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Intermediate Geometry : Plane Geometry

Study concepts, example questions & explanations for Intermediate Geometry

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Example Questions

Example Question #31 : How To Find The Angle Of A Sector

True or false: A $60^{\circ }$ sector of a circle comprises one third of the circle.

Possible Answers:

True

False

Correct answer:

False

Explanation:

A circle includes $360^{\circ }$ of angle measure, so a sector of measure $N^{\circ }$ is $\frac{N}{360}$ of the circle. Set N = 60 - the sector is

$\frac{60}{360} = \frac{1}{6}$

of the circle. The statement is false.

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Example Question #33 : How To Find The Angle Of A Sector

Inscribed angle 2

is the center of the above circle.

True, false, or undetermined: $m \angle ACB = 34 ^{\circ }$

Possible Answers:

False

True

Undetermined

Correct answer:

True

Explanation:

is the center of the circle, so $m \angle AOB$ is a central angle. $m \angle AOB = 68^{\circ }$ , so its intercepted arc $\overarc{AB}$ also has this measure.

$\angle ACB$ is an inscribed angle which intercepts $\overarc{AB}$ , so

$m \angle ACB = \frac{1}{2} m \overarc{AB}$

Substitute:

$m \angle ACB = \frac{1}{2} \cdot 68 ^{\circ } = 34 ^{\circ }$

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Example Question #1 : How To Find The Length Of A Chord

The radius of $\small \odot O$ is feet and $\small m\widehat{AB}=60^{\circ}$ . Find the length of chord $\small \overline{AB}$ .

Possible Answers:

$\small 6 \,ft.$

$\small 8\,ft.$

$\small 3\,ft.$

$\small 3\sqrt{3}\,ft.$

$\small 6\sqrt{2}\,ft.$

Correct answer:

$\small 6 \,ft.$

Explanation:

We begin by drawing in three radii: one to $\small A$ , one to $\small B$ , and one perpendicular to $\small \overline{AB}$ with endpoint $\small C$ on our circle.

We must also recall that our central angle $\small \angle AOB$ has a measure equal to its intercepted arc. Therefore, $\small m\angle AOB=60^\circ$ . Our perpendicular radius actually divides $\small \triangle AOB$ into two congruent triangles. Therefore, it also bisects our central angle, meaning that $\small m\angle AOC=m\angle COB=30^\circ$

Therefore, each of these triangles is a 30-60-90 triangle, meaning that each half of our chord is simply half the length of the hypotenuse (our radius which is 6). Therefore, each half is 3, and the entire chord is 6 feet.

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Example Question #2 : How To Find The Length Of A Chord

If a chord is units away from the center of a circle, and the radius is , what is the length of that chord?

Possible Answers:

9.234

9.798

4.5

Correct answer:

9.798

Explanation:

Draw a segment perpendicular to the chord from the center, and this line will bisect the chord. Setting up the Pythagorean Theorem with the radius as the hypotenuse and the distance as one of the legs, we solve for the other leg.

7^2-5^2=24 $\rightarrow \sqrt{24}=4.8989$

Since this leg is half of the chord, the total chord length is 2 times that, or 9.798.

2(4.8989)=9.798

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Example Question #1 : How To Find The Length Of A Chord

If a chord is units away from the center of a circle, and the radius is , what is the length of that chord?

Possible Answers:

Correct answer:

Explanation:

$10^2-6^2=64 \rightarrow \sqrt{64}=8$

Since this leg is half of the chord, the total chord length is 2 times that, or 16.

2(8)=16

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Example Question #131 : Circles

If a chord is 4.5 units away from the center of a circle, and the radius is , what is the length of that chord?

Possible Answers:

3.963

7.7

7.937

3.4

Correct answer:

7.937

Explanation:

$6^2-4.5^2=15.75 \rightarrow \sqrt{15.75}=3.9686$

Since this leg is half of the chord, the total chord length is 2 times that, or 7.937.

2(3.9686)=7.937

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Example Question #1 : How To Find The Length Of A Chord

If a chord is units away from the center of a circle, and the radius is 3.5 , what is the length of that chord?

Possible Answers:

1.803

7.212

3.606

Correct answer:

3.606

Explanation:

$3.5^2-3^2=3.25 \rightarrow \sqrt{3.25}=1.8027$

Since this leg is half of the chord, the total chord length is 2 times that, or 3.606.

2(1.8027)=3.606

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Example Question #1 : How To Find The Length Of A Chord

If a chord is units away from the center of a circle, and the radius is , what is the length of that chord?

Possible Answers:

Correct answer:

Explanation:

$5^2-4^2=9 \rightarrow \sqrt{9}=3$

Since this leg is half of the chord, the total chord length is 2 times that, or 6.

2(3)=6

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Example Question #4 : How To Find The Length Of A Chord

If a chord is units away from the center of a circle, and the radius is , what is the length of that chord?

Possible Answers:

26.44

6.678

13.266

Correct answer:

13.266

Explanation:

$12^2-10^2=44 \rightarrow \sqrt{44}=6.6332$

Since this leg is half of the chord, the total chord length is 2 times that, or 13.266.

2(6.6332)=13.266

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Example Question #3 : Chords

If a chord is units away from the center of a circle, and the radius is , what is the length of that chord?

Possible Answers:

8.908

2.236

4.472

Correct answer:

4.472

Explanation:

$3^2-2^2=5 \rightarrow \sqrt{5}=2.2361$

Since this leg is half of the chord, the total chord length is 2 times that, or 4.472.

2(2.2361)=4.472

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Intermediate Geometry : Plane Geometry

Study concepts, example questions & explanations for Intermediate Geometry

All Intermediate Geometry Resources

Example Questions

Example Question #31 : How To Find The Angle Of A Sector

Example Question #33 : How To Find The Angle Of A Sector

Example Question #1 : How To Find The Length Of A Chord

Example Question #2 : How To Find The Length Of A Chord

Example Question #1 : How To Find The Length Of A Chord

Example Question #131 : Circles

Example Question #1 : How To Find The Length Of A Chord

Example Question #1 : How To Find The Length Of A Chord

Example Question #4 : How To Find The Length Of A Chord

Example Question #3 : Chords

All Intermediate Geometry Resources

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