Mar 30  Ch. 1  The language of mathematics

Apr 1  Ch. 2  Implications

Apr 3  Ch. 3  Proofs


Apr 6  Ch. 4  Proof by contradiction

Apr 8  Ch. 4  Proof by contradiction (continued), Ch. 5  The induction principle, HW 1 due

Apr 10  Ch. 5  The induction principle (continued)


Apr 13  Ch. 6  The language of set theory

Apr 15  Ch. 6  The language of set theory (continued), Ch. 7  Quantifiers, HW 2 due

Apr 17  Ch. 7  Quantifiers (continued), Ch. 15  The division theorem


Apr 20  Ch. 15  The division theorem (continued), Ch. 16  The Euclidean algorithm

Apr 22  Ch. 8  Functions, HW 3 due

Apr 24  Ch. 8  Functions (continued), Ch. 9  Injections, surjections, and bijections


Apr 27  Review

Apr 29  Midterm: 9am PST

May 1  Ch. 9  Injections, surjections, and bijections (continued)


May 4  Ch. 10  Counting

May 6  Ch. 10  Counting (continued), Ch. 11  Properties of finite sets, HW 4 due

May 8  Ch. 11  Properties of finite sets (continued)


May 11  Ch. 12  Counting functions and subsets

May 13  Ch. 12  Counting functions and subsets (continued), HW 5 due

May 15  Ch. 13  Number systems


May 18  Ch. 13  Number systems (continued)

May 20  Ch. 14  Counting infinite sets, HW 6 due

May 22  Ch. 14  Counting infinite sets (continued)


May 25  No class

May 27  Ch. 14  Counting infinite sets (continued), Ch. 19  Congruence of integers, HW 7 due

May 29  Ch. 19  Congruence of integers (continued), Ch. 22  Partitions and equivalence relations


Jun 1  Ch. 22  Partitions and equivalence relations (continued)

Jun 3  Ch. 23  The sequence of prime numbers, HW 8 due

Jun 5  Review


Jun 9  Final Exam: 11am PST 