This week we learned how to find the radius, area, central angle, and arc length of a sector of a circle given at least two of the measurements. Here are the formulas you will need. These formulas are only for measurements in radians.
K = area of the sector
r = radius
s = the arc length
Θ = the central angle
for
K = 1/2(r^2)Θ
K = 1/2(r)(s)
s = rΘ
Ex. 1
A sector of a circle has arc length 11 cm and central angle 2.2 radians. Find its radius and area.
- First of all, identify what you have.
s = 11
Θ = 2.2 - Then, you can use a formula to find the radius and area. Use the formula where you only have one unknown variable.
You wouldn't use K = 1/2(r^2)Θ or K = 1/2(r)(s) because both the area and radius are unknown.
Instead, you would use s = rΘ.
In trig, you should always solve the formula for the variable you are looking for before plugging into the formula, so the formula becomes r = s/Θ. - Plugging into this formula, r = 11/2.2 = 5.
- To find the area, you could use either K = 1/2(r^2)Θ or K = 1/2(r)(s).
K = 1/2(5^2)2.2 = 27.5
or
K = 1/2(5)(11) = 27.5 - Your answers would be r = 5 and K = 27.5
If the problem asks for apparent size, you should automatically assume to use the formula s = rΘ, where r = distance between two objects, Θ = apparent size, and s = diameter of an object.
Ex. 2
The diameter of the moon is about 3500 km. Its apparent size is about 0.0087 radians. About how far is it from Earth?
- Identify what's given.
s = 3500
Θ = .0087
r = ??
s = rΘ - Plug into the formula.
3500 = r( .0087)
r = 402298.8506 - It is about 402298.8506 km from the Earth.
I need that picture!!
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