本研究主要以正三角形作為基本單元,透過窮舉討論得到正三角形邊的作用方式只有五種,再經由排列組合歸納出11 種正三角形密鋪磁磚設計方法。進一步,運用我們的研究結果,配合數學簡報系統製圖,創作新圖樣,也彌補了Escher 在手繪時所造成的誤差,達到完全密鋪的效果。碎形磁磚的部份,我們也依據其背後的數學理論創作幾套結構圖,利用結構解析,碎形密鋪磁磚將變得十分容易,學習者將可輕鬆製作富有創意的新圖樣。 ;This research mainly takes the regular triangle as the basic unit. Through the enumeration, we obtain that there are only five operations for edge of the regular triangle, and then 11 kinds of regular triangle design methods are induced. Even more, utilizing our findings and Mathematical Presentation System (Math PS), we created the new pattern which makes up Escher’s errors and achieves the tiling. As to Fractal Tiling, we create several sets of structure drawings according to its mathematics theory. Using structure analysis, the Fractal Tiling will become extremely simple, and the learner can make the rich creative new pattern easily.
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