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Favourite Geometry Theorem. (1 Viewer)
- Thread starter HappyFeet
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watatank
=)
wtf is that?
LoneShadow
Uber Procrastinator
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The simplest and the best: Pythagoras Theorem
vulgarfraction
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Sif you'd ever use Desargues. Even if there was a situation where you could you'd never be able to pick it out.
Current favourite is power of a point/radical axis, just because it's so useful.
Current favourite is power of a point/radical axis, just because it's so useful.
Captain Gh3y
Rhinorhondothackasaurus
Napoleon's Theorem 
Personally, I think Desargue's is quite cool and i have only ever used it once, so its pretty rare. here is the problem.
ABC is a non-isosceles triangle with incenter I. The smaller circle through I tangent to CA and CB meets the smaller circle through I tangent to BC and BA at A' (and I). B' and C' are defined similarly. Show that the circumcenters of AIA', BIB' and CIC' are collinear.
ABC is a non-isosceles triangle with incenter I. The smaller circle through I tangent to CA and CB meets the smaller circle through I tangent to BC and BA at A' (and I). B' and C' are defined similarly. Show that the circumcenters of AIA', BIB' and CIC' are collinear.