5.2: Triangle Inequalities

Slides:

Advertisements

Similar presentations

5-3 Inequalities in One Triangle

Advertisements

MM1G3b -Understand and use the triangle inequality, the side-angle inequality, and the exterior angle inequality.

Triangle Inequality Theorem:

Section 5.3 Inequalities in One Triangle. The definition of inequality and the properties of inequalities can be applied to the measures of angles.

 § 7.1 Segments, Angles, and Inequalities  § 7.4 Triangle Inequality Theorem  § 7.3 Inequalities Within a Triangle  § 7.2 Exterior Angle Theorem.

Triangle Inequality Theorems Sec 5.5 Goals: To determine the longest side and the largest angle of a triangle To use triangle inequality theorems.

5.5 Inequalities in Triangles

An exterior angle is outside the triangle and next to one of the sides. 4-2 Exterior Angle Theorem.

Anna Chang T2. Angle-Side Relationships in Triangles The side that is opposite to the smallest angle will be always the shortest side and the side that.

5-2 Inequalities and Triangles

Chapter 5: Inequalities!

Chapter 7 Triangle Inequalities. Segments, Angles and Inequalities.

Triangle Inequalities

HOW TO FIND AN ANGLE MEASURE FOR A TRIANGLE WITH AN EXTENDED SIDE

5-6 Inequalities in One Triangle

Inequalities in One Triangle

Triangle Sum Properties & Inequalities in a Triangle Sections 4.1, 5.1, & 5.5.

5.5Use Inequalities in a Triangle Theorem 5.10: If one side of a triangle is longer than the other side, then the angle opposite the longest side is _______.

5.6 Inequalities in One Triangle The angles and sides of a triangle have special relationships that involve inequalities. Comparison Property of Inequality.

ANGLES OF A TRIANGLE Section 4.2. Angles of a Triangle Interior angles  Original three angles of a triangle Exterior angles  Angles that are adjacent.

Inequality Postulates. If: Reason: The whole is greater than any of its parts. ABC Then: Then:and.

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

Inequalities for Sides and Angles of a Triangle Section 5-3.

Chapter 6 Review. + DEFINITION OF INEQUALITY Difference in size, degree or congruence A B

Triangle Inequalities What makes a triangle and what type of triangle.

GEOMETRY HELP Explain why m  4 > m  5. Substituting m  5 for m  2 in the inequality m  4 > m  2 produces the inequality m  4 > m  5.  4 is an.

4.7 Triangle Inequalities. Theorem 4.10 If one side of a triangle is longer than another side, then the angle opposite the longer side is larger than.

Chapter 4 Section 4.1 Section 4.2 Section 4.3. Section 4.1 Angle Sum Conjecture The sum of the interior angles of a triangle add to 180.

4.7 Triangle Inequalities. In any triangle…  The LARGEST SIDE lies opposite the LARGEST ANGLE.  The SMALLEST SIDE lies opposite the SMALLEST ANGLE.

Thursday, November 8, 2012 Agenda: TISK & No MM Lesson 5-5: Triangle Inequalities Homework: 5-5 Worksheet.

Chapter 7 Geometric Inequalities Chin-Sung Lin. Inequality Postulates Mr. Chin-Sung Lin.

Chapter 7 Geometric Inequalities Eleanor Roosevelt High School Geometry Mr. Chin-Sung Lin.

Chapter 5.5 Inequalities in Triangles. Property: Comparison Property of Inequality If a = b+c and c > 0, then a > b Proof of the comparison property –

Triangle Inequality Theorem and Side Angle Relationship in Triangle

4.7 Triangle Inequalities

Triangle Inequalities. Triangle Inequality #1 Triangle Inequality 1(577031).ggb Triangle Inequality 1(577031).ggb This same relation applies to sides.

5-3 Inequalities in One Triangle 5-4 Indirect proof 5-5 The triangle Inequality 5-6 Inequality in two triangles. Chapter 5.

Honors Geometry Section 4.8 cont. Triangle Inequality Proofs.

Triangle Inequalities Objectives: 1.Discover inequalities among sides and angles in triangles.

5-3 Inequalities and Triangles The student will be able to: 1. Recognize and apply properties of inequalities to the measures of the angles of a triangle.

+ Angle Relationships in Triangles Geometry Farris 2015.

Sect. 5.5 Inequalities in One Triangle Goal 1 Comparing Measurements of a Triangle. Goal 2 Using the Triangle Inequality.

HONORS GEOMETRY 5.3. Inequalities in One Triangle.

 Students will be able to use inequalities involving angles and sides of triangles.

Triangle Inequality Theorem The sum of the lengths of any two sides of a triangle is greater than the length of the third side.

Chapter 4-3 Inequalities in One Triangle Inequalities in Two Triangles.

5-5 Inequalities in Triangles

Chapter Inequalities in One Triangle 5-4 Indirect proof 5-5 The triangle Inequality 5-6 Inequality in two triangles.

5.5 Inequalities in One Triangle

5.2 HW ANSWERS Pg. 338 #5-10, # YJ = SJ =

Triangle Inequalities

6.5 & 6.6 Inequalities in One and Two Triangle

Warm-up Find x a) b).

Inequalities and Triangles

5-2 Inequalities and Triangles

Triangle Inequalities

TRIANGLE INEQUALITY THEOREM

Triangle Theorems.

Class Greeting.

Use Inequalities in a Triangle

Base Angles & Exterior Angles

TRIANGLE INEQUALITY THEOREM

TRIANGLE INEQUALITY THEOREM

Triangle Inequalities

Exterior Angle Theorem

Inequalities in Triangles

INEQUALITIES Sides/Angles of Triangles

5-2 Inequalities and Triangles

Inequalities for Sides and Angles of a Triangle

7-5: Inequalities in a Triangle

Presentation transcript:

5.2: Triangle Inequalities Greater Than 5.2: Triangle Inequalities Less Than or Equal To

What is an inequality? For any real number, a>b iff there is a positive number c such that a=b+c

All Properties Still Hold All Properties Still Hold! Addition, Subtraction, Multiplication, Division, Transitive etc.

Theorem 5.8: If an angle is an exterior angle of a triangle, then its measure is larger than the measure of either remote interior angle.

Name all the angles whose measures are less than <14

Which angle is the largest?

Theorem 5.9: If one side of a triangle is larger than a second side, then the angle opposite that side is larger than the angle opposite the shorter side

Put the sides of the triangle in order from smallest to largest AB<BC<AC

Put the angles in order from smallest to largest (assume x>0) <C, <B, <A

Compare the following angles m<RSU_____m<SUR m<TSV_____m<STV m<RSV_____m<RUV

It’s Proof Time!! See Overhead