Median of a triangle

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Title: Median of a triangle

1
Median of a triangle

The median of a triangle is a segment whose
endpoints are a vertex of the triangle and the
midpoint of the opposite side
Every triangle has 1 median for each vertex, or 3
medians total

2
Centroid of a triangle

The centroid of a triangle is the point of
concurrency of the 3 medians of a triangle.
This point is also called the center of gravity
When 3 or more lines intersect at 1 point, they
are called concurrent lines

3
Centroid theoremtheorem 32-1

The centroid of a triangle is located 2/3 of the
distance from each vertex to the midpoint of the
opposite side
CP 2/3 CN
BP 2/3 BM
AP 2/3 AL

4
Using the centroid to find segment lengths

5
Finding the centroid on a coordinate plane

Find the centroid of tri DEF with vertices
D(-3,5),E(-2,1), and F(-7,3)
Graph the triangle
Find the midpoint of each segment -
midp DF (-5,4), midp DE (-2.5,3)
Since all 3 medians meet at the same point, the
intersection of any 2 will give the location of
the centroid.

7
Find the centroid of tri RTSwith R(-2,2),
T(2,2), S(1, -2)

8
Altitude of a triangle

The altitude of a triangle is the perpendicular
segment from the vertex to the line containing
the opposite side.
The orthocenter is the point of concurrency of
the 3 altitudes of a triangle

9
Locating the orthocenter