2.2b: Exploring Congruent Triangles with Proofs

1. 2.2b: Exploring Congruent Triangles with Proofs CCSS

2. A proof is an argument that uses logic, definitions, properties, and previously proven statements to show that a conclusion is true. An important part of writing a proof is giving justifications to show that every step is valid.

4. Division Property of Equality Example 1: Solving an Equation in Algebra Solve the equation 4m – 8 = –12. Write a justification for each step. 4m – 8 = –12 Given equation +8+8Addition Property of Equality 4m = –4 Simplify. m = –1 Simplify.

5. Solve the equation . Write a justification for each step. Given equation Multiplication Property of Equality. t = –14 Simplify. Check It Out! Example 1

6. Example 3: Solving an Equation in Geometry Write a justification for each step. NO = NM + MO Segment Addition Post. 4x – 4 = 2x + (3x – 9) Substitution Property of Equality 4x – 4 = 5x – 9 Simplify. –4 = x – 9 Subtraction Property of Equality 5 = x Addition Property of Equality

7.  Add. Post. mABC = mABD + mDBC Check It Out! Example 3 Write a justification for each step. 8x°=(3x + 5)°+ (6x – 16)° Subst. Prop. of Equality 8x = 9x – 11 Simplify. –x = –11 Subtr. Prop. of Equality. x = 11 Mult. Prop. of Equality.

9. Remember! Numbers are equal (=) and figures are congruent ().

10. Example 4: Identifying Property of Equality and Congruence Identify the property that justifies each statement. A. QRS  QRS B. m1 = m2 so m2 = m1 C. AB  CD and CD  EF, so AB EF. D. 32° = 32° Reflex. Prop. of . Symm. Prop. of = Trans. Prop of  Reflex. Prop. of =

11. Check It Out! Example 4 Identify the property that justifies each statement. 4a. DE = GH, so GH = DE. 4b. 94° = 94° 4c. 0 = a, and a = x. So 0 = x. 4d. A  Y, so Y  A Sym. Prop. of = Reflex. Prop. of = Trans. Prop. of = Sym. Prop. of 

12. Ex. Identify the property that justifies each statement. 3. x = y and y = z, so x = z. 4. DEF  DEF 5. ABCD, so CDAB. Trans. Prop. of = Reflex. Prop. of  Sym. Prop. of 

13. 2-Column Proof • Numbered statements and corresponding reasons in a logical order organized into 2 columns. statements reasons 1. 1. 2. 2. 3. 3. etc.

14. 2-Column Proof (Con’t) statements reasons • You can only use: • Given • Definitions • Postulates • Theorems • Properties

15. Statements PQ=2x+5, QR=6x-15, PR=46. 2. PQ+QR=PR 3. 2x+5+6x-15=46 4. 8x-10=46 5. 8x=56 6. x=7 Reasons Given Seg Add Post. Subst. prop of = Simplify Add prop of = Division prop of = Ex: Given: PQ=2x+5 QR=6x-15 PR=46 Prove: x=7 P Q R

16. Statements Q is midpt of PR PQ=QR PQ+QR=PR QR+QR=PR 2QR=PR QR= PQ= Reasons Given Defn. of midpt Seg Add. post Subst. prop of = Simplify Division prop of = Subst. prop Ex: Given: Q is the midpoint of PR. Prove: PQ and QR =

17. Example– Given: HA || KS Prove: Reasons Statement Given 1 HA || KS, 1 Alt. Int. Angles are congruent 2 2 Vertical Angles are congruent 3 3 4 ASA Postulate 4

18. Example Given: Prove: Statement Reason 1) Given 1)

19. Example Given: Prove: Statement Reason 1) Given 1) 2) 2)

20. Example Given: Prove: Statement Reason 1) Given 1) 2) 2)

21. Given: Prove: Reasons Statement Given 1 , 1