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MATHPOWER TM 12, WESTERN EDITION 4.1.1 Chapter 4 Trigonometric Functions 4.1.

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Presentation on theme: "MATHPOWER TM 12, WESTERN EDITION 4.1.1 Chapter 4 Trigonometric Functions 4.1."— Presentation transcript:

1 MATHPOWER TM 12, WESTERN EDITION 4.1.1 Chapter 4 Trigonometric Functions 4.1

2 4.1.2 An angle is formed by rotating an initial arm about a fixed point. Angles in Standard Position - Definitions An angle is said to be in when the is on the and the is at Positive angles have a rotation. Negative angles have a rotation. A is the angle measured from the to the terminal arm. The principal angle is A is the angle measured from the to the terminal arm. The reference angle is are angles that share the

3 4.1.3 Sketching Angles in Standard Position Sketch the following angles in standard position. State the principal angle, the reference angle, and one positive and one negative coterminal angle. a) 150 0 b) -260 0 c) 560 0 Principal Angle Reference Angle Coterminal Angles Principal Angle Reference Angle Coterminal Angles Principal Angle Reference Angle Coterminal Angles

4 d) -220 0 Principal Angle Reference Angle Coterminal Angles  where n is an element of the integers. Sketching Angles in Standard Position To find all coterminal angles: 4.1.4

5 Radian Measure A is the measure of the angle at the centre of the circle subtended by an arc equal in length to the radius of the circle. r r r 2r2r r r 4.1.5 number of radians =

6 r Changing Degree Measure to Radian Measure 4.1.6 Therefore,

7 4.1.7 Changing Degree Measure to Radian Measure Calculate the radian measure: a) 210 0 b) 315 0

8 4.1.8 Changing Radian Measure to Degree Measure Calculate the degree measure: a) b) c) 1.68 rad To convert from radians to degrees, multiply by To convert from degrees to radians, multiply by

9 4.1.9 Finding the Sector Angle or the Arc Length Find the measure of the sector angle: 6.1 cm 5 cm Find the arc length: 8 cm 70 0 Convert 70 0 to radians: The arc length is cm. a

10 Angular Velocity Radians are often involved in applications involving angular speed. Angular speed is the rate at which the central angle is changing. Find the average angular speed of a wheel that is rotating 15 times in 3 s. Each time that the wheel rotates, it turns through a central angle of radians. Therefore, in rotations, the wheel has travelled radians. speed = The average angular speed is 4.1.10 speed =

11 Suggested Questions: Pages 189-191 1, 2, 3-71 odd, 74, 80, 81, 83 4.1.11

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