Arithmetic Hexagon
Geometry
Level
3
This is an INMO problem, I found a very elegant solution for it in the Internet. So I thought of posting it here,
Does there exists a convex hexagon in the plane whose all interior angles are equal and whose side lengths are 1, 2, 3, 4, 5, 6 in some order.
Yes
No
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1 solution
I didn't write this solution but I find it very elegant