Given the between sum of squares `betweenss`

and the vector of within sum of squares for each cluster `withinss`

the formulas are these:

```
totss = tot.withinss + betweenss
tot.withinss = sum(withinss)
```

For example, if there were only one cluster then `betweenss`

would be `0`

, there would be only one component in `withinss`

and `totss = tot.withinss = withinss`

.

For further clarification, we can compute these various quantities ourselves given the cluster assignments and that may help clarify their meanings. Consider the data `x`

and the cluster assignments `cl$cluster`

from the example in `help(kmeans)`

. Then if we define the sum of squares function as:

```
ss <- function(x) sum(scale(x, scale = FALSE)^2)
```

we have:

```
example(kmeans) # create x and cl
betweenss <- ss(cl$centers[cl$cluster,]) # or ss(fitted(cl))
withinss <- sapply(split(as.data.frame(x), cl$cluster), ss)
tot.withinss <- sum(withinss) # or resid <- x - fitted(cl); ss(resid)
totss <- ss(x) # or tot.withinss + betweenss
cat("totss:", totss, "tot.withinss:", tot.withinss,
"betweenss:", betweenss, "\n")
# compare above to:
str(cl)
```

EDIT:

Since this question was answered, R has added additional similar `kmeans`

examples (`example(kmeans)`

) and a new `fitted.kmeans`

method and we now show how the fitted method fits into the above in the comments trailing the code lines.