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Ch. 11 - Power Series
Briggs - Calculus: Early Transcendentals 3rd Edition
Briggs3rd EditionCalculus: Early TranscendentalsISBN: 9780136847243Not the one you use?Change textbook
All textbooksBriggs 3rd EditionCh. 11 - Power SeriesProblem 11.2.37
Chapter 11, Problem 11.2.37

Radius of convergence Find the radius of convergence for the following power series.
∑ₖ₌₁∞ (k!xᵏ)/(kᵏ)

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1
Identify the general term of the power series: \(a_k = \frac{k! x^k}{k^k}\).
Recall that the radius of convergence \(R\) can be found using the root test or ratio test. Here, the root test is often simpler for factorial expressions. The root test uses the formula: \(\frac{1}{R} = \limsup_{k \to \infty} \sqrt[k]{|a_k|}\).
Apply the root test by computing \(\sqrt[k]{|a_k|} = \sqrt[k]{\frac{k! |x|^k}{k^k}} = \frac{\sqrt[k]{k!} \cdot |x|}{k}\).
Use Stirling's approximation for large \(k\) to estimate \(k!\), which is \(k! \approx \sqrt{2 \pi k} \left(\frac{k}{e}\right)^k\). Taking the \(k\)th root gives \(\sqrt[k]{k!} \approx \frac{k}{e}\).
Substitute this approximation back into the expression to get \(\sqrt[k]{|a_k|} \approx \frac{\frac{k}{e} \cdot |x|}{k} = \frac{|x|}{e}\). Then, set \(\limsup_{k \to \infty} \sqrt[k]{|a_k|} = \frac{|x|}{e}\) and solve \(\frac{1}{R} = \frac{|x|}{e}\) to find the radius of convergence \(R\).

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Key Concepts

Here are the essential concepts you must grasp in order to answer the question correctly.

Radius of Convergence

The radius of convergence of a power series is the distance from the center of the series within which the series converges absolutely. It determines the interval on the x-axis where the series represents a valid function. Finding this radius helps understand the domain of convergence for the series.
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Radius of Convergence

Ratio Test for Convergence

The ratio test is a method to determine the convergence of an infinite series by examining the limit of the absolute value of the ratio of consecutive terms. For power series, it is commonly used to find the radius of convergence by analyzing the limit of |a_{k+1}/a_k| as k approaches infinity.
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Ratio Test

Factorials and Exponential Growth

Factorials (k!) grow faster than exponential functions, which affects the behavior of series terms. Understanding how factorials compare to powers like k^k is crucial when applying convergence tests, as it influences the limit calculations and thus the radius of convergence.
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Related Practice
Textbook Question

Evaluating an infinite series Write the Maclaurin series for f(x) = ln (1+x) and find the interval of convergence. Evaluate f(−1/2) to find the value of ∑ₖ₌₁∞ 1/(k 2ᵏ)

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Textbook Question

Approximating real numbers Use an appropriate Taylor series to find the first four nonzero terms of an infinite series that is equal to the following numbers.

cos 2

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Textbook Question

Write out the first three terms of the Maclaurin series for the following functions.

ƒ(x) = (1 + x)^(1/3)"

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Textbook Question

Binomial series Write out the first three terms of the Maclaurin series for the following functions.

ƒ(x) = (1 + 2x)^(-5)

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Textbook Question

Differentiating and integrating power series Find the power series representation for g centered at 0 by differentiating or integrating the power series for f (perhaps more than once). Give the interval of convergence for the resulting series.


g(x) = 2/(1 − 2x)² using f(x) = 1/(1 − 2x)

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Textbook Question

Combining power series Use the power series representation


f(x ) =ln (1 − x) = −∑ₖ₌₁∞ xᵏ/k, for −1 ≤ x < 1,


to find the power series for the following functions (centered at 0). Give the interval of convergence of the new series.


p(x) = 2x⁶ ln(1 − x)

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