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Chapter 5 Medians of a Triangle

Chapter 5 Medians of a Triangle. Median of a triangle. Starts at a vertex and divides a side into two congruent segments (midpoint). Centroid of the triangle. The point of concurrency of the three medians of a triangle . Always lies inside the triangle!. A. C. B. Always Inside!.

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Chapter 5 Medians of a Triangle

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  1. Chapter 5Medians of a Triangle

  2. Median of a triangle • Starts at a vertex and divides a side into two congruent segments (midpoint).

  3. Centroid of the triangle • The point of concurrency of the three medians of a triangle. • Always lies inside the triangle!

  4. A C B Always Inside!

  5. Median formula • The medians of a triangle intersect at a point that is in a 2:1 ratio. • From vertex to centroid=2 • Centroid to side=1

  6. A F E P C B D P is the centroid of triangle ABC 8 4 If EC = 12, EP = ___ and PC = ___ 6 2 3 4

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