The method is based on the individual work of Carl Friedrich Gauss (1777 - 1855) and Adrien-Marie Legendre (1752-1833) combined with modern algorithms for multiplication and square roots. It repeatedly replaces two numbers by their arithmetic and geometric mean, in order to approximate their arithmetic-geometric mean.
The version presented below is also known as the Salamin-Brent algorithm; it was independently discovered in 1976 by Eugene Salamin[?] and Richard Brent[?]. It was used to compute the first 206,158,430,000 decimal digits of Pi on September 18 to 20, 1999, and the results were checked with Borwein's algorithm.
1. Initial value setting;
2. Repeat the following instructins until the difference of a and b is within the desired accuracy:
3. Pi is approximated with a, b and t as:
The algorithm has second order convergent nature, which essentially means that the number of correct digits doubles with each step of the algorithm.
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