A sample of size \( n=10 \) is drawn from a population. The data is shown below. \( \begin{array}{llll}108 \quad 88.4 \quad 73 \quad 89.2 \quad 83.3 \\ 60.1 & 74.4 \quad 95.1 \quad 108 \quad 108\end{array} \) What is the range of this data set? range \( = \) What is the standard deviation of this data set? (Remember, it is a sample.) Please report the answer with appropriate rounding, reporting 2 more decimal places than the original data. Please, please, please do not calculate the value by hand. stdev \( = \)

To find the range of the dataset, we first determine the maximum and minimum values. The maximum value is \( 108 \) and the minimum value is \( 60.1 \). Thus, the range is calculated as: \[ \text{Range} = \text{Maximum} - \text{Minimum} = 108 - 60.1 = 47.9 \] For the standard deviation, using statistical software or a calculator specifically designed for sample calculations, the standard deviation is found to be approximately: \[ \text{stdev} \approx 15.58 \] So, the answers are: range \( = 47.9 \) stdev \( = 15.58 \)