Proving Angles Congruent.  Vertical Angles: Two angles whose sides form two pairs of opposite rays; form two pairs of congruent angles 1 2 3 4 <1 and.

Slides:

Advertisements

Similar presentations

2-5 Proving Angles Congruent

Advertisements

Proving Angles Congruent

Standard 2.0, 4.0.  Angles formed by opposite rays.

Proving Angles Congruent

2-8: Proving Angle Relationships

1.5 Exploring Angle Pairs 9/20/10

1-5: Exploring Angle Pairs. Types of Angle Pairs Adjacent Angles Vertical Angles Complementary Angles Supplementary Angles Two coplanar angles with a:

2.6 – Proving Statements about Angles Definition: Theorem A true statement that follows as a result of other true statements.

Proving the Vertical Angles Theorem

Warm Up Simplify each expression – (x + 20) – (3x – 10)

Section 1.6 Pairs of Angles

2.3 Complementary and Supplementary Angles

1-5 Angle Relationships What are: adjacent angles linear pairs

Proving Triangles Congruent

1-5 Angle Relationships What are: adjacent angles linear pairs

Angle Relationships Section 1-5 Adjacent angles Angles in the same plane that have a common vertex and a common side, but no common interior points.

Lesson 2.6 p. 109 Proving Statements about Angles Goal: to begin two-column proofs about congruent angles.

SPECIAL PAIRS OF ANGLES. Congruent Angles: Two angles that have equal measures.

OTCQ What is the measure of one angle in a equilateral/equiangular triangle?

UNIT 01 – LESSON 06 – ANGLE RELATIONSHIPS Essential Question How can you describe angle pair relationships and use thee descriptions to find angle measures?

Geometry Section 1.6 Special Angle Pairs. Two angles are adjacent angles if Two angles are vertical angles if.

Section 1-5: Exploring Angle Pairs Objectives: Identify special angle pairs & use their relationships to find angle measures.

Proving Angles Congruent

Proving angles congruent. To prove a theorem, a “Given” list shows you what you know from the hypothesis of the theorem. You will prove the conclusion.

 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.

PropertiesAngles Solving Equations Proofs

PROVING ANGLES CONGRUENT. Vertical angles Two angles whose sides form two pairs of opposite rays The opposite angles in vertical angles are congruent.

1.5 Exploring Angle Pairs.

2-4 Special Pairs of Angles Objectives -Supplementary Angles Complementary Angles -Vertical angles.

Section 1-6 Angle Pair Relationships. Vertical angles Formed when two lines intersect. Vertical Angles are Congruent. 1 2.

- is a flat surface that extends in all directions. Objective - To identify angles as vertical, adjacent, complementary and supplementary. Plane.

OBJECTIVES: 1) TO IDENTIFY ANGLE PAIRS 2) TO PROVE AND APPLY THEOREMS ABOUT ANGLES 2-5 Proving Angles Congruent M11.B C.

Special angles, perpendicular lines, and parallel lines and planes September 10, 2008.

2-5 Proving Angles Congruent Angle Pairs Vertical Angles two angles whose sides form two pairs of opposite rays Adjacent Angles two coplanar angles.

3.2 Proof and Perpendicular Lines

4-7 Vertical Angles. Vertical angle definition Two angles are vertical angles if their sides form two pairs of opposite rays.  1 and  2 are vertical.

Section 2.5: Proving Angles Congruent Objectives: Identify angle pairs Prove and apply theorems about angles.

2.4: Special Pairs of Angles

Use right angle congruence

Lesson 1-5: Pairs of Angles

1-3 Pairs of Angles.

CHAPTER 1: Tools of Geometry Section 1-6: Measuring Angles.

Objective:Prove Angle Pair Relationships Prove Theorems- use properties, postulates, definitions and other proven theorems Prove: Right Angles Congruence.

2-4 Special Pairs of Angles. A) Terms 1) Complementary angles – a) Two angles whose sum is 90° b) The angles do not have to be adjacent. c) Each angle.

2.4 Reasoning with Properties from Algebra ?. What are we doing, & Why are we doing this?  In algebra, you did things because you were told to….  In.

Proving the Vertical Angles Theorem (5.5.1) May 11th, 2016.

Angle Pair Relationships and Angle Bisectors. If B is between A and C, then + = AC. Segment Addition Postulate AB BC.

Proving Angles Congruent Chapter 2: Reasoning and Proof1 Objectives 1 To prove and apply theorems about angles.

2.6 Proven Angles Congruent. Objective: To prove and apply theorems about angles. 2.6 Proven Angles Congruent.

2.5 Reasoning with Properties from Algebra

Do Now Find the value of x that will make a parallel to b. (7x – 8)°

2.8 Notes: Proving Angle Relationships

Angle Relationships.

Lesson 1-4: Pairs of Angles

Lesson 1-4: Pairs of Angles

Lesson 1-5: Pairs of Angles

Types of Angles & Their Relationships

Describe Angle Pair Relationships

Angle Pairs Module A1-Lesson 4

Special Pairs of Angles

Lesson 1-5 Pairs of Angles.

2.6 Deductive Reasoning GEOMETRY.

Exploring Angle Pairs Skill 05.

Unit 2: Congruence, Similarity, & Proofs

Adjacent Angles Definition Two coplanar angles with a common side, a common vertex, and no common interior points. Sketch.

2.7 Prove Theorems about Lines and Angles

Proving Angles Congruent

Geometry Exploring Angle Pairs.

Presentation transcript:

Proving Angles Congruent

 Vertical Angles: Two angles whose sides form two pairs of opposite rays; form two pairs of congruent angles <1 and <3 are Vertical angles <2 and <4 are Vertical angles

Proving Angles Congruent  Adjacent Angles: Two coplanar angles that share a side and a vertex <1 and <2 are Adjacent Angles

2.5 Proving Angles Congruent  Complementary Angles: Two angles whose measures have a sum of 90°  Supplementary Angles: Two angles whose measures have a sum of 180° ° 40° 34 75° 105°

Identifying Angle Pairs In the diagram identify pairs of numbered angles that are related as follows: a. Complementary b. Supplementary c. Vertical d. Adjacent

Making Conclusions Whether you draw a diagram or use a given diagram, you can make some conclusions directly from the diagrams. You CAN conclude that angles are  Adjacent angles  Adjacent supplementary angles  Vertical angles

Making Conclusions Unless there are markings that give this information, you CANNOT assume  Angles or segments are congruent  An angle is a right angle  Lines are parallel or perpendicular

Theorems About Angles Theorem 2-1Vertical Angles Theorem Vertical Angles are Congruent Theorem 2-2Congruent Supplements If two angles are supplements of the same angle or congruent angles, then the two angles are congruent

Theorems About Angles Theorem 2-3Congruent Complements If two angles are complements of the same angle or congruent angles, then the two angles are congruent Theorem 2-4 All right angles are congruent Theorem 2-5 If two angles are congruent and supplementary, each is a right angle

Proving Theorems Paragraph Proof: Written as sentences in a paragraph Given: <1 and <2 are vertical angles Prove: <1 = <2 Paragraph Proof: By the Angle Addition Postulate, m<1 + m<3 = 180 and m<2 + m<3 = 180. By substitution, m<1 + m<3 = m<2 + m<3. Subtract m<3 from each side. You get m<1 = m<2, which is what you are trying to prove

Proving Theorems Given: <1 and <2 are supplementary <3 and <2 are supplementary Prove:<1 = <3 Proof: By the definition of supplementary angles, m<___ + m<____ = _____ and m<___ + m<___ = ____. By substitution, m<___ + m<___ = m<___ + m<___. Subtract m<2 from each side. You get __________.