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Warm Up Determine whether each statement is true or false. If false, give a counterexample.

Warm Up Determine whether each statement is true or false. If false, give a counterexample. 1. It two angles are complementary, then they are not congruent. 2. If two angles are congruent to the same angle, then they are congruent to each other. 3. Supplementary angles are congruent.

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Warm Up Determine whether each statement is true or false. If false, give a counterexample.

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  1. Warm Up Determine whether each statement is true or false. If false, give a counterexample. 1.It two angles are complementary, then they are not congruent. 2. If two angles are congruent to the same angle, then they are congruent to each other. 3. Supplementary angles are congruent. false; 45° and 45° true false; 60° and 120°

  2. Objectives Write two-column proofs. Prove geometric theorems by using deductive reasoning.

  3. Vocabulary theorem two-column proof

  4. Definitions • Postulates • Properties • Theorems Conclusion Hypothesis When writing a proof, it is important to justify each logical step with a reason. You can use symbols and abbreviations, but they must be clear enough so that anyone who reads your proof will understand them.

  5. Example 1: Writing Justifications Write a justification for each step, given that A and Bare supplementary and mA = 45°. 1. Aand Bare supplementary. mA = 45° Given information Def. of supp s 2. mA+ mB= 180° Subst. Prop of = 3. 45°+ mB= 180° Steps 1, 2 Subtr. Prop of = 4. mB= 135°

  6. Write a justification for each step, given that B is the midpoint of AC and ABEF. 1. Bis the midpoint of AC. 2. AB BC 3. AB EF 4. BC EF Check It Out! Example 1 Given information Def. of mdpt. Given information Trans. Prop. of 

  7. A theorem is any statement that you can prove. Once you have proven a theorem, you can use it as a reason in later proofs.

  8. Turn to: Postulate and Theorem

  9. Linear Pair Theorem If two angles form a linear pair; then they are supplementary

  10. Congruent Supplements Theorem If two angles are supplementary to the same angle, then the two angles are congruent

  11. Example 2: Completing a Two-Column Proof Fill in the blanks to complete the two-column proof. Given: XY Prove: XY  XY Reflex. Prop. of =

  12. CHECK UP! Fill in the blanks to complete a two-column proof of one case of the Congruent Supplements Theorem. Given: 1 and 2 are supplementary, and 2 and 3 are supplementary. Prove: 1  3 Proof: • 1 and 2 are supp., and 2 and 3 are supp. b. m1 + m2 = m2 + m3 c. Subtr. Prop. of = d. 1  3

  13. Turn to:Postulates and Theorems

  14. Right Angle Congruence Theorem All right angles are congruent.

  15. Congruent Complements Theorem If two angles are complementary to the same angle, then the two angles are congruent.

  16. Example 3: Writing a Two-Column Proof Use the given plan to write a two-column proof. Given: 1 and 2 are supplementary, and 1  3 Prove: 3 and 2 are supplementary.

  17. Example 3 Continued Given 1 and 2 are supplementary. 1  3 m1+ m2 = 180° Def. of supp. s m1= m3 Def. of s Subst. m3+ m2 = 180° Def. of supp. s 3 and 2 are supplementary

  18. Check Up Use the given plan to write a two-column proof if one case of Congruent Complements Theorem. Given: 1 and 2 are complementary, and 2 and 3 are complementary. Prove: 1  3

  19. Check It Out! Example 3 Continued Given 1 and 2 are complementary. 2 and 3 are complementary. m1+ m2 = 90° m2+ m3 = 90° Def. of comp. s m1+ m2 = m2+ m3 Subst. Reflex. Prop. of = m2= m2 m1 = m3 Subtr. Prop. of = 1  3 Def. of  s

  20. Warm Up Write each definition as a biconditional. A.) A pentagon is a five – sided polygon. B.) A right angle measures 90°.

  21. Check for Understanding!! Write a justification for each step, given that mABC= 90° and m1= 4m2. 1. mABC= 90° and m1= 4m2 2. m1+ m2 = mABC 3. 4m2 + m2 = 90° 4. 5m2= 90° 5. m2= 18° Given  Add. Post. Subst. Simplify Div. Prop. of =.

  22. Check for Understanding 2. Use the given plan to write a two-column proof. Given: 1, 2 , 3, 4 Prove: m1 + m2 = m1 + m4 1. 1 and 2 are supp. 1 and 4 are supp. 1. Linear Pair Thm. 2. Def. of supp. s 2. m1+ m2 = 180°, m1+ m4 = 180° 3. Subst. 3. m1+ m2 = m1+ m4

  23. Assignment Pg. 114 6 – 8 all

  24. Warm Up Complete each sentence. If the measures of two angles are ____________, then the angles are congruent. If two angles form a ___________, then they are supplementary. If two angles are complementary to the same angle, then the two angles are _____________.

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