/*! This file is auto-generated */ .wp-block-button__link{color:#fff;background-color:#32373c;border-radius:9999px;box-shadow:none;text-decoration:none;padding:calc(.667em + 2px) calc(1.333em + 2px);font-size:1.125em}.wp-block-file__button{background:#32373c;color:#fff;text-decoration:none} Problem 61 Identify the functions represent... [FREE SOLUTION] | 91Ó°ÊÓ

91Ó°ÊÓ

Log out

Learning Materials

Features

Discover

Chapter 10: Problem 61

Identify the functions represented by the following power series. $$\sum_{k=1}^{\infty}(-1)^{k} \frac{k x^{k+1}}{3^{k}}$$

Short Answer

Expert verified
Answer: The given power series represents the function $$f(x)=-\frac{3 - 2x}{(3 - x)^2}, \text{ when } |-x/3| < 1.$$

Step by step solution

01

Initial Observation

The given power series is: $$\sum_{k=1}^{\infty}(-1)^{k} \frac{k x^{k+1}}{3^{k}}$$ Now let's observe the series and identify the patterns: 1. It has alternating signs given by \((-1)^k\) 2. It has a \(k\) in the numerator 3. The term \(x^{k+1}\) is the power of \(x\) 4. The term \(3^{k}\) in the denominator
02

Manipulate the Series

To make it easier to compare with known functions, let's rewrite the series. Notice that we can write: $$\frac{k x^{k+1}}{3^{k}} = k \cdot \frac{x^{k+1}}{3^{k}}$$ Now let's rewrite the series: $$\sum_{k=1}^{\infty}(-1)^{k} k \cdot \frac{x^{k+1}}{3^{k}}$$
03

Identify Known Functions

Notice that the series looks like a geometrical series whose common ratio is \(\frac{x}{3}\). If we recall a regular geometric series, we have: $$\sum_{k=1}^{\infty} \left(\frac{x}{3}\right)^{k} = \frac{\frac{x}{3}}{1 - \frac{x}{3}} = \frac{x}{3 - x} \text{, when } |-x/3| < 1$$
04

Derive and Compare

The given series has a \(k\) multiplying the geometric series. We will find the derivative of the known function \(\frac{x}{3 - x}\) to see if we can match the given series. Compute the derivative: $$\frac{d}{dx}\left(\frac{x}{3 - x}\right) = \frac{(1)(3-x) - (1) x}{(3 - x)^2} = \frac{3-x-x}{(3-x)^2}$$ which simplifies to: $$\frac{d}{dx}\left(\frac{x}{3 - x}\right) = \frac{3 - 2x}{(3 - x)^2} \text{, when } |-x/3| < 1$$
05

Adjust Signs

The given series has alternating signs. To match that, we can multiply the derivative of the function by \(-1\): $$-\frac{3 - 2x}{(3 - x)^2} \text{, when } |-x/3| < 1$$ Now, let's compare the two functions: $$\sum_{k=1}^{\infty}(-1)^{k} k \cdot \frac{x^{k+1}}{3^{k}} = -\frac{3 - 2x}{(3 - x)^2} \text{, when } |-x/3| < 1$$ The power series is equal to: $$ f(x)=-\frac{3 - 2x}{(3 - x)^2} \text{, when } |-x/3| < 1 $$

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.

Over 30 million students worldwide already upgrade their learning with 91Ó°ÊÓ!

One App. One Place for Learning.

All the tools & learning materials you need for study success - in one app.

Get started for free

Most popular questions from this chapter

Consider the following function and its power series: $$ f(x)=\frac{1}{(1-x)^{2}}=\sum_{k=1}^{\infty} k x^{k-1}, \quad \text { for }-1

Let $$f(x)=\sum_{k=0}^{\infty} c_{k} x^{k} \quad \text { and } \quad g(x)=\sum_{k=0}^{\infty} d_{k} x^{k}$$ a. Multiply the power series together as if they were polynomials, collecting all terms that are multiples of \(1, x,\) and \(x^{2} .\) Write the first three terms of the product \(f(x) g(x)\) b. Find a general expression for the coefficient of \(x^{n}\) in the product series, for \(n=0,1,2, \ldots\)

The inverse hyperbolic sine is defined in several ways; among them are $$\sinh ^{-1} x=\ln (x+\sqrt{x^{2}+1})=\int_{0}^{x} \frac{d t}{\sqrt{1+t^{2}}}$$ Find the first four terms of the Taylor series for \(\sinh ^{-1} x\) using these two definitions (and be sure they agree).

Find the function represented by the following series and find the interval of convergence of the series. $$\sum_{k=1}^{\infty} \frac{x^{2 k}}{4 k}$$

Exponential function In Section 3, we show that the power series for the exponential function centered at 0 is $$e^{x}=\sum_{k=0}^{\infty} \frac{x^{k}}{k !}, \quad \text { for }-\infty < x < \infty$$ Use the methods of this section to find the power series for the following functions. Give the interval of convergence for the resulting series. $$f(x)=e^{2 x}$$
See all solutions

Recommended explanations on Math Textbooks

Calculus

Read Explanation

Applied Mathematics

Read Explanation

Theoretical and Mathematical Physics

Read Explanation

Probability and Statistics

Read Explanation

Statistics

Read Explanation

Decision Maths

Read Explanation
View all explanations

What do you think about this solution?

We value your feedback to improve our textbook solutions.

Study anywhere. Anytime. Across all devices.