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Medians, Altitudes and Concurrent Lines Section 5-3
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A B C Given ABC, identify the opposite side of A of B of C BC AC AB
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Any triangle has three medians. A B C L M N Let L, M and N be the midpoints of AB, BC and AC respectively. Hence, CL, AM and NB are medians of ABC. Definition of a Median of a Triangle A median of a triangle is a segment whose endpoints are a vertex of a triangle and a midpoint of the side opposite that vertex. Properties of Medians
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The median starts at a vertex and ends at the midpoint of the opposite side. Centroid Properties of Medians
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Centroid of a Triangle: The point of concurrency of the medians of a triangle.
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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. 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. This point of intersection is called a centroid. This point of intersection is called a centroid. D G F C J H E DC = 2/3(DJ) EC = 2/3(EG) FC = 2/3(FH) Theorem about Medians
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The centroid is 2/3’s of the distance from the vertex to the side. from the vertex to the side. 2x x 10 5 32 X16 Properties of Medians
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In the figure below, DE = 6 and AD = 16. Find DB and AF. F
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A B C D E F In the figure, AF, DB and EC are angle bisectors of ABC. Definition of an Angle Bisector of a Triangle A segment is an angle bisector of a triangle if and only if a) it lies in the ray which bisects an angle of the triangle and b) its endpoints are the vertex of this angle and a point on the opposite side of that vertex. Any triangle has three angle bisectors. Note: An angle bisector and a median of a triangle are sometimes different. BM is a median and BD is an angle bisector of ABC. M Let M be the midpoint of AC. Properties of Angle Bisectors
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Angle bisectors start at a vertex and bisect the angle. Incenter Properties of Angle Bisectors
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Any point on an angle bisector is equidistance from the sides of the angle Properties of Angle Bisectors
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This makes the Incenter an equidistance from all 3 sides Properties of Angle Bisectors
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Any triangle has three (3) altitudes. Definition of an Altitude of a Triangle A segment is an altitude of a triangle if and only if it has one endpoint at a vertex of a triangle and the other on the line that contains the side opposite that vertex so that the segment is perpendicular to this line A segment is an altitude of a triangle if and only if it has one endpoint at a vertex of a triangle and the other on the line that contains the side opposite that vertex so that the segment is perpendicular to this line. ACUTEOBTUSE B A C Properties of Altitudes
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Start at a vertex and form a 90° angle with the line containing the opposite side. Orthocenter Properties of Altitudes
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The orthocenter can be located in the triangle, on the triangle or outside the triangle. Right Legs are altitudes Obtuse Properties of Altitudes
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RIGHT A B C If ABC is a right triangle, identify its altitudes. BG, AB and BC are its altitudes. G Can a side of a triangle be its altitude? YES! Properties of Altitudes
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Median goes from vertex to midpoint of segment opposite. Altitude is a perpendicular segment from vertex to segment opposite. Compare Medians & Altitudes
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Altitude.. Vertex.. 90°.. Orthocenter Vertex.. 90°.. Orthocenter Angle Bisector.. Angle into 2 equal angles.. Incenter Angle into 2 equal angles.. Incenter Perpendicular Bisector… 90°.. bisects side.. Circumcenter 90°.. bisects side.. Circumcenter Median.. Vertex.. Midpoint of side.. Centroid Vertex.. Midpoint of side.. Centroid
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Give the best name for AB ABABABABAB || | | || Median Altitude None A Angle Perp Bisector Bisector
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Concurrency Concurrent Lines: Three or more lines that meet at one point. Point of Concurrency: The point at which concurrent lines meet. l m n P k
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Properties of Bisectors Theorem 5-6: The perpendicular bisectors of the sides of a triangle are concurrent at a point equidistant from the vertices. Circumcenter of the Triangle: The point of concurrency of the perpendicular bisectors of a triangle.
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Properties of Bisectors Theorem 5-7: The bisectors of the angles of a triangle are concurrent at a point equidistant from the sides. Incenter of the Triangle: The point of concurrency of the angle bisectors of a triangle.
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Sum It Up Figure concurrent at.. which is… bisector circumcenter incenter centroid orthocenter median bisector altitude equidistant from vertices equidistant from sides 2/3 distance from vertices to midpoint ---------------------
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