I'm trying to understand how `venneuler`

works and it outputs a venn diagram I wouldn't expect. I like to work with simple examples when I'm trying to understand something. I'm supplying the matrix below which I believe is :

a logical or numeric matrix whose columns represent sets and co-occurrence is defined by non-zero (rep. TRUE) values in rows (weight for a row being 1 for logical matrices or the row sum for numeric matrices). -venneular manual-

I would expect if two things both have 1's or 0's in the same row they'd have overlap in their venn. So in this matrix w and z have no 1's or 0's in common. I'd expect their venn's not to overlap but they do (see figure 1 below). Why? If I'm supplying wrong information or it needs to be reformatted please explain. If it's in the calculations of `venneular`

please explain that.

```
w x y z
[1,] 1 0 1 0
[2,] 0 0 1 1
[3,] 0 0 1 1
[4,] 1 1 0 0
```

The code for the above:

```
library(venneuler)
w <- c(1,0,0,1)
x <- c(0, 0, 0, 1)
y <- c(1, 1, 1,0)
z <- c(0, 1, 1,0)
a <- cbind(w, x, y, z)
v <- venneuler(a)
plot(v)
```

`venneuler()`

et al. must be aimed at doing as good a job as possible, despite there being no completely accurate solution. – Josh O'Brien Oct 26 '12 at 0:44`percentage difference between input intersection area and fitted intersection area`

. – Tyler Rinker Oct 26 '12 at 0:47