The given task for group project were as follows:
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Write an introduction to fractals
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Select either one of the following fractals (refer to table below): Sierpinski Gasket Sierpinski Carpet Sierpinski Pentagon Heighway Dragon McWorter Pentigree Koch Curve Koch Snowflake Levy Dragon Pentadentrite *(In this project we choose Sierpinski Carpet for basic knowledge about fractal)
For the selected fractal, provide: a geometric description of how the fractal is constructed; show the calculation (algorithm) the IFS transformations, the code for generating the fractal via a Lindenmayer system (L-system), the similarity dimension of the fractal, special properties and interesting facts about the fractals, and references.
- Produce your own fractals. Give a name, and provide information as above. Demonstrate its construction using animation and maplet interface if possible. *(In this project we do a fractal that seems like fish shape and by using graphical user interface in Matlab)
For further additional info you can refer to Group Project Matrix Theory.pdf