Answer:
e) (10.94, 11.66)
Step-by-step explanation:
We have a small sample size of n = 15 departing truck loads (we suppose that the sample comes from a normal distribution), the average number of damaged items per truck load is calculated to be [tex]\bar{x} = 11.3[/tex] with a calculated sample variance [tex]s^2[/tex] = 0.64. The 90% confidence interval for the true mean of damaged items is given by [tex]\bar{x}\pm t_{\alpha/2}(\frac{s}{\sqrt{n}})[/tex] where [tex]t_{\alpha/2}[/tex] is the [tex]\alpha/2[/tex]th quantile of the t distribution with n - 1 = 14 degrees of freedom.
As we want the 90% confidence interval, we have that [tex]\alpha = 0.1[/tex] and the confidence interval is [tex]11.3\pm t_{0.05}(\frac{0.8}{\sqrt{15}})[/tex] where [tex]t_{0.05} = -1.7613[/tex]. Then, we have [tex]11.3\pm (-1.7613)(\frac{0.8}{\sqrt{15}})[/tex] and the 90% confidence interval is given by (10.94, 11.66)
