Modul 35 Teil 9 1 | 2 | 3 | 4 | 5 | 6 | 7 | 8 | 10 | 11 | 12 | 13 | Literatur Module

Curlicue-Variationen Polygonmuster in der Gaußschen Zahlenebene

 
 

$\parbox{7.5cm}{\epsfxsize=6.cm\epsfbox{samml_dekm128}\\$n=1200,\varphi(i)=d_m(i),x=\frac{1}{128}$ }$

$\parbox{8cm}{\epsfxsize=6.cm\epsfbox{samml_dekm128_2}\\$n=180,\varphi(i)=d_m(i),x=\frac{1}{128}$ }$

$\parbox{7.5cm}{\epsfxsize=6.cm\epsfbox{samml_dekm64}\\$n=1200,\varphi(i)=d_m(i),x=\frac{1}{64}$ }$

$\parbox{8cm}{\epsfxsize=6.cm\epsfbox{samml_dekm64_2}\\$k=50\ldots 400,\varphi(i)=d_m(i),x=\frac{1}{64}$ }$

$\parbox{7.5cm}{\epsfxsize=6.cm\epsfbox{samml_dekm255}\\$n=64,\varphi(i)=d_m(i),x=\frac{1}{255}$ }$

$\parbox{8cm}{\epsfxsize=6.cm\epsfbox{samml_dekm254}\\$n=200,\varphi(i)=d_m(i),x=\frac{1}{254}$ }$

$\parbox{7.5cm}{\epsfxsize=5.8cm\epsfbox{samml_dekm3h7}\\$n=1400,\varphi(i)=d_m(i),x=\frac{1}{3^7}$\\[23,24]}$

$\parbox{8cm}{\epsfxsize=6.cm\epsfbox{samml_dekm3h7_2}\\$n=600,\varphi(i)=d_m(i),x=\frac{1}{3^7}$ }$

$\parbox{8cm}{\epsfxsize=5.8cm\epsfbox{samml_dekm3h8}\\$n=1400,\varphi(i)=d_m(i),x=\frac{1}{3^8}$\\-Hulud, the sandworm of Dune[25,26]}$

$\parbox{8cm}{\epsfxsize=6.cm\epsfbox{samml_dekm3h8_2}\\$n=800,\varphi(i)=d_m(i),x=\frac{1}{3^8}$ }$

$\parbox{7.5cm}{\epsfxsize=5.8cm\epsfbox{samml_dekm17h3}\\$n=1200,\varphi(i)=d_m(i),x=\frac{1}{17^3}$\\}$

$\parbox{8cm}{\epsfxsize=6.cm\epsfbox{samml_dekm17h3_2}\\$n=600,\varphi(i)=d_m(i),x=\frac{1}{17^3}$ }$

$\parbox{14.5cm}{\epsfxsize=14cm\epsfbox{samml_dekm17h3_3}\\$n=2000,\varphi(i)=d_m(i),x=\frac{1}{17^3}$\\}$

$\parbox{7.5cm}{\epsfxsize=6cm\epsfbox{samml_mod127_13_59}\\$n=2000,\varphi(i)=(13i+59)\mbox{mod}127,x=\pi^\pi$ }$

$\parbox{8cm}{\epsfxsize=6.cm\epsfbox{samml_mod127_13_59_2}\\$n=520,\varphi(i)=(13i+59)\mbox{mod}127,x=\pi^\pi$ }$

(Sto), (Schö)

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