Chapter 5 – 1 Bisectors, Medians, and Altitudes of Triangles pp. 269 - 278

1. If we use this next year and want to be brief on the concurrency points, it would be better to make a table listing the types of segments and the name of the point of concurrency with a diagram. Skip the words and definitions since we are just briefly mentioning each term.

2. DNA Chapter 5 – 1 Bisectors, Medians, and Altitudes of Triangles pp. 269 - 278

3. No Yes No Distance from a point to a line • The length of the perpendicular segment from the point to the line.

4. A B Perpendicular bisector is a segment, ray, line or plane that is to a segment at its midpoint. l P

5. A perpendicular bisector of a triangle bisects one of its sides.

6. Sample problem: Find x and y.

7. A B P is on the Perpendicular Bisector Theorem Any point on the  bisector of a segment is equidistant from the endpoints of the segment. P

8. Angle Bisector Theorem Any point on the bisector of an angle is equidistant from the 2 sides of the angle. D B A C

9. Altitude (height) of a Triangle The  segment from a vertex to the opposite side of the . Vertex

11. Median of a  A segment connecting a vertex of the triangle and the midpt of the opposite side.

12. Concurrent Lines 3 or more lines that intersect at the same pt. l P is called the point of concurrency. P m n

13. The point of concurrency of the 3 of a is called the circumcenter of the

14. The circumcenter is the point used to circumscribe (circle) the triangle so that the circle passes through each vertex of the .

15. Incenter The point of concurrency of the 3  bisectors of a . The incenter is the point used to construct an inscribed circle (a circle inside of a triangle).

16. Orthocenter The point of concurrency of the 3 altitudes of a .

17. Centroid The point of concurrency of the 3 medians of a . Balance point of the triangle!

18. Homework: Textbook pp. 274 – 278, problems 2, 6 – 15, and 47 – 50, and 52 - 54.