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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 10.6.11
Chapter 10, Problem 10.6.11

11–27. Alternating Series Test Determine whether the following series converge.
∑ (k = 0 to ∞) (−1)ᵏ / (2k + 1)

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Identify the series given: \( \sum_{k=0}^{\infty} \frac{(-1)^k}{2k+1} \). This is an alternating series because of the factor \( (-1)^k \), which causes the terms to alternate in sign.
Recall the Alternating Series Test (Leibniz Test), which states that an alternating series \( \sum (-1)^k a_k \) converges if two conditions are met: (1) the sequence \( a_k \) is decreasing, and (2) \( \lim_{k \to \infty} a_k = 0 \).
Check the sequence \( a_k = \frac{1}{2k+1} \). First, verify that \( a_k \) is positive and decreasing. Since the denominator \( 2k+1 \) increases as \( k \) increases, \( a_k \) decreases.
Next, evaluate the limit of \( a_k \) as \( k \to \infty \): \( \lim_{k \to \infty} \frac{1}{2k+1} = 0 \). This satisfies the second condition of the Alternating Series Test.
Since both conditions are satisfied, conclude that the series \( \sum_{k=0}^{\infty} \frac{(-1)^k}{2k+1} \) converges by the Alternating Series Test.

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Key Concepts

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

Alternating Series Test

The Alternating Series Test determines the convergence of series whose terms alternate in sign. It requires that the absolute value of the terms decreases monotonically to zero. If these conditions hold, the series converges, though not necessarily absolutely.
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Monotonic Decreasing Sequence

A sequence is monotonic decreasing if each term is less than or equal to the previous term. For the Alternating Series Test, the absolute values of the terms must form such a sequence, ensuring the terms get progressively smaller and approach zero.
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Limit of the Terms Approaching Zero

For a series to converge, the terms must approach zero as the index goes to infinity. This is a necessary condition for convergence; if the terms do not tend to zero, the series diverges regardless of sign alternation.
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Related Practice
Textbook Question

11–86. Applying convergence tests Determine whether the following series converge. Justify your answers.

∑ (from j = 2 to ∞)1 / (j ln¹⁰j)

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48–63. Choose your test Determine whether the following series converge or diverge using the properties and tests introduced in Sections 10.3 and 10.4.

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11–86. Applying convergence tests Determine whether the following series converge. Justify your answers.

∑ (from k = 0 to ∞) (3ᵏ⁺⁴) / (5ᵏ⁻²)

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11–86. Applying convergence tests Determine whether the following series converge. Justify your answers.

∑ (from k = 1 to ∞)cos(1 / k⁹)

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Textbook Question

Find a formula for the nth partial sum Sₙ of

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