Answer:
(0.4958, 0.7422)
Step-by-step explanation:
Let p be the true proportion of water specimens that contain detectable levels of lead. The point estimate for p is [tex]\hat{p}=26/42=0.6190[/tex]. The estimated standard deviation is given by [tex]\sqrt{\hat{p}(1-\hat{p})/n}=\sqrt{(0.6190)(1-0.6190)/42}=0.0749[/tex]. Because we have a large sample, the 90% confidence interval for p is given by [tex]0.6190\pm z_{0.05}0.0749[/tex] where [tex]z_{0.05}=1.6448[/tex] is the value that satisfies that above this and under the standard normal density there is an area of 0.05. So, the confidence interval is [tex]0.6190\pm (1.6448)(0.0749)[/tex], i.e., (0.4958, 0.7422).
