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1.6 Angle Pair Relationships What you should learn GOAL 1 Identify vertical angles and linear pairs. GOAL 2 Identify complementary and supplementary angles. Why you should learn it To solve real-life problems, such as finding the measures of angles formed by the cables of a bridge. 1.6 Angle Pair Relationships GOAL 1 VERTICAL ANGLES AND LINEAR PAIRS Vocabulary Two angles whose sides form two pairs of opposite rays vertical angles are called _____________. 4 1 3 2 Identify the pairs of vertical angles in the diagram. Click to check. 1 and 3 2 and 4 Two adjacent angles whose noncommon sides are opposite rays are called a _________. linear pair common side 5 6 noncommon sides 5 and 6 are a linear pair. EXAMPLE 1 Extra Example 1 2 1 3 5 4 a. Are 1 and 2 a linear pair? yes b. Are 4 and 5 a linear pair? no c. Are 5 and 3 vertical angles? no d. Are 1 and 3 vertical angles? yes Click to see the answers. EXAMPLE 2 Extra Example 2 In one town, Main Street and Columbus Avenue intersect to form an angle of 36°. Find the measures of the other three angles. Click to see a diagram. Columbus Avenue mX 144 mY 36 36° Main Street mZ 144 Click to see the answers. EXAMPLE 3 Extra Example 3 Solve for x and y. Then find the angle measures. M Click for a hint. L (4 x 15) P (5 x 30) N (3 y 15) (3 y 15) mLPM mNPM 180 and mLPO mNPO 180 Solve each equation to find x and y. Click for the answers. x 15, y 30 O mLPM mOPN 75 mMPN mLPO 105 Checkpoint 1. Name one pair of vertical angles and one pair of angles that form a linear pair. Click to see the answers. J I (5 x 30) K (2 x 4) H G Vertical angle pairs: IHJ and GHK ; JHK and GHI Linear pairs: IHJ and JHK ; JHK and KHG; KHG and GHI ; GHI and IHJ 2. What is the measure of GHI ? 140 1.6 Angle Pair Relationships GOAL 2 COMPLEMENTARY AND SUPPLEMENTARY ANGLES Vocabulary If the sum of the measures of two angles is 90°, the angles are ______________ complementary angles, and each is the ___________ of the other. complement 1 and 2 are now nonadjacent complementary angles. Note: Complementary angles 1 may or may not be adjacent. 2 If the sum of the measures of two angles is 180°, the supplementary angles, and each is the angles are _____________ ___________ supplement of the other. Note: Supplementary angles may or may not be adjacent. If 3 and 4 are adjacent and supplementary, they form a _________. linear pair 3 4 3 and 4 are now nonadjacent supplementary angles, and they no longer form a linear pair. EXAMPLE 4 Extra Example 4 State whether the two angles are complementary, supplementary, or neither. Click for the solution. 12 9 3 6 neither supplementary 12 9 3 neither 6 EXAMPLE 5 Extra Example 5 a. Given that G is a supplement of H , and mG is 82, find mH . mG mH 180 Click to see 82 mH 180 the solution. mH 98 b. Given that U is a complement of V , and mU is 73, find mV . mU mV 90 Click to see 73 mV 90 the solution. mV 17 EXAMPLE 6 Extra Example 6 T and S are supplementary. The measure of T is half Find S. mSClick . the measure of for a hint. 1 mT mS 180 and mT mS 2 Substitute and solve. Click for the solution. mT mS 180 1 mS mS 180 2 3 mS 180 2 mS 120 Checkpoint D and E are complements and D and F are supplements. If mE is four times mD, find the measure of each of the three angles. Click for a hint. mE 4(mD) and mE mD 90 Substitute and solve. Click for the answers. mD 18 mE 72 mF 162 QUESTIONS?
