The answer is No, it is not possible to get `abline()`

to draw the fitted line on only one part of the plot region where the model was fitted. This is because it uses only the model coefficients to draw the line, not predictions from the model. If you look closely, you'll see that the line draw actually extends outside the plot region, covering the plot frame where it exists the region.

The simplest solution to such problems is to predict from the model for the regions you want.

```
# The dataset:
daten <- data.frame(x = c(0:6), y = c(0.3, 0.1, 0.9, 3.1, 5, 4.9, 6.2))
# make a linear fit for the datapoints 3, 4, 5
mod <- lm(y~x, data = daten, subset = 3:5)
```

First, we get the range of `x`

values we want to differentiate:

```
xr <- with(daten, range(x[3:5]))
```

then we predict for a set of evenly spaced points on this range using the model:

```
pred <- data.frame(x = seq(from = xr[1], to = xr[2], length = 50))
pred <- transform(pred, yhat = predict(mod, newdata = pred))
```

Now plot the data and the model using `abline()`

:

```
plot(y ~ x, data = daten)
abline(mod)
```

then add in the region you want to emphasise:

```
lines(yhat ~ x, data = pred, col = "red", lwd = 2)
```

Which gives us this plot:

If you have a model that is more complex than that which can be handled by `abline()`

, then we take a slightly different strategy, predicting over the range of the available, plotted data to draw the line, and then pick out the interval we want to highlight. The following code does that:

```
## range of all `x` data
xr2 <- with(daten, range(x))
## same as before
pred <- data.frame(x = seq(from = xr2[1], to = xr2[2], length = 100))
pred <- transform(pred, yhat = predict(mod, newdata = pred))
## plot the data and the fitted model line
plot(y ~ x, data = daten)
lines(yhat ~ x, data = pred)
## add emphasis to the interval used in fitting
with(pred, lines(yhat ~ x, data = pred, subset = x >= xr[1] & x <= xr[2],
lwd = 2, col = "red"))
```

What we do here is use the `subset`

argument to pick out the values from the predictions that are in the interval used in fitting, the vector we pass to `subset`

is a logical vector of `TRUE`

and `FALSE`

values indicating which data are in the region of interest and `lines()`

only plots a line along those data.

```
R> head(with(pred, x >= xr[1] & x <= xr[2]))
[1] FALSE FALSE FALSE FALSE FALSE FALSE
```

One might wonder why I have done predictions over 50 or 100 evenly spaced values of the predictor variable when we could, in this case, just have done a prediction for the start and the end of the data or region of interest and join the two points? Well, not all modelling exercises are that simple - you double log model from a previous question is a case in point - and the generic solution I outline above will work in all cases whereas simply joining two predictions won't.

@Andrie has furnished you with a solution to Idea 2.

`abline()`

doesn't work for all but the simplest cases and even then it only works we plotting across the entire plot region because it works using the intercept and slope coefficients of the model. It knows nothing, or cares to know nothing about the data used to fit the model. The easiest way I know to do the first idea is to generate predictions over the interval you are interested in and plot those predictions. – Gavin Simpson Jun 8 '11 at 14:13