Counting all equilateral triangles in 0,1,2,...,n3
Abstract
We describe a procedure of counting all equilateral triangles in the three dimensional space whose coordinates are allowed only in the set \0,1,...,n\. This sequence is denoted here by ET(n) and it has the entry A102698 in "The On-Line Encyclopedia of Integer Sequences". The procedure is implemented in Maple and its main idea is based on the results in eji. Using this we calculated the values ET(n) for n=1..55 which are included here. Some facts and conjectures about this sequence are stated. The main of them is that n ∞ ET(n) n+1 exists.
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