I wrote a simple fortran program to compute Gauss's constant :

```
program main
implicit none
integer :: i, nit
double precision :: u0, v0, ut, vt
nit=60
u0=1.d0
v0=sqrt(2.d0)
print *,1.d0/u0,1.d0/v0
do i=1,nit
ut=sqrt(u0*v0)
vt=(u0+v0)/2.d0
u0=ut
v0=vt
print *,1.d0/u0,1.d0/v0
enddo
end program main
```

Result is 0.83462684167407308 after 4 iterations. Anyway to have better results using the arithmetico-geometric mean method? How do people compute many digits for numbers such as pi, Euler's constant, and so on ? Does each irrational number has a specific algorithm?