#11
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Re: Another possible daryn sighting
[ QUOTE ]
you have entirely too many symbols [/ QUOTE ] Zildjian - the oldest american owned company |
#12
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Re: Another possible daryn sighting
This is fantastic. Every math term in there is used brilliantly.
The Klein Four Group Finite Simple Group (of Order Two) The path of love is never smooth But mine's continuous for you You're the upper bound in the chains of my heart You're my axiom of choice, you know it's true But lately our relation's not so well-defined And I just can't function without you I'll prove my propisition and I'm sure you'll find We're a finite simple group of order two I'm losing my identity I'm getting tensor (sic!) every day And without loss of generality I will assume that you feel the same way Since every time I see you you just quotient mod out The faithful image that I map into But when we're one-to-one you'll see what I'm about Cause we're a finite simple group of order two Our equivalence was stable A principle (sic!) of bundles sitting deep inside But then you drove a wedge between our 2-forms Now everything is so complexified When we first meet we simply-connected (sic!) My heart was open but too dense Our system was already directed To have a finite limit in some sense I'm living in the kernel of a rank one map From my domain its image looks so blue Cause all I see are zeros it's a cruel trap But we're a finite simple group of order two I'm not the smoothest operator in my class But we're a mirror pair me and you (you and me) So let's apply forgetful functors to the past And be a finite simple group be a finite simple group Let's be a finite simple group of order two (why not three?) I've proved my proposition now as you can see So let's both be associative and free And by corollary this shows You and I to be purely inseprable QED |
#13
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Re: Another possible daryn sighting
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#14
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Re: Another possible daryn sighting
[ QUOTE ]
NERDS NERDS NERDS NERDS [/ QUOTE ] And..? |
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