Let's say there's a 4-way interaction, with a 2x2x2 factorial design plus a continuous variable.
Factors have the default contrast coding (`contr.treatment`

). Here's an example:

```
set.seed(1)
cat1 <- as.factor(sample(letters[1:2], 1000, replace = TRUE))
cat2 <- as.factor(sample(letters[3:4], 1000, replace = TRUE))
cat3 <- as.factor(sample(letters[5:6], 1000, replace = TRUE))
cont1 <- rnorm(1000)
resp <- rnorm(1000)
df <- data.frame(cat1, cat2, cat3, cont1, resp)
mod <- lm(resp ~ cont1 * cat1 * cat2 * cat3, data = df)
```

Looking at the output of `coef(mod)`

, we get something like:

```
(Intercept) cont1 cat1b
0.019822407 0.011990238 0.207604677
cat2d cat3f cont1:cat1b
-0.010132897 0.105397591 -0.001153867
cont1:cat2d cat1b:cat2d cont1:cat3f
0.023358901 -0.194991402 0.060960695
cat1b:cat3f cat2d:cat3f cont1:cat1b:cat2d
-0.240624582 -0.117278931 -0.069880751
cont1:cat1b:cat3f cont1:cat2d:cat3f cat1b:cat2d:cat3f
-0.120446848 -0.141688864 0.136945262
cont1:cat1b:cat2d:cat3f
0.201792298
```

And to get the estimated intercept for `cat1b`

(for example), we would add our implicit `(Intercept)`

term and `cat1b`

, i.e. `coef(mod)[1] + coef(mod)[3]`

. To get the change in slope for the same category, we would use `coef(mod)[2] + coef(mod)[6]`

, *a la* this r-bloggers post. It gets pretty tedious to write all of them out, and `methods(class="lm")`

doesn't look like it has any functions that do this right out of the gate.

Is there some obvious way to get numerical estimates for the intercept and slope for each combination of factors?