Daily Driving The average number of miles a person drives per day is 24. A researcher wishes to see if people over age 60 drive less than 24 miles per day. She selects a random sample of 27 drivers over the age of 60 and finds that the mean number of miles driven is 22.2. The population standard deviation is 3.7 miles. At a = 0.05 is there sufficient evidence that those drivers over 60 years old drive less than 24 miles per day on average? Assume that the variable is normally distributed. Use the P-value method with tables. a. State the hypotheses and identify the claim. b. Find the critical value(s) C. Compute the test value. D.) make the decision. E. Summarize the results