Find the area for circles

Elementary Geometry For College Students, 7e
7th Edition
ISBN:9781337614085
Author:Alexander, Daniel C.; Koeberlein, Geralyn M.
Publisher:Alexander, Daniel C.; Koeberlein, Geralyn M.
ChapterP: Preliminary Concepts
SectionP.CT: Test
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Find the area for circles
**Problem 6: Understanding Circle Measurements**

Given the following diagram:

[Insert Image of Circle Here]

In the diagram, we have a circle with a radius clearly marked as 15.6 cm. The radius is the distance from the center of the circle to any point on its perimeter. 

**Key Information:**
- **Radius (r):** 15.6 cm

**Explanation of Diagrams:**

The diagram consists of a simple circle with a line segment originating from the center and reaching out to the edge of the circle. This line segment represents the radius of the circle, which is labeled as "15.6 cm."

**Mathematical Context:**

1. **Circumference of the Circle (C):**
   To find the circumference, we use the formula:
   \[
   C = 2\pi r
   \]
   Plugging in the value of the radius:
   \[
   C = 2\pi(15.6 \text{ cm}) \approx 98.0 \text{ cm}
   \]

2. **Area of the Circle (A):**
   To find the area, we use the formula:
   \[
   A = \pi r^2
   \]
   Plugging in the value of the radius:
   \[
   A = \pi (15.6 \text{ cm})^2 \approx 764.5 \text{ cm}^2
   \]

Understanding these basic properties of circles is essential in geometry and is applicable in various real-life scenarios, such as designing wheels, clocks, and any other round shapes.
Transcribed Image Text:**Problem 6: Understanding Circle Measurements** Given the following diagram: [Insert Image of Circle Here] In the diagram, we have a circle with a radius clearly marked as 15.6 cm. The radius is the distance from the center of the circle to any point on its perimeter. **Key Information:** - **Radius (r):** 15.6 cm **Explanation of Diagrams:** The diagram consists of a simple circle with a line segment originating from the center and reaching out to the edge of the circle. This line segment represents the radius of the circle, which is labeled as "15.6 cm." **Mathematical Context:** 1. **Circumference of the Circle (C):** To find the circumference, we use the formula: \[ C = 2\pi r \] Plugging in the value of the radius: \[ C = 2\pi(15.6 \text{ cm}) \approx 98.0 \text{ cm} \] 2. **Area of the Circle (A):** To find the area, we use the formula: \[ A = \pi r^2 \] Plugging in the value of the radius: \[ A = \pi (15.6 \text{ cm})^2 \approx 764.5 \text{ cm}^2 \] Understanding these basic properties of circles is essential in geometry and is applicable in various real-life scenarios, such as designing wheels, clocks, and any other round shapes.
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