I am fitting gam's to data on the interval (0,1) using the `gam`

function of the `mgcv`

package in R. My model code looks like this:

```
mod <- gam(y ~ x1 + x2 + s(latitude, longitude), faimly=betar(link='logit'), data = data)
```

Model fits well, but when I plot the fitted vs. observed values, it looks like this:

```
plot(data$y ~ fitted(mod), ylab='observed',xlab='fitted')
```

Clearly, the model is fitting values greater than 1 and less than 0. This is not supposed to happen. It violates the assumptions of the beta distribution. It doesn't happen when I model the same data in the `betareg`

package for R. What might be causing this discrepancy?

`predict`

, you'll want to use the argument`type="response"`

, otherwise it will go outside of the range. If you're using the`fitted`

function, I'm not sure. – Wayne Sep 1 '16 at 15:18`fitted(mod)`

. Plotting is done with`plot(y ~ fitted(mod))`

– colin Sep 1 '16 at 15:32