Question 453297
I have a statistics problem where I am supposed to find the mean, median, and sum of squared deviation for the following scores: 8, -5,7, -10, 5.
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Ranked List of DATA: -10,,-5,,5,,7,,8
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I found the mean by adding up all the scores and then dividing by the numbers of scores. So the mean is (20-15)/2 = 5/2 = 2.5
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The median is the middle score: median = 5
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Finding the sum of squared deviations I'm at a lose. I know my formula is SS/N .I know N represents the total number of scores which is 5 but I'm not sure what SS is. Any assistance would be appreciated.
1st term: (-10-2.5)^2 = (-12.5)^2 = 156.25
2nd term: (-5-2.5)^2 = (-7.5)^2 = 56.25
3rd term: (5-2.5)^2 = (2.5)^2 = 6.25
4th term: (7-2.5)^2 = (4.5)^2 = 20.25
5th term: (8-2.5)^2 = (5.5)^2 = 30.25
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SS = the sum of those squares = 269.25
Divide by N = 5 = 53.85
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Cheers,
Stan H.