![Page 1: Arc Length and Area of a Sector Trigonometry MATH 103 S. Rook](https://reader036.vdocument.in/reader036/viewer/2022082712/56649ebc5503460f94bc4ffb/html5/thumbnails/1.jpg)
Arc Length and Area of a Sector
TrigonometryMATH 103
S. Rook
![Page 2: Arc Length and Area of a Sector Trigonometry MATH 103 S. Rook](https://reader036.vdocument.in/reader036/viewer/2022082712/56649ebc5503460f94bc4ffb/html5/thumbnails/2.jpg)
Overview
• Section 3.4 in the textbook:– Arc length– Area of a sector
2
![Page 3: Arc Length and Area of a Sector Trigonometry MATH 103 S. Rook](https://reader036.vdocument.in/reader036/viewer/2022082712/56649ebc5503460f94bc4ffb/html5/thumbnails/3.jpg)
Arc Length
![Page 4: Arc Length and Area of a Sector Trigonometry MATH 103 S. Rook](https://reader036.vdocument.in/reader036/viewer/2022082712/56649ebc5503460f94bc4ffb/html5/thumbnails/4.jpg)
Arc Length
• Recall that in Section 3.2 we derived a formula relating the central angle θ (in radians), radius r, and the arc of length s cut off by θ
• Like many formulas we can often solve for one variable in terms of the others
• Thus, we get a formula for arc length: 4
rs
r
s
![Page 5: Arc Length and Area of a Sector Trigonometry MATH 103 S. Rook](https://reader036.vdocument.in/reader036/viewer/2022082712/56649ebc5503460f94bc4ffb/html5/thumbnails/5.jpg)
Arc Length (Example)
Ex 1: θ is a central angle in a circle of radius r. Find the length of arc s cut off by θ:
a)
b) θ = 315°, r = 5 inches
5
cm 12,3
r
![Page 6: Arc Length and Area of a Sector Trigonometry MATH 103 S. Rook](https://reader036.vdocument.in/reader036/viewer/2022082712/56649ebc5503460f94bc4ffb/html5/thumbnails/6.jpg)
Arc Length (Example)
Ex 2: The minute hand of a circular clock is 8.4 inches long. How far does the tip of the minute hand travel in 10 minutes?
6
![Page 7: Arc Length and Area of a Sector Trigonometry MATH 103 S. Rook](https://reader036.vdocument.in/reader036/viewer/2022082712/56649ebc5503460f94bc4ffb/html5/thumbnails/7.jpg)
Arc Length (Example)
Ex 3: θ is a central angle in a circle that cuts off arc length s. Find the radius r of the circle:
θ = 150°, s = 5 km
7
![Page 8: Arc Length and Area of a Sector Trigonometry MATH 103 S. Rook](https://reader036.vdocument.in/reader036/viewer/2022082712/56649ebc5503460f94bc4ffb/html5/thumbnails/8.jpg)
Area of a Sector
![Page 9: Arc Length and Area of a Sector Trigonometry MATH 103 S. Rook](https://reader036.vdocument.in/reader036/viewer/2022082712/56649ebc5503460f94bc4ffb/html5/thumbnails/9.jpg)
Area of a Sector
• Sometimes we wish to know the area of the sector of a circle with central angle θ in radians and radius r– Let A be the area of this sector
• Using a part to whole proportion with area and arc length:
becomes which is the formula for Area of a Sector
9r
r
r
A
22 2
2
1rA
![Page 10: Arc Length and Area of a Sector Trigonometry MATH 103 S. Rook](https://reader036.vdocument.in/reader036/viewer/2022082712/56649ebc5503460f94bc4ffb/html5/thumbnails/10.jpg)
Area of a Sector (Example)
Ex 4: Find the area of the sector formed by central angle θ in a circle of radius r if:
a)
b) θ = 15°, r = 10 m
10
m 3,5
2 r
![Page 11: Arc Length and Area of a Sector Trigonometry MATH 103 S. Rook](https://reader036.vdocument.in/reader036/viewer/2022082712/56649ebc5503460f94bc4ffb/html5/thumbnails/11.jpg)
Area of a Sector (Example)
Ex 5: An automobile windshield wiper 6 inches long rotates through an angle of 45°. If the rubber part of the blade covers only the last 4 inches of the wiper, approximate the area of the windshield cleaned by the windshield wiper
11
![Page 12: Arc Length and Area of a Sector Trigonometry MATH 103 S. Rook](https://reader036.vdocument.in/reader036/viewer/2022082712/56649ebc5503460f94bc4ffb/html5/thumbnails/12.jpg)
Summary
• After studying these slides, you should be able to:– Calculate arc length– Calculate the area of a sector
• Additional Practice– See the list of suggested problems for 3.4
• Next lesson– Velocities (Section 3.5)
12