Recent snippets posted on Snipplr.com https://snipplr.com/ Tue, 09 Jun 2026 20:34:04 +0000 https://snipplr.com/view/48402/advanced-pi-approximation <p>Referencing the Machin-like formula in the linked reddit comment. Should be as exact as Scheme allows.</p> Fri, 04 Feb 2011 17:21:10 UTC https://snipplr.com/view/48402/advanced-pi-approximation https://snipplr.com/view/48330/shorter-pi-approximation <p>#72 at the URL</p> Thu, 03 Feb 2011 14:59:35 UTC https://snipplr.com/view/48330/shorter-pi-approximation https://snipplr.com/view/48328/pi-approximation-in-scheme <p>Based on the pi approximation (100 - ((2125^3 + 214^3 + 30^3 + 37^2)/(82^5)))^(1/4), referenced in equation 57 at the referenced URL.</p> Thu, 03 Feb 2011 14:44:34 UTC https://snipplr.com/view/48328/pi-approximation-in-scheme