1 / 20

1-6 Measuring Angles

1-6 Measuring Angles. Objectives: Define and name angles, sides, and rays Use the Protractor Postulate for measuring angles Classify angles as acute, right, obtuse, or straight Use the Angle Addition Postulate

dalmar
Download Presentation

1-6 Measuring Angles

An Image/Link below is provided (as is) to download presentation Download Policy: Content on the Website is provided to you AS IS for your information and personal use and may not be sold / licensed / shared on other websites without getting consent from its author. Content is provided to you AS IS for your information and personal use only. Download presentation by click this link. While downloading, if for some reason you are not able to download a presentation, the publisher may have deleted the file from their server. During download, if you can't get a presentation, the file might be deleted by the publisher.

E N D

Presentation Transcript


  1. 1-6 Measuring Angles Objectives: • Define and name angles, sides, and rays • Use the Protractor Postulate for measuring angles • Classify angles as acute, right, obtuse, or straight • Use the Angle Addition Postulate • Define vertical angles, adjacent angles, complementary angles, and supplementary angles

  2. Angle, Sides, Vertex QBT 1 B TBQ An angle is a figure formed by two rays that have a common endpoint. The rays are the sides of the angle. (rays BT and BQ) The common endpoint is called the vertex of the angle (point B). When naming an angle with 3 letters, the vertex must be the middle letter. B Q 1 Names: T

  3. Naming angles X W 1 2 Y Z • What are two other names for ∠ 1? • ∠ XWY, ∠ YWX • Is ∠ W a good name for ∠ 1? • No, it would not be clear which angle ∠ W would be referring to.

  4. Interior and exterior exterior W Y Z interior A B An angle separates a plane into three parts: interior • the ______, which is the set of points • between the sides of the angle exterior 2) the ______, which is the set of points outside the angle angle itself 3) the _________ In the figure shown, point B and all other points in the blue region are in the interiorof the angle. Point A and all other points in the greenregion are in the exterior of the angle. Points Y, W, and Z are on the angle.

  5. Measuring Angles • We measure an angle using a protractor. • Determine the amount of rotation between the two sides of an angle. • For every angle, there is a unique positive number between 0 and 180 called the degree measure of the angle. • Special angles: • 0°, 90°, 180°, 360° • Simulation or hands-on for measuring angles: http://www.mathcasts.org/gg/student/angles/angles/angle_meas3.html

  6. Drawing an Angle with a Protractor 1) Draw AB 3) Locate and draw point C at the mark labeled 135. Draw AC. C A B Use a protractor to draw an angle having a measure of 135. 2) Place the center point of the protractor on A. Align the mark labeled 0 with the ray.

  7. Classifying Angles A A obtuse angle 90 < m A < 180 acute angle 0 < m A < 90 A right angle m A = 90 A straight angle m A = 180

  8. Congruent Angles 1 2 • Angles with the same measure m 1 = m 2 (the measure of angle 1 equals the measure of angle 2) • 1 ≅  2 (Angle 1 is congruent to angle 2) (May also be indicated by arc on both angles)

  9. Hands-on Measurement of Angles A B 2) Draw and label a point B in the interior of the angle. Then draw OB. O C 1) Draw an acute, an obtuse, or a right angle. Label the angle AOC. 45° 75° 30° • For each angle, find • mAOC • mCOB • mAOB.

  10. Angle Addition Postulate A B 45° 75° 30° O C • For any angle AOC, if B is in the interior of AOC, thenmAOB + mBOC = mAOC.

  11. Example • What is m∠TSW if m∠RST = 50 and m∠RSW = 125 ? T W 125° 50° R S • m∠RST +m∠TSW = m∠RSW • 50+m∠TSW = 125 • m∠TSW = 125 – 50 = 75

  12. Identifying Angle Pairs – Adjacent Angles J 2 common side R M 1 1 and 2 are adjacent with the same vertex R and N Adjacent (next to, joining) angles are angles that: A) share a common side B) have the same vertex C) have no interior points in common D) are coplanar

  13. Identifying Angle Pairs: Adjacent Angles B 2 1 1 2 G N L 1 The side of 1 is ____ J 2 The side of 2 is ____ Determine whether 1 and 2 are adjacent angles. No. They have a common vertex B, but _____________ no common side Yes. They have the same vertex G and a common side with no interior points in common. No. They do not have a common vertex nor ____________ a common side

  14. Identifying Angle Pairs: Vertical Angles • Vertical Angles Two angles are vertical if and only if they are two nonadjacent angles formed by a pair of intersecting lines. Vertical angles: 1 and 3 1 4 2 2 and 4 3 Vertical Angles

  15. Identifying Angle Pairs: Complementary Angles E D A 60° 30° F B C • Two angles are complementary if and only if the sum of their degree measures is 90. • Each angle is a complement of the other. (Angle B is the complement of angle E)

  16. Complementary Angles: Examples I 75° 15° H P Q 40° 50° H S U V 60° T 30° Z W Some examples of complementary angles are shown below. mH + mI = 90 mPHQ + mQHS = 90 Remember: Complementary angles can form a Corner (which measures 90°). mTZU + mVZW = 90

  17. Identifying Angle Pairs: Supplementary Angles D C 130° 50° E B F A Two angles are supplementary if and only if the sum of their degree measures is 180. mB+ mE = 50 + 130 = 180

  18. Supplementary Angles: Examples I 75° 105° H Q 130° 50° H S P U V 60° 120° 60° Z W T Some examples of supplementary angles are shown below. mH + mI = 180 mPHQ + mQHS = 180 Remember: Supplementary angles can form a linear pair or Straight line (which measures 180°) mTZU + mUZV = 180 and mTZU + mVZW = 180

  19. Linear Pair Q 130° 50° H S P • A pair of adjacent angles whose noncommon sides that form opposite rays • Hands-On: • On your paper, draw a linear pair • Measure each of the two angles and add the measures • Simulation: • http://www.geogebra.org/en/upload/files/english/Barbara_Perez/Linear_Angles.html

  20. Homework • Workbook 1-6 pp. 259-260

More Related