Question
What is the measure of central angle AOB to the nearest tenth of a degree?
An image shows a circle with central angle A O B. O is at the center of the circle. Points A and B are on the circumference of the circle making A O and B O radii of the circle. A B is an arc along the circumference of the circle and is labeled showing the arc length of A B is 9 centimeters. A O is labeled 5 centimeters.
The measure of <AOB
is approximately blank degrees.
An image shows a circle with central angle A O B. O is at the center of the circle. Points A and B are on the circumference of the circle making A O and B O radii of the circle. A B is an arc along the circumference of the circle and is labeled showing the arc length of A B is 9 centimeters. A O is labeled 5 centimeters.
The measure of <AOB
is approximately blank degrees.
Answers
Answered by
GPT-4o mini
To find the measure of central angle \( AOB \) in degrees, you can use the formula that relates arc length, radius, and central angle:
\[
\text{Arc Length} = r \cdot \theta
\]
where:
- \( \text{Arc Length} \) is the length of the arc (AB) in centimeters,
- \( r \) is the radius of the circle in centimeters,
- \( \theta \) is the central angle in radians.
Given:
- Arc Length \( = 9 \) cm
- Radius \( r = 5 \) cm
We can rearrange the formula to solve for \( \theta \):
\[
\theta = \frac{\text{Arc Length}}{r}
\]
Plugging in the values:
\[
\theta = \frac{9}{5} = 1.8 \text{ radians}
\]
Now, to convert radians to degrees, we use the conversion factor \( \frac{180}{\pi} \):
\[
\theta_{\text{degrees}} = \theta \times \frac{180}{\pi}
\]
Calculating this:
\[
\theta_{\text{degrees}} = 1.8 \times \frac{180}{\pi} \approx 1.8 \times 57.2958 \approx 103.1
\]
Therefore, the measure of central angle \( AOB \) is approximately **103.1 degrees**.
\[
\text{Arc Length} = r \cdot \theta
\]
where:
- \( \text{Arc Length} \) is the length of the arc (AB) in centimeters,
- \( r \) is the radius of the circle in centimeters,
- \( \theta \) is the central angle in radians.
Given:
- Arc Length \( = 9 \) cm
- Radius \( r = 5 \) cm
We can rearrange the formula to solve for \( \theta \):
\[
\theta = \frac{\text{Arc Length}}{r}
\]
Plugging in the values:
\[
\theta = \frac{9}{5} = 1.8 \text{ radians}
\]
Now, to convert radians to degrees, we use the conversion factor \( \frac{180}{\pi} \):
\[
\theta_{\text{degrees}} = \theta \times \frac{180}{\pi}
\]
Calculating this:
\[
\theta_{\text{degrees}} = 1.8 \times \frac{180}{\pi} \approx 1.8 \times 57.2958 \approx 103.1
\]
Therefore, the measure of central angle \( AOB \) is approximately **103.1 degrees**.