Angle Bisector A segment that cuts an angle in half.

Slides:

Advertisements

Similar presentations

Brain Strain Find the value of x. x x x xx Special Segments in Triangles.

Advertisements

Section 1.5 Special Points in Triangles

4.6 Medians of a Triangle.

Lesson 5-1 Bisectors, Medians, and Altitudes. Ohio Content Standards:

A perpendicular bisector is a line found in a triangle CIRCUMCENTER It cuts the side into two equal parts And because it's perpendicular it makes two.

 Definition:  A line that passes through the midpoint of the side of a triangle and is perpendicular to that side.

Points of Concurrency in Triangles Keystone Geometry

5-3 Concurrent Lines, Medians, Altitudes

8/9/2015 EQ: What are the differences between medians, altitudes, and perpendicular bisectors? Warm-Up Take out homework p.301 (4-20) even Check your answers.

Chapter 5 Section 5.4 Medians and Altitudes U SING M EDIANS OF A T RIANGLE A median of a triangle is a segment whose endpoints are a vertex of the triangle.

Medians, Altitudes, and Angle Bisectors Honors Geometry Mr. Manker.

Points of Concurrency Line Segments Triangle Inequalities.

Bell Problem Find the value of x Use Medians and Altitudes Standards: 1.Apply proper techniques to find measures 2.Use representations to communicate.

5.3 - Concurrent Lines, Medians, and Altitudes

Chapter 5.3 Concurrent Lines, Medians, and Altitudes

Objectives To define, draw, and list characteristics of: Midsegments

By: Isaac Fernando and Kevin Chung.  Do Now: what is a point of concurrency?

5.3: Concurrent Lines, Medians and Altitudes Objectives: To identify properties of perpendicular bisectors and angle bisectors To identify properties of.

Please get a warm up and begin working. Special Parts of Triangles Please get: ♥ Cheat for special segments and lines in triangles ♥ Scissors ♥ Glue or.

Median and Altitude of a Triangle Sec 5.3

Points of Concurrency Triangles.

Special Segments of Triangles

Lesson 12 – Points of Concurrency II

5.4 Medians and Altitudes A median of a triangle is a segment whose endpoints are a vertex and the midpoint of the opposite side. –A triangle’s three medians.

Geometry B POINTS OF CONCURRENCY. The intersection of the perpendicular bisectors. CIRCUMCENTER.

Centers of Triangles or Points of Concurrency Median.

Chapter 10 Section 3 Concurrent Lines. If the lines are Concurrent then they all intersect at the same point. The point of intersection is called the.

Points of Concurrency The point where three or more lines intersect.

Special Segments of Triangles Advanced Geometry Triangle Congruence Lesson 4.

Warm Up Homework – page 7 in packet

5.4 – Use Medians and Altitudes Length of segment from vertex to midpoint of opposite side AD =BF =CE = Length of segment from vertex to P AP =BP =CP =

5.3: Concurrent Lines, Medians and Altitudes Objectives: Students will be able to… Identify properties of perpendicular bisectors and angle bisectors Identify.

5.1 Special Segments in Triangles Learn about Perpendicular Bisector Learn about Medians Learn about Altitude Learn about Angle Bisector.

Chapter 5 Medians of a Triangle. Median of a triangle Starts at a vertex and divides a side into two congruent segments (midpoint).

SPECIAL SEGMENTS OF TRIANGLES SECTIONS 5.2, 5.3, 5.4.

Points of Concurrency MM1G3e Students will be able to find and use points of concurrency in triangles.

Median, Angle bisector, Perpendicular bisector or Altitude Answer the following questions about the 4 parts of a triangle. The possible answers are listed.

The 5 special segments of a triangle …again Perpendicular bisector Angle bisector Median Altitude Perpendicular and thru a midpoint of a side Bisects an.

The intersection of the medians is called the CENTROID. How many medians does a triangle have?

5-2 Median & Altitudes of Triangles

WARM UP March 11, Solve for x 2. Solve for y (40 + y)° 28° 3x º xºxºxºxº.

Medians, and Altitudes. When three or more lines intersect in one point, they are concurrent. The point at which they intersect is the point of concurrency.

Special lines in Triangles and their points of concurrency Perpendicular bisector of a triangle: is perpendicular to and intersects the side of a triangle.

Use Medians and Altitudes

Medians Median vertex to midpoint.

Bisectors, Medians, and Altitudes

Medians, Altitudes and Perpendicular Bisectors

Special Segments in a Triangle

Triangle Centers Points of Concurrency

Please get a warm up and begin working

Transformations Transformation is an operation that maps the original geometric figure, the pre-image , onto a new figure called the image. A transformation.

You need your journal The next section in your journal is called special segments in triangles You have a short quiz.

Medians and Altitudes of a Triangle

Vocabulary and Examples

Centers of Triangles or Points of Concurrency

Angle Bisectors & Medians.

Lines Associated with Triangles 4-3D

Geometry 5.2 Medians and Altitudes of a Triangle

Bisectors, Medians and Altitudes

5-1 HW ANSWERS Pg. 327 # Even 18. CF 10. PS = DA & DB

Lesson 5-3: Bisectors in Triangles

Centroid Theorem By Mario rodriguez.

5.3 Concurrent Lines, Medians, and Altitudes

MID-TERM STUFF HONORS GEOMETRY.

Warm Up– in your notebook

5-2 Medians and Altitudes of Triangles

SPECIAL SEGMENTS.

concurrency that we will be discussing today.

Presentation transcript:

Angle Bisector A segment that cuts an angle in half

B A C D 12

G F H I

Point of Concurrency Incenter - The point of concurrency formed by the intersection of the three bisectors of a triangle.

Incenter It is the same distance from each side of the triangle to the incenter.

The angle bisectors of the triangle meet at point P. Find PF.

The angle bisectors of triangle TUV meet at point W. Find the value of d F Y E 4d - 1 V T U W 2d + 7

Median A segment from the vertex of a triangle to the midpoint of the opposite side. Median Vertex

Point of Concurrency Centroid – The point of concurrency formed by the intersection of the three medians of a triangle

Centroid The centroid is two-thirds of the distance from each vertex to the midpoint of the opposite side.

In  ABC, AN, BP, and CM are medians. A B M P E C N If AN = 12, find AE.

In  ABC, AN, BP, and CM are medians. A B M P E C N If CE = 16, find EM.

In  ABC, AN, BP, and CM are medians. A B M P E C N If EP = 3, find EB and BP.

Special Segments in the Coordinate Plane