PROFESSOR/ CONTACT: |
Lucia Moura, Office: STE 5-027 email: lucia@eecs.uottawa.ca (Your email message must have in the subject line "CSI2101 <student full name>" or it may not be read) Office hours: Mondays and Fridays 1:15PM-2:15PM WEB PAGE: http://www.eecs.uottawa.ca/~lucia/courses/2101-12/ |
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LINKS/INFO: |
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LECTURES/TUTORIALS: |
Lec1 Mondays 11:30-1:00 (MRT 250) TUT Tuesdays 4:00-5:30 (FTX 133) - tutorials are mandatory Lec2 Thursdays 1:00-2:30 (MRT 250) |
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POLICIES: |
You are responsible for reading the course's policies on plagiarism, remarking, late assignments and missed midterm. |
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TEXTBOOK: |
Kenneth H. Rosen, Discrete Mathematics and Its Applications, Sixth or Seventh Edition, McGraw Hill, 2007 or 2012. (references given to 6th edition as it was voted the official version by vast majority of students) |
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CALENDAR DESCRIPTION |
CSI2101 Discrete Structures (3,1.5,0) 3 cr. Discrete structures as they apply to computer science, algorithm analysis and design. Predicate logic. Review of proof techniques; application of induction to computing problems. Graph theory applications in information technology. Program correctness, preconditions, postconditions and invariants. Analysis of recursive programs using recurrence relations. Properties of integers and basic cryptographical applications. Prerequisite: MAT1348. |
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COURSE OBJECTIVES |
Discrete mathematics and structures form the very foundation for computer science, and are essential in every branch of computing. In MAT1348 (discrete mathematics for computing) you have been introduced to fundamental problems and objects in discrete mathematics. In CSI2101 (discrete structures) you will learn more advanced concepts in this area, and at the same time increase your knowledge of how to apply them to various types of problems in computing. While learning how to analyse an algorithm, prove the correctness of a program, model a network problem with graphs or use number theory in cryptography, you will be sharpening your mathematical skills by practicing problem solving, modeling, logical reasoning and writing precise proofs. |
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COURSE OUTLINE |
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MARKING SCHEME: |
Final Grade (G): if (0.25*M + 0.50*F)/0.75 < 50% then G=(0.25*M + 0.50*F)/0.75 if (0.25*M + 0.50*F)/0.75>= 50% then G=0.25*M + 0.50*F + 0.20*A + 0.05 *Q |
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IMPORTANT DATES: |
Assignment (currently tentative) due dates:
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