Warm-up 1.3x = 8x – 15 0 = 5x – 15 15 = 5x x = 3 2.6x + 3 = 8x – 14 3 = 2x – 14 17 = 2x x = 8.5 3.5x – 2 = 3x + 6 2x – 2 = 6 2x = 8 x = 4 AB = 2 AM AB.

Slides:

Advertisements

Similar presentations

Unit 2 Find the Midpoint of a Line Segment Learning Goals: I can find the midpoint of a line segment by applying what I know about averages. I can solve.

Advertisements

Chapter 5 Properties of Triangles Perpendicular and Angle Bisectors Sec 5.1 Goal: To use properties of perpendicular bisectors and angle bisectors.

5.1 Perpendicular Bisector Equidistant. Definition of a Perpendicular Bisector A Perpendicular Bisector is a ray, line, segment or even a plane that is.

4-7 Median, Altitude, and Perpendicular bisectors.

5.2 – Use Perpendicular Bisectors A segment, ray, line, or plane, that is perpendicular to a segment at its midpoint is called a perpendicular bisector.

Using properties of Midsegments Suppose you are given only the three midpoints of the sides of a triangle. Is it possible to draw the original triangle?

Chapter 5 Perpendicular Bisectors. Perpendicular bisector A segment, ray or line that is perpendicular to a segment at its midpoint.

Geometry (Holt 3-4)K.Santos. Perpendicular Bisector Perpendicular bisector of a segment is a line perpendicular to a segment at the segment’s midpoint.

Bell Problem. 5.2 Use Perpendicular Bisectors Standards: 1.Describe spatial relationships using coordinate geometry 2.Solve problems in math and other.

Chapter 5. Vocab Review  Intersect  Midpoint  Angle Bisector  Perpendicular Bisector  Construction of a Perpendicular through a point on a line Construction.

Today – Monday, December 17, 2012  Q & A from Friday’s Warm up PG. 292: 1-13  Questions from HW #1  Learning Target: Use the Perpendicular Bisector.

5.2 Perpendicular and Angle Bisectors

Section 1.5 Segment & Angle Bisectors 1/12. A Segment Bisector A B M k A segment bisector is a segment, ray, line or plane that intersects a segment at.

5.2 Bisectors of Triangles5.2 Bisectors of Triangles  Use the properties of perpendicular bisectors of a triangle  Use the properties of angle bisectors.

Anna Chang 10-1 / T2.  Perpendicular bisector is a line that cuts a segment into two equal parts, it creates 90 degrees.

Chapter 5 Perpendicular Bisectors. Perpendicular bisector A segment, ray or line that is perpendicular to a segment at its midpoint.

Perpendicular & Angle Bisectors. Objectives Identify and use ┴ bisectors and  bisectors in ∆s.

Warm Up Find the values of y by substituting x = 2, 3, 10 1.Y = 20x Y = 9(x+3)

2.1 Segment Bisectors. Definitions Midpoint – the point on the segment that divides it into two congruent segments ABM.

Index Card Let’s start our stack of Theorems, Postulates, Formulas, and Properties that you will be able to bring into a quiz or test. Whenever I want.

Geometry 3-6 Perpendicular Bisector A line or ray that cuts a line segment in half at a 90° angle. Perpendicular bisector Flipped fraction and opposite.

Warm Up Use Labsheet 1.1.

Perpendicular Bisector of a Line To find the equation of the perpendicular bisector of a line segment : 1. Find the midpoint 2. Find the slope of the given.

Geometry 13.5 The Midpoint Formula. The Midpoint Formula The midpoint of the segment that joins points (x 1,y 1 ) and (x 2,y 2 ) is the point (-4,2) (6,8)

1.6 Basic Constructions.

Warm-up with 4.2 Notes on Isosceles Triangles 2) Copy Angle EBC and name it Angle LMN ) Copy EC and add.

GEOMETRY 3.4 Perpendicular Lines. LEARNING TARGETS  Students should be able to…  Prove and apply theorems about perpendicular lines.

3.6 Perpendiculars and Distance

11/12/14 Geometry Bellwork 1.3x = 8x – 15 0 = 5x – = 5x x = 3 2.6x + 3 = 8x – 14 3 = 2x – = 2x x = x – 2 = 3x + 6 2x – 2 = 6 2x = 8.

Construct: Use a compass and a straightedge to draw a geometric figure. Perpendicular Lines: Two lines that intersect to form two right angles. Perpendicular.

Warm-Up (6 th Hour) On scratch paper draw the following: A line segment, AB. An angle, ACB. Find the point that exactly in the middle of your line and.

Bisectors of a Triangle

5-2 Use Perpendicular Bisectors

2-3: Proving Theorems. Reasons used in Proofs Given information Definitions Postulates (Algebraic Properties included) Theorems that have already been.

Section 5-1 Perpendiculars and Bisectors. Perpendicular bisector A segment, ray, line, or plane that is perpendicular to a segment at its midpoint.

Bisectors in Triangles Section 5-2. Perpendicular Bisector A perpendicular tells us two things – It creates a 90 angle with the segment it intersects.

What is a locus? What is the relationship between a perpendicular bisector of a segment and the segment’s endpoints? What is the relationship between the.

Section 5.2 Use Perpendicular Bisectors. Vocabulary Perpendicular Bisector: A segment, ray, line, or plane that is perpendicular to a segment at its midpoint.

Geometry Lesson 5 – 1 Bisectors of Triangles Objective: Identify and use perpendicular bisectors in triangles. Identify and use angle bisectors in triangles.

Perpendicular Bisectors of a Triangle Geometry. Equidistant A point is equidistant from two points if its distance from each point is the same.

Geometry Sections 5.1 and 5.2 Midsegment Theorem Use Perpendicular Bisectors.

5.6 Angle Bisectors and Perpendicular Bisectors

Daily Warm-Up Quiz F H, J, and K are midpoints 1. HJ = __ 60 H 65 J FG = __ JK = __ m < HEK = _ E G Reason: _ K 3. Name all 100 parallel segments.

Perpendicular and Angle Bisectors Perpendicular Bisector – A line, segment, or ray that passes through the midpoint of a side of a triangle and is perpendicular.

Warm-up 6 th Hour – Chapter 6 Test Scores: 100, 98, 95, 94, 92, 92, 88, 85, 83, 82, 72, 70, 67, 66, 62, 58, 7 MeanMedian ModeRange What happens to the.

Warm-Up: Problem of the Day One endpoint of a line segment has coordinates (-3,- 1). The midpoint of the line segment is at (1,1). What is the location.

5-2 Perpendicular and Angle Bisectors. Perpendicular Bisectors A point is equidistant from two objects if it is the same distance from each. A perpendicular.

Perpendicular Bisectors and Altitudes of Triangles.

Warm Up Week 7 1) What is the value of x? 28 ⁰ x⁰x⁰ 3x ⁰.

Chapter 5: Properties of Triangles Section 5.1: Perpendiculars and Bisectors.

Chapter 10: Properties of Circles

Assignment 1: 10.3 WB Pg. 127 #1 – 14 all

2.1 Segment Bisectors Goal:

Chapter 5.1 Segment and Angle Bisectors

Warm up Find the midpoint of segment AB A(0,0) B(6,4)

ANSWERS TO EVENS If angle 1 is obtuse, then angle 1 = 120

5.1 Perpendiculars and Bisectors

4-7 Medians, Altitudes, and Perpendicular Bisectors

Section 11 – 2 Chords & Arcs Objectives:

6.1 Perpendicular and Angle Bisectors

Module 14: Lesson 4 Perpendicular Lines

4-7 Medians, Altitudes, and Perpendicular Bisectors

Check your homework using the posters posted around the room.

Basic Constructions Constructing a congruent segment

Check your work from yesterday with the correct answers on the board.

14-2b Tangent Lines to Circles

SPECIAL SEGMENTS.

Midpoint and Median P9. The midpoint of the hypotenuse of a right triangle is equidistant from the 3 vertices. P12. The length of a leg of a right triangle.

To Start: 20 Points 1. What is a midsegment?

Writing the equation of the

Presentation transcript:

Warm-up 1.3x = 8x – 15 0 = 5x – = 5x x = 3 2.6x + 3 = 8x – 14 3 = 2x – = 2x x = x – 2 = 3x + 6 2x – 2 = 6 2x = 8 x = 4 AB = 2 AM AB = 2(5x – 2) AB = 2(5*4 – 2) = 2(18) AB = 36

5.2: Use Perpendicular Bisectors A line segment (or line or ray) is a perpendicular bisector iff it is perpendicular to another segment at its midpoint

equidistant CB

AB 4x7x x 4(2) 8

Check Points #1 and 2

Work these out now! 2x = 5x – 6 0 = 3x – 6 6 = 3x x = 2 AB = 4 3x + 8 = 7x – 16 8 = 4x – = 4x x = 6 AB = 26 6x + 11 = 11x – 9 11 = 5x – 9 20 = 5x x = 4 AB = 35

Homework Pg 306/1-17