(a) Explanation Prove: Consider, A , B ⊆ ℝ , s 1 = sup A and s 2 = sup B also suppose s 1 ≥ s 2 . For all values of x ∈ A , x ≤ s 1 and also for all values of y ∈ B , y ≤ s 2 ≤ s 1 . This will lead to z ∈ A ∪ B , z ≤ s 1 . Thus we can say that s 1 is upper bounded of A ∪ B (b) To determine To prove: That i n f ( A ∪ B ) = min ( i n f ( A ) , i n f ( B ) ) if i n f ( A ) and i n f ( B ) exists.

8th Edition

ISBN: 9781285463261

Author: Douglas Smith, Maurice Eggen, Richard St. Andre

Publisher: Cengage Learning

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Sequence and Series

A sequence is defined as a collection of things. Series is defined to sum the things one by one in the sequence. It was invented by German mathematician Carl Friedrich Gauss.

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Chapter 7.1, Problem 13E

(a)

To determine

To prove: That sup(A∪B) exists and sup(A∪B)=max(sup(A),sup(B)) if sup(A) and sup(B) exists.

(b)

To determine

To prove: That inf(A∪B)=min(inf(A),inf(B)) if inf(A) and inf(B) exists.

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Chapter 7 Solutions

A Transition to Advanced Mathematics

Ch. 7.1 - Prob. 1E Ch. 7.1 - Prob. 2E Ch. 7.1 - Prob. 3E Ch. 7.1 - Prob. 4E Ch. 7.1 - Prob. 5E Ch. 7.1 - Prob. 6E Ch. 7.1 - Prob. 7E Ch. 7.1 - Prob. 8E Ch. 7.1 - Prob. 9E Ch. 7.1 - Prob. 10E

Ch. 7.1 - Prob. 11E Ch. 7.1 - Prob. 12E Ch. 7.1 - Prob. 13E Ch. 7.1 - Prob. 14E Ch. 7.1 - Prob. 15E Ch. 7.1 - An alternate version of the Archimedean Principle...Ch. 7.1 - Prob. 17E Ch. 7.1 - Prob. 18E Ch. 7.1 - Prob. 19E Ch. 7.1 - Prob. 20E Ch. 7.2 - Prob. 1E Ch. 7.2 - Prob. 2E Ch. 7.2 - Prob. 3E Ch. 7.2 - Prob. 4E Ch. 7.2 - Prob. 5E Ch. 7.2 - Prob. 6E Ch. 7.2 - Prob. 7E Ch. 7.2 - Prob. 8E Ch. 7.2 - Prob. 9E Ch. 7.2 - Prob. 10E Ch. 7.2 - Prob. 11E Ch. 7.2 - Prob. 12E Ch. 7.2 - Prob. 13E Ch. 7.2 - Prob. 14E Ch. 7.2 - Prob. 15E Ch. 7.2 - Prob. 16E Ch. 7.2 - Prob. 17E Ch. 7.2 - Prob. 18E Ch. 7.2 - Prob. 19E Ch. 7.2 - Prob. 20E Ch. 7.2 - Prob. 21E Ch. 7.2 - Prob. 22E Ch. 7.3 - Prob. 1E Ch. 7.3 - Prob. 2E Ch. 7.3 - Prob. 3E Ch. 7.3 - Let S=0,1. Find SSc.Ch. 7.3 - Prob. 5E Ch. 7.3 - Prob. 6E Ch. 7.3 - Prob. 7E Ch. 7.3 - Prob. 8E Ch. 7.3 - Prob. 9E Ch. 7.3 - Prob. 10E Ch. 7.3 - Prob. 11E Ch. 7.3 - Prob. 12E Ch. 7.3 - Prob. 13E Ch. 7.3 - Prob. 14E Ch. 7.4 - For each sequence x, determine whether x is...Ch. 7.4 - Prob. 2E Ch. 7.4 - Prob. 3E Ch. 7.4 - Prob. 4E Ch. 7.4 - Prob. 5E Ch. 7.4 - Prob. 6E Ch. 7.4 - Prob. 7E Ch. 7.4 - Prob. 8E Ch. 7.4 - Prob. 9E Ch. 7.4 - Prob. 10E Ch. 7.4 - Prob. 11E Ch. 7.4 - Prob. 12E Ch. 7.4 - Prob. 13E Ch. 7.5 - Prove Lemma 7.5.1.Ch. 7.5 - Prob. 2E Ch. 7.5 - Prob. 3E Ch. 7.5 - Prob. 4E Ch. 7.5 - Prob. 5E Ch. 7.5 - Prob. 6E Ch. 7.5 - Prob. 7E

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Sequences and Series Introduction; Author: Mario's Math Tutoring;https://www.youtube.com/watch?v=m5Yn4BdpOV0;License: Standard YouTube License, CC-BY

Introduction to sequences; Author: Dr. Trefor Bazett;https://www.youtube.com/watch?v=VG9ft4_dK24;License: Standard YouTube License, CC-BY

To prove: That sup ( A ∪ B ) exists and sup ( A ∪ B ) = m a x ( s u p ( A ) , s u p ( B ) ) if sup ( A ) and sup ( B ) exists.

Solution Summary: The author explains how to prove s_1 is upper bounded of Acup B.

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To prove: That sup(A∪B) exists and sup(A∪B)=max(sup(A),sup(B)) if sup(A) and sup(B) exists.

To prove: That inf(A∪B)=min(inf(A),inf(B)) if inf(A) and inf(B) exists.

Chapter 7 Solutions