Question

suppose we have a circle with a diameter of 14 units. after measuring, we find that the circumference of the circle is approximately 43.96 units. what is the relationship between the two parts of the circle? move the answer choices to the correct places. to find the relationship between these two parts of the circle, we divide the by the the result indicates that the circumference is approximately times the diameter. this constant value is known as

Explanation:

Step1: Recall circle - related formula

The formula for the circumference of a circle is $C=\pi d$, where $C$ is the circumference and $d$ is the diameter. To find the relationship between the circumference and the diameter, we divide the circumference by the diameter.

Step2: Calculate the ratio

We know that $C = 43.96$ units and $d=14$ units. When we divide $C$ by $d$, we get $\frac{C}{d}=\frac{43.96}{14}=3.14$. This value is $\pi$.

Answer:

To find the relationship between these two parts of the circle, we divide the circumference by the diameter. The result indicates that the circumference is approximately 3.14 times the diameter. This constant value is known as pi ($\pi$).