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All Journal Journal of Mathematics: Theory and Applications
Kediangan, Ilham Vanka Agustiawan
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Mathematics

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Journal : Journal of Mathematics: Theory and Applications

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Design 3D Wallpaper Motifs from Sierpinski Carpet Fractals Using Mathematica Applications Kediangan, Ilham Vanka Agustiawan; Zakaria, La; Sutrisno, Agus
Journal of Mathematics: Theory and Applications Vol 6 No 2 (2024)
Publisher : Program Studi Matematika Universitas Sulawesi Barat

Show Abstract | Download Original | Original Source | Check in Google Scholar | DOI: 10.31605/jomta.v6i2.3569

Abstract

The development of geometric studies is very rapid, including fractal geometry. A fractal is a geometric shape that fulfills the properties of the fractal dimension. If you look at a fractal at first glance, it has an irregular shape, but if you look further, there is a regularity. One of the properties of fractals is self-similarity which occurs when a fractal is enlarged. The fractal form has a pattern obtained from iterating a function with infinite repetition. Among the fractal shapes there is the Sierpinski carpet shape. Fractals in 2D form can be transformed using geometric concepts into 3D fractals. Fractal shapes can be applied for cultural development, namely to form wallpaper motifs. Fractal geometric motifs are obtained from iterating a function with the help of Wolframe Mathematica.
Co-Authors Sutrisno, Agus Zakaria, La