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Table 3 p values for the Shapiro–Wilk test for normality of samples

From: A methodological note on a weighted voting experiment

  Shapiro–Wilk
RRMA FRMA RRSA FRSA
\(asin(sqrt(\textit{MWC/WC)})\) 0.11 0.41 0.18 0.05
\(asin(sqrt(2\textit{MWC/MWC}))\) 0.53 0.86 0.32 0.76
\(asin(sqrt(2\textit{MWC/WC}))\) 0.10 0.63 0.95 0.28
Time length 0.68 0.41 0.81 0.36
Number of actions 0.48 0.04 0.21 0.84
Number of approvals 0.75 0.99 0.22 0.54
Number of proposals 0.04 0.14 0.12 0.22
Number of objections 1 0.82 0.40 0.63 0.89
Number of objections 3 0.49 0.23 0.74 0.72
\(\textit{asin}(\textit{sqrt}(\textit{Errors}))\) 0.14 0.07 0.77 0.83
  1. In the Shapiro–Wilk tests, the null hypothesis is that the samples are normally distributed. Objection \(t\) stands for the objection made at least \(t\) seconds after a proposal was made