Borwein's algorithm (others)

See Borwein's algorithm for a description of the most prominent and oft-used algorithm.

Other algorithms devised by Jonathan and Peter Borwein to calculate the value of π include the following:

Cubical covergence, 1991:
- Start out by setting
  $a_{0}={\frac {1}{3}}$
  
  $s_{0}={\frac {{\sqrt {3}}-1}{2}}$
- Then iterate
  $r_{k+1}={\frac {3}{1+2(1-s_{k}^{3})^{1/3}}}$
  
  $s_{k+1}={\frac {r_{k+1}-1}{2}}$
  
  $a_{k+1}=r_{k+1}a_{k}-3^{k}(r_{k+1}^{2}-1)$
Then a_k converges cubically against 1/π; that is, each iteration approximately triples the number of correct digits.
Quartical covergence, 1984:
- Start out by setting
  $a_{0}={\sqrt {2}}$
  
  $b_{0}=0$
  
  $p_{0}=2+{\sqrt {2}}$
- Then iterate
  $a_{n+1}={\frac {{\sqrt {a_{n}}}+1/{\sqrt {a_{n}}}}{2}}$
  
  $b_{n+1}={\frac {{\sqrt {a_{n}}}(1+b_{n})}{a_{n}+b_{n}}}$
  
  $p_{n+1}={\frac {p_{n}b_{n+1}(1+a_{n+1})}{1+b_{n+1}}}$
Then p_k converges quartically against π; that is, each iteration approximately quadruples the number of correct digits. The algorithm is not self-correcting; each iteration must be performed with the desired number of correct digits of π.
Quintical covergence:
- Start out by setting
  $a_{0}={\frac {1}{2}}$
  
  $s_{0}=5({\sqrt {5}}-2)$
- Then iterate
  $x_{n+1}={\frac {5}{s_{n}}}-1$
  
  $y_{n+1}=(x_{n+1}-1)^{2}+7$
  
  $z_{n+1}=\left({\frac {1}{2}}x_{n+1}\left(y_{n+1}+{\sqrt {y_{n+1}^{2}-4x_{n+1}^{3}}}\right)\right)^{1/5}$
  
  $s_{m+1}={\frac {25}{(z_{n+1}+x_{n+1}/z_{n+1}+1)^{2}s_{n}}}$
  
  $a_{n+1}=s_{n}^{2}a_{n}-5^{n}\left({\frac {s_{n}^{2}-5}{2}}+{\sqrt {s_{n}(s_{n}^{2}-2s_{n}+5)}}\right)$
Then a_k converges quintically against 1/π (that is, each iteration approximately quintuples the number of correct digits), and the following condition holds:

$0<a_{n}-{\frac {1}{\pi }}<16\cdot 5^{n}\cdot e^{-5^{n}}\pi$