![Fermat's Library on Twitter: "Ramanujan discovered this peculiar way to represent 1/π. https://t.co/nyge5IeqFM" / Twitter Fermat's Library on Twitter: "Ramanujan discovered this peculiar way to represent 1/π. https://t.co/nyge5IeqFM" / Twitter](https://pbs.twimg.com/media/Dkj8_jYWsAEW2d0.jpg)
Fermat's Library on Twitter: "Ramanujan discovered this peculiar way to represent 1/π. https://t.co/nyge5IeqFM" / Twitter
![0027: Part 6, Ramanujan's pi formulas and the hypergeometric function - A Collection of Algebraic Identities 0027: Part 6, Ramanujan's pi formulas and the hypergeometric function - A Collection of Algebraic Identities](https://sites.google.com/site/tpiezas/_/rsrc/1333449015005/0027/%28new%29%20p%20%3D%201.png)
0027: Part 6, Ramanujan's pi formulas and the hypergeometric function - A Collection of Algebraic Identities
![𝐒𝐫𝐢𝐧𝐢𝐯𝐚𝐬𝐚 𝐑𝐚𝐠𝐡𝐚𝐯𝐚 ζ(1/2 + i σₙ )=0 on Twitter: "In the year 1914, Srinivasa Ramanujan published a paper titled 'Modular Equations & Approximations to Pi' in Cambridge journal. In that Ramanujan gave 𝐒𝐫𝐢𝐧𝐢𝐯𝐚𝐬𝐚 𝐑𝐚𝐠𝐡𝐚𝐯𝐚 ζ(1/2 + i σₙ )=0 on Twitter: "In the year 1914, Srinivasa Ramanujan published a paper titled 'Modular Equations & Approximations to Pi' in Cambridge journal. In that Ramanujan gave](https://pbs.twimg.com/media/Ed79AblUMAEXPOs.png)
𝐒𝐫𝐢𝐧𝐢𝐯𝐚𝐬𝐚 𝐑𝐚𝐠𝐡𝐚𝐯𝐚 ζ(1/2 + i σₙ )=0 on Twitter: "In the year 1914, Srinivasa Ramanujan published a paper titled 'Modular Equations & Approximations to Pi' in Cambridge journal. In that Ramanujan gave
![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](https://media.springernature.com/lw685/springer-static/image/art%3A10.1007%2Fs11139-020-00337-z/MediaObjects/11139_2020_337_Figa_HTML.png)
Ramanujan-like formulae for $$\pi $$ and $$1/\pi $$ via Gould–Hsu inverse series relations | SpringerLink
National Geographic India - #DidYouKnow that one of these infinite series was used to calculate pi to more than 17 million digits? This #NationalMathematicsDay, let's celebrate one of the world's greatest mathematicians,
![0027: Part 6, Ramanujan's pi formulas and the hypergeometric function - A Collection of Algebraic Identities 0027: Part 6, Ramanujan's pi formulas and the hypergeometric function - A Collection of Algebraic Identities](https://sites.google.com/site/tpiezas/_/rsrc/1324975111051/0027/borwein%202.png)
0027: Part 6, Ramanujan's pi formulas and the hypergeometric function - A Collection of Algebraic 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](https://media.springernature.com/lw685/springer-static/image/art%3A10.1007%2Fs11139-020-00337-z/MediaObjects/11139_2020_337_Figb_HTML.png)