Chapter 1 and Chapter 2 Homework Assignments

Assignment 1 / Section 1.1 / pg. 5-8 / 1-11, 15, 19, 22-24, 27-32, 36, 40, 42, 44, 48, (51, 52) last two are challenging

additionally prove deductively:
1. that the product of odd and an even must be even
2. the square of a even is even

Chapter 2 Set Theory

Assignment 2 / Section 2.1 / pg. 46-50/1-12 (in notes), 20, 22, 26-29, 40, 46, 47, 49, 52, 56, 58, 60, 65, 76, 78, 79, 80, 84, 85, 91-94

Assignment 3 / 7th Edition / Section 2.2 /pg. 54-55/1-6(in notes), 8-32(even), 33-36, 38-50(even), 54-57
Assignment 3 / 8th Edition/ Section 2.2/pg. 58-59/Same numbers as above

Assignment 4 / 7th edition/ Section 2.3 / pg. 62-66 /1-14(in notes), 69-84, 87, 88, 108, 110, 112, 120, 122
Assignment 4/ 8th Edition/ Section 2.3/pg. 68-71 /1-14(in notes), 83-98, 101, 102, 122, 124, 126, 71, 74

Assignment 5 / 7th ed /Section 2.4 / pg. 71-75/ 1-8(in notes), 9, 10, 15, 17-22, 41-46, 53, 54, 64, 66, 68, 74, 76, 78, 80, 82, 86(challenging one)
Assignment 5/ 8th ed / Section 2.4/ pg. 77-82/ same numbers as above

Assignment 6 / Section 2.5 / pg. 80 (7th ed.) or pg. 86 (8th ed.)/2-14(even), 16 for all you crazies

Assignment 7/ Section 2.6 / pg. 86/ 1, 2, 5, 10, 15, 16 & Special problem

Study Group Assignment for Test 1

7th edition /pg 35-36 / 1-6, 10-11 and pg. 38 / 1-3 (for the problems dealing with sequences also tell me what kind of sequence, arithematic, geometric, or recursive) and pg. 90 / 1-18 (for 17 make sure you are not using the sets provided in the previous problems but a general diagram in which the regions are all labeled one through four in the case of two sets or one through eight in the case of eight sets.)

8th edition / pg 37-38 / 1-6, 10-11 and pg 41/1-3 (for the problems dealing with sequences also tell me what kind of sequence, arithematic, geometric, or recursive)and pg 97-98 1-20 (for 19 make sure you are not using the sets provided in the previous problems but a general diagram in which the regions are all labeled one through four in the case of two sets or one through eight in the case of eight sets.)