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

Curlicue-Variationen Polygonmuster in der Gaußschen Zahlenebene

 
 

$\parbox{7.5cm}{\epsfxsize=6cm\epsfbox{samml_mod666_7_47_kette}\\ ......}+\frac{\,65\,\vert}{\vert\,256\,}+\frac{\,257\,\vert}{\vert\,1024\,}+\ldots$ }$

$\parbox{8cm}{\epsfxsize=6.cm\epsfbox{samml_kette}\\$n=2000,\var......}+\frac{\,65\,\vert}{\vert\,256\,}+\frac{\,257\,\vert}{\vert\,1024\,}+\ldots$ }$

$\parbox{7.5cm}{\epsfxsize=6cm\epsfbox{samml_mod111_7_47_kette2}\\ ......}+\frac{\,63\,\vert}{\vert\,254\,}+\frac{\,255\,\vert}{\vert\,1022\,}+\ldots$ }$

$\parbox{8cm}{\epsfxsize=6.cm\epsfbox{samml_mod99_7_47_kette2}\\......}+\frac{\,63\,\vert}{\vert\,254\,}+\frac{\,255\,\vert}{\vert\,1022\,}+\ldots$ }$

$\parbox{7.5cm}{\epsfxsize=6cm\epsfbox{samml_mod88_7_47_kette2}\\ ......}+\frac{\,63\,\vert}{\vert\,254\,}+\frac{\,255\,\vert}{\vert\,1022\,}+\ldots$ }$

$\parbox{8cm}{\epsfxsize=6.cm\epsfbox{samml_mod77_7_47_kette2}\\......}+\frac{\,63\,\vert}{\vert\,254\,}+\frac{\,255\,\vert}{\vert\,1022\,}+\ldots$ }$

$\parbox{7.5cm}{\epsfxsize=6cm\epsfbox{samml_mod66_7_47_kette2}\\ ......}+\frac{\,63\,\vert}{\vert\,254\,}+\frac{\,255\,\vert}{\vert\,1022\,}+\ldots$ }$

$\parbox{7.5cm}{\epsfxsize=6cm\epsfbox{samml_mod44_7_47_kette2}\\ ......}+\frac{\,63\,\vert}{\vert\,254\,}+\frac{\,255\,\vert}{\vert\,1022\,}+\ldots$ }$

$\parbox{8cm}{\epsfxsize=6.cm\epsfbox{samml_mod33_7_47_kette2}\\......}+\frac{\,63\,\vert}{\vert\,254\,}+\frac{\,255\,\vert}{\vert\,1022\,}+\ldots$ }$

$\parbox{7.5cm}{\epsfxsize=6cm\epsfbox{samml_mod42_7_47_kette2}\\ ......}+\frac{\,63\,\vert}{\vert\,254\,}+\frac{\,255\,\vert}{\vert\,1022\,}+\ldots$ }$

$\parbox{8cm}{\epsfxsize=6.cm\epsfbox{samml_mod42_7_47_kette2_2}\\ ......}+\frac{\,63\,\vert}{\vert\,254\,}+\frac{\,255\,\vert}{\vert\,1022\,}+\ldots$ }$

$\parbox{7.5cm}{\epsfxsize=6cm\epsfbox{samml_mod42_7_47_1t4}\\$n=90,\varphi(i)=(7i+47)\mbox{mod}42,x=\frac{1}{42}$ }$

$\parbox{8cm}{\epsfxsize=6.cm\epsfbox{samml_mod163_7_47_1t4}\\$n=2000,\varphi(i)=(7i+47)\mbox{mod}163,x=\frac{1}{42}$ }$

$\parbox{7.5cm}{\epsfxsize=6cm\epsfbox{samml_mod33_7_47_1t4}\\$n=400,\varphi(i)=(7i+47)\mbox{mod}33,x=\frac{1}{42}$ }$

$\parbox{8cm}{\epsfxsize=6.cm\epsfbox{samml_mod111_7_47_1t4}\\$n=1700,\varphi(i)=(7i+47)\mbox{mod}111,x=\frac{1}{42}$ }$

(Sto), (Schö)

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