Question 13 of 14, Step 1 of 1 The electric cooperative needs to know the mean household usage of electricity by its non-commercial customers in kWh per day. Assume that the population standard deviation is 2.3 kWh . The mean electricity usage per family was found to be 15.3 kWh per day for a sample of 3611 families. Construct the \( 99 \% \) confidence interval for the mean usage of electricity. Round your answers to one decimal place.

To construct a 99% confidence interval for the mean usage of electricity, we can use the formula: \[ \text{Confidence Interval} = \bar{x} \pm z \left( \frac{\sigma}{\sqrt{n}} \right) \] Where: - \(\bar{x} = 15.3\) kWh (sample mean) - \(\sigma = 2.3\) kWh (population standard deviation) - \(n = 3611\) (sample size) - \(z\) is the z-value corresponding to a 99% confidence level (approximately 2.576). First, calculate the standard error (SE): \[ SE = \frac{\sigma}{\sqrt{n}} = \frac{2.3}{\sqrt{3611}} \approx 0.1218 \] Next, calculate the margin of error (ME): \[ ME = z \times SE \approx 2.576 \times 0.1218 \approx 0.3145 \] Finally, construct the confidence interval: \[ \text{Lower Limit} = \bar{x} - ME \approx 15.3 - 0.3145 \approx 14.9 \] \[ \text{Upper Limit} = \bar{x} + ME \approx 15.3 + 0.3145 \approx 15.6 \] Thus, the 99% confidence interval for the mean usage of electricity is approximately \( [14.9, 15.6] \) kWh per day.