RT @MatthewBJane: If you liked the post, I have a package that plots out probability of superiority as a function of the difference between…
RT @MatthewBJane: If you liked the post, I have a package that plots out probability of superiority as a function of the difference between…
RT @MatthewBJane: If you liked the post, I have a package that plots out probability of superiority as a function of the difference between…
RT @MatthewBJane: If I take two random people from a bivariate gaussian with a correlation of .36, the person that scores higher on X has a…
If you liked the post, I have a package that plots out probability of superiority as a function of the difference between the two people in X, it’s called {posc}. Here is the output of the following code remotes::install_github('MatthewBJane/posc') posc::
Just amazing! How to get rid of the, not always understood but commonly used "percentage of variance explained" or r^2 value.
RT @MatthewBJane: If I take two random people from a bivariate gaussian with a correlation of .36, the person that scores higher on X has a…
RT @MatthewBJane: If I take two random people from a bivariate gaussian with a correlation of .36, the person that scores higher on X has a…
RT @MatthewBJane: If I take two random people from a bivariate gaussian with a correlation of .36, the person that scores higher on X has a…
RT @MatthewBJane: If I take two random people from a bivariate gaussian with a correlation of .36, the person that scores higher on X has a…
RT @MatthewBJane: If I take two random people from a bivariate gaussian with a correlation of .36, the person that scores higher on X has a…
Neat.
If I take two random people from a bivariate gaussian with a correlation of .36, the person that scores higher on X has a 61.7 percent chance to score higher on Y. You can calculate bivariate probability of superiority by doing PBS=(asin(.36)/pi)+.5 htt
Probability of bivariate superiority: A #nonparametric common-language statistic for detecting #bivariaterelationships📃 https://t.co/1SnUMkwcCo
Probability of bivariate superiority: A non-parametric common-language statistic for detecting bivariate relationships https://t.co/cK7MpvDLZ1 BehResM