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Use the angles formed by a transversal to prove two lines are parallel.

Objective. Use the angles formed by a transversal to prove two lines are parallel. Post. If corres.<s  lines ||. Example 1: Using the Converse of the Corresponding Angles Postulate.

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Use the angles formed by a transversal to prove two lines are parallel.

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  1. Objective Use the angles formed by a transversal to prove two lines are parallel.

  2. Post. If corres.<s  lines ||.

  3. Example 1: Using the Converse of the Corresponding Angles Postulate Use the Converse of the Corresponding Angles Postulate and the given information to show that ℓ || m. 4 8 4 8 4 and 8 are corresponding angles. ℓ || mConv. of Corr. s Post.

  4. The Converse of the Corresponding Angles Postulate is used to construct parallel lines. The Parallel Postulate guarantees that for any line l you can always construct a parallel line through a point that is not on l

  5. If alt.int.<s  lines || If alt.ext.<s  lines || If SS int.<s  lines ||

  6. Example 2a: Determining Whether Lines are Parallel Use the given information and the theorems you have learned to show that r || s. 4 8 4 8 4 and 8 are alternate exterior angles. r || sConv. Of Alt. Int. s Thm.

  7. Example 2B Continued Use the given information and the theorems you have learned to show that r || s. m2 = (10x + 8)°, m3 = (25x – 3)°, x = 5 m2 + m3 = 58° + 122° = 180°2 and 3 are same-side interior angles. r || sConv. of Same-Side Int. s Thm.

  8. Example 3: Proving Lines Parallel Given:p || r , 1 3 Prove: l || m

  9. Example 3 Continued 1. Given 1.p || r 2.3  2 2. Alt. Ext. s Thm. 3.1  3 3. Given 4.1  2 4. Trans. Prop. of  5. L ||m 5. Conv. of Corr. s Post.

  10. Lesson Quiz: Part I Name the postulate or theorem that proves p || r. 1. 4 5 Conv. of Alt. Int. sThm. 2. 2 7 Conv. of Alt. Ext. sThm. 3. 3 7 Conv. of Corr. sPost. 4. 3 and 5 are supplementary. Conv. of Same-Side Int. sThm.

  11. Lesson Quiz: Part II Use the theorems and given information to prove p || r. 5. m2 = (5x + 20)°, m 7 = (7x + 8)°, and x = 6 m2 = 5(6) + 20 = 50° m7 = 7(6) + 8 = 50° m2 = m7, so 2 ≅ 7 p || r by the Conv. of Alt. Ext. sThm.

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