Difference between revisions of "Sector"
I like pie (talk | contribs) m (Removed unnecessary stuff) |
I like pie (talk | contribs) m |
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<div style="float:right"><asy>size(150); | <div style="float:right"><asy>size(150); | ||
− | real angle1=30, angle2= | + | real angle1=30, angle2=120; |
pair O=origin, A=dir(angle2), B=dir(angle1); | pair O=origin, A=dir(angle2), B=dir(angle1); | ||
path sector=O--B--arc(O,1,angle1,angle2)--A--cycle; | path sector=O--B--arc(O,1,angle1,angle2)--A--cycle; | ||
Line 7: | Line 7: | ||
D(A--O--B); | D(A--O--B); | ||
MP("O",D(O),SSW); | MP("O",D(O),SSW); | ||
− | MP("A",D(A), | + | MP("A",D(A),NW); |
MP("B",D(B),NE); | MP("B",D(B),NE); | ||
− | MP("\theta",(0. | + | MP("\theta",(0.05,0.075),N);</asy></div> |
− | A '''sector''' of a [[circle]] | + | A '''sector''' of a [[circle]] is a region bounded by two [[radius|radii]] of the circle and an [[arc]]. |
− | == Area == | + | If the [[central angle]] of the sector is <math>\pi</math> (or <math>180^{\circ}</math>), then the sector is a [[semicircle]]. |
− | The [[area]] of a sector is found by [[multiply]]ing the area of circle <math>O</math> by <math>\frac{\theta}{2\pi}</math>, where <math>\theta</math> is the | + | |
+ | ==Area== | ||
+ | The [[area]] of a sector is found by [[multiply]]ing the area of circle <math>O</math> by <math>\frac{\theta}{2\pi}</math>, where <math>\theta</math> is the central angle in radians. | ||
Therefore, the area of a sector is <math>\frac{r^2\theta}{2}</math>, where <math>r</math> is the radius and <math>\theta</math> is the central angle in radians. | Therefore, the area of a sector is <math>\frac{r^2\theta}{2}</math>, where <math>r</math> is the radius and <math>\theta</math> is the central angle in radians. |
Latest revision as of 20:12, 24 April 2008
A sector of a circle is a region bounded by two radii of the circle and an arc.
If the central angle of the sector is (or ), then the sector is a semicircle.
Area
The area of a sector is found by multiplying the area of circle by , where is the central angle in radians.
Therefore, the area of a sector is , where is the radius and is the central angle in radians.
Alternatively, if is in degrees, the area is .
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