# Which variables combine to form most of the variance for a principle component in PCA?

I get how PCA works and how to implement it in Matlab, but I'm at a loss to find out which variables contribute most strongly to a principle component.

My questions is, suppose I have a data set of variables A,B,C,D,E,F. Unknown to me, variables A,B,C,E measure almost the same thing, and variables D, F both measure a different thing. There is little correlation between variables from the set (A,B,C,E), and set (D,F).

PCA tells me that there are 2 main principle components, which I know how to do. I do not know how to identify that A,B,C,E and D,F are two groups of variables measuring the same things within that group. Any advice on this would be greatly appreciated.

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First let's create some data that behaves as you described - four variables that measure something similar, and two factors that measure something else.

``````>> x = randn(100, 1);
>> y = randn(100, 1);
>> v = [[x,x,x,x] + 0.1*randn(100,4), [y,y]  + 0.1*randn(100,2)];
``````

Now find the principal components with a call to `pca`

``````>> [coeff, scores, latent, tsq, explained] = pca(v);
``````

By looking at the variable `latent` we can see that the first two principle components are dominant

``````>> latent
latent =
5.4821
2.0491
0.0120
0.0106
0.0089
0.0073
``````

Now, by looking at the first two rows of `coeff` (which contain the loadings of each of your six variables on the first two factors) it is clear that variables 1-4 load heavily on the first factor (in blue) and variables 5-6 load heavily on the second factor (in red).

``````>> bar(coeff(1:2, :)')
``````

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Thank you so much!! That's exactly what I was looking for –  lkloh Nov 2 '13 at 20:33
By the way, I believe you mean to say ''Look at the first two COLUMNS, not first two rows''. Thanks again. –  lkloh Nov 4 '13 at 4:38