Benutzer:RokerHRO/Spielwiese

Test für eine Benutzervorlage :-)

Achtung: Dieser Artikel enthält zu viele Bausteine. Bitte prüfe, ob nicht einige (oder alle) davon entfernt werden können.

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Ich habe eine Vorlage für Tastatureingaben gemacht. Man drücke einfach Ctrl + Q.

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Willkommen bei Wikipedia, der freien Enzyklopädie! Sie haben die Bearbeiten-Funktion entdeckt. Leider noch nicht das Strafrecht. Als Bewohner von Deutschland, Österreich oder der Schweiz sind Sie an das jeweilige Strafrecht gebunden. Ihr Verhalten hat definitiv gegen dieses verstoßen. Gegen Sie kann Anzeige erstattet werden, worauf es zu einer Anklage und Verurteilung kommen kann. Wir ersuchen Sie in Ihrem eigenen Interesse, keine weiteren Bearbeitungen zu verüben. Sollten Sie Rückfragen haben, stehen Ihnen unsere Anfragestelle WP:FZW, bzw. unter E-Mail info-de@wikimedia.org zur Verfügung. Sie werden von mir und anderen Mitarbeitern beobachtet! Mit freundlichen Grüßen, ~~~~

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Nettes Bild von/für arrogante, löschwütige Wikipedia-Admins:

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${\displaystyle xyz\ {}_{\overrightarrow {{}^{123}}}\ abc}$

Für ${\displaystyle \textstyle {2 \choose 3}}$ gilt ${\displaystyle {2 \choose 3}}$. :-)

Ebenso ${\displaystyle \textstyle {\begin{pmatrix}x&y\\z&v\end{pmatrix}}\neq {\begin{pmatrix}x&y\\z&v\end{pmatrix}}}$

[0] :

${\displaystyle \xi _{0}:={\frac {1}{2}}}$

[1] :

${\displaystyle \xi _{1}:={\frac {2\cdot {1 \choose 1}\cdot {2 \choose 1}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}{\sqrt {1+{\frac {2}{1}}}}}}$

[2] :

${\displaystyle \xi _{2}:={\frac {2\cdot {1 \choose 1}\cdot {2 \choose 1}\cdot {\frac {1+{\sqrt {2+{\frac {2}{1}}}}}{\sqrt {2\cdot {1 \choose 2}\cdot {5 \choose 2}\cdot {17 \choose 2}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}\cdot {\sqrt {2+{\frac {2}{1}}}}}}}}{\sqrt {1+{\frac {\sqrt {2+{\frac {2}{1}}}}{2\cdot {1 \choose 2}\cdot {5 \choose 2}\cdot {17 \choose 2}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}}}$

[3] :

${\displaystyle \xi _{3}:={\frac {2\cdot {1 \choose 1}\cdot {2 \choose 1}\cdot {\frac {1+{\sqrt {2+{\frac {\sqrt {3+{\frac {2}{1}}}}{2\cdot {1 \choose 3}\cdot {10 \choose 3}\cdot {37 \choose 3}\cdot {82 \choose 3}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}}{\sqrt {2\cdot {1 \choose 2}\cdot {5 \choose 2}\cdot {17 \choose 2}\cdot {\frac {1+{\sqrt {3+{\frac {2}{1}}}}}{\sqrt {2\cdot {1 \choose 3}\cdot {10 \choose 3}\cdot {37 \choose 3}\cdot {82 \choose 3}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}\cdot {\sqrt {3+{\frac {2}{1}}}}}}}\cdot {\sqrt {2+{\frac {\sqrt {3+{\frac {2}{1}}}}{2\cdot {1 \choose 3}\cdot {10 \choose 3}\cdot {37 \choose 3}\cdot {82 \choose 3}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}}}}}{\sqrt {1+{\frac {\sqrt {2+{\frac {\sqrt {3+{\frac {2}{1}}}}{2\cdot {1 \choose 3}\cdot {10 \choose 3}\cdot {37 \choose 3}\cdot {82 \choose 3}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}{2\cdot {1 \choose 2}\cdot {5 \choose 2}\cdot {17 \choose 2}\cdot {\frac {1+{\sqrt {3+{\frac {2}{1}}}}}{\sqrt {2\cdot {1 \choose 3}\cdot {10 \choose 3}\cdot {37 \choose 3}\cdot {82 \choose 3}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}\cdot {\sqrt {3+{\frac {2}{1}}}}}}}}}}}}}$

[4] :

${\displaystyle \xi _{4}:={\frac {2\cdot {1 \choose 1}\cdot {2 \choose 1}\cdot {\frac {1+{\sqrt {2+{\frac {\sqrt {3+{\frac {\sqrt {4+{\frac {2}{1}}}}{2\cdot {1 \choose 4}\cdot {17 \choose 4}\cdot {65 \choose 4}\cdot {145 \choose 4}\cdot {257 \choose 4}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}{2\cdot {1 \choose 3}\cdot {10 \choose 3}\cdot {37 \choose 3}\cdot {82 \choose 3}\cdot {\frac {1+{\sqrt {4+{\frac {2}{1}}}}}{\sqrt {2\cdot {1 \choose 4}\cdot {17 \choose 4}\cdot {65 \choose 4}\cdot {145 \choose 4}\cdot {257 \choose 4}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}\cdot {\sqrt {4+{\frac {2}{1}}}}}}}}}}}}{\sqrt {2\cdot {1 \choose 2}\cdot {5 \choose 2}\cdot {17 \choose 2}\cdot {\frac {1+{\sqrt {3+{\frac {\sqrt {4+{\frac {2}{1}}}}{2\cdot {1 \choose 4}\cdot {17 \choose 4}\cdot {65 \choose 4}\cdot {145 \choose 4}\cdot {257 \choose 4}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}}{\sqrt {2\cdot {1 \choose 3}\cdot {10 \choose 3}\cdot {37 \choose 3}\cdot {82 \choose 3}\cdot {\frac {1+{\sqrt {4+{\frac {2}{1}}}}}{\sqrt {2\cdot {1 \choose 4}\cdot {17 \choose 4}\cdot {65 \choose 4}\cdot {145 \choose 4}\cdot {257 \choose 4}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}\cdot {\sqrt {4+{\frac {2}{1}}}}}}}\cdot {\sqrt {3+{\frac {\sqrt {4+{\frac {2}{1}}}}{2\cdot {1 \choose 4}\cdot {17 \choose 4}\cdot {65 \choose 4}\cdot {145 \choose 4}\cdot {257 \choose 4}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}}}}\cdot {\sqrt {2+{\frac {\sqrt {3+{\frac {\sqrt {4+{\frac {2}{1}}}}{2\cdot {1 \choose 4}\cdot {17 \choose 4}\cdot {65 \choose 4}\cdot {145 \choose 4}\cdot {257 \choose 4}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}{2\cdot {1 \choose 3}\cdot {10 \choose 3}\cdot {37 \choose 3}\cdot {82 \choose 3}\cdot {\frac {1+{\sqrt {4+{\frac {2}{1}}}}}{\sqrt {2\cdot {1 \choose 4}\cdot {17 \choose 4}\cdot {65 \choose 4}\cdot {145 \choose 4}\cdot {257 \choose 4}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}\cdot {\sqrt {4+{\frac {2}{1}}}}}}}}}}}}}}}{\sqrt {1+{\frac {\sqrt {2+{\frac {\sqrt {3+{\frac {\sqrt {4+{\frac {2}{1}}}}{2\cdot {1 \choose 4}\cdot {17 \choose 4}\cdot {65 \choose 4}\cdot {145 \choose 4}\cdot {257 \choose 4}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}{2\cdot {1 \choose 3}\cdot {10 \choose 3}\cdot {37 \choose 3}\cdot {82 \choose 3}\cdot {\frac {1+{\sqrt {4+{\frac {2}{1}}}}}{\sqrt {2\cdot {1 \choose 4}\cdot {17 \choose 4}\cdot {65 \choose 4}\cdot {145 \choose 4}\cdot {257 \choose 4}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}\cdot {\sqrt {4+{\frac {2}{1}}}}}}}}}}}{2\cdot {1 \choose 2}\cdot {5 \choose 2}\cdot {17 \choose 2}\cdot {\frac {1+{\sqrt {3+{\frac {\sqrt {4+{\frac {2}{1}}}}{2\cdot {1 \choose 4}\cdot {17 \choose 4}\cdot {65 \choose 4}\cdot {145 \choose 4}\cdot {257 \choose 4}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}}{\sqrt {2\cdot {1 \choose 3}\cdot {10 \choose 3}\cdot {37 \choose 3}\cdot {82 \choose 3}\cdot {\frac {1+{\sqrt {4+{\frac {2}{1}}}}}{\sqrt {2\cdot {1 \choose 4}\cdot {17 \choose 4}\cdot {65 \choose 4}\cdot {145 \choose 4}\cdot {257 \choose 4}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}\cdot {\sqrt {4+{\frac {2}{1}}}}}}}\cdot {\sqrt {3+{\frac {\sqrt {4+{\frac {2}{1}}}}{2\cdot {1 \choose 4}\cdot {17 \choose 4}\cdot {65 \choose 4}\cdot {145 \choose 4}\cdot {257 \choose 4}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}}}}}}}}}}$

[5] :

${\displaystyle \xi _{5}:={\frac {2\cdot {1 \choose 1}\cdot {2 \choose 1}\cdot {\frac {1+{\sqrt {2+{\frac {\sqrt {3+{\frac {\sqrt {4+{\frac {\sqrt {5+{\frac {2}{1}}}}{2\cdot {1 \choose 5}\cdot {26 \choose 5}\cdot {101 \choose 5}\cdot {226 \choose 5}\cdot {401 \choose 5}\cdot {626 \choose 5}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}{2\cdot {1 \choose 4}\cdot {17 \choose 4}\cdot {65 \choose 4}\cdot {145 \choose 4}\cdot {257 \choose 4}\cdot {\frac {1+{\sqrt {5+{\frac {2}{1}}}}}{\sqrt {2\cdot {1 \choose 5}\cdot {26 \choose 5}\cdot {101 \choose 5}\cdot {226 \choose 5}\cdot {401 \choose 5}\cdot {626 \choose 5}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}\cdot {\sqrt {5+{\frac {2}{1}}}}}}}}}}}{2\cdot {1 \choose 3}\cdot {10 \choose 3}\cdot {37 \choose 3}\cdot {82 \choose 3}\cdot {\frac {1+{\sqrt {4+{\frac {\sqrt {5+{\frac {2}{1}}}}{2\cdot {1 \choose 5}\cdot {26 \choose 5}\cdot {101 \choose 5}\cdot {226 \choose 5}\cdot {401 \choose 5}\cdot {626 \choose 5}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}}{\sqrt {2\cdot {1 \choose 4}\cdot {17 \choose 4}\cdot {65 \choose 4}\cdot {145 \choose 4}\cdot {257 \choose 4}\cdot {\frac {1+{\sqrt {5+{\frac {2}{1}}}}}{\sqrt {2\cdot {1 \choose 5}\cdot {26 \choose 5}\cdot {101 \choose 5}\cdot {226 \choose 5}\cdot {401 \choose 5}\cdot {626 \choose 5}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}\cdot {\sqrt {5+{\frac {2}{1}}}}}}}\cdot {\sqrt {4+{\frac {\sqrt {5+{\frac {2}{1}}}}{2\cdot {1 \choose 5}\cdot {26 \choose 5}\cdot {101 \choose 5}\cdot {226 \choose 5}\cdot {401 \choose 5}\cdot {626 \choose 5}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}}}}}}}}}{\sqrt {2\cdot {1 \choose 2}\cdot {5 \choose 2}\cdot {17 \choose 2}\cdot {\frac {1+{\sqrt {3+{\frac {\sqrt {4+{\frac {\sqrt {5+{\frac {2}{1}}}}{2\cdot {1 \choose 5}\cdot {26 \choose 5}\cdot {101 \choose 5}\cdot {226 \choose 5}\cdot {401 \choose 5}\cdot {626 \choose 5}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}{2\cdot {1 \choose 4}\cdot {17 \choose 4}\cdot {65 \choose 4}\cdot {145 \choose 4}\cdot {257 \choose 4}\cdot {\frac {1+{\sqrt {5+{\frac {2}{1}}}}}{\sqrt {2\cdot {1 \choose 5}\cdot {26 \choose 5}\cdot {101 \choose 5}\cdot {226 \choose 5}\cdot {401 \choose 5}\cdot {626 \choose 5}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}\cdot {\sqrt {5+{\frac {2}{1}}}}}}}}}}}}{\sqrt {2\cdot {1 \choose 3}\cdot {10 \choose 3}\cdot {37 \choose 3}\cdot {82 \choose 3}\cdot {\frac {1+{\sqrt {4+{\frac {\sqrt {5+{\frac {2}{1}}}}{2\cdot {1 \choose 5}\cdot {26 \choose 5}\cdot {101 \choose 5}\cdot {226 \choose 5}\cdot {401 \choose 5}\cdot {626 \choose 5}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}}{\sqrt {2\cdot {1 \choose 4}\cdot {17 \choose 4}\cdot {65 \choose 4}\cdot {145 \choose 4}\cdot {257 \choose 4}\cdot {\frac {1+{\sqrt {5+{\frac {2}{1}}}}}{\sqrt {2\cdot {1 \choose 5}\cdot {26 \choose 5}\cdot {101 \choose 5}\cdot {226 \choose 5}\cdot {401 \choose 5}\cdot {626 \choose 5}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}\cdot {\sqrt {5+{\frac {2}{1}}}}}}}\cdot {\sqrt {4+{\frac {\sqrt {5+{\frac {2}{1}}}}{2\cdot {1 \choose 5}\cdot {26 \choose 5}\cdot {101 \choose 5}\cdot {226 \choose 5}\cdot {401 \choose 5}\cdot {626 \choose 5}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}}}}\cdot {\sqrt {3+{\frac {\sqrt {4+{\frac {\sqrt {5+{\frac {2}{1}}}}{2\cdot {1 \choose 5}\cdot {26 \choose 5}\cdot {101 \choose 5}\cdot {226 \choose 5}\cdot {401 \choose 5}\cdot {626 \choose 5}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}{2\cdot {1 \choose 4}\cdot {17 \choose 4}\cdot {65 \choose 4}\cdot {145 \choose 4}\cdot {257 \choose 4}\cdot {\frac {1+{\sqrt {5+{\frac {2}{1}}}}}{\sqrt {2\cdot {1 \choose 5}\cdot {26 \choose 5}\cdot {101 \choose 5}\cdot {226 \choose 5}\cdot {401 \choose 5}\cdot {626 \choose 5}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}\cdot {\sqrt {5+{\frac {2}{1}}}}}}}}}}}}}}\cdot {\sqrt {2+{\frac {\sqrt {3+{\frac {\sqrt {4+{\frac {\sqrt {5+{\frac {2}{1}}}}{2\cdot {1 \choose 5}\cdot {26 \choose 5}\cdot {101 \choose 5}\cdot {226 \choose 5}\cdot {401 \choose 5}\cdot {626 \choose 5}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}{2\cdot {1 \choose 4}\cdot {17 \choose 4}\cdot {65 \choose 4}\cdot {145 \choose 4}\cdot {257 \choose 4}\cdot {\frac {1+{\sqrt {5+{\frac {2}{1}}}}}{\sqrt {2\cdot {1 \choose 5}\cdot {26 \choose 5}\cdot {101 \choose 5}\cdot {226 \choose 5}\cdot {401 \choose 5}\cdot {626 \choose 5}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}\cdot {\sqrt {5+{\frac {2}{1}}}}}}}}}}}{2\cdot {1 \choose 3}\cdot {10 \choose 3}\cdot {37 \choose 3}\cdot {82 \choose 3}\cdot {\frac {1+{\sqrt {4+{\frac {\sqrt {5+{\frac {2}{1}}}}{2\cdot {1 \choose 5}\cdot {26 \choose 5}\cdot {101 \choose 5}\cdot {226 \choose 5}\cdot {401 \choose 5}\cdot {626 \choose 5}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}}{\sqrt {2\cdot {1 \choose 4}\cdot {17 \choose 4}\cdot {65 \choose 4}\cdot {145 \choose 4}\cdot {257 \choose 4}\cdot {\frac {1+{\sqrt {5+{\frac {2}{1}}}}}{\sqrt {2\cdot {1 \choose 5}\cdot {26 \choose 5}\cdot {101 \choose 5}\cdot {226 \choose 5}\cdot {401 \choose 5}\cdot {626 \choose 5}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}\cdot {\sqrt {5+{\frac {2}{1}}}}}}}\cdot {\sqrt {4+{\frac {\sqrt {5+{\frac {2}{1}}}}{2\cdot {1 \choose 5}\cdot {26 \choose 5}\cdot {101 \choose 5}\cdot {226 \choose 5}\cdot {401 \choose 5}\cdot {626 \choose 5}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}}}}}}}}}}}}{\sqrt {1+{\frac {\sqrt {2+{\frac {\sqrt {3+{\frac {\sqrt {4+{\frac {\sqrt {5+{\frac {2}{1}}}}{2\cdot {1 \choose 5}\cdot {26 \choose 5}\cdot {101 \choose 5}\cdot {226 \choose 5}\cdot {401 \choose 5}\cdot {626 \choose 5}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}{2\cdot {1 \choose 4}\cdot {17 \choose 4}\cdot {65 \choose 4}\cdot {145 \choose 4}\cdot {257 \choose 4}\cdot {\frac {1+{\sqrt {5+{\frac {2}{1}}}}}{\sqrt {2\cdot {1 \choose 5}\cdot {26 \choose 5}\cdot {101 \choose 5}\cdot {226 \choose 5}\cdot {401 \choose 5}\cdot {626 \choose 5}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}\cdot {\sqrt {5+{\frac {2}{1}}}}}}}}}}}{2\cdot {1 \choose 3}\cdot {10 \choose 3}\cdot {37 \choose 3}\cdot {82 \choose 3}\cdot {\frac {1+{\sqrt {4+{\frac {\sqrt {5+{\frac {2}{1}}}}{2\cdot {1 \choose 5}\cdot {26 \choose 5}\cdot {101 \choose 5}\cdot {226 \choose 5}\cdot {401 \choose 5}\cdot {626 \choose 5}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}}{\sqrt {2\cdot {1 \choose 4}\cdot {17 \choose 4}\cdot {65 \choose 4}\cdot {145 \choose 4}\cdot {257 \choose 4}\cdot {\frac {1+{\sqrt {5+{\frac {2}{1}}}}}{\sqrt {2\cdot {1 \choose 5}\cdot {26 \choose 5}\cdot {101 \choose 5}\cdot {226 \choose 5}\cdot {401 \choose 5}\cdot {626 \choose 5}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}\cdot {\sqrt {5+{\frac {2}{1}}}}}}}\cdot {\sqrt {4+{\frac {\sqrt {5+{\frac {2}{1}}}}{2\cdot {1 \choose 5}\cdot {26 \choose 5}\cdot {101 \choose 5}\cdot {226 \choose 5}\cdot {401 \choose 5}\cdot {626 \choose 5}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}}}}}}}}{2\cdot {1 \choose 2}\cdot {5 \choose 2}\cdot {17 \choose 2}\cdot {\frac {1+{\sqrt {3+{\frac {\sqrt {4+{\frac {\sqrt {5+{\frac {2}{1}}}}{2\cdot {1 \choose 5}\cdot {26 \choose 5}\cdot {101 \choose 5}\cdot {226 \choose 5}\cdot {401 \choose 5}\cdot {626 \choose 5}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}{2\cdot {1 \choose 4}\cdot {17 \choose 4}\cdot {65 \choose 4}\cdot {145 \choose 4}\cdot {257 \choose 4}\cdot {\frac {1+{\sqrt {5+{\frac {2}{1}}}}}{\sqrt {2\cdot {1 \choose 5}\cdot {26 \choose 5}\cdot {101 \choose 5}\cdot {226 \choose 5}\cdot {401 \choose 5}\cdot {626 \choose 5}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}\cdot {\sqrt {5+{\frac {2}{1}}}}}}}}}}}}{\sqrt {2\cdot {1 \choose 3}\cdot {10 \choose 3}\cdot {37 \choose 3}\cdot {82 \choose 3}\cdot {\frac {1+{\sqrt {4+{\frac {\sqrt {5+{\frac {2}{1}}}}{2\cdot {1 \choose 5}\cdot {26 \choose 5}\cdot {101 \choose 5}\cdot {226 \choose 5}\cdot {401 \choose 5}\cdot {626 \choose 5}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}}{\sqrt {2\cdot {1 \choose 4}\cdot {17 \choose 4}\cdot {65 \choose 4}\cdot {145 \choose 4}\cdot {257 \choose 4}\cdot {\frac {1+{\sqrt {5+{\frac {2}{1}}}}}{\sqrt {2\cdot {1 \choose 5}\cdot {26 \choose 5}\cdot {101 \choose 5}\cdot {226 \choose 5}\cdot {401 \choose 5}\cdot {626 \choose 5}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}\cdot {\sqrt {5+{\frac {2}{1}}}}}}}\cdot {\sqrt {4+{\frac {\sqrt {5+{\frac {2}{1}}}}{2\cdot {1 \choose 5}\cdot {26 \choose 5}\cdot {101 \choose 5}\cdot {226 \choose 5}\cdot {401 \choose 5}\cdot {626 \choose 5}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}}}}\cdot {\sqrt {3+{\frac {\sqrt {4+{\frac {\sqrt {5+{\frac {2}{1}}}}{2\cdot {1 \choose 5}\cdot {26 \choose 5}\cdot {101 \choose 5}\cdot {226 \choose 5}\cdot {401 \choose 5}\cdot {626 \choose 5}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}{2\cdot {1 \choose 4}\cdot {17 \choose 4}\cdot {65 \choose 4}\cdot {145 \choose 4}\cdot {257 \choose 4}\cdot {\frac {1+{\sqrt {5+{\frac {2}{1}}}}}{\sqrt {2\cdot {1 \choose 5}\cdot {26 \choose 5}\cdot {101 \choose 5}\cdot {226 \choose 5}\cdot {401 \choose 5}\cdot {626 \choose 5}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}\cdot {\sqrt {5+{\frac {2}{1}}}}}}}}}}}}}}}}}}}}$

[6] :

${\displaystyle \xi _{6}:={\frac {2\cdot {1 \choose 1}\cdot {2 \choose 1}\cdot {\frac {1+{\sqrt {2+{\frac {\sqrt {3+{\frac {\sqrt {4+{\frac {\sqrt {5+{\frac {\sqrt {6+{\frac {2}{1}}}}{2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}{2\cdot {1 \choose 5}\cdot {26 \choose 5}\cdot {101 \choose 5}\cdot {226 \choose 5}\cdot {401 \choose 5}\cdot {626 \choose 5}\cdot {\frac {1+{\sqrt {6+{\frac {2}{1}}}}}{\sqrt {2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}\cdot {\sqrt {6+{\frac {2}{1}}}}}}}}}}}{2\cdot {1 \choose 4}\cdot {17 \choose 4}\cdot {65 \choose 4}\cdot {145 \choose 4}\cdot {257 \choose 4}\cdot {\frac {1+{\sqrt {5+{\frac {\sqrt {6+{\frac {2}{1}}}}{2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}}{\sqrt {2\cdot {1 \choose 5}\cdot {26 \choose 5}\cdot {101 \choose 5}\cdot {226 \choose 5}\cdot {401 \choose 5}\cdot {626 \choose 5}\cdot {\frac {1+{\sqrt {6+{\frac {2}{1}}}}}{\sqrt {2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}\cdot {\sqrt {6+{\frac {2}{1}}}}}}}\cdot {\sqrt {5+{\frac {\sqrt {6+{\frac {2}{1}}}}{2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}}}}}}}}{2\cdot {1 \choose 3}\cdot {10 \choose 3}\cdot {37 \choose 3}\cdot {82 \choose 3}\cdot {\frac {1+{\sqrt {4+{\frac {\sqrt {5+{\frac {\sqrt {6+{\frac {2}{1}}}}{2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}{2\cdot {1 \choose 5}\cdot {26 \choose 5}\cdot {101 \choose 5}\cdot {226 \choose 5}\cdot {401 \choose 5}\cdot {626 \choose 5}\cdot {\frac {1+{\sqrt {6+{\frac {2}{1}}}}}{\sqrt {2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}\cdot {\sqrt {6+{\frac {2}{1}}}}}}}}}}}}{\sqrt {2\cdot {1 \choose 4}\cdot {17 \choose 4}\cdot {65 \choose 4}\cdot {145 \choose 4}\cdot {257 \choose 4}\cdot {\frac {1+{\sqrt {5+{\frac {\sqrt {6+{\frac {2}{1}}}}{2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}}{\sqrt {2\cdot {1 \choose 5}\cdot {26 \choose 5}\cdot {101 \choose 5}\cdot {226 \choose 5}\cdot {401 \choose 5}\cdot {626 \choose 5}\cdot {\frac {1+{\sqrt {6+{\frac {2}{1}}}}}{\sqrt {2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}\cdot {\sqrt {6+{\frac {2}{1}}}}}}}\cdot {\sqrt {5+{\frac {\sqrt {6+{\frac {2}{1}}}}{2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}}}}\cdot {\sqrt {4+{\frac {\sqrt {5+{\frac {\sqrt {6+{\frac {2}{1}}}}{2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}{2\cdot {1 \choose 5}\cdot {26 \choose 5}\cdot {101 \choose 5}\cdot {226 \choose 5}\cdot {401 \choose 5}\cdot {626 \choose 5}\cdot {\frac {1+{\sqrt {6+{\frac {2}{1}}}}}{\sqrt {2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}\cdot {\sqrt {6+{\frac {2}{1}}}}}}}}}}}}}}}}}}}{\sqrt {2\cdot {1 \choose 2}\cdot {5 \choose 2}\cdot {17 \choose 2}\cdot {\frac {1+{\sqrt {3+{\frac {\sqrt {4+{\frac {\sqrt {5+{\frac {\sqrt {6+{\frac {2}{1}}}}{2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}{2\cdot {1 \choose 5}\cdot {26 \choose 5}\cdot {101 \choose 5}\cdot {226 \choose 5}\cdot {401 \choose 5}\cdot {626 \choose 5}\cdot {\frac {1+{\sqrt {6+{\frac {2}{1}}}}}{\sqrt {2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}\cdot {\sqrt {6+{\frac {2}{1}}}}}}}}}}}{2\cdot {1 \choose 4}\cdot {17 \choose 4}\cdot {65 \choose 4}\cdot {145 \choose 4}\cdot {257 \choose 4}\cdot {\frac {1+{\sqrt {5+{\frac {\sqrt {6+{\frac {2}{1}}}}{2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}}{\sqrt {2\cdot {1 \choose 5}\cdot {26 \choose 5}\cdot {101 \choose 5}\cdot {226 \choose 5}\cdot {401 \choose 5}\cdot {626 \choose 5}\cdot {\frac {1+{\sqrt {6+{\frac {2}{1}}}}}{\sqrt {2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}\cdot {\sqrt {6+{\frac {2}{1}}}}}}}\cdot {\sqrt {5+{\frac {\sqrt {6+{\frac {2}{1}}}}{2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}}}}}}}}}{\sqrt {2\cdot {1 \choose 3}\cdot {10 \choose 3}\cdot {37 \choose 3}\cdot {82 \choose 3}\cdot {\frac {1+{\sqrt {4+{\frac {\sqrt {5+{\frac {\sqrt {6+{\frac {2}{1}}}}{2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}{2\cdot {1 \choose 5}\cdot {26 \choose 5}\cdot {101 \choose 5}\cdot {226 \choose 5}\cdot {401 \choose 5}\cdot {626 \choose 5}\cdot {\frac {1+{\sqrt {6+{\frac {2}{1}}}}}{\sqrt {2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}\cdot {\sqrt {6+{\frac {2}{1}}}}}}}}}}}}{\sqrt {2\cdot {1 \choose 4}\cdot {17 \choose 4}\cdot {65 \choose 4}\cdot {145 \choose 4}\cdot {257 \choose 4}\cdot {\frac {1+{\sqrt {5+{\frac {\sqrt {6+{\frac {2}{1}}}}{2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}}{\sqrt {2\cdot {1 \choose 5}\cdot {26 \choose 5}\cdot {101 \choose 5}\cdot {226 \choose 5}\cdot {401 \choose 5}\cdot {626 \choose 5}\cdot {\frac {1+{\sqrt {6+{\frac {2}{1}}}}}{\sqrt {2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}\cdot {\sqrt {6+{\frac {2}{1}}}}}}}\cdot {\sqrt {5+{\frac {\sqrt {6+{\frac {2}{1}}}}{2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}}}}\cdot {\sqrt {4+{\frac {\sqrt {5+{\frac {\sqrt {6+{\frac {2}{1}}}}{2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}{2\cdot {1 \choose 5}\cdot {26 \choose 5}\cdot {101 \choose 5}\cdot {226 \choose 5}\cdot {401 \choose 5}\cdot {626 \choose 5}\cdot {\frac {1+{\sqrt {6+{\frac {2}{1}}}}}{\sqrt {2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}\cdot {\sqrt {6+{\frac {2}{1}}}}}}}}}}}}}}\cdot {\sqrt {3+{\frac {\sqrt {4+{\frac {\sqrt {5+{\frac {\sqrt {6+{\frac {2}{1}}}}{2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}{2\cdot {1 \choose 5}\cdot {26 \choose 5}\cdot {101 \choose 5}\cdot {226 \choose 5}\cdot {401 \choose 5}\cdot {626 \choose 5}\cdot {\frac {1+{\sqrt {6+{\frac {2}{1}}}}}{\sqrt {2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}\cdot {\sqrt {6+{\frac {2}{1}}}}}}}}}}}{2\cdot {1 \choose 4}\cdot {17 \choose 4}\cdot {65 \choose 4}\cdot {145 \choose 4}\cdot {257 \choose 4}\cdot {\frac {1+{\sqrt {5+{\frac {\sqrt {6+{\frac {2}{1}}}}{2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}}{\sqrt {2\cdot {1 \choose 5}\cdot {26 \choose 5}\cdot {101 \choose 5}\cdot {226 \choose 5}\cdot {401 \choose 5}\cdot {626 \choose 5}\cdot {\frac {1+{\sqrt {6+{\frac {2}{1}}}}}{\sqrt {2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}\cdot {\sqrt {6+{\frac {2}{1}}}}}}}\cdot {\sqrt {5+{\frac {\sqrt {6+{\frac {2}{1}}}}{2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}}}}}}}}}}}\cdot {\sqrt {2+{\frac {\sqrt {3+{\frac {\sqrt {4+{\frac {\sqrt {5+{\frac {\sqrt {6+{\frac {2}{1}}}}{2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}{2\cdot {1 \choose 5}\cdot {26 \choose 5}\cdot {101 \choose 5}\cdot {226 \choose 5}\cdot {401 \choose 5}\cdot {626 \choose 5}\cdot {\frac {1+{\sqrt {6+{\frac {2}{1}}}}}{\sqrt {2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}\cdot {\sqrt {6+{\frac {2}{1}}}}}}}}}}}{2\cdot {1 \choose 4}\cdot {17 \choose 4}\cdot {65 \choose 4}\cdot {145 \choose 4}\cdot {257 \choose 4}\cdot {\frac {1+{\sqrt {5+{\frac {\sqrt {6+{\frac {2}{1}}}}{2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}}{\sqrt {2\cdot {1 \choose 5}\cdot {26 \choose 5}\cdot {101 \choose 5}\cdot {226 \choose 5}\cdot {401 \choose 5}\cdot {626 \choose 5}\cdot {\frac {1+{\sqrt {6+{\frac {2}{1}}}}}{\sqrt {2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}\cdot {\sqrt {6+{\frac {2}{1}}}}}}}\cdot {\sqrt {5+{\frac {\sqrt {6+{\frac {2}{1}}}}{2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}}}}}}}}{2\cdot {1 \choose 3}\cdot {10 \choose 3}\cdot {37 \choose 3}\cdot {82 \choose 3}\cdot {\frac {1+{\sqrt {4+{\frac {\sqrt {5+{\frac {\sqrt {6+{\frac {2}{1}}}}{2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}{2\cdot {1 \choose 5}\cdot {26 \choose 5}\cdot {101 \choose 5}\cdot {226 \choose 5}\cdot {401 \choose 5}\cdot {626 \choose 5}\cdot {\frac {1+{\sqrt {6+{\frac {2}{1}}}}}{\sqrt {2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}\cdot {\sqrt {6+{\frac {2}{1}}}}}}}}}}}}{\sqrt {2\cdot {1 \choose 4}\cdot {17 \choose 4}\cdot {65 \choose 4}\cdot {145 \choose 4}\cdot {257 \choose 4}\cdot {\frac {1+{\sqrt {5+{\frac {\sqrt {6+{\frac {2}{1}}}}{2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}}{\sqrt {2\cdot {1 \choose 5}\cdot {26 \choose 5}\cdot {101 \choose 5}\cdot {226 \choose 5}\cdot {401 \choose 5}\cdot {626 \choose 5}\cdot {\frac {1+{\sqrt {6+{\frac {2}{1}}}}}{\sqrt {2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}\cdot {\sqrt {6+{\frac {2}{1}}}}}}}\cdot {\sqrt {5+{\frac {\sqrt {6+{\frac {2}{1}}}}{2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}}}}\cdot {\sqrt {4+{\frac {\sqrt {5+{\frac {\sqrt {6+{\frac {2}{1}}}}{2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}{2\cdot {1 \choose 5}\cdot {26 \choose 5}\cdot {101 \choose 5}\cdot {226 \choose 5}\cdot {401 \choose 5}\cdot {626 \choose 5}\cdot {\frac {1+{\sqrt {6+{\frac {2}{1}}}}}{\sqrt {2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}\cdot {\sqrt {6+{\frac {2}{1}}}}}}}}}}}}}}}}}}}}}}{\sqrt {1+{\frac {\sqrt {2+{\frac {\sqrt {3+{\frac {\sqrt {4+{\frac {\sqrt {5+{\frac {\sqrt {6+{\frac {2}{1}}}}{2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}{2\cdot {1 \choose 5}\cdot {26 \choose 5}\cdot {101 \choose 5}\cdot {226 \choose 5}\cdot {401 \choose 5}\cdot {626 \choose 5}\cdot {\frac {1+{\sqrt {6+{\frac {2}{1}}}}}{\sqrt {2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}\cdot {\sqrt {6+{\frac {2}{1}}}}}}}}}}}{2\cdot {1 \choose 4}\cdot {17 \choose 4}\cdot {65 \choose 4}\cdot {145 \choose 4}\cdot {257 \choose 4}\cdot {\frac {1+{\sqrt {5+{\frac {\sqrt {6+{\frac {2}{1}}}}{2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}}{\sqrt {2\cdot {1 \choose 5}\cdot {26 \choose 5}\cdot {101 \choose 5}\cdot {226 \choose 5}\cdot {401 \choose 5}\cdot {626 \choose 5}\cdot {\frac {1+{\sqrt {6+{\frac {2}{1}}}}}{\sqrt {2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}\cdot {\sqrt {6+{\frac {2}{1}}}}}}}\cdot {\sqrt {5+{\frac {\sqrt {6+{\frac {2}{1}}}}{2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}}}}}}}}{2\cdot {1 \choose 3}\cdot {10 \choose 3}\cdot {37 \choose 3}\cdot {82 \choose 3}\cdot {\frac {1+{\sqrt {4+{\frac {\sqrt {5+{\frac {\sqrt {6+{\frac {2}{1}}}}{2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}{2\cdot {1 \choose 5}\cdot {26 \choose 5}\cdot {101 \choose 5}\cdot {226 \choose 5}\cdot {401 \choose 5}\cdot {626 \choose 5}\cdot {\frac {1+{\sqrt {6+{\frac {2}{1}}}}}{\sqrt {2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}\cdot {\sqrt {6+{\frac {2}{1}}}}}}}}}}}}{\sqrt {2\cdot {1 \choose 4}\cdot {17 \choose 4}\cdot {65 \choose 4}\cdot {145 \choose 4}\cdot {257 \choose 4}\cdot {\frac {1+{\sqrt {5+{\frac {\sqrt {6+{\frac {2}{1}}}}{2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}}{\sqrt {2\cdot {1 \choose 5}\cdot {26 \choose 5}\cdot {101 \choose 5}\cdot {226 \choose 5}\cdot {401 \choose 5}\cdot {626 \choose 5}\cdot {\frac {1+{\sqrt {6+{\frac {2}{1}}}}}{\sqrt {2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}\cdot {\sqrt {6+{\frac {2}{1}}}}}}}\cdot {\sqrt {5+{\frac {\sqrt {6+{\frac {2}{1}}}}{2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}}}}\cdot {\sqrt {4+{\frac {\sqrt {5+{\frac {\sqrt {6+{\frac {2}{1}}}}{2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}{2\cdot {1 \choose 5}\cdot {26 \choose 5}\cdot {101 \choose 5}\cdot {226 \choose 5}\cdot {401 \choose 5}\cdot {626 \choose 5}\cdot {\frac {1+{\sqrt {6+{\frac {2}{1}}}}}{\sqrt {2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}\cdot {\sqrt {6+{\frac {2}{1}}}}}}}}}}}}}}}}}}{2\cdot {1 \choose 2}\cdot {5 \choose 2}\cdot {17 \choose 2}\cdot {\frac {1+{\sqrt {3+{\frac {\sqrt {4+{\frac {\sqrt {5+{\frac {\sqrt {6+{\frac {2}{1}}}}{2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}{2\cdot {1 \choose 5}\cdot {26 \choose 5}\cdot {101 \choose 5}\cdot {226 \choose 5}\cdot {401 \choose 5}\cdot {626 \choose 5}\cdot {\frac {1+{\sqrt {6+{\frac {2}{1}}}}}{\sqrt {2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}\cdot {\sqrt {6+{\frac {2}{1}}}}}}}}}}}{2\cdot {1 \choose 4}\cdot {17 \choose 4}\cdot {65 \choose 4}\cdot {145 \choose 4}\cdot {257 \choose 4}\cdot {\frac {1+{\sqrt {5+{\frac {\sqrt {6+{\frac {2}{1}}}}{2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}}{\sqrt {2\cdot {1 \choose 5}\cdot {26 \choose 5}\cdot {101 \choose 5}\cdot {226 \choose 5}\cdot {401 \choose 5}\cdot {626 \choose 5}\cdot {\frac {1+{\sqrt {6+{\frac {2}{1}}}}}{\sqrt {2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}\cdot {\sqrt {6+{\frac {2}{1}}}}}}}\cdot {\sqrt {5+{\frac {\sqrt {6+{\frac {2}{1}}}}{2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}}}}}}}}}{\sqrt {2\cdot {1 \choose 3}\cdot {10 \choose 3}\cdot {37 \choose 3}\cdot {82 \choose 3}\cdot {\frac {1+{\sqrt {4+{\frac {\sqrt {5+{\frac {\sqrt {6+{\frac {2}{1}}}}{2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}{2\cdot {1 \choose 5}\cdot {26 \choose 5}\cdot {101 \choose 5}\cdot {226 \choose 5}\cdot {401 \choose 5}\cdot {626 \choose 5}\cdot {\frac {1+{\sqrt {6+{\frac {2}{1}}}}}{\sqrt {2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}\cdot {\sqrt {6+{\frac {2}{1}}}}}}}}}}}}{\sqrt {2\cdot {1 \choose 4}\cdot {17 \choose 4}\cdot {65 \choose 4}\cdot {145 \choose 4}\cdot {257 \choose 4}\cdot {\frac {1+{\sqrt {5+{\frac {\sqrt {6+{\frac {2}{1}}}}{2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}}{\sqrt {2\cdot {1 \choose 5}\cdot {26 \choose 5}\cdot {101 \choose 5}\cdot {226 \choose 5}\cdot {401 \choose 5}\cdot {626 \choose 5}\cdot {\frac {1+{\sqrt {6+{\frac {2}{1}}}}}{\sqrt {2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}\cdot {\sqrt {6+{\frac {2}{1}}}}}}}\cdot {\sqrt {5+{\frac {\sqrt {6+{\frac {2}{1}}}}{2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}}}}\cdot {\sqrt {4+{\frac {\sqrt {5+{\frac {\sqrt {6+{\frac {2}{1}}}}{2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}{2\cdot {1 \choose 5}\cdot {26 \choose 5}\cdot {101 \choose 5}\cdot {226 \choose 5}\cdot {401 \choose 5}\cdot {626 \choose 5}\cdot {\frac {1+{\sqrt {6+{\frac {2}{1}}}}}{\sqrt {2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}\cdot {\sqrt {6+{\frac {2}{1}}}}}}}}}}}}}}\cdot {\sqrt {3+{\frac {\sqrt {4+{\frac {\sqrt {5+{\frac {\sqrt {6+{\frac {2}{1}}}}{2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}{2\cdot {1 \choose 5}\cdot {26 \choose 5}\cdot {101 \choose 5}\cdot {226 \choose 5}\cdot {401 \choose 5}\cdot {626 \choose 5}\cdot {\frac {1+{\sqrt {6+{\frac {2}{1}}}}}{\sqrt {2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}\cdot {\sqrt {6+{\frac {2}{1}}}}}}}}}}}{2\cdot {1 \choose 4}\cdot {17 \choose 4}\cdot {65 \choose 4}\cdot {145 \choose 4}\cdot {257 \choose 4}\cdot {\frac {1+{\sqrt {5+{\frac {\sqrt {6+{\frac {2}{1}}}}{2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}}{\sqrt {2\cdot {1 \choose 5}\cdot {26 \choose 5}\cdot {101 \choose 5}\cdot {226 \choose 5}\cdot {401 \choose 5}\cdot {626 \choose 5}\cdot {\frac {1+{\sqrt {6+{\frac {2}{1}}}}}{\sqrt {2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}\cdot {\sqrt {6+{\frac {2}{1}}}}}}}\cdot {\sqrt {5+{\frac {\sqrt {6+{\frac {2}{1}}}}{2\cdot {1 \choose 6}\cdot {37 \choose 6}\cdot {145 \choose 6}\cdot {325 \choose 6}\cdot {577 \choose 6}\cdot {901 \choose 6}\cdot {1297 \choose 6}\cdot {\frac {1+2}{\sqrt {1\cdot 2}}}}}}}}}}}}}}}}}}}}}}}$

[10]: ${\displaystyle \xi _{10}=\ ?}$

A) Hinprojektion:

${\displaystyle x=a\cdot \lambda +b\cdot \lambda \cdot \cos(\varphi )\qquad y=c\cdot \varphi +d\cdot \varphi \cdot \cos(\lambda )}$

B) Rückprojektion:

${\displaystyle \lambda =f_{\lambda }(x,y)\qquad \varphi =f_{\varphi }(x,y)\,}$

Daraus soll man nun die Rückprojektion finden:

${\displaystyle \lambda ={\frac {x}{a+b\cdot \cos(\varphi )}}\qquad \varphi ={\frac {y}{c+d\cdot \cos(\lambda )}}}$

${\displaystyle \lambda ={\frac {x}{a+b\cdot \cos \left({\frac {y}{c+d\cdot \cos(\lambda )}}\right)}}\qquad \varphi ={\frac {y}{c+d\cdot \cos \left({\frac {x}{a+b\cdot \cos(\varphi )}}\right)}}}$

test:‮▀█▀ █▬█ █ ▄▄█▀▀

${\displaystyle {\frac {b}{h_{1}}}={\dfrac {e}{1}}}$	${\displaystyle \ \Longleftrightarrow \ }$	${\displaystyle h_{1}={\frac {b}{e}}}$	${\displaystyle (1)\,}$
${\displaystyle {\dfrac {b}{h_{2}}}={\dfrac {b-e}{1}}}$	${\displaystyle \Longleftrightarrow }$	${\displaystyle h_{2}={\frac {b}{b-e}}}$	${\displaystyle (2)\,}$
${\displaystyle 3^{2}=9=h_{1}^{2}+b^{2}}$			${\displaystyle (3)\,}$
${\displaystyle 2^{2}=4=h_{2}^{2}+b^{2}}$			${\displaystyle (4)\,}$
${\displaystyle 5=h_{1}^{2}-h_{2}^{2}}$			${\displaystyle (5):(3)-(4)\,}$
${\displaystyle 5=\left({\frac {b}{e}}\right)^{2}-\left({\frac {b}{b-e}}\right)^{2}}$			${\displaystyle (6):\mathrm {(1)\,und\,(2)\,in\,(5)} \,}$
${\displaystyle 5={\frac {b^{2}}{e^{2}}}-{\frac {b^{2}}{(b-e)^{2}}}\ =\ {\frac {b^{2}}{e^{2}}}-{\frac {b^{2}}{b^{2}-2\,b\,e+e^{2}}}}$			${\displaystyle (7)\,}$

1. ${\displaystyle f(-1)=0}$
2. ${\displaystyle f(0)=1}$
3. ${\displaystyle \forall x>-1:f(x)>0}$
4. ${\displaystyle \forall x>0:f'(x)<0}$
5. ${\displaystyle f'(0)=0}$
6. ${\displaystyle \forall x<0:f'(x)>0}$
7. ${\displaystyle \lim _{x\to -1}f'(x)=+\infty }$
8. ${\displaystyle f''(1)=0}$