Splash Screen. Over Lesson 2–6 5-Minute Check 1 A.Distributive Property B.Addition Property C.Substitution Property D.Multiplication Property State the.

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Presentation transcript:

Splash Screen

Over Lesson 2–6 5-Minute Check 1 A.Distributive Property B.Addition Property C.Substitution Property D.Multiplication Property State the property that justifies the statement. 2(LM + NO) = 2LM + 2NO

Over Lesson 2–6 5-Minute Check 1 A.Distributive Property B.Addition Property C.Substitution Property D.Multiplication Property State the property that justifies the statement. 2(LM + NO) = 2LM + 2NO

Over Lesson 2–6 5-Minute Check 2 A.Distributive Property B.Substitution Property C.Addition Property D.Transitive Property State the property that justifies the statement. If m ∠ R = m ∠ S, then m ∠ R + m ∠ T = m ∠ S + m ∠ T.

Over Lesson 2–6 5-Minute Check 2 A.Distributive Property B.Substitution Property C.Addition Property D.Transitive Property State the property that justifies the statement. If m ∠ R = m ∠ S, then m ∠ R + m ∠ T = m ∠ S + m ∠ T.

Over Lesson 2–6 5-Minute Check 3 A.Multiplication Property B.Division Property C.Distributive Property D.Substitution Property State the property that justifies the statement. If 2PQ = OQ, then PQ =

Over Lesson 2–6 5-Minute Check 3 A.Multiplication Property B.Division Property C.Distributive Property D.Substitution Property State the property that justifies the statement. If 2PQ = OQ, then PQ =

Over Lesson 2–6 5-Minute Check 4 A.Reflexive Property B.Symmetric Property C.Transitive Property D.Substitution Property State the property that justifies the statement. m ∠ Z = m ∠ Z

Over Lesson 2–6 5-Minute Check 4 A.Reflexive Property B.Symmetric Property C.Transitive Property D.Substitution Property State the property that justifies the statement. m ∠ Z = m ∠ Z

Over Lesson 2–6 5-Minute Check 5 A.Reflexive Property B.Symmetric Property C.Substitution Property D.Transitive Property State the property that justifies the statement. If BC = CD and CD = EF, then BC = EF.

Over Lesson 2–6 5-Minute Check 5 A.Reflexive Property B.Symmetric Property C.Substitution Property D.Transitive Property State the property that justifies the statement. If BC = CD and CD = EF, then BC = EF.

Over Lesson 2–6 5-Minute Check 6 A.x = x B.If x = 3, then x + 4 = 7. C.If x = 3, then 3 = x. D.If x = 3 and x = y, then y = 3. Which statement shows an example of the Symmetric Property?

Over Lesson 2–6 5-Minute Check 6 A.x = x B.If x = 3, then x + 4 = 7. C.If x = 3, then 3 = x. D.If x = 3 and x = y, then y = 3. Which statement shows an example of the Symmetric Property?

Then/Now You wrote algebraic and two-column proofs. Write proofs involving segment addition. Write proofs involving segment congruence.

Concept

Example 1 Use the Segment Addition Postulate 2. Definition of congruent segments AB = CD Reflexive Property of Equality BC = BC Segment Addition Postulate AB + BC = AC 4. Proof: StatementsReasons Given AB ≅ CD ___

Example 1 6. Segment Addition Postulate CD + BC = BD Transitive Property of Equality AC = BD 7. Proof: StatementsReasons 5. Substitution Property of Equality 5. CD + BC = AC Use the Segment Addition Postulate 8. Definition of congruent segments 8. AC ≅ BD ___

Example 1 Prove the following. Given:AC = AB AB = BX CY = XD Prove:AY = BD

Example 1 1. Given AC = AB, AB = BX Transitive Property AC = BX Given CY = XD Addition PropertyAC + CY = BX + XD4. AY = BD 6. Substitution6. Proof: StatementsReasons Which reason correctly completes the proof? 5. ________________ AC + CY = AY; BX + XD = BD 5. ?

Example 1 A.Addition Property B.Substitution C.Definition of congruent segments D.Segment Addition Postulate

Example 1 A.Addition Property B.Substitution C.Definition of congruent segments D.Segment Addition Postulate

Concept

Example 2 Proof Using Segment Congruence BADGE Jamie is designing a badge for her club. The length of the top edge of the badge is equal to the length of the left edge of the badge. The top edge of the badge is congruent to the right edge of the badge, and the right edge of the badge is congruent to the bottom edge of the badge. Prove that the bottom edge of the badge is congruent to the left edge of the badge. Given: Prove:

Example 2 Proof Using Segment Congruence 5. Substitution 5. Proof: Statements Reasons 1. Given Definition of congruent segments Given Transitive Property 4. YZ ___

Example 2 Prove the following. Given: Prove:

Example 2 Which choice correctly completes the proof? Proof: Statements Reasons 1. Given Transitive Property Given Transitive Property _______________ 5. ?

Example 2 A.Substitution B.Symmetric Property C.Segment Addition Postulate D.Reflexive Property

Example 2 A.Substitution B.Symmetric Property C.Segment Addition Postulate D.Reflexive Property

End of the Lesson