Identifying Triangles Unit 4C-Triangle Geometry  LT7: I can identify different types of triangles based on different measures.

Slides:

Advertisements

Similar presentations

Triangle Congruence Theorems

Advertisements

6-2: Proving Congruence using congruent parts Unit 6 English Casbarro.

Proving Triangles Congruent At the end of this lesson, you should be able to prove two triangles are congruent by using ASA and AAS Postulates.

4-4 & 4-5: Tests for Congruent Triangles

Topic: Congruent Triangles (6.0) Objectives Prove triangles are congruent Standards Geometry. Measurement. Problem solving. Reasoning and Proof.

Congruent Polygons. Congruent segments have the same length.

Proving Triangles Congruent Advanced Geometry Triangle Congruence Lesson 2.

Test For Congruent Triangles. Test 1 3 cm 4 cm 3 cm Given three sides : SSS Two triangles are congruent if the three sides of one triangle are equal to.

Honors Geometry Section 4.3 AAS / RHL

4.3 & 4.4 Proving Triangles are Congruent

Congruent Triangles Geometry Chapter 4.

Objective: discover conditions to prove triangles are congruent. Two figures are congruent if and only if : one can be mapped onto the other by one or.

 Figures are congruent if you can slide, flip or turn them.  If you know that two triangles are congruent then you can list their congruent sides and.

Triangles and Congruence

4-2: Triangle Congruence by SSS and SAS 4-3: Triangle Congruence by ASA and AAS 4-4: Using Corresponding Parts of Congruent Triangles.

Mrs. Rivas 1. three pairs of congruent sides 2. three pairs of congruent angles.

Constructing Triangles Unit 4C-Triangle Geometry LT5: I can construct triangles from given angles. LT6: I can construct triangles from given sides.

Warm-up with 4.5 other congruence shortcuts For 1 -3 tell whether it is possible (YES or No) to draw a triangle with the given side lengths. 1) 7 in.,

5-7 Inequalities in Two Triangles

Honors Geometry Section 4.8 Triangle Inequalities

Classify Triangles Standard 4C.

Warm-up 3.4 and 4.4 Draw the figure and solve for the missing angles.

CONGRUENT TRIANGLES UNIT 2 LESSON 1. Triangle Style.

4.1: Apply Triangle Sum Properties

Triangle Congruencies Lesson 4.4. c)What is PZ? d)What is

Unit 3 Review Geometry Congruent Triangles.

Fundraiser – Keep selling!

Ch. 3 Review Part II Honors Geometry. Ch. 3 Test (Part II) Review  Median: Divides side to which it is drawn into two congruent segments.  Altitude:

Proving Triangles Congruent Sections 4-4 and 4-5.

Triangle Congruence by ASA and AAS Chapter 4 Section 3.

1 You will find unknown side lengths of similar figures.

Triangle Congruence. 3 line segments (dried spaghetti sticks – make three different sizes) Take 3 line segments Make a triangle Mark the vertices Draw.

Classifying Triangles Unit 4C-Triangle Geometry LT1: I can classify triangles based on angle measures. LT2: I can classify triangles based on side measures.

Triangle Properties - Ch 4 Triangle Sum Conjecture The sum of the measures of the angles of a triangle is…. …180 degrees. C-17 p. 199.

Drill Write your homework in your planner Take out your homework Find all angle measures:

UNIT 7: CONGRUENT TRIANGLES, AND THEOREMS Final Exam Review.

Warm Up  For both right triangles, find the value of x. x x

CHAPTER 4 SECTION 2 Triangle Congruence by SSS and SAS.

For 9 th /10 th grade Geometry students Use clicker to answer questions.

5.6 Proving Triangle Congruence by ASA and AAS. OBJ: Students will be able to use ASA and AAS Congruence Theorems.

Math 8 Ms. Stewart Unique Triangles.

Section Review Triangle Similarity. Similar Triangles Triangles are similar if (1) their corresponding (matching) angles are congruent (equal)

Warm Up Draw a triangle with the following specifications –One side 5 cm –One side 8 cm –A 40 degree Angle Compare your triangle with your classmates.

Yr 2 w-up 9/16 – copy the pictures For # 1-5 state which triangles are congruent and why 1. A B CD A B C D A B D C 3. AD bisects < CAB D is the midpoint.

Chapter 9, Section 5 Congruence. To be congruent: –corresponding parts (sides/ angles) have the same measure.

Do Now: Identify two congruent triangles in the figure below. H N A D.

Warm Up: March 27th Translate Left 5 and down 4Left 3 and up 2 A B CD.

Triangle Proofs. USING SSS, SAS, AAS, HL, & ASA TO PROVE TRIANGLES ARE CONGRUENT STEPS YOU SHOULD FOLLOW IN PROOFS: 1. Using the information given, ______________.

Geometry 4-3 Triangle Congruence by ASA and AAS. Investigation Break one piece of spaghetti into three similar length sizes. Arrange the pieces into a.

Honors Geometry Section 4.3 cont. Using CPCTC. In order to use one of the 5 congruence postulates / theorems ( )we need to show that 3 parts of one triangle.

Classify the triangle by its angles and by its sides.

Math CC7/8 – Sept. 16 Homework: p. 76 #6-9, #40

Bell ringer On a sheet of paper, draw and label two congruent triangles. Your triangles should be oriented differently (example: not facing the same.

Congruent & Similar Shapes

Proving Triangles are Congruent

Geometry 4.1 Triangle and Angles.

Proving Triangles Congruent

EOC Prep: Triangles.

4-2 Some Ways to Prove Triangles Congruent (p. 122)

Learn to use the ASA and AAS tests for congruence.

Triangles 7.G.2 Focus on knowing the properties of triangles from three measures of angles or sides, noticing when the conditions determine a unique.

Unique Triangles.

Unit 9. Day 17..

Proving Triangles are Congruent

Properties of Triangle Congruence

Determining if a Triangle is Possible

4-4/4-5 Proving Triangles Congruent

Lesson 3-2 Isosceles Triangles.

Presentation transcript:

Identifying Triangles Unit 4C-Triangle Geometry  LT7: I can identify different types of triangles based on different measures.

Identifying There are 3 different ways to identify triangles based on information given (angles and sides) 1.) A Unique Triangle 2.) More Than One Triangle 3.) No Triangle

What Is A “Unique” Triangle? A unique triangle means there is ONLY ONE WAY to create the triangle. All unique triangles are congruent (the same) even though you may have to “flip” or “turn” them to line up

Criteria For A Unique Triangle There are certain criteria that must be met in order for a triangle to be considered a unique triangle… 1.) SSS Triangles 2.) SAS triangles with an included angle 3.) ASA triangles with an included side 4.) ASA triangles with a nonincluded side

What Is “More Than One” Triangle? There are certain criteria that must be met in order for more than one triangle to be made with the same given information… 1.) SAS triangles with a nonincluded angle – EXCEPT if the given sides are the same length (isosceles) in which case you will get a unique triangle 2.) AAA Triangles

What Is “No” Triangle? There are certain criteria that if you are given you will NOT be able to create a triangle… 1.) If the sum of all the angles in the triangle does NOT equal 180° 2.) If the sum of 2 of the sides of the triangle is NOT greater than the third side

Let’s Review

Now Let’s Practice

Example 2  Draw Triangle QRS where Angle R=40°, RQ=12cm, and RS=8cm. Is the triangle unique, more than one, or none?

Example 3

Example 4

Example 5

Example 6

Example 7

Any Questions???????

Your Turn!  Complete the handout individually to assess what you have now learned about creating a unique triangle, more than one triangle, or no triangle.  We will discuss your answers as a class once everyone is finished.