Students are often confused by the fact that the arcs of a circle are capable of being measured in more than one way. The best way to avoid that confusion is to remember that arcs possess two properties. They have length as a portion of the circumference, but they also have a measurable curvature, based upon the corresponding central angle.
Arc length
As mentioned earlier in this section, an
arc can be measured either in degrees or in unit length. In Figure
1 ,
l
is a connected portion of the circumference of the circle.
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Figure 1
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Determining arc length.
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The portion is determined by the size of its corresponding central angle. A proportion will be created that compares a portion of the circle to the whole circle first in degree measure and then in unit length.
With the use of this proportion,
l
can now be found. In Figure
1 , the measure of the central angle = 120°, circumference = 2π
r, and
r = 6 inches.
Reduce 120°/360° to ⅓.
Example 1: In Figure
2 ,
l
= 8π inches. The radius of the circle is 16 inches. Find
m ∠
AOB.
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Figure 2
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Using the arc length and the radius to find the measure of the associated central angle.
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Reduce 8π/32π to ¼.
So,
m ∠
AOB = 90°
Sector of a circle
A
sector of a circle is a region bounded by two radii and an arc of the circle.
In Figure
3 ,
OACB is a sector.
is the arc of sector
OACB. OADB is also a sector.
is the arc of sector
OADB. The area of a sector is a portion of the entire area of the circle. This can be expressed as a proportion.
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Figure 3
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A sector of a circle.
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Example 2: In Figure
4 , find the area of sector
OACB.
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Figure 4
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Finding the area of a sector of a circle.
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Example 3: In Figure
5 , find the area of sector
RQTS.
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Figure 5
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Finding the area of a sector of a circle.
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The radius of this circle is 36 ft, so the area of the circle is π(36)2 or 1296π ft2. Therefore,
Reduce120/360 to ⅓.
Fundamental Ideas
Circles
