Warm up OBJECTIVE: Students will classify triangles by there sides and angles and find missing angle measurements in triangles right acute obtuse When.

Slides:

Advertisements

Similar presentations

TODAY IN GEOMETRY…  Review 4.1 concepts  Learning Goal: 4.2 Identify Congruent Triangles  Independent practice  Ch.4 QUIZ-Thursday/Friday.

Advertisements

DO NOW 1) X = 180 2) 55 + X = 180 3) X + 58 = 90 4) 31 + X = 90.

A triangle can be classified by _________ and __________. sidesangles There are four ways to classify triangles by angles. They are Equiangular Acute.

Triangles Review.

Section 4.1 Classifying Triangles

5-1 Classifying Triangles Today we will be learning how to classify triangles according to length of sides and measurement of the angles.

Pre-Algebra Homework Page 248 #1-9. NEW! Student Learning Goal Chart Lesson Reflection for Chapter 5.

Triangles 11.2.

Chapter 4.1 Notes: Apply Triangle Sum Properties Goal: You will classify triangles and find measures of their angles.

Warmup – grab a book Room , submit answers for x and y.

EQUILATERAL & ISOSCELES Quiz tomorrow. CLASSIFY the triangle by ANGLES and SIDES Angles: acute, obtuse, right Sides:equilateral, isosceles, scalene 91.

Triangles and Angles Sec 4.1 GOALS: To classify triangles by their angles and sides To find missing angle measures in triangles.

Triangles Geometry Mr. Zampetti Unit 3, Day 1. Today’s Objectives To learn new strategies that will help find the measures of angles in a triangle To.

Triangle Classification. Objectives Classify triangles by their angle and side measures Find the sum of the measure of the interior and exterior angles.

Classify triangles by sides No congruent sides Scalene triangle At least two sides congruent Isosceles triangle Three congruent sides Equilateral triangle.

What is a triangle? Triangles can be classified by their angles. There are four different classifications by angles. Equiangular triangles are triangles.

Goal, to classify triangles by their sides and by their angles.

4-1 Triangles and Angles. Theorem 4.1: Triangle Sum The sum of the measures of the interior angles of a triangle is 180 . xx yy zz  x +

10-4 Triangles pages Indicators  G3b- Use triangle sum relationships to solve problems. G4- Determine necessary conditions for congruence of triangles.

Bell Work Find the measure of the missing variables and state what type of angle relationship they have(alt. interior, alt. ext, same side interior, corresponding).

Unit 5 Review State Standards 2: Write geometric proofs. 5: Prove triangles are congruent. 12: Find and use measures of sides and angles in triangles.

Geometry Section 4.1 Triangle Sum Theorem. A triangle is the figure formed by three line segments joining three noncollinear points. A B C.

Triangles Objective: Learn to name and classify triangles.

Classifying Triangles How many degrees can be found in all triangles? 180 We can classify triangles 2 ways: By their angles By their sides.

Classifying Triangles Lesson Classifying by Angle Acute triangles have three acute angles. Obtuse triangles have one obtuse angle. Right triangles.

Classifying Triangles. Two Ways to Classify Triangles  By Their Sides  By Their Angles.

Bell work Use the diagram to find x. b||c. a 80° b c x + 30.

Triangles Chapter What is the sum of the angles inside a triangle? 180º? Prove it m Given A B C Angle Addition Postulate/Definition of a Straight.

3.6 Types of Triangles Advanced Geometry. Definitions (Index Cards)  Scalene triangle – a triangle in which no two sides are congruent.  Isosceles triangle.

Classify These Triangles by Sides and Angles. Chapter 4 Congruent Triangles Section 4.1: Triangle Sum Properties Todays Objective: Determine if a right.

Warm-Up Exercises Lesson 4.1, For use with pages º ANSWER right 2. 72º Classify each angle as acute, obtuse, or right. ANSWERacute.

4.1 Triangle Angle Sum and Properties. How many degrees in a triangle? The sum of the angles in any triangle is exactly 180 degrees.

Applying Triangle Sum Properties

Lesson 10-4 Pages Triangles. What you will learn! How to identify and classify triangles.

Warm Up 5-1 Classify each angle as acute, obtuse, or right

IDENTIFYING TRIANGLES

4.1 Apply Triangle Sum Properties

Date: Topic: Isosceles Triangle Theorem (6.1.C)

Opener: How many diagonals does each polygon have

Geometry 4.1 Triangle and Angles.

Bellwork Classify each angle as acute, obtuse, or right. 90° 72° 116°

Warm-up Classify each angle: Solve for x.

Section 3-4 Angles of a Triangle.

Triangles: Classifications, Angles and More

CLASSIFICATIONS, ANGLES AND MORE!!

7.7.3 Triangles.

Classifying Triangles

Chapter 4: Congruent Triangles

Triangles Review.

CLASSIFICATIONS, ANGLES AND MORE!!

IDENTIFYING TRIANGLES

Classifying Triangles

Objective - To classify triangles.

Triangles Guided Notes

Add up all the sides Perimeter of Area of a Rectangle: ANY polygon:

Classifying Triangles

3-3 Parallel Lines & the Triangle Angle Sum Theorem

4-1 Vocabulary Acute triangle Equiangular triangle Right triangle

Unit 4A – Geometric Figures Lesson 3 Triangles

Triangles & Their Angles

4.1 – Apply triangle sum properties

4.1 Apply Triangle Sum Properties

Triangles Lesson 10-4.

Geometry 3.4 Angles of a Triangle.

Classifying Triangles

4-1 Classifying Triangles

Presentation transcript:

Warm up OBJECTIVE: Students will classify triangles by there sides and angles and find missing angle measurements in triangles right acute obtuse When lines are parallel as indicated, the alt. int.  ’s 

OBJECTIVE: Students will analyze and classify Triangles by sides & angles, prove triangles congruent & use coordinate geometry to investigate triangle relationships. Why? Triangles are used to add strength to structures in real-world situations. For example, the frame of a hang glider involves several triangles. Mastery is 80% or better on Practice Problems and 5- Minute Checks.

Copy those terms for which you are unfamiliar

(3 ways) 023 Skill Development

Think….Ink…Share….Quick Write In your own words compare and contrast isosceles, scalene and equilateral triangles. Hint: How are they similar? Different?

(4 ways) 1313 equiangular  ’s are also equilateral Skill Development

isosceles acute isosceles 72,72,36

Pair Share With a partner discuss the criterion in the following triangles: Acute Right Obtuse Equiangular

x x

 RST is a right  (3--1) (-3-3) (3-5) (-3-5) (3-2) (-1-2) right Skill Development

Two of the most important theorems you ever need

What should we do now? 3x – 9 = x x = 82 x = 41 Guided

2x + x + 90 = 180  sum theorem 3x = 90 x = 30 What kind of triangle is this? Right scalene Guided ……White Boards

Homework Day 1 of 2 Page 221 #1-15 all

Recall: 8x x (  sum corollary)

How’s this for a challenge? Hint: draw and label a picture ABC Which angle is biggest? Let x = the smallest angle x 2x 3x x + 2x + 3x = 180  sum theorem 6x = 180 x = 30 m  A = 2(30) = 60 m  B = 30 m  C = 3(30) = 90

Don’t be afraid to recognize properties we used last week Notice the parallel lines Y = 30 alt int  ’s  x = 60 corollary to  sum OR x + 30 = 90 ext  theorem x = 60

Find y first y = 90 – 39 = 51 Find this  ? = 180 – (50+51) = 79 x = 180  sum Theorem x = 45 corollary to  sum

Sometimes it “helps” to “separate” the triangles. Label our known values xx 25  20  yy yy 25  Find y y+25 = 90 y = 65 By ∆ sum, this angle is 95  So x = = 85

Exit Slips 1.How many ways can a triangle be classified by its sides? Name them. 2.How many ways can a triangle by classified by its angles? Name them. 3.What do all the angles of any triangle ALWAYS add up to? Name the theorem. 4.Find x and y. (copy picture)

WHAT WAS TODAYS OBJECTIVE ?? STUDENTS WILL ANALYZE TRIANGLES, FIND THEIR MEASURES AND CLASSIFY THEM BY THEIR SIDES AND THEIR ANGLES.

Home Work Pages #16-37 all