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Can a sequence be both arithmetic and geometric Give

Algebra and Trigonometry | 8th Edition | ISBN: 9780132329033 | Authors: Michael Sullivan ISBN: 9780132329033 217

Solution for problem 13.3.106 Chapter 13

Algebra and Trigonometry | 8th Edition

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Algebra and Trigonometry | 8th Edition | ISBN: 9780132329033 | Authors: Michael Sullivan

Algebra and Trigonometry | 8th Edition

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Problem 13.3.106

Can a sequence be both arithmetic and geometric? Give reasons for your answer.

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9/21/16 ● To show a limit doesn’t exist ○ All #’s can’t exist ■ Prove that left and right­hand limits don’t exist or are not equal ■ Or one or both go to infinity ■ One or both one­sided limits do not exist Challenge problems 1. Prove lim (x­>a) ax^2 + Bx + y = aa^2 + Ba + y 2. Prove that lim (x­>0) lim sin (pi/x) does not exist ● Squueze theorem ○ If lim (x­>a) f(x) = lim (x­>a) g(x) = L and for x near but not equal to a f(x) a) h(x) = L ■ EXAMPLE ● h(x) = x sin x ● What is lim (x­>0) h(x) ● ­1

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Chapter 13, Problem 13.3.106 is Solved
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Textbook: Algebra and Trigonometry
Edition: 8
Author: Michael Sullivan
ISBN: 9780132329033

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Can a sequence be both arithmetic and geometric Give