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5.4Use Medians and Altitudes Theorem 5.8: Concurrency of Medians of a Triangle The medians of a triangle intersect at a point that is two thirds of the.

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Presentation on theme: "5.4Use Medians and Altitudes Theorem 5.8: Concurrency of Medians of a Triangle The medians of a triangle intersect at a point that is two thirds of the."— Presentation transcript:

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2 5.4Use Medians and Altitudes Theorem 5.8: Concurrency of Medians of a Triangle The medians of a triangle intersect at a point that is two thirds of the distance from each vertex to the midpoint of the opposite side. B A C D P F E

3 5.4Use Medians and Altitudes Example 1 Use the centroid of a triangle In FGH, M is the centroid and GM = 6. Find ML and GL. G F H J M L K 6 Concurrency of Medians of a Triangle Theorem _____ = ____ GL Substitute ___ for GM. ___ = ____ GL Multiple each side by the reciprocal, ___. ___ = GL Then ML = GL – ____ = ___ – ____ = ___. So, ML = ___ and GL = ___.

4 5.4Use Medians and Altitudes Checkpoint. Complete the following exercises. 1.In Example 1, suppose FM = 10. Find MK and FK. G F H J M L K 10

5 5.4Use Medians and Altitudes The vertices of JKL are J(1, 2), K(4, 6), and L(7, 4). Find the coordinates of the centroid P of JKL. Sketch JKL. Then use the Midpoint Formula to find the midpoint M of JL and sketch median KM. Example 2 Find the centroid of a triangle J K L M The centroid is _________ of the distance from each vertex to the midpoint of the opposite side. two thirds The distance from vertex K to point M is 6 – ___ = ___ units. 3 3 So, the centroid is ___ (___) = ___ units down from K on KM. The coordinates of the centroid P are (4, 6 – ___), or (____). P

6 5.4Use Medians and Altitudes Theorem 5.9: Concurrency of Altitudes of a Triangle The lines containing the altitudes of a triangle are ___________. The lines containing AF, BE, and CD meet at G C B A G E D F

7 5.4Use Medians and Altitudes Find the orthocenter P of the triangle. Example 3 Find the orthocenter a. b. Solution a. b. P P

8 5.4Use Medians and Altitudes Checkpoint. Complete the following exercises. 2.In Example 2, where do you need to move point K so that the centroid is P(4, 5)? J K L P M Distance from the midpoint to the centroid is how much of the total distance of the median? If that distance is 2, what is the total distance?

9 5.4Use Medians and Altitudes Checkpoint. Complete the following exercises. 3.Find the orthocenter P of the triangle. P

10 5.4Use Medians and Altitudes Pg. 294, 5.4 #1-19

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