Condé Nast Traveler conducts an annual survey in which readers rate their favorite cruise ship. All ships are rated on a 100-point scale, with higher values indicating better service. A sample of 36 ships that carry fewer than 500 passengers resulted in an average rating of 85.36, and a sample of 43 ships that carry 500 or more passengers provided an average rating of 81.3. Assume that the population standard deviation is 4.51 for ships that carry fewer than 500 passengers and 3.94 for ships that carry 500 or more passengers.
Round your all answers to two decimal places.
a. What is the point estimate of the difference
between the population mean rating for ships that carry fewer than
500 passengers and the population mean rating for ships that carry
500 or more passengers?
b. At 95% confidence, what is the margin of
error?
c. What is a 95% confidence interval estimate of the difference between the population mean ratings for the two sizes of ships?
(A) point estimate of the difference between the population mean rating for ships that carry fewer than 500 passengers and the population mean rating for ships that carry 500 or more passengers is equal to the mean difference
So, point estimate = x1 - x2
= 85.36 - 81.3
= 4.06
(B) Margin of error =
setting sigma1 = 4.51, sigma2 = 3.94, n1 = 36, n2 = 43
z critical = 1.96 (using z table)
(C) confidence interval =
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