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Geometry Angles formed by Parallel Lines and Transversals. Warm Up. Give an example of each angle pair. 1) Alternate interior angles 2) Alternate exterior angles 3)Same side interior angles. 1 2. 3 4. 5 6. 7 8. Parallel, perpendicular and skew lines.
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GeometryAngles formed by Parallel Lines and Transversals CONFIDENTIAL
Warm Up Give an example of each angle pair. 1) Alternate interior angles 2) Alternate exterior angles 3)Same side interior angles CONFIDENTIAL
1 2 3 4 5 6 7 8 Parallel, perpendicular and skew lines When a transversal cuts (or intersects) parallel lines several pairs of congruent and supplementary angles are formed. There are several special pairs of angles formed from this figure. Vertical pairs: Angles1 and 4 Angles2 and 3 Angles5 and 8 Angles6 and 7 CONFIDENTIAL
1 2 3 4 5 6 7 8 Supplementary pairs: Angles1 and 2 Angles2 and 4 Angles3 and 4 Angles1 and 3 Angles 5 and 6 Angles 6 and 8 Angles 7 and 8 Angles 5 and 7 Recall that supplementary angles are angles whose angle measure adds up to 180°. All of these supplementary pairs are linear pairs. There are three other special pairs of angles. These pairs are congruent pairs. CONFIDENTIAL
1 2 3 4 t 5 6 7 8 p q 1 3 2 4 5 7 6 8 Corresponding angle postulate If two parallel lines are cut by a transversal, then the pairs of corresponding angles are congruent. CONFIDENTIAL
A) m( ABC) C 800 x0 A B Using the Corresponding angle postulate Find each angle measure. corresponding angles x = 80 m( ABC) = 800 CONFIDENTIAL
(2x-45)0 D B) m( DEF) (x+30)0 E F corresponding angles (2x-45)0 = (x+30)0 subtract x from both sides x – 45 = 30 add 45 to both sides x = 75 m( DEF) = (x+30)0 = (75+30)0 = 1050 CONFIDENTIAL
Now you try! 1) m( DEF) R x0 S 1180 Q CONFIDENTIAL
Remember that postulates are statements that are accepted without proof. Since the Corresponding Angles postulate is given as a postulate, it can be used to prove the next three theorems. CONFIDENTIAL
1 2 1 3 2 4 4 3 Alternate interior angles theorem Theorem If two parallel lines are cut by a transversal, then the two pairs of Alternate interior angles are congruent. Hypothesis Conclusion CONFIDENTIAL
5 7 6 8 5 6 8 7 Alternate exterior angles theorem Theorem If two parallel lines are cut by a transversal, then the twopairs of Alternate exterior angles are congruent. Hypothesis Conclusion CONFIDENTIAL
1 2 4 3 m 1 + m 4 =1800 m 2 + m 3 =1800 Same-side interior angles theorem Theorem If two parallel lines are cut by a transversal, then the twopairs of Same-side interior angles are supplementary. Hypothesis Conclusion CONFIDENTIAL
1 2 l 3 Given: l || m Prove: 2 3 m l || m 1 3 2 3 Corresponding angles Given 2 1 Vertically opposite angles Alternate interior angles theorem Proof: CONFIDENTIAL
A) m( EDF) A C 1250 B D x0 F E Finding Angle measures Find each angle measure. x = 1250 m( DEF) = 1250 Alternate exterior angles theorem CONFIDENTIAL
R T 13x0 23x0 B) m( TUS) S U Same-side interior angles theorem 13x0 + 23x0 = 1800 Combine like terms 36x = 180 divide both sides by 36 x = 5 m( TUS) = 23(5)0 Substitute 5 for x = 1150 CONFIDENTIAL
C B A (2x+10)0 (3x-5)0 D E Now you try! 2) Find each angle measure. CONFIDENTIAL
(25x+5y)0 1250 (25x+4y)0 1200 A treble string of grand piano are parallel. Viewed from above, the bass strings form transversals to the treble string. Find x and y in the diagram. By the Alternative Exterior Angles Theorem, (25x+5y)0 = 1250 By the Corresponding Angles Postulates, (25x+4y)0 = 1200 (25x+5y)0 = 1250 - (25x+4y)0 = 1200 y = 5 25x+5(5) = 125 x = 4, y = 5 Subtract the second equation from the first equation Substitute 5 for y in 25x +5y = 125. Simplify and solve for x. CONFIDENTIAL
(25x+5y)0 1250 (25x+4y)0 1200 Now you try! 3) Find the measure of the acute angles in the diagram. CONFIDENTIAL
1270 1) m( JKL) 2) m( BEF) L x0 G K J A A (7x-14)0 B C (4x+19)0 E D F H Assessment Find each angle measure: CONFIDENTIAL
3) m( 1) 4) m( CBY) 1 A X D B Y (3x+9)0 E 6x0 C Z Find each angle measure: CONFIDENTIAL
M 5) m( KLM) 6) m( VYX) K Y0 L 1150 X 4a0 V Y (2a+50)0 Z W Find each angle measure: CONFIDENTIAL
4 1 3 2 5 7) m 1 = (7x+15)0 , m 2 = (10x-9)0 8) m 3 = (23x+15)0 , m 4 = (14x+21)0 State the theorem or postulate that is related to the measures of the angles in each pair. Then find the angle measures: CONFIDENTIAL
1 2 3 4 5 6 7 8 Let’s review Parallel, perpendicular and skew lines When a transversal cuts (or intersects) parallel lines several pairs of congruent and supplementary angles are formed. There are several special pairs of angles formed from this figure. Angles1 and 4 Angles2 and 3 Angles5 and 8 Angles6 and 7 Vertical pairs: CONFIDENTIAL
1 2 3 4 5 6 7 8 Supplementary pairs: Angles1 and 2 Angles2 and 4 Angles3 and 4 Angles1 and 3 Angles 5 and 6 Angles 6 and 8 Angles 7 and 8 Angles 5 and 7 Recall that supplementary angles are angles whose angle measure adds up to 180°. All of these supplementary pairs are linear pairs. There are three other special pairs of angles. These pairs are congruent pairs. CONFIDENTIAL
1 2 3 4 t 5 6 7 8 p q 1 3 2 4 5 7 6 8 Corresponding angle postulate If two parallel lines are cut by a transversal, then the pairs of corresponding angles are congruent. CONFIDENTIAL
A) m( ABC) C 800 x0 A B Using the Corresponding angle postulate Find each angle measure. corresponding angles x = 80 m( ABC) = 800 CONFIDENTIAL
(2x-45)0 D B) m( DEF) (x+30)0 E F corresponding angles (2x-45)0 = (x+30)0 subtract x from both sides x – 45 = 30 add 45 to both sides x = 75 m( DEF) = (x+30)0 = (75+30)0 = 1050 CONFIDENTIAL
1 2 1 3 2 4 4 3 Alternate interior angles theorem Theorem If two parallel lines are cut by a transversal, then the two pairs of Alternate interior angles are congruent. Hypothesis Conclusion CONFIDENTIAL
5 7 6 8 5 6 8 7 Alternate exterior angles theorem Theorem If two parallel lines are cut by a transversal, then the twopairs of Alternate exterior angles are congruent. Hypothesis Conclusion CONFIDENTIAL
1 2 4 3 m 1 + m 4 =1800 m 2 + m 3 =1800 Same-side interior angles theorem Theorem If two parallel lines are cut by a transversal, then the twopairs of Same-side interior angles are supplementary. Hypothesis Conclusion CONFIDENTIAL
1 2 l 3 Given: l || m Prove: 2 3 m l || m 1 3 2 3 Corresponding angles Given 2 1 Vertically opposite angles Alternate interior angles theorem Proof: CONFIDENTIAL
You did a great job today! CONFIDENTIAL