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Angular measurement Objectives Be able to define the radian. Be able to convert angles from degrees into radians and vice versa.

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Presentation on theme: "Angular measurement Objectives Be able to define the radian. Be able to convert angles from degrees into radians and vice versa."— Presentation transcript:

1 Angular measurement Objectives Be able to define the radian. Be able to convert angles from degrees into radians and vice versa.

2 Outcomes MUST ALL You MUST ALL be able to define the radian AND be able to convert degrees into radians and vice-versa. MOSTSHOULD MOST of you SHOULD Be able to understand the reasons for using radians AND be able to solve problems involving a mixture of degrees and radians. SOMECOULD SOME of you COULD be able to work out arc length.

3 Radians Radians are units for measuring angles. They can be used instead of degrees. r O 1 radian is the size of the angle formed at the centre of a circle by 2 radii which join the ends of an arc equal in length to the radius. r r x = 1 radian x = 1 rad. or 1 c

4 r O 2r r 2c2c If the arc is 2r, the angle is 2 radians. Radians

5 O If the arc is 3r, the angle is 3 radians. r 3r r 3c3c If the arc is 2r, the angle is 2 radians. Radians

6 O If the arc is 3r, the angle is 3 radians. If the arc is 2r, the angle is 2 radians. r r If the arc is r, the angle is radians. r Radians

7 O If the arc is 3r, the angle is 3 radians. r r If the arc is 2r, the angle is 2 radians. If the arc is r, the angle is radians. r Radians

8 If the arc is r, the angle is radians. O r r r But, r is half the circumference of the circle so the angle is Hence, Radians

9 We sometimes say the angle at the centre is subtended by the arc. Hence, r O r r x x = 1 radian Radians

10  Radians SUMMARY One radian is the size of the angle subtended by the arc of a circle equal to the radius 1 radian

11 Exercises 1. Write down the equivalent number of degrees for the following number of radians: Ans: (a) (b) (c) (d) 2. Write down, as a fraction of, the number of radians equal to the following: (a) (b) (c) (d) Ans: It is very useful to memorize these conversions

12 Extension Arc Length

13 Let the arc length be l. O r r l Consider a sector of a circle with angle. Then, whatever fraction is of the total angle at O,...... l is the same fraction of the circumference. So, ( In the diagram this is about one-third.) circumference

14 Examples 1. Find the arc length, l, of the sector of a circle of radius 7 cm. and sector angle 2 radians. Solution: where is in radians

15 2. Find the arc length, l, of the sector of a circle of radius 5 cm. and sector angle. Give exact answers in terms of. Solution: where is in radians rads. So, Examples

16  Radians An arc of a circle equal in length to the radius subtends an angle equal to 1 radian. 1 radian  For a sector of angle radians of a circle of radius r, the arc length, l, is given by SUMMARY

17 1. Find the arc length, l, of the sector shown. O 4 cm l 2. Find the arc length, l, of the sector of a circle of radius 8 cm. and sector angle. Give exact answers in terms of. Exercises

18 1. Solution: O 4 cm A l Exercises

19 2. Solution: rads. So, O 8 cm A l where is in radians Exercises

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