Answer

Step by step solution

Part (a) Step 1. Given information.

Part (a) Step 2. Find the first two terms in the sequence.

Part (a) Step 3. Find the third, fourth terms in the sequence.

Part (a) Step 4. Find the fifth terms in the sequence.

Part (a) Step 5. Find the partial sums.

Part (b) Step 1. Write a close formula for Sk.

Part (c) Step 1. Find the sum of the series.

One App. One Place for Learning.

Most popular questions from this chapter

Recommended explanations on Math Textbooks

Calculus

Pure Maths

Statistics

Probability and Statistics

Discrete Mathematics

Applied Mathematics

Study anywhere. Anytime. Across all devices.