[ExI] symmetrical 11-Venn discovered

spike spike66 at att.net
Mon Aug 13 16:30:17 UTC 2012


Kewall!

 

I have long wondered about this.  If you draw a Venn diagram with the usual
three sets which creates eight distinct regions, it is pretty
straightforward, but it gets wacky complicated really fast.  The number of
regions is 2^n, where n is the number of sets.  So what does a 4-Venn look
like?  Can you draw one?  Check this, they claim to have discovered a way to
make a symmetrical 11-Venn.  It looks right to me:

 

http://cartesianproduct.wordpress.com/2012/08/12/venn-diagrams-for-11-sets/

 

{8^D  

 

Oh this is sooo cool, life.is.goooood.

 

spike

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