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# Let In (x) := 1for x E (0, l/n) and In (x) :=Oelsewherein[O, 1].Show that Un) ISBN: 9780471321484 424

## Solution for problem 17 Chapter 8.2

Introduction to Real Analysis | 3rd Edition

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Problem 17

Let In (x) := 1for x E (0, l/n) and In (x) :=Oelsewherein[O, 1].Show that Un) isadecreasingsequence of discontinuous functions that converges to a continuous limit function, but theconvergence is not uniform on [0, 1].

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Exam2StudySmartQuestions 4/9/1611:51PM BiologicalFoundations o Whenaneuronsendsasignal,itissendinganelectricalimpulsedownitsbody.Itstart inthedendrites,wheretheactionpotentialfromanotherneuronisreceived.The neurotransmittersfromthepresynapticneuroncausesligandgatedsodiumchannelto open.Thisinfluxofsodiumthrowsoffthethreshold,whichis-70mV.Ifthemembrane...

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##### ISBN: 9780471321484

This full solution covers the following key subjects: . This expansive textbook survival guide covers 48 chapters, and 831 solutions. Introduction to Real Analysis was written by and is associated to the ISBN: 9780471321484. This textbook survival guide was created for the textbook: Introduction to Real Analysis, edition: 3. The answer to “Let In (x) := 1for x E (0, l/n) and In (x) :=Oelsewherein[O, 1].Show that Un) isadecreasingsequence of discontinuous functions that converges to a continuous limit function, but theconvergence is not uniform on [0, 1].” is broken down into a number of easy to follow steps, and 35 words. Since the solution to 17 from 8.2 chapter was answered, more than 217 students have viewed the full step-by-step answer. The full step-by-step solution to problem: 17 from chapter: 8.2 was answered by , our top Calculus solution expert on 03/14/18, 07:51PM.

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