The monster group is the highest order sporadic group M. It has group order |M| = 808017424794512875886459904961710757005754368000000000 (1) = 2^(46)·3^(20)·5^9·7^6·11^2·13^3·17·19·23·29·31·41·47·59·71, (2) where the divisors are precisely the 15 supersingular primes (Ogg 1980). The monster...
COLGeek: Again thanks for your prompt reply. I had already read one of those wiki articles.
I was trying to ascertain where the rule originated and how it applied to the symmetry of stars. I have an idea that the symmetry of stars can be explained by fractal geometry but somehow Monster Group may play a part.
I am looking for a simple explanation of something that is very complex and difficult to explain.
Thank you again
That simple explanation from the You-tube clip was exactly what I was looking for. The other links were fantastic also. I don’t feel so dumb now after I heard John Conway say he didn’t completely understand it.
….. and I had the feeling that string theory would get a mention.
Thanks so much Cat