EXAM 1: Thursday, February 15

1.1: Problems 7, 10, 11 (For 7, you need not complete the part in parentheses. For 11, you may skip describing the congruence class of

1.2: 15, 16 (For 16, you need not complete the part in parentheses.)

Chapter 2: Prove Theorems 32, 35, 36, 38, 39.

(Hints: For Theorem 32, recall the construction of angle bisector and explanations we discussed in class, and rewrite as a proof. For Theorem 36, first apply Theorem 35 to the side that is not necessarily congruent to the others, then join the midpoint to the opposite vertex and use the SSS Axiom and CPCFC.)

Chapter 2: Prove Corollary 41 and Theorem 46.

Do Problems 56 and 57(iv), (v), (vii), (viii).

(Hint for Corollary 41: Use Theorems 38 and 40.)

EXAM 2: Thursday, March 29, on Chapters 1 and 2

Chapter 3: Prove Corollary 61 and 62.

Do problems 76, 77, 78, 79.

Chapter 5: Do problems 105, 107, 108(i),(ii),(iii), 115, 117, 121, 131

Chapter 6: Problem 135

EXAM 3: Thursday, May 3, 12:30-2:30 in our classroom, on Chapters 3, 4, 5, 6