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Section 2-6

Section 2-6. Special Angles on Parallel Lines. Pair of Corresponding Angles. Pair of Alternate Interior Angles. Pair of Alternate Exterior Angles. When parallel lines are cut by a transversal, special relationships exist between these angles. Investigation 1: Which Angles are Congruent?.

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Section 2-6

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  1. Section 2-6 Special Angles on Parallel Lines

  2. Pair of Corresponding Angles

  3. Pair of Alternate Interior Angles

  4. Pair of Alternate Exterior Angles

  5. When parallel lines are cut by a transversal, special relationships exist between these angles.

  6. Investigation 1: Which Angles are Congruent? • Using the lines on your paper as a guide, draw a pair of parallel lines. Label them k and l. Draw a transversal that intersects the parallel lines. Label the transversal m, and label the angles with numbers as shown.

  7. Step 1: Place a piece of patty paper over the set of angles 1, 2, 3, and 4. Copy the two intersecting lines m and l and the four angles onto the patty paper. • Slide the patty paper down to the intersection of lines m and k, and compafre angles 1 through 4 with each of the corresponding angles 5 through 8. What relationship exists between the corresponding angles? Alternate Interior angles? Alternate exterior angles?

  8. Corresponding Angles Conjecture If two parallel lines are cut by a transversal, then the corresponding angles are congruent

  9. Alternate Interior Angles Conjecture If two parallel lines are cut by a transversal, then the alternate interior angles are congruent

  10. Alternate Exterior Angles Conjecture If two parallel lines are cut by a transversal, then the alternate exterior angles are congruent

  11. The three conjectures can be combined into one Parallel Line Conjecture If two parallel lines are cut by a transversal, then corresponding angles are , alternate interior angles are , and alternate exterior angles are . congruent congruent congruent

  12. Investigation 2: Is the Converse True? • Draw two intersecting lines on your paper. Copy these lines onto a piece of patty paper. Because you copied the angles, the two sets of angles are congruent. • Slide the top copy so the transversal stays lined up. • Trace the lines and the angles from the bottom original onto the patty paper again. When you do this, you are constructing sets of congruent corresponding angles. Mark the congruent angles. • Are the two lines parallel? You can test to see if the distance between the two lines remains the same, which guarantees that they never meet.

  13. Repeat the last step, but this time rotate the patty paper 180o so that the transversals line up again. What kinds of congruent angles have you created? Trace the lines and angles and mark the congruent angles. Arte the lines parallel? Check them. • Compare your results with those in your group. Complete the conjecture.

  14. Converse of the Parallel Lines Conjecture If two lines are cut by a transversal to form pairs of congruent corresponding angles, congruent alternate interior angles, or congruent alternate exterior angles, then the lines are congruent

  15. Write a deductive argument explaining why the Alternate Interior Angles Conjecture is true. Assume that the Vertical Angles Conjecture and Corresponding Angles Conjecture are both true.

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