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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


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


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

What am I doing wrong?

share|improve this question
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
share|improve this answer
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. – 42- Oct 4 '12 at 20:42
@42 predictions are by definition outside the domain of information. – Dzamo Norton Jan 28 at 18:20
@DzamoNorton Pretty sure he meant "predictions for values of x beyond the range of x's actually observed. So (exaggerating just for purposes of illustration) if you've fitted a model relating power of car engines (the dependent or "y" variable) to their volume (the independent or "x" variable), you probably shouldn't try using it to predict the power of an engine with a volume of 10 cubic meters. I think he was really using the term "domain" in a more precise, technical sense. – Josh O'Brien Jan 28 at 18:29

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