Fibonacci, Sierpinski, and Pascal:
Enter the World of Mathematics!
Abstract:
The world and nature are not complete without a logical explanation, particularly in patterns that happen among them. As mathematicians begin to notice this aspect, they must conduct logical reasoning to portray the true explanation as to why something happened. Whether it be an equation, a lecture, or a theory presented by these renowned mathematicians, they've contributed much to the process that allowed the future to continue off from where they started. In-depth analysts state th
at many mathematicians have used formulas to express the infinite state of these sequences. These specific sequences are called fractals. Students are expected to explore these sequences and the mathematicians that contributed to these fractals; Fibonacci, Sierpinski, and Pascal.
Introduction
Greetings and welcome! Within this wiki, you will find all sorts of information based on the subject of Fibonacci, Sierpinski, and Pascal and their contributions to mathematics. You will explore the great minds of these geniuses, relation to fractals, and devoted studies and theories produced. We humbly greet you to our website as you enter the world of mathematics!
P.S. Feel free to comment on multiple reviewed pages, but we may kindly ask you not to use profane language! Thank you!
The members of our team are: Mohamad Omais, Michael Makled, Yara Fakhoury and Heba Basha.
Job Descriptions:
_Michael Makled was responsible of the biography of Pascal including a picture and the correct dates. He is also responsible of of Pascal's Triangle Patterns and explanations 4 patterns (one is the odd number pattern).
_Yara Fakhoury is responsible for the biography of Fibonacci including a picture and the correct dates. She is also responsible of the Fibonacci's relationship to the "Golden Ratio" pattern and explanation.
_Mohamad Omais is responsible for the Sierpinski's Triangle Program / Output
_Heba Basha is responsible for the biography of Sierpinski including a picture and the correct dates, Sierpinski's Triangle Iterations, including the GPS worksheet summary, the first four stages of Sierpinski's Triangle, and most of the 3-D Model.
The 3-D Model of Sierpenski's Triangles was done by the conversion the the group's hard work and effort.
Comments (0)
You don't have permission to comment on this page.