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Example Questions
Example Question #1 : How To Find The Angle Of A Sector
A pie has a diameter of 12". A piece is cut out, having a surface area of 4.5π. What is the angle of the cut?
4.5°
25°
12.5°
45°
90°
45°
This is simply a matter of percentages. We first have to figure out what percentage of the surface area is represented by 4.5π. To do that, we must calculate the total surface area. If the diameter is 12, the radius is 6. Don't be tricked by this!
A = π * 6 * 6 = 36π
Now, 4.5π is 4.5π/36π percentage or 0.125 (= 12.5%)
To figure out the angle, we must take that percentage of 360°:
0.125 * 360 = 45°
Example Question #271 : Geometry
Eric is riding a Ferris wheel. The Ferris wheel has 18 compartments, numbered in order clockwise. If compartment 1 is at 0 degrees and Eric enters compartment 13, what angle is he at?
180
300
260
280
240
240
12 compartments further means 240 more degrees. 240 is the answer.
360/12 = 240 degrees
Example Question #1 : How To Find The Angle Of A Sector
In the figure above that includes Circle O, the measure of angle BAC is equal to 35 degrees, the measure of angle FBD is equal to 40 degrees, and the measure of arc AD is twice the measure of arc AB. Which of the following is the measure of angle CEF? The figure is not necessarily drawn to scale, and the red numbers are used to mark the angles, not represent angle measures.
The measure of angle CEF is going to be equal to half of the difference between the measures two arcs that it intercepts, namely arcs AD and CD.
Thus, we need to find the measure of arcs AD and CD. Let's look at the information given and determine how it can help us figure out the measures of arcs AD and CD.
Angle BAC is an inscribed angle, which means that its meausre is one-half of the measure of the arc that it incercepts, which is arc BC.
Thus, since angle BAC is 35 degrees, the measure of arc BC must be 70 degrees.
We can use a similar strategy to find the measure of arc CD, which is the arc intercepted by the inscribed angle FBD.
Because angle FBD has a measure of 40 degrees, the measure of arc CD must be 80 degrees.
We have the measures of arcs BC and CD. But we still need the measure of arc AD. We can use the last piece of information given, along with our knowledge about the sum of the arcs of a circle, to determine the measure of arc AD.
We are told that the measure of arc AD is twice the measure of arc AB. We also know that the sum of the measures of arcs AD, AB, CD, and BC must be 360 degrees, because there are 360 degrees in a full circle.
Because AD = 2AB, we can substitute 2AB for AD.
This means the measure of arc AB is 70 degrees, and the measure of arc AD is 2(70) = 140 degrees.
Now, we have all the information we need to find the measure of angle CEF, which is equal to half the difference between the measure of arcs AD and CD.
Example Question #2 : How To Find The Angle Of A Sector
The length of an arc, , of a circle is and the radius, , of the circle is . What is the measure in degrees of the central angle, , formed by the arc ?
The circumference of the circle is .
The length of the arc S is .
A ratio can be established:
Solving for yields 90o.
Note: This makes sense. Since the arc S was one-fourth the circumference of the circle, the central angle formed by arc S should be one-fourth the total degrees of a circle.
Example Question #21 : Circles
In the circle above, the length of arc BC is 100 degrees, and the segment AC is a diameter. What is the measure of angle ADB in degrees?
90
100
cannot be determined
40
80
40
Since we know that segment AC is a diameter, this means that the length of the arc ABC must be 180 degrees. This means that the length of the arc AB must be 80 degrees.
Since angle ADB is an inscribed angle, its measure is equal to half of the measure of the angle of the arc that it intercepts. This means that the measure of the angle is half of 80 degrees, or 40 degrees.
Example Question #2 : How To Find The Angle Of A Sector
What is the angle of a sector of area on a circle having a radius of ?
To begin, you should compute the complete area of the circle:
For your data, this is:
Now, to find the angle measure of a sector, you find what portion of the circle the sector is. Here, it is:
Now, multiply this by the total degrees in a circle:
Rounded, this is .
Example Question #1 : How To Find The Angle Of A Sector
What is the angle of a sector that has an arc length of on a circle of diameter ?
The first thing to do for this problem is to compute the total circumference of the circle. Notice that you were given the diameter. The proper equation is therefore:
For your data, this means,
Now, to compute the angle, note that you have a percentage of the total circumference, based upon your arc length:
Rounded to the nearest hundredth, this is .
Example Question #6 : How To Find The Angle Of A Sector
Figure NOT drawn to scale.
Refer to the above diagram. is a semicircle. Evaluate .
Insufficient information is given to answer the question.
An inscribed angle of a circle that intercepts a semicircle is a right angle; therefore, , which intercepts the semicircle , is such an angle. Consequently, , and is a right triangle. The acute angles of are complementary, so
The measure of inscribed is
.
An inscribed angle of a circle intercepts an arc of twice its degree measure, so
.
Example Question #271 : Sat Mathematics
Figure NOT drawn to scale
Refer to the above figure. is a diameter of the circle. Evaluate .
is a diameter, so is a semicircle, and
,
or, equivalently,
In terms of , since ,
and , being a secant segment and a tangent segment to a circle, respectively, intercept two arcs such that the measure of the angle that the segments form is equal to one-half the difference of the measures of the intercepted arcs - that is,
Setting , , and :
Example Question #31 : Circles
Refer to the above diagram. Evaluate the measure of .
The total measure of the arcs that comprise a circle is , so from the above diagram,
Substituting the appropriate expression for each arc measure:
Therefore,
and
The measure of the angle formed by the tangent segments and , which is , is half the difference of the measures of the arcs they intercept, so
Substituting:
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