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Topic: Klein Four Group (Read 928 times) |
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ima1trkpny
Senior Riddler
"Double click on 'Yes'... Hey!"
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Re: Klein Four Group
« Reply #1 on: Oct 9th, 2007, 1:00pm » |
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OMG that was hilarious! 
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"The pessimist sees difficulty in every opportunity. The optimist sees the opportunity in every difficulty." -Churchill
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ThudnBlunder
Uberpuzzler
The dewdrop slides into the shining Sea
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Re: Klein Four Group
« Reply #2 on: Oct 9th, 2007, 11:11pm » |
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Very well crafted, but I don't think it will ever become a monster hit.
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| « Last Edit: Oct 9th, 2007, 11:12pm by ThudnBlunder » |
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THE MEEK SHALL INHERIT THE EARTH.....................................................................er, if that's all right with the rest of you.
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JiNbOtAk
Uberpuzzler
Hana Hana No Mi
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Re: Klein Four Group
« Reply #3 on: Oct 10th, 2007, 2:01am » |
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I could just post the link, but it's much too hilarious not to share it.
Finite Simple Group ( of Order Two )
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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 proposition 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 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 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 principal love bundle sitting deep inside
But then you drove a wedge between our two-forms
Now everything is so complexified
When we first met, we simply connected
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 zeroes, 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,
So let's apply forgetful functors to the past
And be a finite simple group, a finite simple group,
Let's be a finite simple group of order two
(Oughter: "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 inseparable. Q. E. D.
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