Holt McDougal Geometry 12-3-EXT Measuring Angles in Radians 12-3-EXT Measuring Angles in Radians Holt Geometry Lesson Presentation Lesson Presentation.

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Presentation transcript:

Holt McDougal Geometry 12-3-EXT Measuring Angles in Radians 12-3-EXT Measuring Angles in Radians Holt Geometry Lesson Presentation Lesson Presentation Holt McDougal Geometry

12-3-EXT Measuring Angles in Radians Use proportions to convert angle measures from degrees to radians. Objectives

Holt McDougal Geometry 12-3-EXT Measuring Angles in Radians radian Vocabulary

Holt McDougal Geometry 12-3-EXT Measuring Angles in Radians One unit of measurement for angles is degrees, which are based on a fraction of a circle. Another unit is called a radian, which is based on the relationship of the radius and arc length of a central angle in a circle. Four concentric circles are shown, with radius 1, 2, 3, and 4. The measure of each arc is 60°.

Holt McDougal Geometry 12-3-EXT Measuring Angles in Radians The relationship between the radius and arc length is linear, with a slope of 2π =, or about The slope represents the ratio of the arc length to the radius. This ratio is the radian measure of the angle, so 60° is the same as radians. 60° 360° π 3 π 3

Holt McDougal Geometry 12-3-EXT Measuring Angles in Radians If a central angle θ in a circle of radius r intercepts an arc of length r, the measure of θ is defined as 1 radian. Since the circumference of a circle of radius r is 2πr, an angle representing one complete rotation measures 2π radians, or 360°. 2π radians = 360° and π radians = 180° 1° = π radians 180° and 1 radian = 180° π radians Use these facts to convert between radians and degrees.

Holt McDougal Geometry 12-3-EXT Measuring Angles in Radians

Holt McDougal Geometry 12-3-EXT Measuring Angles in Radians Arc length is the distance along an arc measured in linear units. In a circle of radius r, the length of an arc with a central angle measure m is L = 2πr Remember! m° 360°

Holt McDougal Geometry 12-3-EXT Measuring Angles in Radians Convert each measure from degrees to radians. Example 1: Converting Degrees to Radians A. 85° 17 85° π radians 180° 36 = 17 π 36 A. 90° 1 90° π radians 180° 2 = π 2

Holt McDougal Geometry 12-3-EXT Measuring Angles in Radians Because the radian measure of an angle is related to arc length, the most commonly used angle measures are usually written as fractional multiples of π. Helpful Hint

Holt McDougal Geometry 12-3-EXT Measuring Angles in Radians Check It Out! Example 1 Convert each measure from degrees to radians. A. –36° ° π radians 180° 5 = - π 5 B. 270° 3 270° π radians 180° 2 = 3π 2

Holt McDougal Geometry 12-3-EXT Measuring Angles in Radians Convert each measure from radians to degrees. Example 2: Converting Radians to Degrees 2π2π 3 A. 2 π 1 3 radians ° Π radians = 120° π 6 B. π 1 6 radians ° Π radians = 30°

Holt McDougal Geometry 12-3-EXT Measuring Angles in Radians Check It Out! Example 2 Convert each measure from radians to degrees. 5π5π 6 A. 5 π 1 6 radians ° Π radians = 150° 3π3π 4 B. - 3 π 1 4 radians ° Π radians = -135° -