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. PI, e, Ratio, or Sqrt(2) are some of the numbers taken into consideration. Each sequence of digits has a length of 10,000 digits. The application treats these sequences of digits as signals. The heatmap shown in the graphical interface represents a transition matrix in which the probability of transition between digits is signified by colors. Bright red is 1 and black is 0. Below the heatmap is a graph showing the frequency of digits (0-9) in a sliding window above the sequence of digits. Below the last graph is another graph showing the frequency of digits on all processe 6E73 d sliding windows. This is important as it appears that the frequencies of the digits increase one by one, in the sense that the frequency of one digit has a steep increase and the frequency of other digits remain temporarily unchanged, after a while the frequency of another digit increases and the others remain unchanged, and so on. There's a lot to be said for this irrational number scanner. For this reason, I believe that full functionality can be seen by studying the source code.
- Paul A. Gagniuc. Algorithms in Bioinformatics: Theory and Implementation. John Wiley & Sons, Hoboken, NJ, USA, 2021, ISBN: 9781119697961.