5.4 Medians and Altitudes A median of a triangle is a segment whose endpoints are a vertex and the midpoint of the opposite side. A triangle’s three medians.

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Date: Sec 5-4 Concept: Medians and Altitudes of a Triangle

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Presentation transcript:

5.4 Medians and Altitudes A median of a triangle is a segment whose endpoints are a vertex and the midpoint of the opposite side. A triangle’s three medians are always concurrent.

Concurrency of Medians Theorem The medians of a triangle are concurrent at a point that is two thirds the distance from each vertex to the midpoint of the opposite side.

Centroid In a triangle, the point of concurrency of the medians is called the centroid of the triangle. The point is also called the center of gravity of the triangle because it is the point where the triangle shape will balance. The centroid is always inside the triangle.

Finding the Length of a Median In the diagram, XA = 8. What is the length of segment XB?

Altitude An altitude of a triangle is the perpendicular segment from the vertex of the triangle to the line containing the opposite side. An altitude of a triangle can be inside or outside the triangle, or it can be a side of a triangle.

Concurrency of Altitudes Theorem The line that contains the altitudes of a triangle are concurrent. The lines that contain the altitudes of a triangle are concurrent at the orthocenter of the triangle. The orthocenter of a triangle can be inside, on, or outside the triangle.

Orthocenter of the Triangle The lines that contain the altitudes of a triangle are concurrent at the orthocenter of the triangle. Can be inside, on, or outside the triangle.

Finding the Orthocenter Triangle ABC has vertices A(1 , 3), B(2 , 7), and C(6 , 3). What are the coordinates of the orthocenter of triangle ABC?

Finding the Orthocenter Step 1 – find the equation of the line containing the altitude to segment AC. Since segment AC is horizontal, the altitude has to be vertical and must go through vertex B(2 , 7). So, the equation of the altitude is x = 2. Step 2 – find the equation of the line containing the altitude to segment BC. The slope of segment BC = 3 – 7 / 6 – 2 = -1 The slope of the perpendicular line has to be 1. The line passes through vertex A (1 , 3). y – 3 = 1 ( x – 1)  y = x + 2

Finding the Orthocenter Step 3 – find the orthocenter by solving this system of equations x = 2 y = x + 2 y = 2 + 2 y = 4 The coordinates of the orthocenter are (2 , 4).

Special Segments and Lines in Triangles

More Practice!!!!! Homework – Textbook p. 312 – 313 #8 – 16 ALL.