I am trying to do PCA analysis using `princomp`

function in R.

The following is the example code:

```
mydf <- data.frame (
A = c("NA", rnorm(10, 4, 5)),
B = c("NA", rnorm(9, 4, 5), "NA"),
C = c("NA", "NA", rnorm(8, 4, 5), "NA")
)
out <- princomp(mydf, cor = TRUE, na.action=na.exclude)
Error in cov.wt(z) : 'x' must contain finite values only
```

I tried to remove the `NA`

from the dataset, but it does not work.

```
ndnew <- mydf[complete.cases(mydf),]
A B C
1 NA NA NA
2 1.67558617743171 1.28714736288378 NA
3 -1.03388645096478 9.8370942023751 10.9522215389562
4 7.10494481721949 14.7686678743866 4.06560213642725
5 13.966212462717 3.92061729913733 7.12875100279949
6 -1.91566982754146 0.842774330179978 5.26042516598668
7 0.0974919570675357 5.5264365812476 6.30783046905425
8 12.7384749395121 4.72439301946042 2.9318845479507
9 13.1859349108349 -0.546676530952666 9.98938028956806
10 4.97278207223239 6.95942086859593 5.15901566720956
11 -4.10115142119221 NA NA
```

Even if I can remove the `NA`

's it might not be of help as every rows or column has at least one missing values. Is there any R method that can impute the data doing PCA analysis?

UPDATE: based on the answers:

```
> mydf <- data.frame (A = c(NA, rnorm(10, 4, 5)), B = c(NA, rnorm(9, 4, 5), NA),
+ C = c(NA, NA, rnorm(8, 4, 5), NA))
> out <- princomp(mydf, cor = TRUE, na.action=na.exclude)
Error in cov.wt(z) : 'x' must contain finite values only
ndnew <- mydf[complete.cases(mydf),]
out <- princomp(ndnew, cor = TRUE, na.action=na.exclude)
```

This works but the defult `na.action`

does not work.

Is there is any method that can impute the data, as in real data I have almost every column with missing value in them? The result of such `NA`

omission will give me ~ 0 rows or columns.

`na.action`

argument to work. For your big question, about how to proceed when your data contain many NA's, a quick google search on "missing values pca" turns up a ton of useful hits, including [this R function]{rss.acs.unt.edu/Rdoc/library/pcaMethods/html/bpca.html}. If you still need help after doing some research, I'd head over to stats.stackexchange.com , since this is really a statistical question. – Josh O'Brien Apr 30 '12 at 16:37