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Proving Segment Relationships

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Presentation on theme: "Proving Segment Relationships"— Presentation transcript:

1 Proving Segment Relationships
LESSON 2–7 Proving Segment Relationships

2 Five-Minute Check (over Lesson 2–6) TEKS Then/Now
Postulate 2.8: Ruler Postulate Postulate 2.9: Segment Addition Postulate Example 1: Use the Segment Addition Postulate Theorem 2.2: Properties of Segment Congruence Proof: Transitive Property of Congruence Example 2: Real-World Example: Proof Using Segment Congruence Lesson Menu

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

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

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

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

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

8 Which statement shows an example of the Symmetric Property?
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. 5-Minute Check 6

9 Mathematical Processes G.1(D), G.1(G)
Targeted TEKS G.6(A) Verify theorems about angles formed by the intersection of lines and line segments, including vertical angles, and angles formed by parallel lines cut by a transversal and prove equidistance between the endpoints of a segment and points on its perpendicular bisector and apply these relationships to solve problems. Mathematical Processes G.1(D), G.1(G) TEKS

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

11 Concept

12 Concept

13 2. Definition of congruent segments AB = CD 2.
Use the Segment Addition Postulate Proof: Statements Reasons 1. 1. Given AB  CD ___ 2. Definition of congruent segments AB = CD 2. 3. Reflexive Property of Equality BC = BC 3. 4. Segment Addition Postulate AB + BC = AC 4. Example 1

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

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

16 Which reason correctly completes the proof?
1. Given AC = AB, AB = BX 1. 2. Transitive Property AC = BX 2. 3. Given CY = XD 3. 4. Addition Property AC + CY = BX + XD 4. AY = BD 6. Substitution 6. Proof: Statements Reasons Which reason correctly completes the proof? 5. ________________ AC + CY = AY; BX + XD = BD 5. ? Example 1

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

18 Concept

19 Concept

20 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

21 2. Definition of congruent segments 2.
Proof Using Segment Congruence Proof: Statements Reasons 1. Given 1. 2. Definition of congruent segments 2. 3. Given 3. 4. Transitive Property 4. YZ ___ 5. Substitution 5. Example 2

22 Prove the following. Given: Prove: Example 2

23 Which choice correctly completes the proof? Proof:
Statements Reasons 1. Given 1. 2. Transitive Property 2. 3. Given 3. 4. Transitive Property 4. 5. _______________ 5. ? Example 2

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

25 Proving Segment Relationships
LESSON 2–7 Proving Segment Relationships


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