Kites - 2
A short addition to this post:
Question: It is not hard to see that there can be infinitely many kites with the same area and perimeter. So, is it possible to tile the plane without gaps with mutually non-congruent kites all of the same area and perimeter?
Aspects of non-congruent equiparition have been dealt with in many papers by experts. Some pointers are here and linked pages.
One can ask other variants of this question with say, area-diameter as the quantities shared by the kites.
And what about mutually non-congruent parallelograms/ trapeziums of equal area and perimeter?
Hope to add to this post soon.
Question: It is not hard to see that there can be infinitely many kites with the same area and perimeter. So, is it possible to tile the plane without gaps with mutually non-congruent kites all of the same area and perimeter?
Aspects of non-congruent equiparition have been dealt with in many papers by experts. Some pointers are here and linked pages.
One can ask other variants of this question with say, area-diameter as the quantities shared by the kites.
And what about mutually non-congruent parallelograms/ trapeziums of equal area and perimeter?
Hope to add to this post soon.
posted by R.Nandakumar @ 1:17 AM
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