Object-oriented continued fractions with Python.
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Updated
Oct 26, 2024 - Python
Object-oriented continued fractions with Python.
A visualization for the irrationality of pi by rendering r(θ) = e^θi + e^πθi using 2 pendulums and demonstrating pi's irrationality through the fact that the pendulum never repeats the same path.
Numbers that produce accurate results when used as arguments to trigonometric functions
The following is a brief analysis of "XYX" patterns, within natural constants that also happen to be irrational numbers (some are trascendental numbers). La versión en español de los archivos no tiene el sufijo _ENG.
Generate any a-by-( b + c ) finite rectangle SVG containing potentially Infinitely many a-by-( 2 * b ) finite rectangles animated along a number line of ( ( c - b ) / a )^n scale symmetry.
Small project about finding "nerdy anniversaries". E.g. after 3.1415... years one could celebrate the π-th anniversary.
A sequence of digits that never ends and never exhibits any clear patterns, is scratchy for any questioning mind. The main question in regard to this project is: Are there patterns in the digits of irrational numbers? PI laboratory is a scanner that tries to show patterns in the digits of irrational numbers, in a graphical manner.
The Golden Ratio (why it is so irrational) - Numberphile : https://www.youtube.com/watch?v=sj8Sg8qnjOg
Notes: "A 3SUM algorithm on the binary addition level of atomic generated real numbers" , id: notes_000X, Notes
A variety of tasks completed using Jupyter Notebook.
An generic-types Math<T> and Real numeric library for .NETCore 3.1/5.0
A brand-new compression algorithm using the Pi number
Make expressions like 2π behave as irrational numbers in Julia
A formal proof of the irrationality of sqrt(2) written in lean
Código capaz de aproximarse a determinados numeros irracionales a través de métodos probabilísticos.
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