The water works commission needs to know the mean household usage of water by the residents of a small town in gallons per day. They would like the estimate to have a maximum error of 0.12 gallons. A previous study found that for an average family the variance is 5.29 gallons and the mean is 17 gallons per day. If they are using a \( 85 \% \) level of confidence, how large of a sample is required to estimate the mean usage of water? Round your answer up to the next integer.

To determine the required sample size for estimating the mean household water usage with a specific margin of error at a given confidence level, you can use the formula: \[ n = \left( \frac{Z \cdot \sigma}{E} \right)^2 \] Where: - \( n \) = required sample size - \( Z \) = Z-value for the desired confidence level (for \( 85\% \), \( Z \approx 1.44 \)) - \( \sigma \) = standard deviation (the square root of variance, so \( \sigma = \sqrt{5.29} \approx 2.3 \)) - \( E \) = maximum error (0.12 gallons) Now, substituting the values: \[ n = \left( \frac{1.44 \cdot 2.3}{0.12} \right)^2 \] \[ = \left( \frac{3.312}{0.12} \right)^2 \] \[ = (27.6)^2 \approx 761.76 \] Since you round up to the next integer, the required sample size is \( n = 762 \). Happy sampling! You're on your way to quench the thirst of statistical accuracy!