Interpreting results: Wilcoxon signed rank test
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Interpreting results: Wilcoxon signed rank test |
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The nonparametric Wilcoxon signed rank test compares the median of a single column of numbers against a hypothetical median. Interpreting the P value The P value answers this question: If the P value is small, you can reject the idea that the difference is a due to chance and conclude instead that the population has a median distinct from the hypothetical value you entered. If the P value is large, the data do not give you any reason to conclude that the population median differs from the hypothetical median. This is not the same as saying that the medians are the same. You just have no compelling evidence that they differ. If you have small samples, the Wilcoxon test has little power. In fact, if you have five or fewer values, the Wilcoxon test will always give a P value greater than 0.05, no matter how far the sample median is from the hypothetical median. Assumptions The Wilcoxon signed rank test does not assume that the data are sampled from a Gaussian distribution. However it does assume that the data are distributed symmetrically around the median. If the distribution is asymmetrical, the P value will not tell you much about whether the median is different than the hypothetical value. Like all statistical tests, the Wilcoxon signed rank test assumes that the errors are independent. The term “error” refers to the difference between each value and the group median. The results of a Wilcoxon test only make sense when the scatter is random – that any factor that causes a value to be too high or too low affects only that one value. How the Wilcoxon signed rank test works
If the data really were sampled from a population with the hypothetical mean, you would expect W to be near zero. If W (the sum of signed ranks) is far from zero, the P value will be small. With small samples, Prism computes an exact P value. With larger samples, Prism uses an approximation that is quite accurate.
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