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Ch. 10 - Sequences and Infinite Series
Briggs - Calculus: Early Transcendentals 3rd Edition
Briggs3rd EditionCalculus: Early TranscendentalsISBN: 9780136847243Not the one you use?Change textbook
All textbooksBriggs 3rd EditionCh. 10 - Sequences and Infinite SeriesProblem 10.6.5
Chapter 10, Problem 10.6.5

Explain why the magnitude of the remainder in an alternating series (with terms that are nonincreasing in magnitude) is less than or equal to the magnitude of the first neglected term.

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Recall the Alternating Series Remainder Theorem, which states that for an alternating series with terms \( a_n \) that decrease in magnitude and tend to zero, the remainder after \( n \) terms, \( R_n = S - S_n \), satisfies \( |R_n| \leq |a_{n+1}| \).
Understand that the partial sums \( S_n = a_1 - a_2 + a_3 - \cdots + (-1)^{n+1} a_n \) alternate around the actual sum \( S \), meaning each successive partial sum overestimates or underestimates \( S \) by an amount less than the magnitude of the next term.
Since the terms \( |a_n| \) are nonincreasing, the difference between consecutive partial sums \( |S_{n+1} - S_n| = |a_{n+1}| \) provides an upper bound on how much the sum can change, and thus bounds the remainder.
Because the series alternates in sign, the error \( R_n \) does not exceed the size of the next term in magnitude; the partial sums 'zig-zag' closer to the true sum, never overshooting by more than \( |a_{n+1}| \).
Therefore, the magnitude of the remainder after \( n \) terms is at most the magnitude of the first neglected term, which ensures \( |R_n| \leq |a_{n+1}| \).

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Key Concepts

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

Alternating Series

An alternating series is a series whose terms alternate in sign, typically written as positive, negative, positive, and so on. This pattern affects the convergence behavior and error estimation, making it distinct from series with terms of constant sign.
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Geometric Series

Nonincreasing Magnitude of Terms

In an alternating series, the terms' absolute values decrease or stay the same as the series progresses. This property ensures that each successive term is smaller in magnitude, which is crucial for bounding the remainder and establishing convergence.
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Divergence Test (nth Term Test)

Remainder Estimation in Alternating Series

The remainder after n terms in an alternating series is the difference between the true sum and the partial sum. Its magnitude is always less than or equal to the absolute value of the first omitted term, providing a simple and effective error bound for approximations.
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Alternating Series Remainder
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