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Report on the 2009 Tertiary Entrance Examination in Discrete MathematicsThe TEE subject Discrete Mathematics was examined for the last time in 2009.This report was written by the chief examiner with the assistance of the

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Rosen, Discrete Mathematics and Its Applications, 6th Edition - Errata...

Rosen, Discrete Mathematics and Its Applications, 6th edition1st printing Errata Corrections (to be fixed in 2nd and subsequent printings), with additional webresource referencesHere is a listing of corrections we have identified and will fix in

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Show All SolutionsRosen, Discrete Mathematics and Its Applications, 6th editionExtra ExamplesSection 1.4—Nested Quantifiers — Page references correspond to locations of Extra Examples icons in the textbook.p.51, icon at Example 1#1. Write the following statements

Rosen, Discrete Mathematics and Its Applications, 6th Edition - Extra...

Show All SolutionsRosen, Discrete Mathematics and Its Applications, 6th editionExtra ExamplesSection 12.1—Modeling Computation — Page references correspond to locations of Extra Examples icons in the textbook.p.790, icon at Example 8#1. Let G = (V,

Rosen, Discrete Mathematics and Its Applications, 6th Edition - Extra...

Show All SolutionsRosen, Discrete Mathematics and Its Applications, 6th editionExtra ExamplesSection 1.3—Predicates and Quantifiers — Page references correspond to locations of Extra Examples icons in the textbook.p.31, icon at Example 3#1. Let P (x)

Rosen, Discrete Mathematics and Its Applications, 6th Edition - Extra...

Show All SolutionsRosen, Discrete Mathematics and Its Applications, 6th editionExtra ExamplesSection 10.3—Tree Traversal — Page references correspond to locations of Extra Examples icons in the textbook.p.711, icon at Example 1#1. Write in lexicographic ordering

Rosen, Discrete Mathematics and Its Applications, 6th Edition - Extra...

Show All SolutionsRosen, Discrete Mathematics and Its Applications, 6th editionExtra ExamplesSection 1.5—Rules of Inference — Page references correspond to locations of Extra Examples icons in the textbook.p.67, icon at Example 6#1. The proposition (¬q

Rosen, Discrete Mathematics and Its Applications, 6th Edition - Extra...

Show All SolutionsRosen, Discrete Mathematics and Its Applications, 6th editionExtra ExamplesSection 1.2—Propositional Equivalences — Page references correspond to locations of Extra Examples icons in the textbook.p.22, icon below Definition 2#1. Prove that ¬[r ∨

Rosen, Discrete Mathematics and Its Applications, 6th Edition - Extra...

Show All SolutionsRosen, Discrete Mathematics and Its Applications, 6th editionExtra ExamplesSection 1.6—Introduction to Proofs — Page references correspond to locations of Extra Examples icons in the textbook.p.76, icon below start of ”Understanding How Theorems

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Show All SolutionsRosen, Discrete Mathematics and Its Applications, 6th editionExtra ExamplesSection 3.2—The Growth of Functions — Page references correspond to locations of Extra Examples icons in the textbook.p.181, icon at Example 1#1. Give a

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Show All SolutionsRosen, Discrete Mathematics and Its Applications, 6th editionExtra ExamplesSection 6.2—Probability Theory — Page references correspond to locations of Extra Examples icons in the textbook.p.404, icon at Example 3#1. You draw 2 cards,

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Show All SolutionsRosen, Discrete Mathematics and Its Applications, 6th editionExtra ExamplesSection 5.5—Generalized Permutations and Combinations — Page references correspond to locations of Extra Examples icons in the textbook.p.373, icon at Example 4#1. A jar

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Show All SolutionsRosen, Discrete Mathematics and Its Applications, 6th editionExtra ExamplesSection 4.3—Recursive Definitions and Structural Induction — Page references correspond to locations of Extra Examples icons in the textbook.p.295, icon at Example 1 n2

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Show All SolutionsRosen, Discrete Mathematics and Its Applications, 6th editionExtra ExamplesSection 3.4—The Integers and Division — Page references correspond to locations of Extra Examples icons in the textbook.p.201, icon at Example 2#1. Certain rules

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Show All SolutionsRosen, Discrete Mathematics and Its Applications, 6th editionExtra ExamplesSection 4.2—Strong Induction and Well-Ordering — Page references correspond to locations of Extra Examples icons in the textbook.p.285, icon at Example 2#1. Consider an

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Show All SolutionsRosen, Discrete Mathematics and Its Applications, 6th editionExtra ExamplesSection 4.1—Mathematical Induction — Page references correspond to locations of Extra Examples icons in the textbook.p.267, icon at Example 1#1. Use the Principle of

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Show All SolutionsRosen, Discrete Mathematics and Its Applications, 6th editionExtra ExamplesSection 5.1—The Basics of Counting — Page references correspond to locations of Extra Examples icons in the textbook.p.336, icon before Example 1#1. There are

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Show All SolutionsRosen, Discrete Mathematics and Its Applications, 6th editionExtra ExamplesSection 8.1—Relations and Their Properties — Page references correspond to locations of Extra Examples icons in the textbook.p.523, icon at Example 10#1. Let R

Rosen, Discrete Mathematics and Its Applications, 6th Edition - Extra...

Show All SolutionsRosen, Discrete Mathematics and Its Applications, 6th editionExtra ExamplesSection 7.2—Solving Linear Recurrence Relations — Page references correspond to locations of Extra Examples icons in the textbook.p.463, icon at Example 3#1. Solve: an

Rosen, Discrete Mathematics and Its Applications, 6th Edition - Extra...

Show All SolutionsRosen, Discrete Mathematics and Its Applications, 6th editionExtra ExamplesSection 4.4—Recursive Algorithms — Page references correspond to locations of Extra Examples icons in the textbook.p.311, icon at Example 1#1.(a) Write a recursive algorithm

Rosen, Discrete Mathematics and Its Applications, 6th Edition - Extra...

Show All SolutionsRosen, Discrete Mathematics and Its Applications, 6th editionExtra ExamplesSection 9.5—Euler and Hamilton Paths — Page references correspond to locations of Extra Examples icons in the textbook.p.634, icon at Example 2#1. Determine whether

Rosen, Discrete Mathematics and Its Applications, 6th Edition - Extra...

Show All SolutionsRosen, Discrete Mathematics and Its Applications, 6th editionExtra ExamplesSection 3.8—Matrices — Page references correspond to locations of Extra Examples icons in the textbook.p.248, icon at Example 3 2 7 1 −3#1. Let

Rosen, Discrete Mathematics and Its Applications, 6th Edition - Extra...

Show All SolutionsRosen, Discrete Mathematics and Its Applications, 6th editionExtra ExamplesSection 5.3—Permutations and Combinations — Page references correspond to locations of Extra Examples icons in the textbook.p.355, icon at Example 1#1. A class has

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Show All SolutionsRosen, Discrete Mathematics and Its Applications, 6th editionExtra ExamplesSection 6.1—An Introduction to Discrete Probability — Page references correspond to locations of Extra Examples icons in the textbook.p.394, icon at Example 1#1. A

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Show All SolutionsRosen, Discrete Mathematics and Its Applications, 6th editionExtra ExamplesSection 5.2—The Pigeonhole Principle — Page references correspond to locations of Extra Examples icons in the textbook.p.348, icon at Example 4#1. Prove that in

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Common Mistakes in Discrete Mathematics CM-1 Common Mistakes in Discrete MathematicsIn this section of the Guide we list many common mistakes that people studying discrete mathematics sometimesmake. The list is organized chapter by chapter, based

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Show All SolutionsRosen, Discrete Mathematics and Its Applications, 6th editionExtra ExamplesSection 2.3—Functions — Page references correspond to locations of Extra Examples icons in the textbook.p.135, icon at Example 3#1. Determine if the following describes

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PROFESSOR: Melody RashidianCLASSROOM: Alumni Hall 112TIME: Tuesdays and Thursdays, 6:00-8:15 pmCONTACT INFORMATION: mrashidi@clunet.eduWEB PAGE: www.csun.edu/~mr31841OFFICE HOURS: Tuesdays and Thursdays, 8:15-8:30 pm, Alumni Hall 112TEXTBOOK: Kenneth H. Rosen, Discrete Mathematics and Its Application, Sixth EditionMy teaching

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Applications of Discrete Mathematics - Chapter 18...

18 Shortest Path ProblemsAuthor: William C. Arlinghaus, Department of Mathematics and ComputerScience, Lawrence Technological University.Prerequisites: The prerequisites for this chapter are weighted graphs andDijkstra’s algorithm. See Section 9.6 of Discrete Mathematics and Its Applica-tions.IntroductionOne

Applications of Discrete Mathematics - Chapter 5...

5 Coding TheoryAuthor: Kenneth H. Rosen, AT&T Laboratories.Prerequisites: The prerequisites for this chapter are the basics of logic, settheory, number theory, matrices, and probability. See Sections 1.1, 2.1, 2.2,3.4–3.7, and 6.1 of Discrete Mathematics

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11 Scheduling Problems and Bin PackingAuthor: Robert A. McGuigan, Department of Mathematics, Westfield StateCollege.Prerequisites: The prerequisites for this chapter are basic concepts of graphtheory. See, for example, Sections 9.1, 9.2, and 9.4 of Discrete

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21 Graph LayoutsAuthor: Zevi Miller, Department of Mathematics and Statistics, Miami Uni-versity.Prerequisites: The prerequisites for this chapter are big-O notation andbasic concepts of graphs and trees. See Sections 2.2, 9.1, 9.2, 9.4, 10.1, and

Applications of Discrete Mathematics - Chapter 14...

14 Applications of Subgraph EnumerationAuthor: Fred J. Rispoli, Department of Mathematics, Dowling College.Prerequisites: The prerequisites for this chapter are counting, probability,graphs, and trees. See Sections 5.1, 5.3, and 6.1, and Chapters 9 and 10

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24 Petri NetsAuthor: Robert A. McGuigan, Department of Mathematics, Westfield StateCollege.Prerequisites: The prerequisites for this chapter are graphs and digraphs.See Sections 9.1, 9.2, and 10.1 of Discrete Mathematics and Its Applications.IntroductionPetri nets are mathematical

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23 Network FlowsAuthor: Arthur M. Hobbs, Department of Mathematics, Texas A&M Uni-versity.Prerequisites: The prerequisites for this chapter are graphs and trees. SeeSections 9.1 and 10.1 of Discrete Mathematics and Its Applications.IntroductionIn this chapter we

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Spring 2014 Jonathan Wise Last revised: February 14, 2014 at 6:41pmInstructor Jonathan WiseOffice Math 204Office hours T 10-11am, W 1-2pm, Th 3-4pm (or by appointment)e-mail jonathan.wise@math.colorado.eduPhone (303) 492 3018Course website math.colorado.edu/~jonathan.wise/math2001Classroom FLMG 103Class time

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