# log linear model in ggplot?

The data is from: http://www.principlesofeconometrics.com/poe5/poe5rdata.html, in the file: collegetown.csv

A log linear model is of the form: ln(y) = b1 + b2x

``````library(ggthemes)
library(ggplot2)
theUrl <- "../poedata/collegetown.csv"
g1 <- ggplot(data = collegetown, aes(x = sqft, y = price))+
geom_point(col = "blue")
plot(g1)
logLinearModel <- lm(log(price)~sqft, data = collegetown)
g1 +  geom_smooth(method = "lm", formula = y ~ exp(x), se = F, col = "green")+
theme_economist()
summary(logLinearModel)
``````

This gives me the weird plot below:

How do I plot the proper curve? Do I need to store the predicted values explicitly in the data frame?

PS: I want the axis to stay untransformed i.e. in their original scales.

• Please provide a reproducible question by including a subset of the data used; paste data into the question using `dput(head(collegetown, n))` where n is an integer large enough to illustrate the problem Commented Apr 28, 2021 at 7:12
• Perhaps you need to adjust the x-axis with something like: `scale_x_continuous(trans = 'log')` Commented Apr 28, 2021 at 9:35

The model `y~exp(x)` is not the same as the model `log(y)~x`, so you're not getting the smoother you expect. You can specify that the smoother is a generalised linear model with a log-link function using the code:

``````g1 <- ggplot(data = collegetown, aes(x = sqft, y = price))+
geom_point(col = "blue")
g1 +  geom_smooth(method = "glm", formula = y ~ x, se = F, col = "green",
theme_economist()
``````

which gives what you're wanting. If that doesn't seem intuitive, you can fit the lm outside the plotting with:

``````logLinearModel <- lm(log(price)~sqft, data = collegetown)
collegetown\$pred <- exp(predict(logLinearModel))
ggplot(data = collegetown, aes(x = sqft, y = price))+
geom_point(col = "blue") +
geom_line(aes(y=pred), col = "green")+
theme_economist()
``````

Warning - the two versions aren't the same if you want the standard errors; the first approach gives symmetric errors, the standard errors that you might get from the lm prediction are symmetric on a log scale. See here.

I think a relatively simpler method to build the curve is using `stat_function()` method.

``````# LOG LINEAR MODEL
logLinearModel <- lm(log(price)~sqft, data = collegetown)
smodloglinear <- summary(logLinearModel)
logLinearModel
names(logLinearModel)
yn <- exp(logLinearModel\$fitted.values)
rgloglinear <- cor(yn, collegetown\$price)
rgloglinear^2
b1 <- coef(smod)[[1]]
b2 <- coef(smod)[[2]]
sighat2 <- smod\$sigma^2

g2 <- ggplot(data = collegetown,aes(x = sqft, y = price))+
geom_point(col = "white") +
stat_function(fun = function(x){exp(b1+b2*x)}, aes(color = "red"))+
stat_function(fun = function(x){exp(b1+b2*x+sighat2/2)} , aes(color = "green"))+
dark_theme_bw()+
scale_color_identity(name = "Model fit",
breaks = c("red", "green"),
labels = c("yn", "yc"),
guide = "legend")
g2
``````

which gives: