Go with basic and simple purpose, conducting similarity and virable options which is callled EVOLUTION.
I do like it, from the smoothly math to the real change of the world around us. Similarity is not only a Math but sharing the same vision on physics, from Newton, to Einstein, to the parallel universe.

以分形理論來說，fractal could be found in everywhere
那么時候地球所在的太陽系甚至銀河系也是茫茫宇宙的某個分形中的一只branch？
神奇

The film is about fractal geometry. Someone calls fractal geometry 'the natural dynamics of everything' (a video title, 2011, available at https://www.youtube.com/watch?v=yUM7e0tIFi0). Why? Because it explains the shapes of everything in the nature: why the British coastline looks like that, why mountains looks like that, why the trees look like that, why the vessels in the body look like that, ect., etc..
Fractal geometry was invented by Benoit Mandelbrot from 1950. In general, it is a combination of classical geometry (coined by Euclid) and algorithm. The most famous fractal - The Mandelbrot Set - derives from a circle and a generating function 'f(z) = z^2 + c'. (For more knowledge, visit http://mathworld.wolfram.com/MandelbrotSet.html)

曼德爾布洛特集
科赫雪花
分形應用
用于探知為何體積越大單位所需能量越少，即E=M的3/4方。
用于解決無線通訊中如藍牙、無線通訊、wifi等需要單獨頻率但避免多個天線的應用
用于檢測心臟健康。
三年前看過的紀錄片，這是我——一個理科不好的同學對于自然科學最后的反撲，因為硬想要深刻所以覺得這部顯得平淡，其實放開了心態(tài)看的話，就只要坐著感嘆好美啊好美啊好奇妙啊就可以了，科學原理乃至現(xiàn)實應用不妨交給科學家們來做。

Loren Carpenter (visualize)-> what the planes might look like in flight.
Fractals - Form, Chance, and Dimension by Benoit Mandelbrot
It's one of the keys to fractal geometry call iteration in mathematicians.
First Mountain and then "Star Trek II" the Wrath of khan.
Self-similarity always zoom in and out the object look the same.
People like the great 19th century Japanese artist Katsushika Hokusai
the mystery of the monsters, a story really begins in later 19 century, Georg Cantor (German)
Created first monsters in 1883, call " Cantor Set."
Another by the Swedish Helge Von Koch, one of the classical Euclidean geometric figures.
in the 1940s, British Scientist Lewis Richardson,
Koch Curve he wrote a very famous article i Science Magazine called " How Long is the Coastline of British."
Dimension
French Gaston Julia
Mandelbrot in IBM

《尋找隱秘的維度》Hunting The Hidden Dimension 觀后感
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