Category:Examples of Kendall's Coefficient of Concordance
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This category contains examples of Kendall's Coefficient of Concordance.
Kendall's coefficient of concordance is a test for consistency of more than $2$ sets of rankings.
Let $m$ judges independently award ranks $1$ to $n$ to a set of $n$ competitors.
Let $s_i$ be the sum of the rankings awarded to competitor $i$.
The mean $M$ of the values of $s_i$ is $\dfrac 1 2 m \paren {n + 1}$.
The sum of the squares of the deviations from $M$ is given by:
- $S = \ds \sum_{i \mathop = 1}^n \paren {s_i - M}^2$
and Kendall's coefficient of concordance is given by:
- $W = \dfrac {12 S} {m^2 n \paren {n^2 - 1} }$
Pages in category "Examples of Kendall's Coefficient of Concordance"
The following 3 pages are in this category, out of 3 total.