Warm up: Solve for x. Linear Pair 4x + 3 7x + 12 X = 15.

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

1 Relationships in Triangles Bisectors, Medians, and Altitudes Section 6.1 – 6.3 Students Should Begin Taking Notes At Screen 4!!

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.

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.

Proving Centers of Triangles

Warm- up Type 2 writing and Construction Write your own definition and draw a picture of the following: Angle Bisector Perpendicular Bisector Draw an acute.

GOALS: 1. To know the definitions of incenter, circumcenter, and centroid. 2. To identify the incenter, circumcenter, and centroid given a diagram. 3.

5-3 Concurrent Lines, Medians, Altitudes

Introduction Think about all the properties of triangles we have learned so far and all the constructions we are able to perform. What properties exist.

Concurrent Lines Geometry Mrs. King Unit 4, Day 7.

5-3 Points of Concurrency Objective: To identify properties of perpendicular bisectors and angle bisectors.

Geometry Unit 5: Triangle Parts.

introducing Chapter 5 Relationships with Triangles

5.3 - Concurrent Lines, Medians, and Altitudes

Geometry Foldable Use this foldable to go with the Euler Points learned in Chapter 5 Circumcenter Incenter Centroid Orthocenter Make your foldable using.

Top second box. MEDIANS! To the left Point of Concurrency Location It will always be located inside the triangle, because you draw a median from the.

Chapter 5.3 Concurrent Lines, Medians, and Altitudes

Bisectors of a Triangle

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.

Special Parts of Triangles Day 1 Please get: Activity 1 off the back table 8 pieces of patty paper Compass Protractor Scissors Glue stick Pencil.

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.

Drill Write your homework in your planner Take out your homework Solve for x:

3.6—Bisectors of a Triangle Warm Up 1. Draw a triangle and construct the bisector of one angle. 2. JK is perpendicular to ML at its midpoint K. List the.

Points of Concurrency Where multiple lines, segments rays intersect, have specific properties.

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.

Warm Up 1.Give the restrictions on the third side of the triangle if the first two sides are 18 and Find x and y for both figures. 55°70° x y 100°

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

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

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

Chapters 3.7 – 3.8 “Nothing in life is to be feared, it is only to be understood.” Marie Cure.

SPECIAL SEGMENTS OF TRIANGLES SECTIONS 5.2, 5.3, 5.4.

Homework Quiz. Warmup Need Graph Paper/Compass 5.3 Concurrent Lines, Medians, and Altitudes.

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

Geometry Sections 5.2 & 5.3 Points of Concurrency.

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.

Chapter 5: Relationships within Triangles 5.3 Concurrent Lines, Medians, and Altitudes.

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.

Use Medians and Altitudes

Medians and Altitudes of Triangles

Bisectors, Medians, and Altitudes

5.4 Medians and Altitudes.

Medians, Altitudes and Perpendicular Bisectors

Relationships in Triangles

Special Segments in a Triangle

Triangle Centers Points of Concurrency

Please get a warm up and begin working

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.

The intersection of the perpendicular bisectors.

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

Vocabulary and Examples

Special Segments in Triangles

Bisectors, Medians and Altitudes

Relationships in Triangles

Centroid Theorem By Mario rodriguez.

Points of Concurrency Lessons

5.3 Concurrent Lines, Medians, and Altitudes

Warm Up– in your notebook

Altitude, perpendicular bisector, both, or neither?

Chapter 5 and Triangle Properties review

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.

concurrency that we will be discussing today.

Presentation transcript:

Warm up: Solve for x. Linear Pair 4x + 3 7x + 12 X = 15

Special Segments in Triangles

Median Connect vertex to opposite side's midpoint

Altitude Connect vertex to opposite side and is perpendicular

The altitude is the “true height” of the triangle. Tell whether each red segment is an altitude of the triangle. The altitude is the “true height” of the triangle. YES NO YES

Perpendicular Bisector Goes through the midpoint and is perpendicular

Tell whether each red segment is an perpendicular bisector of the triangle. NO NO YES

Angle Bisector Cuts the angle In to TWO congruent parts

Start to memorize… Indicate the special triangle segment based on its description

I cut an angle into two equal parts Who am I? I cut an angle into two equal parts Angle Bisector

I connect the vertex to the opposite side’s midpoint Who am I? I connect the vertex to the opposite side’s midpoint Median

I connect the vertex to the opposite side and I’m perpendicular Who am I? I connect the vertex to the opposite side and I’m perpendicular Altitude

Perpendicular Bisector Who am I? I go through a side’s midpoint and I am perpendicular Perpendicular Bisector

Drill & Practice Indicate which special triangle segment the red line is based on the picture and markings

Multiple Choice Identify the red segment Q1: Angle Bisector B. Altitude C. Median D. Perpendicular Bisector

Multiple Choice Identify the red segment Q2: Angle Bisector B. Altitude C. Median D. Perpendicular Bisector

Multiple Choice Identify the red segment Q3: Angle Bisector B. Altitude C. Median D. Perpendicular Bisector

Multiple Choice Identify the red segment Q4: Angle Bisector B. Altitude C. Median D. Perpendicular Bisector

Multiple Choice Identify the red segment Q5: Angle Bisector B. Altitude C. Median D. Perpendicular Bisector

Multiple Choice Identify the red segment Q6: Angle Bisector B. Altitude C. Median D. Perpendicular Bisector

Multiple Choice Identify the red segment Q7: Angle Bisector B. Altitude C. Median D. Perpendicular Bisector

Multiple Choice Identify the red segment Q8: Angle Bisector B. Altitude C. Median D. Perpendicular Bisector

Points of Concurrency

New Vocabulary (Points of Intersection) Centroid Orthocenter Incenter Circumcenter

Point of Intersection Medians intersect at the centroid

Important Info about the Centroid The intersection of the medians. Found when you draw a segment from one vertex of the triangle to the midpoint of the opposite side. The center is two-thirds of the distance from each vertex to the midpoint of the opposite side. Centroid always lies inside the triangle. This is the point of balance for the triangle.

The intersection of the medians is called the CENTROID.

Altitudes orthocenter Point of Intersection Altitudes intersect at the orthocenter

Important Info about the Orthocenter This is the intersection point of the altitudes. You find this by drawing the altitudes which is created by a vertex connected to the opposite side so that it is perpendicular to that side. Orthocenter can lie inside (acute), on (right), or outside (obtuse) of a triangle.

The intersection of the altitudes is called the ORTHOCENTER.

Angle Bisector incenter Point of Intersection Angle Bisector intersect at the incenter

Important Info about the Incenter The angle bisectors of a triangle intersect at a point that is equidistant from the sides of the triangle. Incenter is equidistant from the sides of the triangle. The center of the triangle’s inscribed circle. Incenter always lies inside the triangle

The intersection of the angle bisectors is called the INCENTER.

Perpendicular Bisectors Point of Intersection Perpendicular Bisectors intersect at the circumcenter

Important Information about the Circumcenter The perpendicular bisectors of a triangle intersect at a point that is equidistant from the vertices of the triangle. The circumcenter is the center of a circle that surrounds the triangle touching each vertex. Can lie inside an acute triangle, on a right triangle, or outside an obtuse triangle.

The intersection of the perpendicular bisector is called the CIRCUMCENTER.

Memorize these! MC AO ABI PBCC Medians/Centroid Altitudes/Orthocenter Angle Bisectors/Incenter Perpendicular Bisectors/Circumcenter

Will this work? MC AO ABI PBCC My Cousin Ate Our Avocados But I Prefer Burritos Covered in Cheese