Compute the power of the test for the situation in Example 1.

Approach The power of the test is \(1-\beta\). In Example 1, we found that \(\beta\) is 0.7764 when the true population proportion is 0.48 .

Data from Example 1

We tested \(H_{0}: p=0.5\) versus \(H_{1}: p<0.5\), where \(p\) is the proportion of Illinois high school students who have taken the ACT and are prepared for college-level mathematics. To conduct this test, a random sample of \(n=500\) high school students who took the ACT was obtained and the number of students who were prepared for college mathematics (ACT score at least 22) was determined. The test was conducted with \(\alpha=0.05\). If the true population proportion of Illinois high school students with a score of 22 or higher on the ACT is 0.48 , which means the alternative hypothesis is true, what is the probability of making a Type II error, \(\beta\) ? That is, what is the probability of failing to reject the null hypothesis when, in fact, \(p<0.5\) ?