Suppose population 1 is all blue cars sold at used car auctions, and the mean sale price of all such blue cars is $24,579 with a standard deviation of $3,691. Additionally, suppose population 2 is all red cars sold at used car auctions, and the mean sale price of all such red cars is $21,948 with a standard deviation of $4,028. If a simple random sample of 47 blue cars sold at used car auctions is selected and the mean sale price of the 47 blue cars in the sample is determined, and if an independent simple random sample of 59 red cars sold at used car auctions is selected and the mean sale price of the 59 red cars in the sample is determined, if appropriate describe completely the sampling distribution of X1-X2. What is the center of the sampling distribution of X1-X2? (2631, 757.57, -2631, 600.71, 676.86, 4401) What is the spread of the sampling distribution of X1-X2? (751.57, 600.71, 564857.64, 676.86, 12.12, 2631) What is the shape of the sampling distribution? (Skewed Right, Bimodal, Normal, Skewed Left) Are there any unusual features in this sampling distribution? (yes or no)
Suppose population 1 is all blue cars sold at used car auctions, and the
What is the center of the sampling distribution of X1-X2?
(2631, 757.57, -2631, 600.71, 676.86, 4401)
What is the spread of the sampling distribution of X1-X2?
(751.57, 600.71, 564857.64, 676.86, 12.12, 2631)
What is the shape of the sampling distribution?
(Skewed Right, Bimodal, Normal, Skewed Left)
Are there any unusual features in this sampling distribution? (yes or no)
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