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If I really had to pick one (and I do!), I would have to pick the Pythagorean theorem. I have a few reasons - including memories of friends giving hour-long proofs of this theorem, memories of high school math, memories of a seven-page paper on Pytagoreas, etc., etc. I guess the main reason is that it's one of the more commonly used theorems, and it comes in handy a lot in geometry - which is where I think I'll end up teaching first.  
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If I really had to pick one (and I do!), I would have to pick the Pythagorean theorem. I have a few reasons - including memories of friends giving hour-long proofs of this theorem, memories of high school math, memories of a seven-page paper on Pytagoreas, etc., etc. I guess the main reason is that (besides right triangles being the sexiest triangles, and thereby making all right-triangle theorems the sexiest theorems) it's one of the more commonly used theorems, and it comes in handy a lot in geometry - which is where I think I'll end up teaching first.  
  
 
Pythagorean Theorem:
 
Pythagorean Theorem:

Latest revision as of 18:02, 31 August 2008

If I really had to pick one (and I do!), I would have to pick the Pythagorean theorem. I have a few reasons - including memories of friends giving hour-long proofs of this theorem, memories of high school math, memories of a seven-page paper on Pytagoreas, etc., etc. I guess the main reason is that (besides right triangles being the sexiest triangles, and thereby making all right-triangle theorems the sexiest theorems) it's one of the more commonly used theorems, and it comes in handy a lot in geometry - which is where I think I'll end up teaching first.

Pythagorean Theorem: $ a^2 + b^2 = c^2 $


  • For some reason, I had a little bit of trouble with getting this to work, so I hope everything went through all right.

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Basic linear algebra uncovers and clarifies very important geometry and algebra.

Dr. Paul Garrett