`t.test`

tests whether there is a difference in location between two samples that adhere to normal distributions.

To approximately check the assumed normality, you might inspect whether outputs from `qqnorm`

seem linear, or use `ks.test`

in conjunction with estimating parameters from observations*:

```
set.seed(1)
x1 <- rnorm(200,40,10) # should follow a normal distribution
ks.test(x1,"pnorm",mean=mean(x1),sd=sd(x1)) # p: 0.647 [qqnorm(x1) looks linear]
x2 <- rexp(200,10) # should *not* follow a normal distribution
ks.test(x2,"pnorm",mean=mean(x2),sd=sd(x2)) # p: 3.576e-05, [qqnorm(x2) seems curved]
```

I do not know GEO's `Table`

, but I suggest you might want to use its `VALUE`

columns -and not any 2x2 matrices- as inputs for `t.test`

, `qqnorm`

or `ks.test`

; maybe you might provide some additional illustration of your data by posting outputs of `head(Table(gpl96)[1:10,1:4])`

.

(* After https://stat.ethz.ch/pipermail/r-help/2003-October/040692.html, which also appears to demonstrate the more refined Lilliefors test.)

`geoQuery`

here from`bioconductor`

... – agstudy Mar 16 '13 at 12:51