What Is The Measure Of An Arc With A Central Angle Of $120^{\circ}$?1) $240^{\circ}$2) $ Π ∘ \pi^{\circ} Π ∘ [/tex]3) $60^{\circ}$4) $120^{\circ}$

Introduction

In geometry, an arc is a portion of a circle's circumference. The measure of an arc is directly related to the central angle that subtends it. A central angle is an angle formed by two radii that intersect at the center of a circle. In this article, we will explore the relationship between arc measures and central angles, and use this knowledge to determine the measure of an arc with a given central angle.

What is an Arc Measure?

An arc measure is the length of an arc as a fraction of the total circumference of the circle. It is usually expressed in degrees, with a full circle measuring 360 degrees. The arc measure is also known as the arc length or the central angle measure.

Relationship Between Arc Measures and Central Angles

The relationship between arc measures and central angles is based on the fact that the arc measure is directly proportional to the central angle. This means that if the central angle is increased, the arc measure will also increase proportionally.

The Formula for Arc Measures

The formula for arc measures is:

Arc measure = (central angle / 360) × 2πr

Where:

• Arc measure is the length of the arc
• Central angle is the angle formed by the two radii
• r is the radius of the circle
• π is a mathematical constant approximately equal to 3.14

Example: Finding the Measure of an Arc with a Central Angle of $120^{\circ}$

Now that we have a basic understanding of arc measures and central angles, let's apply this knowledge to find the measure of an arc with a central angle of $120^{\circ}$.

Using the formula for arc measures, we can plug in the values as follows:

Arc measure = (120 / 360) × 2πr

Simplifying the equation, we get:

Arc measure = (1/3) × 2πr

Since we are not given the value of the radius, we will assume a radius of 1 unit for simplicity. This means that the arc measure will be:

Arc measure = (1/3) × 2π(1)

Arc measure = (2/3)π

Evaluating the Answer Choices

Now that we have found the measure of the arc with a central angle of $120^{\circ}$, let's evaluate the answer choices:

1. $$240^{\circ}$$

2. $$\pi^{\circ}$$

3. $$60^{\circ}$$

4. $$120^{\circ}$$

Based on our calculation, the correct answer is:

• $$\pi^{\circ}$$

This is because the arc measure is equal to (2/3)π, which is approximately 2.09 radians or 120 degrees.

Conclusion

In conclusion, the measure of an arc with a central angle of $120^{\circ}$ is $\pi^{\circ}$. This is because the arc measure is directly proportional to the central angle, and the formula for arc measures can be used to find the length of the arc. By applying this formula and simplifying the equation, we can find the measure of the arc with a given central angle.

Key Takeaways

• The measure of an arc is directly related to the central angle that subtends it.
• The formula for arc measures is: Arc measure = (central angle / 360) × 2πr
• The arc measure is directly proportional to the central angle.
• The measure of an arc with a central angle of $120^{\circ}$ is $\pi^{\circ}$.

Frequently Asked Questions

• Q: What is the relationship between arc measures and central angles? A: The arc measure is directly proportional to the central angle.
• Q: How do I find the measure of an arc with a given central angle? A: Use the formula for arc measures: Arc measure = (central angle / 360) × 2πr
• Q: What is the measure of an arc with a central angle of $120^\circ}$? A The measure of the arc with a central angle of $120^{\circ$ is $\pi^{\circ}$.
  Frequently Asked Questions: Arc Measures and Central Angles ===========================================================

Q: What is the relationship between arc measures and central angles?

A: The arc measure is directly proportional to the central angle. This means that if the central angle is increased, the arc measure will also increase proportionally.

Q: How do I find the measure of an arc with a given central angle?

A: To find the measure of an arc with a given central angle, you can use the formula for arc measures:

Arc measure = (central angle / 360) × 2πr

Where:

• Arc measure is the length of the arc
• Central angle is the angle formed by the two radii
• r is the radius of the circle
• π is a mathematical constant approximately equal to 3.14

Q: What is the measure of an arc with a central angle of $120^{\circ}$?

A: The measure of the arc with a central angle of $120^{\circ}$ is $\pi^{\circ}$. This is because the arc measure is directly proportional to the central angle, and the formula for arc measures can be used to find the length of the arc.

Q: How do I convert an arc measure from degrees to radians?

A: To convert an arc measure from degrees to radians, you can use the following formula:

Radian measure = (degree measure × π) / 180

Where:

• Radian measure is the length of the arc in radians
• Degree measure is the length of the arc in degrees
• π is a mathematical constant approximately equal to 3.14

Q: What is the relationship between the arc measure and the circumference of a circle?

A: The arc measure is directly proportional to the circumference of a circle. This means that if the circumference of the circle is increased, the arc measure will also increase proportionally.

Q: How do I find the circumference of a circle with a given radius?

A: To find the circumference of a circle with a given radius, you can use the following formula:

Circumference = 2πr

Where:

• Circumference is the length of the circle's circumference
• r is the radius of the circle
• π is a mathematical constant approximately equal to 3.14

Q: What is the difference between an arc measure and a central angle?

A: An arc measure is the length of an arc as a fraction of the total circumference of the circle, while a central angle is the angle formed by two radii that intersect at the center of a circle.

Q: How do I find the measure of a central angle with a given arc measure?

A: To find the measure of a central angle with a given arc measure, you can use the following formula:

Central angle = (arc measure / circumference) × 360

Where:

• Central angle is the angle formed by the two radii
• Arc measure is the length of the arc
• Circumference is the length of the circle's circumference

Q: What is the relationship between the arc measure and the radius of a circle?

A: The arc measure is directly proportional to the radius of a circle. This means that if the radius of the circle is increased, the arc measure will also increase proportionally.

Q: How do I find the radius of a circle with a given arc measure?

A: To find the radius of a circle with a given arc measure, you can use the following formula:

Radius = (arc measure / 2π) × 360

Where:

• Radius is the length of the radius
• Arc measure is the length of the arc
• π is a mathematical constant approximately equal to 3.14

Conclusion

In conclusion, the relationship between arc measures and central angles is a fundamental concept in geometry. By understanding this relationship, you can use the formula for arc measures to find the length of an arc with a given central angle. Additionally, you can use the formulas for converting between degrees and radians, and for finding the circumference and radius of a circle, to solve a variety of problems involving arc measures and central angles.