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Angles and Angle Measure

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Presentation on theme: "Angles and Angle Measure"β€” Presentation transcript:

1 Angles and Angle Measure

2 An angle on the coordinate plane is in standard position if the vertex is at the origin and one ray is on the positive π‘₯-axis. The ray on the π‘₯-axis is called the initial side. The ray that rotates about the center is called the terminal side.

3 If the measure of an angle is positive, the terminal side is rotated counterclockwise.
If the measure of an angle is negative, the terminal side is rotated clockwise.

4 Ex. 1 Draw an angle with the given measure in standard position. a
Ex. 1 Draw an angle with the given measure in standard position. a. 215Β° b. βˆ’40Β°

5 The terminal side of an angle can make more than one complete rotation.
For example, a complete rotation of 360Β° plus a rotation of 120Β° forms an angle that measures 360Β°+120Β° or 480Β°.

6 Ex. 2 Wakeboarding is a combination of surfing, skateboarding, snowboarding, and water skiing. One maneuver involves a 540-degree rotation in the air. Draw an angle in standard position that measure 540Β°.

7 Two or more angles in standard position with the same terminal side are called coterminal angles.
For example, angles that measure 60Β°, 420Β°, and βˆ’300Β° are coterminal. An angle that is coterminal with another angle can be found by adding or subtracting a multiple of 360Β° .

8 Ex. 3 Find an angle with a positive measure and an angle with a negative measure that are coterminal with each angle. 130Β° βˆ’200Β°

9 Angles can also be measured in units that are based on arc length.
One radian is the measure of an angle πœƒ in standard position with a terminal side that intercepts an arc with the same length as the radius of the circle.

10 The circumference of a circle is 2πœ‹π‘Ÿ.
One complete revolution around the circle equals 2πœ‹ radians. 2πœ‹ π‘Ÿπ‘Žπ‘‘π‘–π‘Žπ‘›π‘ =360Β° πœ‹ π‘Ÿπ‘Žπ‘‘π‘–π‘Žπ‘›π‘ =180Β° To convert from degrees to radians, multiply the number of degrees by πœ‹ π‘Ÿπ‘Žπ‘‘π‘–π‘Žπ‘›π‘  180Β° . To convert from radians to degrees, multiply the number of radians by 180Β° πœ‹ π‘Ÿπ‘Žπ‘‘π‘–π‘Žπ‘›π‘  .

11 Ex. 4 Rewrite the degree measure in radians and the radian measure in degrees.
βˆ’30Β° 5πœ‹ 2 120Β° βˆ’ 3πœ‹ 8

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