What can be concluded when integral test is applied to the following series? 1 (2n + 1)3 Select one: the series diverges by integral test. none of these the series converges by integral test. integral test cannot be applied since f(x) is positive and decreasing but not continuous on the interval of integration. integral test cannot be applied since f(x) is continuous and positive but not decreasing on the interval of integration.
What can be concluded when integral test is applied to the following series? 1 (2n + 1)3 Select one: the series diverges by integral test. none of these the series converges by integral test. integral test cannot be applied since f(x) is positive and decreasing but not continuous on the interval of integration. integral test cannot be applied since f(x) is continuous and positive but not decreasing on the interval of integration.
Algebra & Trigonometry with Analytic Geometry
13th Edition
ISBN:9781133382119
Author:Swokowski
Publisher:Swokowski
Chapter10: Sequences, Series, And Probability
Section: Chapter Questions
Problem 22RE
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Transcribed Image Text:What can be concluded when integral test is
applied to the following series?
1
(2n + 1)3
n=3
Select one:
the series diverges by integral test.
none of these
the series converges by integral test.
integral test cannot be applied since f(x) is
positive and decreasing but not continuous
on the interval of integration.
integral test cannot be applied since f(x) is
continuous and positive but not decreasing
on the interval of integration.
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