# how to use predict()

Want to predict a value but this is clearly not the solution. I am doing a multiple choice test and 0.304... is not an answer.How to use predict() correctly?

``````library(glm2)
data(crabs)
fit= glm(Satellites~Width,data=crabs, family="poisson")
plot(Satellites~Width,data=crabs)
abline(fit)
predict(fit, newdata=data.frame(Width=c(22)))
1
0.3042347
``````
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I don't think the value is correct since I am doing a multiple choice thest and 0.304.. is not an answer. –  Roo Feb 19 '13 at 18:38
Ummm... `22 * fit\$coef[2] + fit\$coef[1]` gives what you have posted. It is right. But clearly, it is not what you expected! –  Simon O'Hanlon Feb 19 '13 at 18:42
Value you got with predict() is log() of expected value because you made a Poisson regression. Just make exp(value) to get the same scale as original values. –  Didzis Elferts Feb 19 '13 at 18:47
Should be an answer! @DidzisElferts –  Roo Feb 19 '13 at 18:50

Function `predict()` for Poisson regression (for GLM in general) by default will calculate the values on the scale of the linear predictors, i.e. the log scale in this case (see help file for `predict.glm`).

``````predict(fit, newdata=data.frame(Width=c(22)))
1
0.3042347
``````

To get the predicted values on the scale of the response variable, you should add argument `type="response"` to function `predict()`.

``````predict(fit, newdata=data.frame(Width=c(22)),type="response")
1
1.355587
``````
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+1!`preidct` looks sometimes clunky to use! but it is really a great workhorse! –  agstudy Feb 19 '13 at 19:10
I am not sure what the scale linear predictors have to do with log() though... even more confused. –  Roo Feb 19 '13 at 19:17
You fitted a poisson model. As `?poisson` will tell you, the default link function of the Poisson is the log (that shows up as `poisson(link = "log")` in the help file). "on the scale of the linear predictor" means on the log scale in this context. If this is totally unfamiliar to you, it might be helpful to do some more reading about Poisson GLMs ... –  Ben Bolker Feb 19 '13 at 19:19
@Roo, Venables & Ripley's MASS book has an entire chapter explaining this: amazon.com/Modern-Applied-Statistics-W-N-Venables/dp/0387954570 –  Ricardo Saporta Feb 19 '13 at 19:30