# Is there a Pair-Wise PostHoc Comparisons for the Chi-Square Test in R?

I am wondering if there exists in R a package/function to perform the: "Post Hoc Pair-Wise Comparisons for the Chi-Square Test of Homogeneity of Proportions" (or an equivalent of it) Which is described here: http://epm.sagepub.com/cgi/content/abstract/53/4/951

My situation is of just making a chi test, on a 2 by X matrix. I found a difference, but I want to know which of the columns is "responsible" for the difference.

Thanks, Tal

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Tal, I have a feeling that this is off-topic here. You know where to find r-help as you have been cross-posting for the last few days anyway. –  Dirk Eddelbuettel Mar 17 '10 at 18:09
Hi Dirk, I appreciate your suggestion and suspect that your feeling will turnout correct. The reason I posted it here is because I already asked this question on the R-help a few months ago and got no answer. So I thought to check if someone here might have came across a solution. Best, Tal –  Tal Galili Mar 17 '10 at 19:01
BTW - do you think there is a chance that stackoverflow will open a "statistics" forum here? –  Tal Galili Mar 17 '10 at 19:02
Update: what luck, there is a discussion about this going on now. Dirk - Please have a look: meta.stackoverflow.com/questions/42373/… –  Tal Galili Mar 17 '10 at 19:16
@Tal: I agree with Dirk here. That's what mathoverflow is for: mathoverflow.net/questions/tagged/st.statistics. Some other people are working on a separate statistics site, but currently the r-help distro is the best source. –  Shane Mar 17 '10 at 19:23
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The "chi-square test" is usually generated as the sum of squared individual cell deviations from the "expected" = products of row and column sums divided by the total sum. As such, one can compare the individual cell contributions to the sum to the critical value of a chi-square with 1 d.f. It is a fairly simple task to modify the chisq.test() code to return the cell chi-squares. I just added:

``````cell.chisq = (x - E)^2/E,
``````

to the structure call at the end. They won't get print()-ed, but you can assign the result to an object and use:

`````` obj\$cell.chisq
``````
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Thanks Dwin. Yet, my question had to do with comparing two rows (or columns) to find out which pairs are significant. One could try all the column pairwise tables and compute their P values - but how do you then correct for the multiplicity ? –  Tal Galili Mar 21 '10 at 12:19
Sum the rows of obj\$cell.chisq and apply the Bonferroni adjustment to p-values derived from the chisq critical values. The key point is that "chisq tests" on tables are decomposable by cell, by row, or by column or by combinations of these. People are misled by their intor stats course into thinking that "chi-square test" just means one thing, when in fact it means many things. The analyst still needs to keep clear in his head what is being tested and how many degrees of freedom his entire analysis has consumed. –  IShouldBuyABoat Apr 4 '10 at 15:26