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Transcript
1.6-1.7 Angles and Their Measures Geometry Standard/Objectives: Performance Standard: Solve problems involving complementary, supplementary and congruent angles. Objectives: • Use angle postulates • Classify angles as acute, right, obtuse, or straight. Using Angle Postulates • An angle consists of two different rays that have the same initial point. The rays are the sides of the angle. The initial point is the vertex of the angle. • The angle that has sides AB and AC is denoted by BAC, CAB, A. The point A is vertex the vertex of the angle. C sides B A Ex.1: Naming Angles P • Name the angles in the figure: S SOLUTION: There are three different Q angles. R • PQS or SQP You should not name any of • SQR or RQS these angles as Q because • PQR or RQP all three angles have Q as their vertex. The name Q would not distinguish one angle from the others. more . . . • Angles that have the same measure are called congruent angles. For instance, BAC and DEF each have a measure of 50°, so they are congruent. D 50° E F Note – Geometry doesn’t use equal signs like Algebra MEASURES ARE EQUAL ANGLES ARE CONGRUENT mBAC = mDEF BAC DEF “is equal to” “is congruent to” Note that there is an m in front when you say equal to; whereas the congruency symbol ; you would say congruent to. (no m’s in front of the angle symbols). Interior/Exterior • A point is in the interior of an angle if it is between points that lie on each side of the angle. • A point is in the exterior of an angle if it is not on the angle or in its interior. E A D Postulate 4: Angle Addition Postulate • If P is in the interior of RST, then mRSP + mPST = mRST R P S T Classifying Angles • Angles are classified as acute, right, obtuse, and straight, according to their measures. Angles have measures greater than 0° and less than or equal to 180°. Solution: • Begin by plotting the points. Then use a protractor to measure each angle. Two angles are adjacent angles if they share a common vertex and side, but have no common interior points. 6 and 5 are also a linear pair m5 = 50˚. Note: • The measure of A is denoted by mA. The measure of an angle can be approximated using a protractor, using units called degrees(°). For instance, BAC has a measure of 50°, which can be written as mBAC = 50°. B A C Ex. 3: Classifying Angles in a Coordinate Plane • a. b. c. d. Plot the points L(-4,2), M(-1,-1), N(2,2), Q(4,1), and P(2,-4). Then measure and classify the following angles as acute, right, obtuse, or straight. LMN LMP NMQ LMQ Solution: • Begin by plotting the points. Then use a protractor to measure each angle.
