# Get Confidence Interval For One Point On Regression Line In R?

How do I get the CI for one point on the regression line? I'm quite sure I should use confint() for that, but if I try this

``````confint(model,param=value)
``````

it just gives me the same number as if I just type in

``````confint(model)
``````

if I try without a value, it does not give me any values at all.

What am I doing wrong?

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If you read `?confint` carefully I suspect you'll discover that it is not what you want. You probably simply want to use `predict.lm`. –  joran Oct 4 '12 at 17:24
Also, you might want to read a bit about confidence vs prediction intervals, just to make sure you're getting what you want. –  joran Oct 4 '12 at 17:27

You want `predict()` instead of `confint()`. Also, as Joran noted, you'll need to be clear about whether you want the confidence interval or prediction interval for a given x. (A confidence interval expresses uncertainty about the expected value of y-values at a given x. A prediction interval expresses uncertainty surrounding the predicted y-value of a single sampled point with that value of x.)

Here's a simple example of how to do this in R:

``````df <- data.frame(x=1:10, y=1:10 + rnorm(10))

f <- lm(y~x, data=df)

predict(f, newdata=data.frame(x=c(0, 5.5, 10)), interval="confidence")
#         fit       lwr       upr
# 1 0.5500246 -1.649235  2.749284
# 2 5.7292889  4.711230  6.747348
# 3 9.9668688  8.074662 11.859075

predict(f, newdata=data.frame(x=c(0, 5.5, 10)), interval="prediction")
#         fit       lwr       upr
# 1 0.5500246 -3.348845  4.448895
# 2 5.7292889  2.352769  9.105809
# 3 9.9668688  6.232583 13.701155
``````
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Well written, as usual. The up votes on my comment had finally prompted me to get off my butt and write an actual answer, but you saved me the trouble! –  joran Oct 4 '12 at 17:39
@joran -- Thanks. `predict`'s `newdata` argument and the distinction between confidence and prediction intervals are both tricky enough that I too thought it worth the effort to explain in a bit more detail. –  Josh O'Brien Oct 4 '12 at 17:49
Nice answer. I would have hoped that predicting outside the domain of information would generate a warning. –  BondedDust Oct 4 '12 at 20:42