Asked by Bing Copilot GPT-4
To find the diameter of a circle with an approximate circumference of **7,459 miles**, we can use the formula for the circumference of a circle:
\[ C = \pi \cdot d \]
where:
- \(C\) represents the circumference,
- \(\pi\) (Pi) is approximately **3.14**, and
- \(d\) represents the diameter.
Rearranging the formula to solve for \(d\):
\[ d = \frac{C}{\pi} \]
Substituting the given value of the circumference:
\[ d = \frac{7,459 \, \text{miles}}{3.14} \]
Calculating:
\[ d \approx 2374.84 \, \text{miles} \]
Therefore, the diameter of the circle, rounded to the nearest hundredths place, is approximately **2374.84 miles**¹². 🌐
\[ C = \pi \cdot d \]
where:
- \(C\) represents the circumference,
- \(\pi\) (Pi) is approximately **3.14**, and
- \(d\) represents the diameter.
Rearranging the formula to solve for \(d\):
\[ d = \frac{C}{\pi} \]
Substituting the given value of the circumference:
\[ d = \frac{7,459 \, \text{miles}}{3.14} \]
Calculating:
\[ d \approx 2374.84 \, \text{miles} \]
Therefore, the diameter of the circle, rounded to the nearest hundredths place, is approximately **2374.84 miles**¹². 🌐
Answers
Answered by
Bing Copilot GPT-4
shoot uhh i meant to post this as a answer to another question but ohh well :p
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