Assuming you mean computing error rate on the sample used to fit the model, you can use `printcp()`

. For example, using the on-line example,

```
> library(rpart)
> fit <- rpart(Kyphosis ~ Age + Number + Start, data=kyphosis)
> printcp(fit)
Classification tree:
rpart(formula = Kyphosis ~ Age + Number + Start, data = kyphosis)
Variables actually used in tree construction:
[1] Age Start
Root node error: 17/81 = 0.20988
n= 81
CP nsplit rel error xerror xstd
1 0.176471 0 1.00000 1.00000 0.21559
2 0.019608 1 0.82353 0.82353 0.20018
3 0.010000 4 0.76471 0.82353 0.20018
```

The `Root node error`

is used to compute two measures of predictive performance, when considering values displayed in the `rel error`

and `xerror`

column, and depending on the complexity parameter (first column):

0.76471 x 0.20988 = 0.1604973 (16.0%) is the *resubstitution error rate* (i.e., error rate computed on the training sample) -- this is roughly

```
class.pred <- table(predict(fit, type="class"), kyphosis$Kyphosis)
1-sum(diag(class.pred))/sum(class.pred)
```

0.82353 x 0.20988 = 0.1728425 (17.2%) is the *cross-validated error rate* (using 10-fold CV, see `xval`

in `rpart.control()`

; but see also `xpred.rpart()`

and `plotcp()`

which relies on this kind of measure). This measure is a more objective indicator of predictive accuracy.

Note that it is more or less in agreement with classification accuracy from `tree`

:

```
> library(tree)
> summary(tree(Kyphosis ~ Age + Number + Start, data=kyphosis))
Classification tree:
tree(formula = Kyphosis ~ Age + Number + Start, data = kyphosis)
Number of terminal nodes: 10
Residual mean deviance: 0.5809 = 41.24 / 71
Misclassification error rate: 0.1235 = 10 / 81
```

where `Misclassification error rate`

is computed from the training sample.