A restaurant chain has two locations in a medium-sized town and, believing that it has oversaturated the market for its food, is considering closing one of the restaurants. The manager of the restaurant with a downtown location claims that his restaurant generates more revenue than the sister restaurant by the freeway. The CEO of this company, wishing to test this claim, randomly selects 17 monthly revenue totals for each restaurant. The revenue data from the downtown restaurant have a mean of $360,000 and a standard deviation of $46,000, while the data from the restaurant by the freeway have a mean of $343,000 and a standard deviation of $44,000. Assume there is no reason to believe the population standard deviations are equal, and let μ1 and μ2 denote the mean monthly revenue of the downtown restaurant and the restaurant by the freeway, respectively. Which of the following is the correct value of the test statistic to analyze the claim?
Multiple Choice
t31 = 1.101
t31 = 1.075
t32 = 1.075
t32 = 1.101
Given that,
For sample 1 : n1 = 17, x1-bar = $360000, s1 = $46000
For sample 2 : n2 = 17, x2-bar = $343000, s2 = $44000
The null and alternative hypotheses are,
H0 : μ1 = μ2
Ha : μ1 > μ2
Since, population standard deviations are not equal we should used two-sample t test,
Using TI-83 plus calculator,
Test statistic = t31 = 1.101
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