Wed. 8/26
p. 17: 1, 2, 3, 10; hand in 3 on Mon.

Fri. 8/28
p. 25: 4-8, 16, 17; hand in 6 on Wed.

Mon.. 8/31
p. 26: 25, 26

Wed. 9/2
p. 31: 1, 3i, ii, iv, v, viii, 4

Mon. 9/7
p. 89: 4-7

Wed. 9/9
p. 89: 8, 9; hand in 9 on Mon.

Fri. 9/11
p. 89: 11
p. 94: 1; Hand in 1 on Wed.

Mon. 9/14
p. 94: 2, 3, 4, 5

Wed. 9/16
p. 94: 6, 7, 8, 10

Wed. 9/23
p. 101: 1, 2, 4; Hand in 4 on Mon.

Fri. 9/25
0. Give definitions for a pair of corresponding angles and a pair of interior angles formed by two lines l and m and a transversal t.

Mon. 9/28
p. 102: 5, 6, 7, 9

Wed. 9/30
p. 102: 10, 15, 16 where:
15. Prove that angle P'R'Q is congruent to angle R in Case 2 of the proof of Theorem 3.4.9.
16. Prove Case 3 in the proof of Theorem 3.4.9.
Hand in 10 on Mon.

Fri. 10/2
p. 106: 1, 2; hand in 1 on Wed.
p. 116: 2-8; hand in 2 and 6 on Wed.

Mon. 10/5
p. 117: 10, 14, 15

Fri. 10/9
p. 118:
17 1/2. Prove Theorem 3.6.14
19, 20

Mon. 10/12
p. 118: 25, 26, 28, 30, 31, 32
p. 135:
0. Prove Cor. 4.2.3.

Wed. 10/21
p. 135: 3

Fri. 10/23
p. 135: 6, 8, 9, 10, 11, 21; Hand in 9 on Wed.

Mon. 10/26
p. 140: 1, 2, 3, 5
p. 152: 1, 2, 3

Wed. 10/28
p. 153: 5, 6, 7; Hand in 6 on Mon.

Fri. 10/30
p. 153: 11, 12, 14, 15

Fri. 11/6
p. 176: 3, 4, 7, 8, 9; Hand in 3 on Wed.
p. 188: 1

Mon. 11/9
p. 188: 3, 5

Wed. 11/11
p. 218: 3a, 4, 5a, 6, 7a

p. 219: 8, 9a, 11, 12a, 13, 14, 15, 16, 17a