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Bisectors, Medians, Altitudes Chapter 5 Section 1 Learning Goal: Understand and Draw the concurrent points of a Triangle  The greatest mistake you can.

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Presentation on theme: "Bisectors, Medians, Altitudes Chapter 5 Section 1 Learning Goal: Understand and Draw the concurrent points of a Triangle  The greatest mistake you can."— Presentation transcript:

1 Bisectors, Medians, Altitudes Chapter 5 Section 1 Learning Goal: Understand and Draw the concurrent points of a Triangle  The greatest mistake you can make in life is to be continually fearing you will make one. -- Elbert Hubbard

2 Points of Concurrency When three or more lines intersect at a common point, the lines are called Concurrent Lines. Their point of intersection is called the point of concurrency. Concurrent LinesNon-Concurrent Lines

3 Draw the Perpendicular Bisectors Extend the line segments until they intersect Their point of concurrency is called the circumcenter Draw a circle with center at the circumcenter and a vertex as the radius of the circle What do you notice?

4 Draw the Angle Bisectors Extend the line segments until they intersect Their point of concurrency is called the incenter What do you notice? Draw a circle with center at the incenter and the distance from the incenter to the side as the radius of the circle

5 Draw the Median of the Triangle Extend the line segments until they intersect Their point of concurrency is called the centroid The Centroid is the point of balance of any triangle

6 Centroid is the point of balance

7 Centroid Theorem 2/32/3 1/31/3 How does it work? 9 x 15 y

8 Centroid Theorem

9 Draw the Altitudes of the Triangle Extend the line segments until they intersect Their point of concurrency is called the orthocenter

10 Coordinate Geometry The vertices of ΔABC are A(–2, 2), B(4, 4), and C(1, –2). Find the coordinates of the orthocenter of ΔABC.

11 Points of Concurrency Hyperlink to Geogebra Figures 1.circumcenter Geogebra\Geog_Circumcenter.ggb Geogebra\Geog_Circumcenter.ggb 2.incenter Geogebra\Geog_Incenter.ggbGeogebra\Geog_Incenter.ggb 3.centroidGeogebra\Geog_centroid.ggbGeogebra\Geog_centroid.ggb 4.orthocenterGeogebra\Geog_orthocenter.g gbGeogebra\Geog_orthocenter.g gb Questions: 1.Will the P.O.C. always be inside the triangle? 2.If you distort the Triangle, do the Special Segments change? 3.Can you move the special segments by themselves?

12 Homework Pages 275 – 277; #16, 27, 32 – 35 (all), 38, 42, and 43. (9 problems)


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