Setting Up Proofs Objectives:  To set up proofs from verbal statements  To prove theorems.

Slides:

Advertisements

Similar presentations

EXAMPLE 3 Prove the Alternate Interior Angles Theorem

Advertisements

2.6 Proving Angles Congruent

Proving Angles Congruent.  Vertical Angles: Two angles whose sides form two pairs of opposite rays; form two pairs of congruent angles

Proving Angles Congruent

More Angle Relationships. Deductive Reasoning To deduce means to reason from known facts When you prove a theorem, you are using deductive reasoning using.

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

4-3 A Right Angle Theorem Learner Objective: Students will apply a Right Angle Theorem as a way of proving that two angles are right angles and to solve.

Use right angle congruence

Complementary and Supplementary Angles

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

Chapter 2.7 Notes: Prove Angle Pair Relationships

Chapter 2.7 Notes: Prove Angle Pair Relationships Goal: You will use properties of special pairs of angles.

Geometry 9/2/14 - Bellwork 1. Find the measure of MN if N is between M and P, MP = 6x – 2, MN = 4x, and MP = Name the postulate used to solve the.

Lesson 2.4 Congruent Supplements and Complements Objective: To prove angles congruent by means of four new theorems.

EXAMPLE 1 Identify congruent angles SOLUTION By the Corresponding Angles Postulate, m 5 = 120°. Using the Vertical Angles Congruence Theorem, m 4 = 120°.

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.

Lesson 2.8 Vertical Angles Objective: After studying this lesson you will be able to recognize opposite rays and vertical angles.

Proving Angles Congruent

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

Daily Warm-Up Quiz 1.Name the same ray two different ways. T E A M 2.Draw the next picture/number in the picture pattern: “measure of line segment UP =

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

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

Ch. 2.6: Proving Statements about Angles

Proving Angles Congruent Chapter 2 Section 6. Theorem A conjecture or statement that you can prove true. You can use given information, definitions, properties,

Section 2-6: Geometric Proofs Rigor – prove and apply the Vertical Angles Theorem and the Linear Pair Theorem Relevance – These simple proof gives you.

2-6 Proving Angles Congruent. Theorem: a conjecture or statement that you prove true.

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

2.4: Special Pairs of Angles

Chapter Two: Reasoning and Proof Section 2-5: Proving Angles Congruent.

EXAMPLE 3 Prove the Vertical Angles Congruence Theorem

Lesson 2.7 Transitive and Substitution Properties Objective: After studying this lesson you will be able to apply the transitive properties of segments.

2/17/ : Verifying Angle Relationships 1 Expectation: You will write proofs in “If, then…” form.

4.5 – Prove Triangles Congruent by ASA and AAS In a polygon, the side connecting the vertices of two angles is the included side. Given two angle measures.

Geometry Triangles. Vocabulary  Theorem 4-1 (angle sum theorem): The sum of the measures of the angles of a triangle is 180 In order to prove the angle.

Geometry 2.7 Big Idea: Prove Angle Pair Big Idea: Prove Angle PairRelationships.

Properties of Parallel Lines 3-2. EXAMPLE 1 Identify congruent angles SOLUTION By the Corresponding Angles Postulate, m 5 = 120°. Using the Vertical.

2-6: Planning a Proof. Proofs consist of 5 parts 1.Statement of the theorem 2.A diagram that illustrates the given info 3.A list, in terms of the figure.

Select Answers to Homework Definition of Segment Bisector x, 180-2x11. RIV , 72, 18.

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

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

ADVANCED GEOMETRY SECTION 2.7 Transitive and Substitution Properties.

Lesson 2.2 Complementary and Supplementary Angles Objective: Recognize complementary and supplementary angles.

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

Warm Up Given: Angle MOR = (3x + 7)° Angle ROP = (4x – 1)° MO OP Which angle is larger, angle MOR or angle ROP? M R OP.

4.4 The Equidistance Theorems

Complementary and Supplementary Angles

2.6 Proving Geometric Relationships

Use right angle congruence

Use right angle congruence

Bell work: Once bell work is completed, turn in, along with test corrections, and any homework you have.

CONGRUENCE OF ANGLES THEOREM

CHAPTER 2: DEDUCTIVE REASONING

CONGRUENCE OF ANGLES THEOREM

Proving Statements About Angles

Find the measure of each numbered angle and name the theorem that justifies your work. Problem of the Day.

Agenda EQ: How do we write 2-column Geometric Proofs? Agenda

4.4 The Equidistance Theorems

2.6 Proving Statements about Angles

Proving Statements About Angles

Proving Lines Parallel

7.2 Two Proof-Oriented Triangle theorems

2.6 Proving Statements about Angles

Bellwork From the exercise on the left identify all the postulates and properties that you can. Also note which step you see them in. By the way, what.

Chapter 2, lesson 5: A Simple proof

Objectives Write two-column proofs.

Objectives Write two-column proofs.

Give a reason for each statement.

Proving Statements about Angles

Presentation transcript:

Setting Up Proofs Objectives:  To set up proofs from verbal statements  To prove theorems

Steps to writing a proof for a given theorem: Step 1: Draw and label a diagram. Step 2: Restate the theorem in terms of the labeled diagram. Step 3: Restate what is given, and what is to be proved. The restatement should include the specific rays, segments, angles and other geometric parts from your diagram.

Alert! Sometimes a theorem is written as a simple declarative sentence. The subject of the sentence is the given, and the verb (and remainder of the sentence) is the prove. We will be converting these sentences to if-then form, however.

Example 1 Draw and label a diagram. Restate the theorem in terms of the diagram. State what is given and what is to be proved. Supplementary Angles 1 2 < 1 supp. < 2 <1 ≡ < 2

Example 1 If two congruent angles are supplementary, then they are right angles. Given: Prove: Supplementary Angles 1 2 < 1 supp. < 2; < 1 ≡ < 2

Example 2 Labeled Diagram: If two angles are each congruent to a third angle, then they are congruent to each other. Given: Prove: Draw and label a diagram. Restate the theorem in terms of the diagram. State what is given and what is to be proved.

Final for Understanding Summarize in your own words the steps for setting up a proof from a given statement. Set up a proof based upon the following statement: Complements of vertical angles are congruent. Homework: Setting Up Proofs Worksheet, plus text _____________________