Chapter 7 Triangle Inequalities. Segments, Angles and Inequalities.

Slides:



Advertisements
Similar presentations
Warm-up Solve: 1) 2x + 1+4x +4x-11= 180 Compare greater than >, less than < or equal = 4+5___ 9 5+5__ 9 Find a number x. 6
Advertisements

Chapter 4a: Congruent Triangles By: Nate Hungate, Gary Russell, J. P
5-3 Inequalities in One Triangle
 § 7.1 Segments, Angles, and Inequalities  § 7.4 Triangle Inequality Theorem  § 7.3 Inequalities Within a Triangle  § 7.2 Exterior Angle Theorem.
5-2 Inequalities and Triangles
7.2 Exterior Angle Theorem. You will learn to identify exterior angles and remote interior angles of a triangle and use the Exterior Angle Theorem. 1)
Chapter 5: Inequalities!
Lesson 4.3 – Triangle inequalities & Exterior Angles
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 6: Inequalities in Geometry Sonora Hospital-Medina and Rachel Carta Wagman.
4-2 Angles of Triangles Objectives: The student will be able to: 1. Apply the Triangle-Sum Theorem. 2. Apply the Exterior Angle Theorem.
HOW TO FIND AN ANGLE MEASURE FOR A TRIANGLE WITH AN EXTENDED SIDE
TRIANGLES (There are three sides to every story!).
Chapter 4 Congruent Triangles In this chapter, you will: classify triangles by their parts, apply the Angle Sum Theorem and the Exterior Angle Theorem,
Relationships in Triangles
5-6 Inequalities in One Triangle
Inequalities in One Triangle
Properties of Equality- A ddition Property: If a=b, then a+c=b+c Subtraction Property: If a=b, then a-c=b-c Multiplication Property: If a=b, then a*c=b*c.
Triangles and Lines – Sum of the Angles in a Triangle The sum of the angles in any triangle = 180°
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 Triangles Chapter 4, Section 2. Angle Sum Theorem The sum of angles in a triangle is 180 o
Triangles and Angles Sec 4.1 GOALS: To classify triangles by their angles and sides To find missing angle measures in triangles.
Types of Triangles And Angle Sum Theorems.  Notation for sides.  AB CB AC  Angles   ABC or  B  Vertex angle  Base angle  Opposite side  Opposite.
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.
Basics of Euclidean Geometry Point Line Number line Segment Ray Plane Coordinate plane One letter names a point Two letters names a line, segment, or ray.
Chapter 1 Solving Linear Equations. 1.1 Solving Simple Equations.
Inequalities Section 10.2 Solving Inequalities. Property of Comparison For all real numbers a and b, one and only one of the following must be true: a
 Deductive Reasoning is a process of reasoning logically from given facts to a conclusion.  Addition Property of equality if a=b then a+c=b+c  Subtraction.
Properties from Algebra
Inequality Postulates. If: Reason: The whole is greater than any of its parts. ABC Then: Then:and.
Applying Congruent Triangles “Six Steps To Success”
Chapter 6 Review. + DEFINITION OF INEQUALITY Difference in size, degree or congruence A B
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.
4.1 Triangles and Angles. 2 Standard/Objectives: Objectives: Classify triangles by their sides and angles. Find angle measures in triangles DEFINITION:
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 –
Geometry IB_HR Date: 2/17/2014 ID Check Obj.: SWBAT review for Chapter 5 Test. Bell Ringer: Go over Chapter 4 Take Home Test HW Requests: Sign up for showing.
Chapter 2, Section 1 Conditional Statements. Conditional Statement Also know as an “If-then” statement. If it’s Monday, then I will go to school. Hypothesis:
Triangles The sum of the measures of the angles of a triangle is 180 degrees. m A + m B + m C = 180 o A BC An angle formed by a side and an extension.
Sect. 5.5 Inequalities in One Triangle Goal 1 Comparing Measurements of a Triangle. Goal 2 Using the Triangle Inequality.
Triangle Inequality Theorem The sum of the lengths of any two sides of a triangle is greater than the length of the third side.
Geometry Section 4.1 Apply Triangle Sum Properties.
Chapter 4-3 Inequalities in One Triangle Inequalities in Two Triangles.
5.2: Triangle Inequalities
Angles of Triangles 4.2.
Exterior Angles of Triangles
7-4 Triangle Inequality Theorem
Notecards Unit 4 Triangle Properties.
Triangle Inequality Theorem
5.2 HW ANSWERS Pg. 338 #5-10, # YJ = SJ =
Statements About Segments and Angles
Triangles A polygon with 3 sides.
4.1 Triangles and Angles.
Exterior Angles.
Inequalities in One Triangle
Warm-up Find x a) b).
Exterior Angles of Triangles
SWBAT: - Review for the final exam
Triangle Inequality Theorem
5-3 Congruence Postulates for Triangles
Pythagorean Theorem a²+ b²=c².
Triangle Theorems.
Honors Geometry.
Base Angles & Exterior Angles
5-5 Triangle Inequality Theorem
Side – Angle Inequalities
Side – Angle Inequalities
G9 - Congruence Postulates for Triangles
5-2 Inequalities and Triangles
Presentation transcript:

Chapter 7 Triangle Inequalities

Segments, Angles and Inequalities

Comparison Property For any two real numbers, a and b, exactly one of the following statements is true. a<ba = ba  b

Theorem 7-1 If point C is between points A and B, and A, C, and B are collinear, then AB  AC and AB  CB.

Theorem 7-2 If EP is between ED and EF, then m  DEF  m  DEP and m  DEF  m  PEF.

Transitive Property If a<b and b<c, then a<c. If a  b and b  c, then a  c.

Addition and Subtraction Properties If a<b, then a + c<b + c and a - c<b – c If a  b, then a + c  b + c and a - c  b – c

Multiplication and Division Properties If c  0 and a<b, then ac<bc and a/c<b/c If c  0 and a  b, then ac  bc and a/c  b/c

Exterior Angle Theorem

Exterior Angle An angle that forms a linear pair with one of the angles of a triangle

Remote Interior Angles The two angles in a triangle that do not form a linear pair with the exterior angle

Exterior Angle Theorem The measure of an exterior angle of a triangle is equal to the sum of the measures of its two remote interior angles.

Exterior Angle Inequality Theorem The measure of an exterior angle of a triangle is greater than the measure of either of its two remote interior angles.

Theorem 7-5 If a triangle has one right angle, then the other two angles must be acute.

Inequalities Within a Triangle

Theorem 7-6 If the measures of three sides of a triangle are unequal, then the measures of the angles opposite those sides are unequal in the same order.

Theorem 7-7 If the measures of three angles of a triangle are unequal, then the measures of the sides opposite those angles are unequal in the same order.

Theorem 7-8 In a right triangle, the hypotenuse is the side with the greatest measure.

Triangle Inequality Theorem

The sum of the measures of any two sides of a triangle is greater than the measure of the third side.