A Novel Sixth-Root–Factorial Series Approximation for π Derived from (31)^(1/6)
DOI:
https://doi.org/10.63056/Keywords:
analytical approximation, mathematical constant π, sixth root of 31, convergent factorial-based infinite series, π-approximation, radical expressionsAbstract
In this paper, we present a new analytical approximation for the mathematical constant π, derived from an unconventional relationship involving the sixth root of 31 and a rapidly convergent factorial-based infinite series. Starting from the equation
⁶(31)^(1/6) = √π + ∑(k = 1 to ∞) [ k / (8k)! ] − 1/9801,
we algebraically isolate √π and obtain an explicit symbolic expression for π. The proposed formulation combines radical expressions with a highly convergent factorial series, ensuring fast numerical stability and computational efficiency. A step-by-step derivation is provided, followed by numerical evaluation demonstrating that the resulting approximation yields π ≈ 3.14187, which is remarkably close to the accepted value of π ≈ 3.14159. The small deviation arises primarily from truncation of the infinite series, indicating that higher-order terms can further enhance accuracy. This work highlights a novel pathway for π-approximation, distinct from classical geometric, trigonometric, and Ramanujan-type series, and contributes to ongoing research in number theory and mathematical constants. The proposed method enriches the landscape of π-approximations and opens new directions for exploring factorial-series structures linked with radical expressions.
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Copyright (c) 2025 Dr.Fazal Rehman, Dhan Bir Limbu (Author)
This work is licensed under a Creative Commons Attribution 4.0 International License.
