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- From: pwh@bradley.bradley.edu (Pete Hartman)
- Subject: Fermat's Last Theorem
- Message-ID: <1993Jan6.092212.9851@bradley.bradley.edu>
- Organization: Bradley University
- Date: Wed, 6 Jan 93 09:22:12 GMT
- Lines: 72
-
-
- I was introduced to this problem less than 6 months ago in some
- book (perhaps _The Emperor's New Mind_) which I was reading for
- completely different reasons.
-
- Old hands surely know this one, but for the benefit of any who
- may not: the theorem basically boils down to the assertion
- that there are no numbers x, y, z that satisfy x^N + y^N = z^N
- where N>2. Fermat's statement of the theorem was a little more
- convoluted, and took some examination to realize this.
-
- He claimed in some marginal notes that he had a "truly wondrous"
- proof of this, but he did not record it, and no one has been able
- to reconstruct it.
-
- Until now. :-)
-
- It seems to me to be a pretty obvious statement upon observation,
- and I have some feel for how I would demonstrate the proof, but
- unfortunately, I'm not a mathematician, and it's been a long time
- since Calculus (not that Calc is needed, but it's been even longer
- since most of that other stuff).
-
- So I'm wondering if I could ask a few questions and see what response
- I get. Perhaps I'm just completely off base, and should go back to
- programming, but please be polite if you must tell me that.
-
- My idea is related to the Pythagorean Theorem, which is the only
- non-trivial value of N for which the equation is true (assuming
- Fermat was right) (in ordinary geometry anyway; I'll leave the
- weird stuff to others). One proof of the Pythagorean Theorem I
- recall involves squares drawn with their sides along the right
- triangle in question. So the two-dimensional "volume" (usually
- "area") of the two smaller squares sum to the 2-D "volume" of the third.
-
- I don't recall *why* this is a proof, or maybe I'm confused and it's
- just a demonstration, but I'd like an explanation of it if someone
- could (maybe just email to me, considering it's probably pretty
- simple and I've just forgotten).
-
- Hinging on that, it seems apparent that if we go to N = 3, we are
- dealing with normal 3-D volumes, and it's also apparent that the
- two lesser volumes would sum to less than the third. For N = 4,
- we have hypercubes with edges adjacent to the right triangle, and
- it seems sensible that the two lesser 4-D volumes would be even
- smaller than the third. Etc. Is there some way to formalize
- this proof? Is it really a proof?
-
- Assuming this works, there's another corollary thing that seems
- like it would be possible, but I'm less sure of it's existance
- than I am of this approach to Fermat's Last Theorem. That is,
- there may be "right" objects of higher dimension than 2 where
- the sum of the volumes adjacent to the lesser "sides" of the
- object is equal to the volume of the greatest "side". To make
- this clearer, in the case of 2 dimensions, we deal with right
- triangles (which has the fewest sides possible for a polygon),
- with squares adjacent to each edge. If this can be generalized,
- there should exist some kind of 3 dimensional "right tetrahedron"
- (tetrahedron having the fewest faces possible for a polyhedron)
- that has a relationship between the faces similar to the relationship
- between the sides of a right triangle. Say,
- area1^3 + area2^3 + area3^3 = area4^3. Does this really sound
- feasable to someone who isn't an utter layperson like me? If
- so, is it "interesting"? Has it been demonstrated already?
- Does it have any use? Does anyone care?
-
- Any comments, criticisms, etc, are welcome. Just my own little
- shot in the dark....
- --
- Pete Hartman Bradley University pwh@bradley.bradley.edu
- and it seems your eternal reward is to hang out in heaven eternally bored
-
