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4.8 Concurrent Lines

4.8 Concurrent Lines. Notes(Vocab). Altitude: is the line segment from a vertex of a triangle perpendicular to the opposite side. Altitudes. Notes(Vocab). Orthocenter: is the intersection of the altitudes of the triangle. Acute Triangle - Orthocenter. ∆ABC is an acute triangle.

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4.8 Concurrent Lines

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  1. 4.8 Concurrent Lines

  2. Notes(Vocab) Altitude: is the line segment from a vertex of a triangle perpendicular to the opposite side.

  3. Altitudes

  4. Notes(Vocab) Orthocenter: is the intersection of the altitudes of the triangle.

  5. Acute Triangle - Orthocenter ∆ABC is an acute triangle. The three altitudes intersect at G, a point INSIDE the triangle.

  6. Right Triangle - Orthocenter ∆KLM is a right triangle. The two legs, LM and KM, are also altitudes. They intersect at the triangle’s right angle. This implies that the ortho center is ON the triangle at M, the vertex of the right angle of the triangle.

  7. Obtuse Triangle - Orthocenter ∆YPR is an obtuse triangle. The three lines that contain the altitudes intersect at W, a point that is OUTSIDE the triangle.

  8. Notes(Vocab) Median: is the segment drawn from a vertex of a triangle to the midpoint of the opposite side.

  9. A median of a triangle is a segments whose endpoints are a vertex of the triangle and the midpoint of the opposite side. For instance in ∆ABC, shown at the right, D is the midpoint of side BC. So, AD is a median of the triangle Medians of a triangle

  10. Notes(Vocab) Centroid: is the intersection of the medians and is known as the “center of mass”. (Also known as the balancing point)

  11. The three medians of a triangle are concurrent (they meet). The point of concurrency is called the CENTROID OF THE TRIANGLE. The centroid, labeled P in the diagrams in the next few slides are ALWAYS inside the triangle. Centroids of the Triangle

  12. CENTROIDS - ALWAYS INSIDE THE TRIANGLE

  13. Notes(Vocab) Perpendicular Bisector: is the line or segment that passes through the midpoint of a side and is perpendicular to the side.

  14. A perpendicular bisector of a triangle is a line (or ray or segment) that is perpendicular to a side of the triangle at the midpoint of the side. Perpendicular Bisector of a Triangle Perpendicular Bisector

  15. Notes(Vocab) Circumcenter: is the center of a circumscribed circle made by the intersections of the perpendicular bisectors.

  16. The three perpendicular bisectors of a triangle are concurrent. The point of concurrency may be inside the triangle, on the triangle, or outside the triangle. About concurrency 90° Angle-Right Triangle

  17. The three perpendicular bisectors of a triangle are concurrent. The point of concurrency may be inside the triangle, on the triangle, or outside the triangle. About concurrency Acute Angle-Acute Scalene Triangle

  18. The three perpendicular bisectors of a triangle are concurrent. The point of concurrency may be inside the triangle, on the triangle, or outside the triangle. About concurrency Obtuse Angle-Obtuse Scalene Triangle

  19. Notes(Vocab) Angle Bisector: is the line, segment or ray that bisects an angle of the triangle.

  20. Intersection of Angle Bisectors

  21. Notes(Vocab) Incenter: is the center of an inscribed circle. Made by the intersection of the angle bisectors.

  22. Notes(Vocab) Inscribed Circle: is a circle that is inside of a triangle and touches all three sides. (The center is the intersection of the angle bisectors in the triangle, known as the incenter)

  23. Notes(Vocab) Circumscribed Circle: is a circle outside of the triangle touching all three vertices. (The center is the intersection of the perpendicular bisectors known as the cirumcenter)

  24. When three or more concurrent lines (or rays or segments) intersect in the same point, then they are called concurrent lines (or rays or segments). The point of intersection of the lines is called the point of concurrency.

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