Agenda Bell Ringer Bell Ringer

Slides:

Advertisements

Similar presentations

Determining if a Triangle is Possible

Advertisements

Triangles TOPIC 9 LESSON 9-5.

Determining if a Triangle is Possible. How many different acute triangles can you draw? How many different right scalene triangles can you draw? Recall.

7/3/2015 Geometry 1 Classifying Triangles Free powerpoints at

EXAMPLE 1 Classifying a Triangle a.Classify XYZ by its angles. b. Classify XYZ by its side lengths. SOLUTION a. The triangle has a right angle at Y. So,

HOW MANY SIDES ARE THERE, AND WHAT IS THEIR ANGLE?

10.1 Triangles. Acute Triangle Not Acute Triangles.

Classifying Triangles Students will classify triangles using the lengths of the sides and the angles. S. Calahan October 2010.

Classify Triangles Standard 4C.

Classification of Triangles. Table of Contents  Objective Objective  Review Review  Definition of a Triangle  Samples of Triangular Objects  Types.

Review: Classifying Triangles and The Triangle Angle Sum Theorem

Vocabulary Triangle Sum Theorem acute triangle right triangle

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

What type of triangle is this? A.) scalene B.) obtuse C.) isosceles.

Let’s revise some angles Angles What names of angles do you know? ACUTE RIGHT ANGLE OBTUSEREFLEX Less than 90 o Exactly 90 o Between 90 o and 180 o Between.

GEOMETRY 4-1 Classifying Triangles. 4-1 Classifying Triangles By angle measures: Acute Triangle: 3 acute angles Right Triangle: 1 right angle Obtuse Triangle:

Triangle A polygon with three sides and three angles. A triangle can be names by its’ side lengths and angles. – Side lengths: isosceles, equilateral,

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

GEOMETRY 4-1 Classifying Triangles. Acute Triangle Three acute angles Triangle Classification By Angle Measures.

Triangles A Guided PowerPoint Presentation. 15cm 5cm 10cm 94º 1.

TRIANGLES AND TYPES OF TRIANGLES. A triangle has three sides.

What is a triangle A plane figure, created by connecting three points that are not in the same line. Three – side polygon whose angles add up to 180°

Types of Triangles. Angles The angles in a triangle add up to o + 60 o + 60 o =

Equilateral, Isosceles, Scalene, Right, Acute, Obtuse Types of Triangles.

Triangles Objective: Learn to name and classify triangles.

3/9/2016 Geometry 1 Classifying Triangles Free powerpoints at

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

Sum of Angles in Triangles. Triangles classified by sides A scalene triangle has no congruent sides. An isosceles triangle has at least 2 congruent sides.

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

Sum of Angles in Triangles. Triangles classified by sides A scalene triangle has no congruent sides. An isosceles triangle has at least 2 congruent sides.

Lesson 8.3 Concept: How to classify triangles by their sides and angles. An equilateral triangle has three sides of the same length. An isosceles triangle.

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.

Wednesday, May 11, 2016 HOMEWORK: STUDY AND PRACTICE FOR TOMORROW’S QUIZ!!!

Mathematics Types of Triangles.

Classify the triangle by its angles and by its sides.

Opener: How many diagonals does each polygon have

Geometry 4.1 Triangle and Angles.

MCC.4.G.1-2 All About Triangles.

Classifying Triangles

Classifying Triangles

Triangles A polygon with 3 sides.

Classifying Triangles

Classifying Triangles

Triangles Created by G. Antidormi 2005.

IDENTIFYING TRIANGLES

Triangles Grade 4.

Classifying Triangles

Classifying Triangles

Objective - To classify triangles.

Triangles Guided Notes

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

Identify type of triangle

Classifying Triangles

3-3 Parallel Lines & the Triangle Angle Sum Theorem

4-1 Vocabulary Acute triangle Equiangular triangle Right triangle

Intro to Triangles.

4.1 – Apply triangle sum properties

Classifying Triangles

Classifying Triangles

Determining if a Triangle is Possible

Made by Ms. Shobhana Sharma By KV INS HAMLA

Classifying Triangles

Format your paper for Cornell Notes. Topic: Triangles

Presentation transcript:

Agenda 02.01.2019 Bell Ringer Bell Ringer Jaguar Ascensions (Homeroom) Complete your smart goals and decorate your Jaguar Ascensions folder. Geometry Video Level 4 https://www.youtube.com/watch?v=6fJ4OZq_Xn0 Wrap-up ( Quiz will be postponed to a later date.)

Determining if a Triangle is Possible Return to table of contents

How many different acute triangles can you draw? How many different right scalene triangles can you draw? Recall that triangles can be classified according to their side lengths and the measure of their angles. Sides: Scalene - no sides are congruent Isosceles - two sides are congruent Equilateral - all three sides are congruent Angles: Acute - all three angles are acute Right - contains one right angle Obtuse - contains one obtuse angle

There is another property that applies to triangles: The sum of the lengths of any two sides of a triangle is greater than the length of the third side. What does this mean? If you take the three sides of a triangle and add them in pairs, the sum is greater than (not equal to) the third side. If that is not true, then it is not possible to construct a triangle with the given side lengths.

Example: Determine if sides of length 5 cm, 8 cm and 12 cm can form a triangle? Test all three pairs to see if the sum is greater: 5 + 8 > 12 5 + 12 > 8 8 + 12 > 5 13 > 12 17 > 8 20 > 5 Yes, it is possible to construct a triangle with sides of lengths 5 cm, 8 cm and 12 cm.

Example: Determine if sides of length 3 ft, 4 ft and 9 ft can form a triangle? Test all three pairs to see if the sum is greater: 3 + 4 > 9 3 + 9 > 4 4 + 9 > 3 7 > 9 12 > 4 13 > 3 No, it is not possible to construct a triangle with sides of lengths 3 ft, 4 ft and 9 ft.

Try These: Determine if triangles can be formed with the following side lengths: 1. 4 cm, 7 cm, 10 cm 2. 24 mm, 20 mm, 30 mm 4 + 7 > 10 24 + 20 > 30 4 + 10 > 7 24 + 30 > 20 7 + 10 > 4 20 + 30 > 24 YES YES 3. 7 ft, 9 ft, 16 ft 4. 9 in, 13 in, 24 in 7 + 9 = 16 9 + 13 < 24 7 + 16 > 9 9 + 24 > 13 16 + 9 > 7 13 + 24 > 9 NO NO

1 Determine if sides of length 5 mm, 14 mm and 19 mm can form a triangle. Be prepared to show your work! A Yes B No Answer: B No

2 Determine if sides of length 6 in, 9 in and 14 in can form a triangle. Be prepared to show your work! A Yes B No Answer: A Yes

3 Determine if sides of length 5 yd, 13 yd and 21 yd can form a triangle. Be prepared to show your work! A Yes B No Answer: B No

Determine if sides of length 3 ft, 8 ft and 4 Determine if sides of length 3 ft, 8 ft and 15 ft can form a triangle. Be prepared to show your work! A Yes B No Answer: B No

Determine if sides of length 5 in, 5 in and 9 in can form a triangle. Be prepared to show your work! A Yes B No Answer: A Yes

A triangle could have which of the following sets of angles? 6 A triangle could have which of the following sets of angles? A B C D Answer: B

A triangle could have which of the following sets of angles? 7 A triangle could have which of the following sets of angles? A B C D Answer: A, D

Example: Predict the length of the third side of a triangle with sides of length 12 ft and 16 ft. Side 1 = 12 ft Side 2 = 16 ft The 3rd side must be less than: 12 + 16 > 3rd side 28 ft > 3rd side The 3rd side must be greater than: 12 + 3rd side > 16 3rd side > 4 The 3rd side must be greater than 4 ft and less than 28 ft.

Example: Predict the length of the third side of a triangle with sides of length 9 cm and 15 cm. Side 1 = 9 cm Side 2 = 15 cm The 3rd side must be less than: 9 + 15 > 3rd side 24 cm > 3rd side The 3rd side must be greater than: 9 + 3rd side > 15 3rd side > 6 The 3rd side must be greater than 6 cm and less than 24 cm.

Try These: Predict the length of the third side of a triangle whose known sides are lengths: 1. 13 mm, 20 mm 2. 7 in, 19 in 13 + 20 > Side 3 7 + 19 > Side 3 33 > Side 3 26 > Side 3 13 + Side 3 > 20 7 + Side 3 > 19 Side 3 > 7 Side 3 > 12 7 < side 3 < 33 12 < side 3 < 26

Try These: Predict the length of the third side of a triangle whose known sides are lengths: 3. 4 ft, 11 ft 4. 23 cm, 34 cm 4 + 11 > Side 3 23 + 34 > Side 3 15 > Side 3 57 > Side 3 4 + Side 3 > 11 23 + Side 3 > 34 Side 3 > 7 Side 3 > 11 7 < side 3 < 15 11 < side 3 < 57

8 Predict the lower limit of the length of the third side of a triangle whose known sides are lengths 6 m and 12 m. Answer: 6 m

9 Predict the upper limit of the length of the third side of a triangle whose known sides are lengths 6 m and 12 m. Answer: 18 m

10 Predict the lower limit of the length of the third side of a triangle whose known sides are lengths 9 in and 17 in. Answer: 8 in

11 Predict the upper limit of the length of the third side of a triangle whose known sides are lengths 9 in and 17 in. Answer: 26 in

12 Predict the lower limit of the length of the third side of a triangle whose known sides are lengths 15 ft and 43 ft. Answer: 28 ft

13 Predict the upper limit of the length of the third side of a triangle whose known sides are lengths 15 ft and 43 ft. Answer: 58 ft