A tridimensional pseudo-random walk defined by means of 'pi': 3.141592... -100.000 digits, -base 10- into 050330... -128.508 digits, base 6- (Une pseudo-marche aleatoire tridimensionnelle definie a l'aide de 'pi': 3.141592... -100.000 chiffres, -base 10- en 050330... -128.508 chiffres, base 6-) {a chapter of 'Mathematics - A Virtual Instrument For Exploring Space Time And Beyond'}

A tridimensional pseudo-random walk defined by means of 'pi': 3.141592... -100.000 digits, -base 10- into 050330... -128.508 digits, base 6- [Une pseudo-marche aléatoire tridimensionnelle définie à l'aide de 'pi': 3.141592... -100.000 chiffres, -base 10- en 050330... -128.508 chiffres, base 6-].

Each digit N -base 6- defines the current step of an "absolute" tridimensional random walk:

                    digit=0 ==> move(+1,0,0)
                    digit=1 ==> move(-1,0,0)
                    digit=2 ==> move(0,+1,0)
                    digit=3 ==> move(0,-1,0)
                    digit=4 ==> move(0,0,+1)
                    digit=5 ==> move(0,0,-1)

The coordinates {X,Y,Z} are renormalized as follows:

                    [+0.4014,+0.7686]x[-0.1035,+0.6258]x[-0.0986,+0.6664] --> [0.1,0.9]x[0.1,0.9]x[0.1,0.9]

See some famous real numbers (possibly including this one):

A tridimensional pseudo-random walk defined by means of the Champernowne number -using all base 10 integer numbers-: 0.1 2 3 4 5 6 7 8 9 10 11 12 13... -113.894 digits, base 10- converted into 146.363 digits 042355... -base 6-

A tridimensional pseudo-random walk defined by means of 'e': 2.718281... -100.000 digits, base 10- into 415052... -128.508 digits, base 6-

A tridimensional pseudo-random walk defined by means of 'phi' -the golden ratio-: 1.618033... -100.000 digits, base 10- into 341254... -128.508 digits, -base 6-

A tridimensional pseudo-random walk defined by means of 'pi': 3.141592... -100.000 digits, -base 10- into 050330... -128.508 digits, base 6-

A tridimensional pseudo-random walk defined by means of the square root of 2: 1.414213... -100.000 digits, -base 10- into 225245... -128.508 digits, base 6-

See a random number:

A tridimensional pseudo-random walk defined by means of a random number: 145350... -130.643 digits, -base 6- into 145350... -130.643 digits, base 6-

See a tridimensional brownian motion:

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Copyright © Jean-François COLONNA, 2014-2026. Copyright © CMAP (Centre de Mathématiques APpliquées) UMR CNRS 7641 / École polytechnique, Institut Polytechnique de Paris, 2014-2026.

Copyright © Jean-François COLONNA, 2014-2026.
Copyright © CMAP (Centre de Mathématiques APpliquées) UMR CNRS 7641 / École polytechnique, Institut Polytechnique de Paris, 2014-2026.