1. 7.1(a) Notes: Perpendicular Bisectors Lesson Objective: Identify and use perpendicular bisectors in triangles. CCSS: G.CO.10, G.MG.3

2. Lesson 1: Perpendicular Bisector Theorem Draw AB 3” long. A 3” B

3. Lesson 1: Perpendicular Bisector Theorem Con­struct CD as the perpendicular bi­sector of AB. Plot D at the intersection of AB and CD and point C 1” from D. ● C 1” A 3” D B

4. Lesson 1: Perpendicular Bisector Theorem Draw AC and BC in green. Measure AC and BC. Label congruent and right angle symbols. ● C 1” A 3” D B

5. Lesson 1: Perpendicular Bisector Theorem A B Perpendicular Bisector Theorem: If CD is a | bisector of AB, then AC = BC.

6. Lesson 1: Perpendicular Bisector Theorem Anchor your compass at A, extend more than half way, and mark below. Do the same for B. ● C 1” A 3” D B

7. Lesson 2: Converse | Bisector Theorem What happens when you extend CD? Draw AE and BE in green. Label congruent and right angle symbols.

8. Lesson 2: Converse | Bisector Theorem Converse Perpendicular Bisector Theorem: If AE = BE, then CE is the | bisector of AB.

9. Lesson 3: Using the | Bisector Theorem Find each measure. a. b. c.

10. Lesson 4: Circumcenter Theorem a.Construct the | bisector of each side of ΔABC. Label circumcenter P. b.In red, draw bisectors DP, EP, and FP. Mark congruent marks and right angles also in red. A B C

11. Lesson 4: Circumcenter Theorem c.Draw PA, PB and PC in blue. Anchor at P. Draw circle P with radius PA. What do you notice about circle P? A B C

12. Lesson 4: Circumcenter Theorem Concurrent Lines: 3 or more lines that intersect at a common point called the Point of Concur- rency.

13. Lesson 4: Circumcenter Theorem Circumcenter: The point where the | bisec- tors of a Δ intersect. It is equidistant from each vertex of the Δ.

14. Lesson 4: Circumcenter Theorem If P is the circumcenter of ΔABC, then PA = PB = PC. PA, PB and PC are radii of circle P.

15. 7.1(a): Do I Get It? Yes or No 1.

16. 7.1(a): Do I Get It? Continued Find each measure. 2.WZ3. RT