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School

American Military University *

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302

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Statistics

Date

Apr 3, 2024

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Uploaded by AdmiralWildcatPerson1030

VAL A BV T R Y Elards) XY W @ 6¢ 65% @) < Back Week 8 Test { Back © O Question 18 1/ 1 point The following data represent weights (pounds) of a random sample of professional football players on the following teams. X1 = weights of players for the Dallas Cowboys X2 = weights of players for the Green Bay Packers X3 = weights of players for the Denver Broncos X4 = weights of players for the Miami Dolphins X5 = weights of players for the San Francisco Forty Niners You join a Fantasy Football league and you are wondering if weight is a factor in winning Football games. At a 5% level of Significant, determine if the weights of football players on each of these teams is same or different? See Attached Excel for Data. Reference: The Sports Encyclopedia Pro Football Football Weight data.xlsx | Reject Ho. The football player's weights for each team are differnt because the p-value = £ 0.1890 ) Do Not Reject Ho. The football player's weights for each team are the same because the p- value = 0.0472 (o) Do Not Reject Ho. The football player's weights for each team are the same because the p-value = 0.1890 \ Reject Ho. The football player's weights for each team are differnt because the p-value = £ 0.0472 ¥ Hide question 18 feedback Run a F-Distribution ANOVA analysis using Excel. Data -> Data Analysis -> the first option is Anova: Single Factor -> Click OK In the Input Range: Highlight all 5 columns including the top row with the Labels. Check the box Labels in the First Row and click OK If done correctly the p-value from the ANOVA output is

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