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POINTS OF CONCURRENCY In this lesson we will define what a point of concurrency is. Then we will look at 4 points of concurrency in triangles. As you go.

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Presentation on theme: "POINTS OF CONCURRENCY In this lesson we will define what a point of concurrency is. Then we will look at 4 points of concurrency in triangles. As you go."— Presentation transcript:

1 POINTS OF CONCURRENCY In this lesson we will define what a point of concurrency is. Then we will look at 4 points of concurrency in triangles. As you go through the powerpoint, you will complete your notesheet. You will need to be able to define the 4 points of concurrency and identify them in a picture. You will also use the definition to identify relationships between Segments and angles to solve problems.

2 POINTS OF CONCURRENCY When two lines intersect at one point, we say that the lines are intersecting. The point at which they intersect is the point of intersection. (nothing new right?) Well, if three or more lines intersect, we say that the lines are concurrent. The point at which these lines intersect Is called the point of concurrency.

3 Perpendicular bisectors=Circumcenter
The perpendicular bisectors of the sides of a triangle are concurrent at a point equidistant from the vertices. Point of concurrency

4 Perpendicular bisectors=Circumcenter
This point of concurrency has a special name. It is known as the circumcenter of a triangle. Circumcenter

5 Perpendicular bisectors=Circumcenter
The circumcenter is equidistant from all three vertices.

6 Perpendicular bisectors=Circumcenter
The circumcenter gets its name because it is the center of the circle that circumscribes the triangle. Circumscribe means to be drawn around by touching as many points as possible.

7 Perpendicular bisectors=Circumcenter
Sometimes the circumcenter will be inside the triangle, sometimes it will be on the triangle, and sometimes it will be outside of the triangle! Acute Right Obtuse

8 Angle bisectors=Incenter
The bisectors of the angles of a triangle are concurrent at a point equidistant from the sides. Angle bisector

9 Angle bisectors=Incenter
The point of concurrency of the three angle bisectors is another center of a triangle known as the Incenter. It is equidistant from the sides of the triangle, and gets its name from the fact that it is the center of the circle that is inscribed within the circle. Incenter

10 Medians=Centroid Median: A median of a triangle is the segment That connects a vertex to the midpoint of the opposite side.

11 Medians=Centroid This point of concurrency of the medians is another center of a triangle. It is known as the Centroid. Centroid

12 Medians=Centroid This Centroid is also the Center of Gravity of a triangle which means it is the point where a triangular shape will balance.

13 Altitudes=Orthocenter
Altitudes of a triangle are the perpendicular segments from the vertices to the line containing the opposite side. Unlike medians, and angle bisectors that are always inside a triangle, altitudes can be inside, on or outside the triangle.

14 Altitudes=Orthocenter
This point of concurrency of the altitudes of a triangle form another center of triangles. This center is known as the Orthocenter. The Orthocenter of a triangle can be inside on or outside of the triangle.

15 POINTS OF CONCURRENCY There are many Points of Concurrency in Triangle. We have only looked at four: Circumcenter: Where the perpendicular bisectors meet Incenter: Where the angle bisectors meet Centroid: Where the medians meet Orthocenter: Where the altitudes meet.

16 Practice Problems On the half sheet of paper that you were given
complete the following problems. 1A-C Identify the point of concurrency that is shown in the triangle B C A

17 Practice Problems Solve for x, y in each triangle using the given information 2. Point G is a centroid AC = 24, AF=15, AE= 3x-6, BF = 3y 3. Point H is an orthocenter <ABE = 25, <BFC = 8x + 10, <BAE= 6y+5

18 Practice Problems 4. Point W is both a centroid and an orthocenter.
Why is it a circumcenter also? 5. If you draw two medians, is that enough to determine where the centroid of a triangle is? Why/Why not? 6. Do the following matching. Circumcenter W. Angle bisectors Incenter X. Medians Orthocenter Y. Perpendicular bisectors Centroid Z. Altitudes


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