Textbook Question
87. Explain why or why not
Determine whether the following statements are true and give an explanation or counterexample.
e. ∑ (k = 1 to ∞) (π / e)⁻ᵏ is a convergent geometric series.
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Ch. 10 - Sequences and Infinite 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 10, Problem 10.4.41d
41–44. {Use of Tech} Remainders and estimates Consider the following convergent series.
d. Find an interval in which the value of the series must lie if you approximate it using ten terms of the series.
41. ∑ (k = 1 to ∞) 1 / k⁶
Verified step by step guidance1
Recognize that the series given is \( \sum_{k=1}^{\infty} \frac{1}{k^6} \), which is a convergent p-series with \( p = 6 > 1 \). This means the series converges absolutely and the remainder after \( n \) terms can be estimated using the integral test remainder bounds.
To approximate the sum using the first 10 terms, calculate the partial sum \( S_{10} = \sum_{k=1}^{10} \frac{1}{k^6} \). This is the sum of the first 10 terms of the series.
Use the integral test remainder estimate to find bounds for the remainder \( R_{10} = S - S_{10} \), where \( S \) is the total sum of the series. The remainder satisfies the inequalities:
\[ \int_{11}^{\infty} \frac{1}{x^6} \, dx \leq R_{10} \leq \int_{10}^{\infty} \frac{1}{x^6} \, dx \]
These integrals provide lower and upper bounds for the error when approximating the infinite sum by the first 10 terms.
Evaluate the improper integrals:
\[ \int_{a}^{\infty} \frac{1}{x^6} \, dx = \left[ -\frac{1}{5x^5} \right]_{a}^{\infty} = \frac{1}{5a^5} \]
Use this formula to compute the bounds for \( R_{10} \) by substituting \( a = 10 \) and \( a = 11 \).
Finally, add these remainder bounds to the partial sum \( S_{10} \) to get the interval in which the total sum \( S \) lies:
\[ S_{10} + \int_{11}^{\infty} \frac{1}{x^6} \, dx \leq S \leq S_{10} + \int_{10}^{\infty} \frac{1}{x^6} \, dx \]
This interval gives a guaranteed range for the value of the series when approximated by the first 10 terms.
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Key Concepts
Here are the essential concepts you must grasp in order to answer the question correctly.
Convergent Infinite Series
A convergent infinite series is a sum of infinitely many terms that approaches a finite limit. For the series ∑ 1/k⁶, since the exponent 6 > 1, the p-series test confirms convergence. Understanding convergence ensures the series sum exists and can be approximated by partial sums.
Recommended video:
06:52
Convergence of an Infinite Series
Partial Sums and Approximation
Partial sums are the sums of the first n terms of a series and serve as approximations to the total infinite sum. Using ten terms means calculating the sum from k=1 to 10, which approximates the series' value. The accuracy depends on how quickly the remaining terms decrease.
Recommended video:
06:11Introduction to Riemann Sums
Remainder (Error) Estimates for Series
The remainder after n terms is the difference between the infinite sum and the nth partial sum. For decreasing positive term series like ∑ 1/k⁶, the remainder can be bounded using the integral test, providing an interval where the true sum lies. This helps estimate the error in approximations.
Recommended video:
06:32Alternating Series Remainder
Related Practice
Textbook Question
Explain why or why not Determine whether the following statements are true and give an explanation or counterexample.
d. When applying the Limit Comparison Test, an appropriate comparison series for ∑ (k = 1 to ∞) (k² + 2k + 1) / (k⁵ + 5k + 7) is ∑ (k = 1 to ∞) 1 / k³.
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Textbook Question
Explain why or why not Determine whether the following statements are true and give an explanation or counterexample.
e. If ∑ k⁻ᵖ converges, then ∑ k⁻ᵖ⁺⁰.⁰⁰¹ converges.
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Textbook Question
87. Explain why or why not
Determine whether the following statements are true and give an explanation or counterexample.
d. If ∑ pᵏ diverges, then ∑ (p + 0.001)ᵏ diverges, for a fixed real number p.
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Textbook Question
Explain why or why not Determine whether the following statements are true and give an explanation or counterexample.
d. The Ratio Test is always inconclusive when applied to ∑ aₖ, where aₖ is a nonzero rational function of k.
48
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Textbook Question
Explain why or why not Determine whether the following statements are true and give an explanation or counterexample.
d. Every partial sum Sₙ of the series ∑ (k = 1 to ∞) 1 / k² underestimates the exact value of ∑ (k = 1 to ∞) 1 / k².
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