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References

Introduction Geometry Fractals Fibonacci and Phi Beyond Nature
  1. Campbell, J., & Hayhurst, C. (2015). Euclid: The Father of Geometry. The Rosen Publishing Group, Inc.
  2. Norton, J. D. (2006). Euclidean Geometry the First Great Science. Euclidean Geometry. Retrieved October 20, 2021, from https://sites.pitt.edu/~jdnorton/teaching/HPS_0410/chapters/non_Euclid_Euclid/index.html.
  3. Wolfe, J., & Tyrrel, J. (n.d.). What are fractals? Fractal Foundation. Retrieved October 20, 2021, from https://fractalfoundation.org/resources/what-are-fractals/.
  4. O'Connor, J. J., & Robertson, E. F. (1999). Benoit Mandelbrot - Biography. Maths History. Retrieved October 20, 2021, from https://mathshistory.st-andrews.ac.uk/Biographies/Mandelbrot/.
  5. Debnath, L. (2011). A short history of the Fibonacci and golden numbers with their applications. International Journal of Mathematical Education in Science and Technology, 42(3), 337-367.
  6. Tóth, L. F. (1964). What the bees know and what they do not know. Bulletin of the American Mathematical Society, 70(4), 468-481.
  7. Schattschneider, D. (1992). The Fascination of Tiling. Leonardo, 25(3/4), 341–348. https://doi.org/10.2307/1575860
  8. Fleming, Sir John Ambrose (1902), Waves and Ripples in Water, Air, and Æther: Being a Course of Christmas Lectures Delivered at the Royal Institution of Great Britain, Society for Promoting Christian Knowledge, p. 20.
  9. Ross, C. S. (2014). Shapes in Math, Science and Nature: Squares, Triangles and Circles. United States: Kids Can Press, p. 168.
  10. Stamps, A. E. (2002). Fractals, skylines, nature and beauty. Landscape and urban planning, 60(3), 163-184.
  11. Bunde, A., & Havlin, S. (Eds.). (2013). Fractals in science. Springer.
  12. Spehar, B., Clifford, C. W., Newell, B. R., & Taylor, R. P. (2003). Universal aesthetic of fractals. Computers & Graphics, 27(5), 813-820.
  13. Akhtaruzzaman, M., & Shafie, A. A. (2011). Geometrical substantiation of Phi, the golden ratio and the baroque of nature, architecture, design and engineering. International Journal of Arts, 1(1), 1-22.
  14. Cook, Theodore Andrea (1914). The Curves of Life: Being an Account of Spiral Formations and Their Application to Growth in Nature, to Science and to Art: with the special reference to the manuscripts of Leonardo da Vinci. London: Constable. p. 420. Reprinted 1979, New York: Dover Publications. ISBN 0-486-23701-X.