Napoleon's Problem
Nov. 12th, 2022 01:30 pm![[personal profile]](https://www.dreamwidth.org/img/silk/identity/user.png){kind=small}
sdiI've been having quite a lot of fun playing with geometric constructions lately, and I have another one for you all today: a solution to Napoleon's Problem (that is, inscribing a square in a given circle using only a pair of compasses).
It's a famously tricky problem, and to be honest, I came up with this solution by accident while exploring something else. Nonetheless, I suspect this solution—involving six circles—is the simplest one possible, but I haven't managed to prove it yet.
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Date: 2022-11-12 10:18 pm (UTC)no subject
Date: 2022-11-12 10:33 pm (UTC)I suppose I should thank you as well, given that turning one of your constructions into SVG is what reintroduced me to this whole field of study!
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Date: 2022-11-12 11:30 pm (UTC)no subject
Date: 2022-11-16 01:22 am (UTC)It's not a very elegant proof, but I wrote a computer program to search for all possible geometric constructions involving six or less circles, and unless there's a bug in the program, six circles is indeed the best one can do.
What's more, my program found a nicer construction than I did:
It has the merit of being more symmetrical than mine was, and producing three squares instead of just two. ;)