Textbook Question
Radius and interval of convergence Determine the radius and interval of convergence of the following power series.
∑ₖ₌₀∞ k(x−1)ᵏ
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Ch. 11 - Power Series
Briggs3rd EditionCalculus: Early TranscendentalsISBN: 9780136847243
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Table of contents
- Ch. 1 - Functions210
- Ch. 2 - Limits371
- Ch. 3 - Derivatives633
- Ch. 4 - Applications of the Derivative412
- Ch. 5 - Integration328
- Ch. 6 - Applications of Integration331
- Ch. 7 - Logarithmic, Exponential Functions, and Hyperbolic Functions177
- Ch. 8 - Integration Techniques394
- Ch. 9 - Differential Equations179
- Ch. 10 - Sequences and Infinite Series339
- Ch. 11 - Power Series218
- Ch.12 - Parametric and Polar Curves215
Briggs3rd EditionCalculus: Early TranscendentalsISBN: 9780136847243Not the one you use?Change textbook
Chapter 11, Problem 11.4.73
Derivative trick Here is an alternative way to evaluate higher derivatives of a function f that may save time. Suppose you can find the Taylor series for f centered at the point a without evaluating derivatives (for example, from a known series). Then f⁽ᵏ⁾(a)=k! multiplied by the coefficient of (x−a)ᵏ. Use this idea to evaluate f⁽³⁾(0) and f⁽⁴⁾(0) for the following functions. Use known series and do not evaluate derivatives.
f(x) = ∫₀ˣ sin t² dt
Verified step by step guidance1
Recognize that the function is given by an integral: \(f(x) = \int_0^x \sin(t^2) \, dt\). To find the higher derivatives at 0 without directly differentiating, we will use the Taylor series expansion of \(\sin(t^2)\) around 0.
Recall the Taylor series for \(\sin z\) centered at 0: \(\sin z = \sum_{n=0}^\infty (-1)^n \frac{z^{2n+1}}{(2n+1)!}\). Substitute \(z = t^2\) to get the series for \(\sin(t^2)\): \(\sin(t^2) = \sum_{n=0}^\infty (-1)^n \frac{t^{4n+2}}{(2n+1)!}\).
Integrate the series term-by-term from 0 to \(x\) to find the series for \(f(x)\): \(f(x) = \int_0^x \sin(t^2) \, dt = \sum_{n=0}^\infty (-1)^n \frac{1}{(2n+1)!} \int_0^x t^{4n+2} \, dt\). Perform the integral inside the sum to get \(f(x) = \sum_{n=0}^\infty (-1)^n \frac{x^{4n+3}}{(2n+1)! (4n+3)}\).
Identify the coefficients of the powers of \(x\) in the series expansion of \(f(x)\): the general term is \(a_n x^{4n+3}\) where \(a_n = (-1)^n / [(2n+1)! (4n+3)]\). Since the series is centered at 0, the coefficient of \(x^k\) corresponds to the coefficient of \((x-0)^k\).
Use the formula for the \(k\)-th derivative at 0: \(f^{(k)}(0) = k!\) times the coefficient of \(x^k\) in the Taylor series. To find \(f^{(3)}(0)\) and \(f^{(4)}(0)\), locate the coefficients of \(x^3\) and \(x^4\) respectively in the series and multiply each by \$3!\( and \)4!$. Note that if a power does not appear in the series, the corresponding derivative at 0 is zero.
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Key Concepts
Here are the essential concepts you must grasp in order to answer the question correctly.
Taylor Series Expansion
A Taylor series represents a function as an infinite sum of terms calculated from the function's derivatives at a single point. It expresses f(x) as a power series centered at a point a, allowing approximation of the function near a. Each term involves powers of (x - a) and coefficients related to derivatives of f at a.
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Taylor Series
Relationship Between Taylor Coefficients and Derivatives
The coefficient of the (x - a)^k term in the Taylor series of f(x) is equal to f^(k)(a) divided by k!. This means the k-th derivative at a can be found by multiplying the coefficient of (x - a)^k by k!, providing a shortcut to find derivatives if the series is known.
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Using Known Series to Find Derivatives of Integral Functions
When a function is defined as an integral of another function with a known series (e.g., f(x) = ∫₀ˣ sin(t²) dt), you can find its Taylor series by integrating the series term-by-term. This avoids direct differentiation and allows extraction of derivatives from the resulting power series.
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Related Practice
Textbook Question
Representing functions by power series Identify the functions represented by the following power series.
∑ₖ₌₀∞ 2ᵏ x²ᵏ⁺¹
Textbook Question
Power series for derivatives
a. Differentiate the Taylor series centered at 0 for the following functions.
b. Identify the function represented by the differentiated series.
c. Give the interval of convergence of the power series for the derivative.
f(x) = eˣ
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) = x/(1 + x²)² using f(x) = 1/(1 + x²)
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Textbook Question
Radius and interval of convergence Determine the radius and interval of convergence of the following power series.
∑ₖ₌₀∞ (k²⁰ xᵏ)/(2k+1)!
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Textbook Question
Working with binomial series Use properties of power series, substitution, and factoring to find the first four nonzero terms of the Maclaurin series for the following functions. Use the Maclaurin series
(1 + x)⁻² = 1 − 2x + 3x² − 4x³ + ⋯, for −1 < x < 1.
(1 + 4x)⁻²