# How to calculate amount of contingency tables?

If i want to calculate the amount of k-dimensional contingency tables which formula should I use?

For example, if i have 16 categorical variables in my dataset and want to calculate the amount of 1-dimensional contingency tables, then it's clear, there is only 1 table. If I want to calculate the amount of 2-dimensional contingency tables then I assume there are 120. But how do I calculate it? And what if i have much more variables and k-dimensional tables?

Im searching for one equations with gives me the number of available contingency tables, given the dimension (k) and the number of variables (n). Thanks

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Your question does not make any sense. Please explain some of the terms you are using. For e.g. What is a contingency table? Some examples of what you need will help understand it better. – Aryabhatta Jun 1 '10 at 15:03
what exactly makes no sense? i think for people who are working with this stuff it should be clear. – anon Jun 1 '10 at 16:40
Like one of the posters who seems well versed in the subject matter asked: What is a k-dimensional contingency table? Anyway, I apologize. I didn't mean to offend you. Just that having a clearly phrased question will help you solve your problem quickly. Also, my fault. I didn't see the statistic tag. – Aryabhatta Jun 1 '10 at 16:43
No problem. I understand that its maybe a little bit unclear, but thats also because i'm not a native english speaker. I was just curious about asking what a contingency table is, because i wouldn't ask in a java question what a JButton is ;) But as you said I'm happy that you could help that fast! – anon Jun 1 '10 at 16:48

For moron - a contingency table is defined here.

Sebi - I think you do need to clarify the problem a bit, but let me plow ahead. If I had 16 categorical variables and need to define a contingency table for each pair of variables, that would be C(16,2) = 120 tables. (Combinations of 16 choose 2). Is that what you mean by k-dimension tables?

If so, the number of k dimension tables is simply C(16,k). The excel function is Combin(n,k).

C(16,3) = 560 C(16,4) = 1820 C(16,5) = 4368 C(16,6) = 8008... and so on....

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nice this is what i need. will vote up as soon as i have votes again ;) – RoflcoptrException Jun 1 '10 at 16:40

If I understand this correctly, you are trying to select distinct subsets of size k from the n variables, I suspect the formula will be: number of tables = n! / ( (n-k)! k!)

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