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High School Math : Sectors

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Example Question #1 : Circles

A sector comprises 20% of a circle. What is the central angle of the sector?

Possible Answers:

Correct answer:

Explanation:

Proporations can be used to solve for the central angle. Let equal the angle of the sector.

$\frac{20}{100}=\frac{x}{360}$

Cross mulitply:

7200=100x

Solve for :

$\frac{7200}{100}=\frac{100x}{100}$

72=x

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Example Question #2 : Circles

Arcs

$m \angle AXC = 135^{\circ }$ ; $arc\ \widehat{AB} = 24^{\circ }$ ; $arc\ \widehat{AC} = 94^{\circ }$

Find the degree measure of $arc\ \widehat{CD}$ .

Possible Answers:

$132^{\circ }$

Not enough information is given to answer this question.

$66^{\circ }$

$82^{\circ}$

$164^{\circ}$

Correct answer:

$66^{\circ }$

Explanation:

When two chords of a circle intersect, the measure of the angle they form is half the sum of the measures of the arcs they intercept. Therefore,

$m \angle AXB = \frac{m\; \widehat{AB} + m\; \widehat{CD} }{2}$

Since $\angle AXB$ and $\angle AXC$ form a linear pair, $m \angle AXB + m \angle AXC = 180$ , and $m \angle AXB = 180 - m \angle AXC = 180 - 135 = 45^{\circ }$ .

Substitute $m\; \widehat{AB} = 24$ and $m \angle AXB = 45$ into the first equation:

$45 = \frac{24 + m\; \widehat{CD} }{2}$

$90 =24 + m\; \widehat{CD}$

$66 = m\; \widehat{CD}$

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Example Question #251 : Plane Geometry

Two pizzas are made to the same dimensions. The only difference is that Pizza 1 is cut into pieces at 30° angles and Pizza 2 is cut at 45° angles. They are sold by the piece, the first for $1.95 per slice and the second for $2.25 per slice. What is the difference in total revenue between Pizza 2 and Pizza 1?

Possible Answers:

–$2.70

–$5.40

$5.40

$2.70

Correct answer:

–$5.40

Explanation:

First, let's calculate how many slices there are per pizza. This is done by dividing 360° by the respective slice degrees:

Pizza 1: 360/30 = 12 slices

Pizza 2: 360/45 = 8 slices

Now, the total amount made per pizza is calculated by multiplying the number of slices by the respective cost per slice:

Pizza 1: 12 * 1.95 = $23.40

Pizza 2: 8 * 2.25 = $18.00

The difference between Pizza 2 and Pizza 1 is thus represented by: 18 – 23.40 = –$5.40

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Example Question #3 : Circles

What percentage of a full circle is the following sector? (Round to the nearest tenth of a percent.)

Arch

Note: The figure is not drawn to scale.

Possible Answers:

$16.7\%$

$33.3\%$

$25\%$

$20\%$

$14.4\%$

Correct answer:

$16.7\%$

Explanation:

In order to find the percentage of a sector from an angle, you need to know that a full circle is $360^{\circ}$ .

Therefore, we can find the percentage by dividing the angle of the sector by $360^{\circ}$ and then multiplying by 100:

$Percentage = \frac{\measuredangle}{360^{\circ}}\cdot 100$

$Percentage = \frac{60^{\circ}}{360^{\circ}}\cdot 100=\frac{1}{6}\cdot 100=.1\bar{6}\cdot 100=16.7\%$

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Example Question #1 : Circles

A sector of a circle contains a center angle that is 36 degrees. What percentage of the circle is the sector?

Possible Answers:

$15\%$

$20\%$

$5\%$

$10\%$

Correct answer:

$10\%$

Explanation:

Proportions can be used to determine the percentage. Let equal the percentage comprised of the sector.

$\frac{36}{360}=\frac{x}{100}$

Cross multiply

3600=360x

Solve for x.

$\frac{3600}{360}=\frac{360x}{360}$

10=x

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Example Question #21 : Geometry

A circular, 8-slice pizza is placed in a square box that has dimensions four inches larger than the diameter of the pizza. If the box covers a surface area of 256 in², what is the surface area of one piece of pizza?

Possible Answers:

36π in²

144π in²

18π in²

9π in²

4.5π in²

Correct answer:

4.5π in²

Explanation:

The first thing to do is calculate the dimensions of the pizza box. Based on our data, we know 256 = s². Solving for s (by taking the square root of both sides), we get 16 = s (or s = 16).

Now, we know that the diameter of the pizza is four inches less than 16 inches. That is, it is 12 inches. Be careful! The area of the circle is given in terms of radius, which is half the diameter, or 6 inches. Therefore, the area of the pizza is π * 6² = 36π in². If the pizza is 8-slices, one slice is equal to 1/8 of the total pizza or (36π)/8 = 4.5π in².

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Example Question #3 : Sectors

If B is a circle with line AC = 12 and line BC = 16, then what is the area formed by DBE?

Possible Answers:

$5\pi$

$200$

$144$

$256\pi$

$100\pi$

Correct answer:

$100\pi$

Explanation:

Line AB is a radius of Circle B, which can be found using the Pythagorean Theorem:

$AB^2=AC^2+BC^2\rightarrow AB=\sqrt{AC^2+BC^2}=\sqrt{16^2+12^2}=\sqrt{400}=20$

Since AB is a radius of B, we can find the area of circle B via:

$Area=\pi R^2=\pi(20^2)=400\pi$

Angle DBE is a right angle, and therefore $\frac{1}{4}$ of the circle so it follows:

$Area(DBE)=\frac{400}{4}\pi=100\pi$

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Example Question #5 : Circles

To the nearest tenth, give the area of a $60^{\circ }$ sector of a circle with diameter 18 centimeters.

Possible Answers:

$84.8 \textrm{ cm}^{2}$

$254.5 \textrm{ cm}^{2}$

$42.4 \textrm{ cm}^{2}$

$21.2 \textrm{ cm}^{2}$

$169.6 \textrm{ cm}^{2}$

Correct answer:

$42.4 \textrm{ cm}^{2}$

Explanation:

The radius of a circle with diameter 18 centimeters is half that, or 9 centimeters. The area of a $60^{\circ }$ sector of the circle is

$A = \frac{60}{360 }\cdot \pi \cdot 9^{2} =\frac{1}{6} \cdot \pi \cdot 81 \approx 42.4 \textrm{ cm}^{2}$

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Example Question #6 : Circles

Find the area of a sector that has an angle of 120 degrees and radius of 3.

Possible Answers:

$9\Pi$

$3\Pi$

$\frac{1}{3}\Pi$

$12\Pi$

$27\Pi$

Correct answer:

$3\Pi$

Explanation:

The equation to find the area of a sector is $(\frac{x}{360})\Pi r^2$ .

Substitute the given radius in for and the given angle in for to get:

$(\frac{120}{360})\Pi (3^2)$

Simplify the equation to get the area:

$(\frac{1}{3})\Pi9=3\Pi$

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Example Question #1 : Circles

What is the area of the following sector of a full circle?

Arch

Note: Figure is not drawn to scale.

Possible Answers:

$10\pi m^2$

$23.5\pi m^2$

$21.5\pi m^2$

$27\pi m^2$

$13.5\pi m^2$

Correct answer:

$13.5\pi m^2$

Explanation:

In order to find the fraction of a sector from an angle, you need to know that a full circle is $360^{\circ}$ .

Therefore, we can find the fraction by dividing the angle of the sector by $360^{\circ}$ :

$Percentage = \frac{\measuredangle}{360^{\circ}}$

$Percentage = \frac{60^{\circ}}{360^{\circ}}=\frac{1}{6}$

The formula to find the area of a sector is:

$A=\pi (r^2)(fraction\ of\ whole\ circle)$

where is the radius of the circle.

Plugging in our values, we get:

$A=\pi (r^2)(fraction)$

$A=\pi (9m^2)\left(\frac{1}{6}\right)=13.5\pi m^2$

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High School Math : Sectors

Study concepts, example questions & explanations for High School Math

All High School Math Resources

Example Questions

Example Question #1 : Circles

Example Question #2 : Circles

Example Question #251 : Plane Geometry

Example Question #3 : Circles

Example Question #1 : Circles

Example Question #21 : Geometry

Example Question #3 : Sectors

Example Question #5 : Circles

Example Question #6 : Circles

Example Question #1 : Circles

All High School Math Resources

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