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Download Introduction to Proof: Part I Types of Angles
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Transcript
Introduction to Proof: During this lesson, we will: Identify angles as adjacent or vertical Identify supplementary and complementary angles and find their measures Mrs. McConaughy Geometry 1 Introduction to Proof: Part I Types of Angles Mrs. McConaughy Geometry 2 Review: Classifying Angles By Their Measures Recall, the degree measure, m, of an angle must be 0 > m ≥ 180. Angles can be classified into four categories by their measures: Acute Obtuse Right Straight Mrs. McConaughy Geometry 3 Classifying Angles By Their Position With Respect to Each Other two coplanar angles Adjacent angles :_________________ ______________________________ with a common side, a common vertex, and no common interior points ______________________________ Which angles are adjacent to one another? 1 2 2 4 6 5 7 8 Mrs. McConaughy Geometry 4 Classifying Angles By Their Position With Respect to Each Other nonadjacent angles Vertical angles: _________________ formed by intersecting lines. Vertical ______________________________ angles share a common vertex and ______________________________ have sides which are opposite rays. ______________________________ Which angles form vertical angle pairs? 1 4 2 3 3 Mrs. McConaughy 5 7 Geometry 9 5 Introduction to Proof: Part II Complementary & Supplementary Angles During this lesson, you will: identify supplementary and complementary angles determine the measures of supplementary and complementary angles Mrs. McConaughy Geometry 6 Definitions: Supplementary Angles and Linear Pairs Two angles are supplementary if the sum of their measures is 180 degrees. Each angle is called a supplement of the other. If the angles are adjacent and supplementary, they are called a linear pair. Mrs. McConaughy Geometry 7 Alert!Supplementary Supplementary angles do not have to be Angles and adjacent. If they are adjacent, then the sides Linear Pairs of the two angles whichm< are not PQS + mthe <SQRcommon = 180 < PQS and < SQR are a linear pair side form a straight angle. 1 2 m < 1 + m < 2 = 180 < 1 supplements < 2 < 1 is a supplement of < 2 Mrs. McConaughy m< GHJ + m <JHI = 180 Geometry 8 < GHJ and < JHI are a linear pair Example 1 Which are measures of supplementary angles? 30 ° and 160° 103° and 67° 86° and 94° 86° and 94° 180 Mrs. McConaughy Geometry 9 Definition: Complementary Angles Complementary angles are related to right angles. Definition: Complementary Angles Mrs. McConaughy Two angles are complementary if the sum of their measures is 90 degrees. Each angle is called a complement of the other. Geometry 10 Complementary angles do not have to be adjacent. Complementary Angles If they are adjacent, then the sides of the two angles which are not the common side form a right angle. Mrs. McConaughy Geometry 11 Example 2 Find the measure of a complement of each angle, if possible. Find the measure of a supplement. Angle Measure Complement 90 Supplement 180 90 - m 180 - m ?? 60° 95° m° Mrs. McConaughy Geometry 12 Example 3 Find the measure of an angle if its measure is 60° more than its supplement. m = 180 – m + 60 Alert! We will use the m, 90 - m, and 180 – m to solve problems about angles. Mrs. McConaughy Geometry 13 Example 4 Find the measure of an angle if its measure is twice that of its supplement. Mrs. McConaughy Geometry 14 Example 5 Find the measure of an angle if its measure is 40 less than four times the measure of its complement. measure is 40 less than four times the measure of its complement. m = 4 (90 – m) - Mrs. McConaughy 40 Geometry 15 Final Checks for Understanding Which are measures of complementary angles?…supplementary angles? ...neither? 1. 60° & 30° 2. 130° & 50° 3. 114° & 66° 4. 92° & 2° 5. 53° & 47° 6. 87° & 87° 7. 45° & 45° 8. 26° & 154° Mrs. McConaughy Geometry 16 Final Checks for Understanding What is the measure of a complement of each angle whose measure is given? 1. 45° 2. 20° Mrs. McConaughy 3. 78° 4. 46° Geometry 5. 22.5 6. (m-5)° 17 Final Checks for Understanding Translate words mathematical symbols Complementary Supplementary ___________________ __________________ “a more than b” _______________________ Mrs. McConaughy “a less than b” _______________________ Geometry 18 Homework Complementary & Supplementary Angles WS Mrs. McConaughy Geometry 19
