0016: Article 6 (Ramanujan's Pi formulas) - A Collection of Algebraic Identities
python 3.x - Estimating value of 1/pi using Ramajunam equation, returning wrong value when comparing with (1/math.pi) - Stack Overflow
![PDF] On the elegance of Ramanujan's series for $\pi$ | Semantic Scholar](https://d3i71xaburhd42.cloudfront.net/18b60f85d381d093d696660cff44f90145509dfa/6-Table1-1.png "PDF] On the elegance of Ramanujan's series for $\pi$ | Semantic Scholar")
PDF] On the elegance of Ramanujan's series for $\pi$ | Semantic Scholar
円周率π The Ramanujan Pi Formula+1000digits #002|デザインTシャツ通販【Tシャツトリニティ】
A monstrous formula : Ramanujan's approximation of pi — Steemit
Who Was Ramanujan? | Mathematics, Start writing, Writing
Tamás Görbe on Twitter: "@fermatslibrary This is the Ramanujan-Sato series found by Ramanujan in 1910. It computes a further 8 decimal places of π with each term in the series. The first
0019: Article 9 (More Pi Formulas) - A Collection of Algebraic Identities
Fermat's Library on Twitter: "Ramanujan discovered this peculiar way to represent 1/π. https://t.co/nyge5IeqFM" / Twitter
Ramanujan, the Man who Saw the Number Pi in Dreams | OpenMind
Ramanujan's Magnificent Formula for Pi: 9801/(1103√8)=π | by Sunny Labh | Cantor's Paradise
Solved Ramanujan's sum of 1/pi The goal of this project is | Chegg.com
Solved Ramanujan's Formula for Pi First found by Ramanujan. | Chegg.com
Ramanujan's Magnificent Formula for Pi: 9801/(1103√8)=π | by Sunny Labh | Cantor's Paradise
![PDF] Ramanujan-like series for $1/\pi^2$ and String Theory | Semantic Scholar](https://d3i71xaburhd42.cloudfront.net/dabc4205b47ef55da19a4b477624966d3a613340/10-Table3-1.png "PDF] Ramanujan-like series for $1/\pi^2$ and String Theory | Semantic Scholar")
PDF] Ramanujan-like series for $1/\pi^2$ and String Theory | Semantic Scholar
How accurate is Ramanujan's PI series? - Quora
Ramanujan's Strange Formula for Pi - Wolfram Demonstrations Project
Joseph T Noony on Twitter: "Ramanujan's formula and its variants are today used by supercomputer algorithms for calculating pi correct to millions of decimals of accuracy! What a true genius he was
Ramanujan: The Patron Saint of Pi Explorers – Bhāvanā
Ramanujan: He who had the Pi & ate it too! | The Crooked Pencil
Ramanujan–Sato series - Wikipedia
Ramanujan's Identities
Ramanujan-like formulae for $$\pi $$ and $$1/\pi $$ via Gould–Hsu inverse series relations | SpringerLink
Ramanujan-like formulae for $$\pi $$ and $$1/\pi $$ via Gould–Hsu inverse series relations | SpringerLink
0027: Part 6, Ramanujan's pi formulas and the hypergeometric function - A Collection of Algebraic Identities
PDF) A method for proving Ramanujan series for 1/π
