m = 40° (The measure of a minor arc equals the measure of its corresponding central angle.)ī. If m ∠1 = 40°, find each of the following.įigure 8 A circle with two diameters and a (nondiameter) chord.Ī. Theorem 69: In a circle, if two minor arcs have equal measures, then their corresponding central angles have equal measures.Įxample 4: Figure 8 shows circle O with diameters AC and BD. Theorem 68: In a circle, if two central angles have equal measures, then their corresponding minor arcs have equal measures. The following theorems about arcs and central angles are easily proven. m = 310° ( is a major arc.) The degree measure of a major arc is 360° minus the degree measure of the minor arc that has the same endpoints as the major arc. m (The degree measure of a minor arc equals the measure of its corresponding central angle.)ĭ. Įxample 2: Use Figure 6 to find m ( m = 60°, m = 150°).įigure 6 Using the Arc Addition Postulate.Įxample 3: Use Figure of circle P with diameter QS to answer the following.įigure 7 Finding degree measures of arcs.Ī. Postulate 18 (Arc Addition Postulate): If B is a point on, then m + m = m. Since is a semicircle, its length is half of the circumference. įigure 5 Degree measure and arc length of a semicircle. In these examples, m indicates the degree measure of arc AB, l indicates the length of arc AB, and indicates the arc itself.Įxample 1: In Figure 5, circle O, with diameter AB has OB = 6 inches. Its unit length is a portion of the circumference and is always more than half of the circumference. Degree measure of a major arc: This is 360° minus the degree measure of the minor arc that has the same endpoints as the major arc.Its length is always less than half of the circumference. Its unit length is a portion of the circumference. Degree measure of a minor arc: Defined as the same as the measure of its corresponding central angle.Its unit length is half of the circumference of the circle. Degree measure of a semicircle: This is 180°. They are measured in degrees and in unit length as follows: is a semicircle.įigure 2 A diameter of a circle and a semicircle.Īrcs are measured in three different ways. The first and third are the endpoints, and the middle point is any point on the arc between the endpoints. Major arc: an arc that is more than a semicircle.A minor arc is named by using only the two endpoints of the arc. Minor arc: an arc that is less than a semicircle.The first and third points are the endpoints of the diameter, and the middle point is any point of the arc between the endpoints. Semicircle: an arc whose endpoints are the endpoints of a diameter.This symbol is written over the endpoints that form the arc. It consists of two endpoints and all the points on the circle between these endpoints. In Figure 1, ∠ AOB is a central angle.Īn arc of a circle is a continuous portion of the circle. It is the central angle's ability to sweep through an arc of 360 degrees that determines the number of degrees usually thought of as being contained by a circle.Ĭentral angles are angles formed by any two radii in a circle. Perhaps the one that most immediately comes to mind is the central angle. There are several different angles associated with circles. Summary of Coordinate Geometry Formulas.Slopes: Parallel and Perpendicular Lines.Similar Triangles: Perimeters and Areas.Proportional Parts of Similar Triangles. Formulas: Perimeter, Circumference, Area.Proving that Figures Are Parallelograms.Triangle Inequalities: Sides and Angles.Special Features of Isosceles Triangles.Classifying Triangles by Sides or Angles.Lines: Intersecting, Perpendicular, Parallel.
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