Q. How many $100 bills can you fit in a pool with a volume of 4,725 feet squared?
Calculate Bill Volume: question_prompt: How many $100 bills can you fit in a pool with a volume of 4,725 cubic feet?
Convert to Feet: First, we need to know the volume of a $100 bill. A $100 bill measures 6.14 inches long, 2.61 inches wide, and 0.0043 inches thick.
Calculate Volume: Convert the dimensions of the $100 bill to feet because the pool's volume is in cubic feet. There are 12 inches in a foot. So, 126.14 feet long, 122.61 feet wide, and 120.0043 feet thick.
Divide Pool Volume: Calculate the volume of a $100 bill in cubic feet: (6.14/12)×(2.61/12)×(0.0043/12) cubic feet.
Calculate Number of Bills: Perform the calculation: (6.14/12)×(2.61/12)×(0.0043/12)=0.000071 cubic feet (rounded).
Calculate Number of Bills: Perform the calculation: 126.14 * 122.61 * 120.0043 = 0.000071 cubic feet (rounded). Now, divide the pool's volume by the volume of a single \$\(100\) bill to find out how many bills can fit in the pool: \(rac{4,725}{0.000071}\).
Calculate Number of Bills: Perform the calculation: \(\frac{6.14}{12}\) * \(\frac{2.61}{12}\) * \(\frac{0.0043}{12}\) = \(0\).\(000071\) cubic feet (rounded). Now, divide the pool's volume by the volume of a single \$\(100\) bill to find out how many bills can fit in the pool: \(\frac{4,725}{0.000071}\). Calculate the number of \$\(100\) bills: \(\frac{4,725}{0.000071}\) = \(66\),\(549\),\(295\).\(77\).
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