Read the section scheduled in the calendar to be discussed in the following class.
Minimum Homework by Due Date
Due Wednesday January 9: Section 1.1, 1-15 odd
Due Friday January 11: Section 1.1, 29-43 odd; Section 1.2, 4-11 odd.
Due Monday January 14: Section 1.3, 1-7 odd, 10, 13, 15; Section 1.4, 3, 5, 13-17 odd.
Due Wednesday January 16: Section 1.5, 1-9 odd; Section 1.6, 1; Section 1.7, 1-9 odd.
Due Friday January 18: Section 1.8, 2, 3, 4, 5, 7, 9, 10, 13.
Due Wednesday January 23: Read Section 1.9; Section 2.1, 1-11 odd.
Due Friday January 25: Section 2.2, 1-9.
Due Monday January 28: Section 2.3, 1-11 odd; Section 2.4, 1-5 odd.
Due Wednesday January 30: Section 2.5, 1-11 odd; Section 2.6, 1-13 odd.
Due Friday February 1: Section 2.7, 1-9 odd.
Due Monday February 4: Section 2.9, 1-9 odd.
Due Wednesday February 6: Section 2.10, 1-6 and 8-10.
Due Monday February 11: Chapter 4, 1-7.
Due Friday February 15: Chapter 4, 8-13.
Due Monday February 18: Chapter 4, 14-19.
Due Wednesday February 20: Chapter 4, 20. A) Prove that if n is an integer, then the remainder of n^2 when divided by 5 can only be 0, 1 or 4. B) Prove that if x is a real number, then -5 \le |x +2 | – |x -3| \le 5.
Due Friday February 22: Chapter 7, 1-9 odd.
Due Monday February 25: Chapter 8, 1-7 odd, 13, 19, and 22.
Due Wednesday March 13: Chapter 9, 1-19 odd.
Due Friday March 15: Chapter 10, 1-8.
Due Monday March 18: Chapter 10, 9-21 odd.
Due Wednesday March 20: Chapter 10, 10, 12, 14, and 16.
Due Friday March 22: Memorize the proof of the Fundamental Theorem of Arithmetic.
Due Wednesday April 3: Chapter 12.1, 1, 6, 7, 9 and 12.2, 2, 4, 5, 11, 13.
Due Friday April 5: Chapter 12.3, 1, 3 and 12.4, 1-9 odd.
Due Monday April 8: Chapter 12.5, 1-9 odd.
Due Wednesday April 10: Chapter 12.6, 1, 5-11 odd.