Sep 27  Ch. 1  The language of mathematics 

Sep 30  Ch. 2  Implications

Oct 2  Ch. 3  Proofs

Oct 4  Ch. 4  Proof by contradiction


Oct 7  Ch. 4  Proof by contradiction (continued), Ch. 5  The induction principle

Oct 9  Ch. 5  The induction principle (continued)

Oct 10  HW 1 due, Solutions

Oct 11  Ch. 6  The language of set theory


Oct 14  Ch. 6  The language of set theory (continued), Ch. 7  Quantifiers

Oct 16  Ch. 7  Quantifiers (continued), Ch. 15  The division theorem

Oct 17  HW 2 due, Solutions

Oct 18  Ch. 15  The division theorem (continued), Ch. 16  The Euclidean algorithm


Oct 21  Review, Practice problems, Solutions

Oct 23  Midterm 1

Oct 25  Ch. 8  Functions


Oct 28  Ch. 8  Functions (continued), Ch. 9  Injections, surjections, and bijections

Oct 30  Ch. 9  Injections, surjections, and bijections (continued)

Oct 31  HW 3 due, Solutions

Nov 1  Ch. 10  Counting


Nov 4  Ch. 10  Counting (continued), Ch. 11  Properties of finite sets

Nov 6  Ch. 11  Properties of finite sets (continued), Ch. 12  Counting functions and subsets

Nov 7  HW 4 due, Solutions

Nov 8  Ch. 12  Counting functions and subsets (continued)


Nov 11  No class

Nov 13  Ch. 13  Number systems

Nov 14  HW 5 due, Solutions

Nov 15  Ch. 13  Number systems (continued), Ch. 14  Counting infinite sets


Nov 18  Review, Practice problems, Solutions

Nov 20  Midterm 2

Nov 22  Ch. 14  Counting infinite sets (continued)


Nov 25  Ch. 14  Counting infinite sets (continued), Ch. 19  Congruence of integers

Nov 27  Ch. 19  Congruence of integers (continued), Ch. 22  Partitions and equivalence relations

Nov 29  No class


Dec 2  Ch. 22  Partitions and equivalence relations (continued)

Dec 3  HW 6 due by 1pm, Solutions

Dec 4  Ch. 23  The sequence of prime numbers

Dec 6  Review, Practice problems, Solutions


Dec 13  Final Exam: 8am11am in 001 Cognitive Science Building 