Concurrent Lines, Medians, and Altitiudes

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Concurrent Lines, Medians, and Altitiudes

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Concurrent Lines, Medians, and Altitiudes Concurrent Lines When three or more lines intersect in one point, they are concurrent. Point of Concurrency the point at ... – PowerPoint PPT presentation

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Title: Concurrent Lines, Medians, and Altitiudes

1
Concurrent Lines, Medians, and Altitiudes
2
Concurrent Lines

When three or more lines intersect in one point,
they are concurrent.
Point of Concurrency the point at which the
lines intersect.
For a triangle, there are four different sets of
concurrent lines.

3
Circumcenter

The perpendicular bisectors of the sides of a
triangle are concurrent (all intersect) at a
point equidistant from the vertices.
The point of concurrency is called the
circumcenter of the triangle.

4
Picture of the Circumcenter
CH CJ CG
C is the circumcenter.
Using a compass with the point at C, a circle can
be drawn that passes thru G, H and J. The circle
is circumscribed about the triangle.
C
5
Incenter

The bisectors of the angles of a triangle are
concurrent (all intersect) at a point equidistant
from the sides.
The point of concurrency is called the incenter
of the triangle.

6
Picture of the Incenter
IY IR IW
I is the incenter.
Using a compass with the point at I, a circle can
be drawn that passes thru Y, R and W. The circle
is inscribed in the triangle.
I
7
Medians

Median of a Triangle A median is a segment
drawn from the vertex of a triangle to the
midpoint of the opposite side.

Median
8
Centroid

The medians of a triangle are concurrent (all
intersect) at a point that divides each median
into two segments, one of which is twice as long
as the other.
The point of concurrency is called the centroid.
Also called the center of gravity or center of
balance.

9
Picture of Centroid
2x
8
k
5
b
C
2b
2k
10
x
4
10
Altitudes

Altitude of a Triangle An altitude is a segment
drawn from the vertex of a triangle perpendicular
to the opposite side.
Can be inside, on a side, or outside the traingle

11
Orthocenter

The lines that contain the altitudes of a
triangle are concurrent (they all intersect at a
single point).
The point of concurrency of the altitudes is
called the orthocenter.

12
Orthocenter
13
Finding Lengths of Medians