From combinatorial geometry, the number of lattice points strictly inside an equilateral triangle of side length $n$ (in unit triangles) is approximately $\frac(n-1)^22$, but a known formula for a large equilateral triangle of side $n$ with integer vertices and area $\frac{\sqrt3}4n^2$ is:

From combinatorial geometry, the number of lattice points strictly inside an equilateral triangle of side length $n$ (in unit triangles) is approximately $\frac(n-1)^22$, but a known formula for a large equilateral triangle of side $n$ with integer vertices and area $\frac{\sqrt3}4n^2$ is: - Dyverse

📅 March 9, 2026 👤 scraface

Mar 09, 2026

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