noun a series of numbers in which each number (Fibonacci number) is the sum of the two preceding ones, typically starting with 0 and 1.
The Fibonacci series is a sequence of numbers where each number is the sum of the two preceding ones, starting from 0 and 1. It is used in various mathematical applications such as number theory, geometry, and algebra.
In finance, the Fibonacci series is sometimes used in technical analysis to predict potential levels of support and resistance in stock prices. Traders may use Fibonacci retracement levels to make decisions about buying or selling assets.
In computer science, the Fibonacci series is often used as an example in programming tutorials to demonstrate recursion and dynamic programming techniques. It can also be used in algorithms for tasks like optimizing code execution or generating random num
The Fibonacci series is closely related to the golden ratio, a mathematical concept that is believed to result in aesthetically pleasing proportions. Artists and designers may use the Fibonacci series to create visually appealing compositions in various f
Writers may use the Fibonacci series in their writing to create patterns or structures within their work, such as in the organization of chapters or sections.
Psychologists may use the Fibonacci series in their research or therapy techniques to explore patterns in human behavior or cognitive processes.
Architects may use the Fibonacci series in the design of buildings or structures to create aesthetically pleasing proportions or layouts.
Financial analysts may use the Fibonacci series in technical analysis of stock prices or market trends to identify potential price levels or patterns.
Graphic designers may use the Fibonacci series in the layout or composition of visual elements to create visually appealing designs.