Background. The number π is transcendental: its positional expansion in any integer base is infinite and nonperiodic. It is conventionally assumed that no base reveals structural features in the digits of π. Result. In base 60 — the order of A₅, the rotation group of the regular dodecahedron - the expansion π = 3; 8, 29, 44, 0, 47, 25, 53,. . . exhibits a vanishing coefficient at the fourth fractional position. The three-digit truncation 3;8, 29, 44 approximates π to 6. 1 × 10⁻⁸ (one part in 16. 4 million). The truncation scale is 60⁴ = 12, 960, 000. Uniqueness. A comparative analysis of 27 fundamental mathematical constants (e, φ, √2, √3, √5, γ, ζ (3), ln 2, and others) reveals that π is the only constant with a direct connection to rotational geometry whose base-60 expansion contains a zero within the first six fractional positions. Algebraic framework. The factorial hierarchy Dₙ = (n+1) !/2 generates D₃ = 12 (faces of the dodecahedron), D₄ = 60 (|A₅|, the base), and D₅ = 360 (full rotation in degrees) as three consecutive levels of a single structure. Additionally, the fractional parts of φ and π/5 share the same leading sexagesimal digit (37), providing an arithmetic realization of the identity cos (π/5) = φ/2. Significance. These observations collectively identify base 60 as a structurally distinguished base for π, linking the constant of continuous rotation to the arithmetic of the largest exceptional finite rotation group in three dimensions.
Moss Eva (Sat,) studied this question.