I am trying to determine confidence intervals for predicted probabilities from a binomial logistic regression in R. The model is estimated using `lrm`

(from the package `rms`

) to allow for clustering standard errors on survey respondents (each respondent appears up to 3 times in the data):

```
library(rms)
model1<-lrm(outcome~var1+var2+var3,data=mydata,x=T,y=T,se.fit=T)
model.rob<-robcov(model1,cluster=respondent.id)
```

I am able to estimate a predicted probability for the outcome using `predict.lrm`

:

```
predicted.prob<-predict(model.rob,newdata=data.frame(var1=1,var2=.33,var3=.5),
type="fitted")
```

What I want to determine is a 95% confidence interval for this predicted probability. I have tried specifying `se.fit=T`

, but this not permissible in `predict.lrm`

when `type=fitted`

.

I have spent the last few hours scouring the Internet for how to do this with `lrm`

to no avail (obviously). Can anyone point me toward a method for determining this confidence interval? Alternatively, if it is impossible or difficult with `lrm`

models, is there another way to estimate a logit with clustered standard errors for which confidence intervals would be more easily obtainable?

`exp(fit +/- 1.96*se)/(1+ exp(fit +/- 1.96*se) )`

strategy but after looking at`?predict.lrm`

figured there was a reason you didn't provide that. I thought perhaps there was a problem with not taking into account the covariances. As you can see, I hadn't gone down through the examples. And I falsely imagined you might not see it as soon if it sat here. – 42- Dec 31 '14 at 21:39