OK, color me impressed. I was finding it remarkably interesting and then read the instruction to drag and flip it around which multiplied the whoa factor by at least 7 infinities
Apparently Venn diagrams can grow arbitrarily large. For each prime number, there is a (rotationally) symmetric Venn Diagram, according to [1], but apparently not a construction proof. See also [2].
This is impressive, but as others have said : it fails to clarify things. One thing that would probably help is on the "colored side" when the mouse moves from one zone to the other, it should just change the highlights that need to be changed, so we can smoothly visualize where we are. At the moment, when we do this, it first uselessly highlights everything for a second, so we "lose" the ability to visualize "what changed" precisely between the two zones.
but doesn't seem to be 'subjectively equidistant' as there are some green/green-blue's that are very similar and lots of unused visual separation near orange or violet.
I’m using lattice (line) diagrams to understand intersection concepts like this. They’re easy to generate from cross tables using FCA tools such as the “concepts”
Python available in pip.
https://www.nature.com/articles/nature11241/figures/4