Holt Geometry 4-3, 4-4, and 4-5 Congruent Triangles 4-3, 4-4, and 4-5 Congruent Triangles Holt Geometry Warm Up Warm Up Lesson Presentation Lesson Presentation.

Holt Geometry

4-3, 4-4, and 4-5Congruent Triangles4-3, 4-4, and 4-5

Congruent Triangles

Holt Geometry

Warm Up

Lesson Presentation

Lesson Quiz

Holt Geometry

4-3, 4-4, and 4-5Congruent Triangles

Let’s Get It Started . . .

1. Name all sides and angles of ∆FGH.

2. What is true about K and L? Why?

3. What does it mean for two segments to be congruent?

FG, GH, FH, F, G, H

;Third s Thm.

They have the same length.

Holt Geometry

4-3, 4-4, and 4-5Congruent Triangles

• Use properties of congruent triangles. • Prove triangles congruent by using the

definition of congruence.• Apply SSS, SAS, ASA, and AAS to

construct triangles and solve problems. • Prove triangles congruent by using

SSS, SAS, ASA, and AAS.

Objectives

Holt Geometry

4-3, 4-4, and 4-5Congruent Triangles

corresponding anglescorresponding sidescongruent polygonstriangle rigidityincluded angleIncluded side

Vocabulary

Holt Geometry

4-3, 4-4, and 4-5Congruent Triangles

Geometric figures are congruent if they are the same size and shape. Corresponding angles and corresponding sides are in the same position in polygons with an equal number of sides.

Two polygons are congruent polygons if and only if their corresponding sides are congruent. Thus triangles that are the same size and shape are congruent.

Holt Geometry

4-3, 4-4, and 4-5Congruent Triangles

Holt Geometry

4-3, 4-4, and 4-5Congruent Triangles

To name a polygon, write the vertices in consecutive order.

Helpful Hint

Holt Geometry

4-3, 4-4, and 4-5Congruent Triangles

Naming Polygons Start at any vertex and list the

vertices consecutively in a clockwise or counterclockwise direction.

D

I

AN

EDIANE

IANED

ANEDI

NEDIA

EDIAN

DENAI

ENAID

NAIDE

AIDEN

IDENA

Holt Geometry

4-3, 4-4, and 4-5Congruent Triangles

When you write a statement such as ABC DEF, you are also stating which parts are congruent.

Helpful Hint

Holt Geometry

4-3, 4-4, and 4-5Congruent Triangles

Say What?

Given: ∆PQR ∆STW

Identify all pairs of corresponding congruent parts.

Angles: P S, Q T, R W

Sides: PQ ST, QR TW, PR SW

Holt Geometry

4-3, 4-4, and 4-5Congruent Triangles4-4 Triangle Congruence: SSS and SAS

Holt Geometry

Warm Up

Lesson Presentation

Lesson Quiz

Holt Geometry

4-3, 4-4, and 4-5Congruent Triangles

Let’s Get It Started

1. Name the angle formed by AB and AC.

2. Name the three sides of ABC.

3. ∆QRS ∆LMN. Name all pairs of congruent corresponding parts.

Possible answer: A

QR LM, RS MN, QS LN, Q L, R M, S N

AB, AC, BC

Holt Geometry

4-3, 4-4, and 4-5Congruent Triangles

Apply SSS and SAS to construct triangles and solve problems.

Prove triangles congruent by using SSS and SAS.

Objectives

Holt Geometry

4-3, 4-4, and 4-5Congruent Triangles

triangle rigidityincluded angle

Vocabulary

Holt Geometry

4-3, 4-4, and 4-5Congruent Triangles

In Lesson 4-3, you proved triangles congruent by showing that all six pairs of corresponding parts were congruent.

The property of triangle rigidity gives you a shortcut for proving two triangles congruent. It states that if the side lengths of a triangle are given, the triangle can have only one shape.

Holt Geometry

4-3, 4-4, and 4-5Congruent Triangles

For example, you only need to know that two triangles have three pairs of congruent corresponding sides. This can be expressed as the following postulate.

Holt Geometry

4-3, 4-4, and 4-5Congruent Triangles

Adjacent triangles share a side, so you can apply the Reflexive Property to get a pair of congruent parts.

Remember!

Holt Geometry

4-3, 4-4, and 4-5Congruent Triangles

Example 1: Using SSS to Prove Triangle Congruence

Use SSS to explain why ∆ABC ∆DBC.

Holt Geometry

4-3, 4-4, and 4-5Congruent Triangles

Example 2

Use SSS to explain why ∆ABC ∆CDA.

Holt Geometry

4-3, 4-4, and 4-5Congruent Triangles

An included angle is an angle formed by two adjacent sides of a polygon.

B is the included angle between sides AB and BC.

Holt Geometry

4-3, 4-4, and 4-5Congruent Triangles

Holt Geometry

4-3, 4-4, and 4-5Congruent Triangles

The letters SAS are written in that order because the congruent angles must be between pairs of congruent corresponding sides.

Caution

Holt Geometry

4-3, 4-4, and 4-5Congruent Triangles

Example 3: Engineering Application

The diagram shows part of the support structure for a tower. Use SAS to explain why ∆XYZ ∆VWZ.

Holt Geometry

4-3, 4-4, and 4-5Congruent Triangles

Example 4

Use SAS to explain why ∆ABC ∆DBC.

Holt Geometry

4-3, 4-4, and 4-5Congruent Triangles

The SAS Postulate guarantees that if you are given the lengths of two sides and the measure of the included angles, you can construct one and only one triangle.

Holt Geometry

4-3, 4-4, and 4-5Congruent Triangles

Example 5: Verifying Triangle Congruence

Show that the triangles are congruent for the given value of the variable.

∆MNO ∆PQR, when x = 5.

Holt Geometry

4-3, 4-4, and 4-5Congruent Triangles

Example 6: Proving Triangles Congruent

Given: BC ║ AD, BC AD

Prove: ∆ABD ∆CDB

ReasonsStatements

5. SAS Steps 3, 2, 45. ∆ABD ∆ CDB

4. Reflex. Prop. of

2. Given

3. Alt. Int. s Thm.3. CBD ADB

1. Given1. BC || AD

2. BC AD

4. BD BD

Holt Geometry

4-3, 4-4, and 4-5Congruent Triangles

Example 7

Given: QP bisects RQS. QR QS

Prove: ∆RQP ∆SQP

ReasonsStatements

5. SAS Steps 1, 3, 45. ∆RQP ∆SQP

4. Reflex. Prop. of

1. Given

3. Def. of bisector3. RQP SQP

2. Given2. QP bisects RQS

1. QR QS

4. QP QP

Holt Geometry

4-3, 4-4, and 4-5Congruent Triangles

An included side is the common side of two consecutive angles in a polygon. The following postulate uses the idea of an included side.

Holt Geometry

4-3, 4-4, and 4-5Congruent Triangles

Holt Geometry

4-3, 4-4, and 4-5Congruent Triangles

Example 1: Problem Solving Application

A mailman has to collect mail from mailboxes at A and B and drop it off at the post office at C. Does the table give enough information to determine the location of the mailboxes and the post office?

Holt Geometry

4-3, 4-4, and 4-5Congruent Triangles

The answer is whether the information in the table can be used to find the position of points A, B, and C.

List the important information: The bearing from A to B is N 65° E. From B to C is N 24° W, and from C to A is S 20° W. The distance from A to B is 8 mi.

1 Understand the Problem

Holt Geometry

4-3, 4-4, and 4-5Congruent Triangles

Draw the mailman’s route using vertical lines to show north-south directions. Then use these parallel lines and the alternate interior angles to help find angle measures of ABC.

2 Make a Plan

Holt Geometry

4-3, 4-4, and 4-5Congruent Triangles

mCAB = 65° – 20° = 45°

mCAB = 180° – (24° + 65°) = 91°

You know the measures of mCAB and mCBA and the length of the included side AB. Therefore by ASA, a unique triangle ABC is determined.

Solve3

Holt Geometry

4-3, 4-4, and 4-5Congruent Triangles

One and only one triangle can be made using the information in the table, so the table does give enough information to determine the location of the mailboxes and the post office.

Look Back4

Holt Geometry

4-3, 4-4, and 4-5Congruent Triangles

Example 8: Applying ASA Congruence

Determine if you can use ASA to prove the triangles congruent. Explain.

Two congruent angle pairs are give, but the included sides are not given as congruent. Therefore ASA cannot be used to prove the triangles congruent.

Holt Geometry

4-3, 4-4, and 4-5Congruent Triangles

Example 9

Determine if you can use ASA to prove NKL LMN. Explain.

By the Alternate Interior Angles Theorem. KLN MNL. NL LN by the Reflexive Property. No other congruence relationships can be determined, so ASA cannot be applied.

Holt Geometry

4-3, 4-4, and 4-5Congruent Triangles

You can use the Third Angles Theorem to prove another congruence relationship based on ASA. This theorem is Angle-Angle-Side (AAS).

Holt Geometry

4-3, 4-4, and 4-5Congruent Triangles

Example 10: Using AAS to Prove Triangles Congruent

Use AAS to prove the triangles congruent.

Given: X V, YZW YWZ, XY VY

Prove: XYZ VYW