The Syllabus can be found here.
Points assigned to each problem are shown in brackets following the problems (after they are handed in). Note that not all problems will necessarily be graded.
We have a new Discussion Board. Please submit your questions and comments there so that everyone can benefit from the question and response. (Click on <Communication> and then <Discussion Board>.)
You can see your Grades
also (when we have some). (Click on <Student Tools> then <Check Grade>.)
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Note: Homework is displayed on the day that it is due |
| Tuesday, 1/7 |
Sections 1.1, Intro to
Logic <slideshow><handouts> |
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| Thursday, 1/9 | Section 1.2, Propositional Equivalences
<slideshow><handouts> |
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| Tuesday, 1/14 | More on 1.2 <slideshow><handouts> |
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| Thursday, 1/16 | 1.3 Predicates and Quantifiers <slideshow><handouts> |
1.1 #2[2],
4, 6, 8[3], 12, 14[2], 16, 20[3] (see definitions on p.7 to do problem #20) |
| Tuesday, 1/21 | No Class --- Follows Monday Schedule |
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| Thursday, 1/23 | Classes Canceled due to Bad Weather |
1.2 #4, 8[2], 10[XC+3], 14[3],
16, 18, 20, 26 1.3 #2, 6, 8, 10, 12, 14[a,i,m - 1 each], 20, 24[d,e - 1 each], 26, 40[XC+3] |
| Tuesday, 1/28 | |
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| Thursday, 1/30 | 1.4 Introduction to Sets <slideshow><handouts> |
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| Tuesday, 2/4 | 1.5 More on sets, cartesian products
and set proofs <slideshow><handouts> |
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| Thursday, 2/6 | Venn Diagrams, and 1.6 Introduction
to Functions <slideshow><handouts> |
1.4 #4[2], 6[3](pay
attention!), 8, 10, 12, 14[XC +3], 20, 22, 26[XC +5] 1.5 #4, 6, 8[1], 10[2], 12c-d[2], 18, 22, 26, 36 |
| Tuesday, 2/11 | 1.6 More on Functions <slideshow><handouts> |
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| Thursday, 2/13 | Exam
1 Homework Solutions <pdf> <Word> Study Guide: (All the HW problems, especially those that were graded. 1.1-1.5, and 1.6 up to about the middle of page 61.) |
1.6 #4[XC +2], 8, 10,
12, 58 |
| Tuesday, 2/18 | Class canceled by Rumor |
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| Thursday, 2/20 | Exam 1 review |
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| Tuesday, 2/25 | 1.7 Sequences and Summation <slideshow><handouts> |
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| Thursday, 2/27 | 2.3 Integers and Division
<slideshow><handouts> |
1.7 #2[2], 6[1 each
for a, c, e, f], 14, 16[2], 18, 24[2] |
| Tuesday, 3/4 | Spring Break |
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| Thursday, 3/6 | Spring Break |
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| Tuesday, 3/11 | 2.3 Finish <slideshow><handouts> |
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| Thursday, 3/13 | 2.3 Congruences and 2.4
The Euclidean Algorithm <slideshow><handouts> |
2.3 #2, 8, 10[2], 12,
14[2], 20[2], 24[4] |
| Tuesday, 3/18 | 2.5 The mathematics of
RSA <slideshow><handouts> |
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| Thursday, 3/20 | Some review of Homework problems |
2.3 #16[2], 28[2],
30[1], 32(see p. 120), 48, 51. Also find phi(1200)[2] 2.4 #2[2], 4, 16, 32[1] 2.5 #2(link), 4, 6(link), 8[XC+2] |
| Tuesday, 3/25 | 3.1 Introduction to Proof
Techniques <slideshow><handouts> |
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| Thursday, 3/27 | 3.1 Some more proof techniques <slideshow><handouts> |
2.5 #2(a[2]-d[2]
by hand, show work. e-i by any means), 24a[3], 38, 40[XC+2] Also, evaluate[3] 987654 (mod 11) by hand, show work. |
| Tuesday, 4/1 | 3.2 Proofs by Induction
and intro to 3.3 Recursive definitions <slideshow><handouts> |
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| Thursday, 4/3 | Review for Exam and 3.3 Recursive Definitions |
Homework Problems - do not
hand in 3.1 #17, 19, 21, 23, 29, 35, 39 3.2 #1, 5, 9, 25, 47, 48 |
| Tuesday, 4/8 | |
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| Thursday, 4/10 | Exam 2 <pdf> <Word> Study Guide |
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| Tuesday, 4/15 | 4.1 Introduction to Counting <slideshow><handouts> |
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| Thursday, 4/17 | 4.3 Selecting
and Arranging <slideshow><handouts> |
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| Tuesday, 4/22 | 4.3 Anagrams |
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| Thursday, 4/24 | 7.1 Choose Numbers and
Pascal's Triangle |
Homework Due Tuesday |
| Tuesday, 4/29 | Review of Counting Problems 7.5 Probability |
4.1 #2[2]-6[2],
8-16 even, 22, 24[2], 30, 48[2] 4.3 #2[2], 4, 6, 8, 10[2], 12, 14, 20, 26[2], 36, 44 4.6 #18, 26[3], 28, 32[3], 34a, 36, 51 [Note, this is a 20-point assignment] |
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Final Exam
Thursday, May 8, 8-10am, in the usual room Worksheet 1 Worksheet 2 Study Guide Answers to Last Homework and Worksheets |
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