Seminar International Development I” Fractal Time

Gregg Braden: Fractal Time - Create an article based on the secrets of 2012 and the achievements of the New World era

Seminar International Development I - Fractal Time D: 2012 Secret and New World Era (Essay) Student Name Patrick Mukosha Student ID # UD 37975 BMA 46550 Title: The Secret of Our Future Cycle in the Future: Aiming for our greatest potential. The second stage is partially allocated to undergraduate economics and management department of business philosophy by partly achieving degree of business philosophy Expert: strategic business management day: November 2015 Patrick Mukosha fractal time Page 1 Summary ................................................... .. ......................... 3 3 2. Introduction ............ ... ... ... .......................... ... .......... 4 3. Survey results ................................... ........ ........................... 4 4 3.1. About the author ................................................. ............... 5 5 3.2. Extreme Time - Accepting Change ........................... 5 5 3.3. Truth, change and origin ............................................... .. ....... 6 3.4. Earth's journey through orbit ................................... 7 3.5 How to learn from the constant change of today's world Is it? ...... 8 3.7

The latest development of geometry is fractal geometry. Fractal geometry was developed and promoted by Benoit Mandelbrot in his book "Natural Fractal Geometry" published in 1982. Fractal is a self-similar form (invariant to changes in scale) and is a geometric shape with fractional dimensions. As with chaos theory, this is a study of nonlinear systems, fractals are very sensitive to initial conditions, small changes in the initial conditions of the system may make the output of the system significantly different.

An interesting component of chaos theory is a complex image called fractal. There is a close relationship between chaos and fractal. For example, fractal geometry is the geometry that represents the chaotic system we find in nature. Fractal is a way to describe language and shape. Fractal geometry is described in an algorithm which is a series of instructions on how to create a fractal. The computer converts the instructions into patterns we see and calls fractal images. These same chaotic features also apply to mathematics. In order to create an image called a fractal, several equations can be repeated multiple times. Suppose that the two equations contain only one X and Y variable and some constants. When the equation is repeated multiple times, the result is drawn on the computer screen. Immediately, a very complex image (called a fractal) is magnified and the pattern repeats. Fractal shows all chaotic features