Parallel Lines and Transversals Chapter 3 Section 3.3 Parallel Lines and Transversals
Warm-Up What can you conclude about the angles? Which is not true if m<2=90? The lines are perpendicular. <1 is a right angle. The unlabeled angles are congruent. <1 and <2 are complementary . 1 2
When two parallel lines are cut by a transversal, then … Corresponding angles are Corresponding Angle Postulate Alternate Interior angles are Alternate Interior Angle Theorem. Alternate Exterior angles are Alternate Exterior Angle Theorem Consecutive Interior angles are Supplementary Consecutive Interior Angle Theorem
Perpendicular Transversal Thm. If a transversal is perpendicular to one of two parallel lines, then it is perpendicular to the other.
Find the measure of 1 and 2 Explain your reasoning Corresponding angle Postulate m 2 = 118 Alternate Exterior angle theorem m 1 = 72 Alternate Interior angle theorem m 2 = 180 – 72 = 108 Consecutive Interior angle theorem
Find the measure of 1 and 2 Explain your reasoning Vertical Angle Theorem m 2 = 127 Corresponding angle Postulate
Find the value of x and y and state the reason Vertical Angle Thm y = 81 Corresponding Angle Postulate x = 180 – 98 = 82 Form a linear pair and are supplementary y = 82 Alternate Exterior angle theorem
Find the value of x and y and state the reason Perpendicular Transversal Thm y = 90 If two lines are perpendicular then they form 4 right angles
Find the value of x and state the reason Alt. Int. Angle Thm. 5x – 15 = 80 5x = 95 x = 19 Corresponding Angle Postulate 3(x + 9) = 129 3x + 27 = 129 3x = 102 x = 34
Find the value of x and state the reason Cons. Int. Angle Thm. 4x – 9 + 75 = 180 4x + 66 = 180 4x = 114 x =
Complete the flow proof of the Proof of the Alt. Ext. Angle Thm. a: Given b: Corresponding Angle Postulate c: Vertical Angle Thm d: Transitive