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Unformatted text preview: MARK BOX problem points 1 10 2 10 3 10 4 10 Total 20 % 100 Math 554/703i.002 Prof. Girardi Fall 98 Exam 3 11/24/98 NAME: INSTRUCTIONS : 1. Write a neat formal proof to 2 of the 4 problems. I am doing problem numbers: . 2. Use your own paper: a. write on only one side of the page b. begin each problem on a new page c. put your name on each page. 2. The mark box indicates the problems along with their points. Check that your copy of the exam has all of the problems. 3. During this test, do not leave your seat. If you have a question, raise your hand. 4. This closed book/notes exam covers ( Intro. to Real Analysis , 1 st ed., by Stoll): Sections 2.4 – 2.6. Problem Source : 1. Fundamental Ideas of Analysis by Michael Reed: § 2.6 # 3 & 4. 2. look at problem § 2.5 # 7 3. I made it up today. 4. Standard question, we mentioned it in class. 1 1. Let { a n } ∞ n =1 and { b n } ∞ n =1 be bounded sequences in R and a, c, d ∈ R ....
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This note was uploaded on 12/13/2011 for the course MATH 554 taught by Professor Girardi during the Fall '10 term at South Carolina.
 Fall '10
 Girardi
 Math

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