Eisenbeis und Knopfloch/Kuchen/Halbierung/Aufgabe/Lösung

${\displaystyle {}{\frac {1}{12}}\pi 20^{2}}$

${\displaystyle {}30}$

${\displaystyle {}s}$

${\displaystyle {}h}$

${\displaystyle {}g}$

${\displaystyle {}{\begin{aligned}{\frac {1}{2}}gh&={\frac {1}{2}}g{\sqrt {s^{2}-{\frac {g^{2}}{4}}}}\\&={\frac {1}{4}}g{\sqrt {4s^{2}-g^{2}}}\\&={\frac {1}{4}}{\sqrt {2-{\sqrt {3}}}}s{\sqrt {4s^{2}-(2-{\sqrt {3}})s^{2}}}\\&={\frac {1}{4}}{\sqrt {2-{\sqrt {3}}}}s^{2}{\sqrt {2+{\sqrt {3}}}}\\&={\frac {1}{4}}{\sqrt {4-3}}s^{2}\\&={\frac {s^{2}}{4}}.\end{aligned}}}$

${\displaystyle {}{\frac {s^{2}}{4}}={\frac {1}{24}}\pi \cdot 20^{2}\,}$

führt auf

${\displaystyle {}s=20{\sqrt {\pi /6}}\,.}$

Für die Länge der Schnittkante ergibt sich

${\displaystyle {}g=20{\sqrt {\pi /6}}{\sqrt {2-{\sqrt {3}}}}=20{\sqrt {\frac {\pi (2-{\sqrt {3}})}{6}}}\,.}$

${\displaystyle {}y}$

${\displaystyle {}{\frac {1}{2}}{\sqrt {2+{\sqrt {3}}}}\cdot s={\frac {1}{2}}{\sqrt {2+{\sqrt {3}}}}\cdot {\sqrt {\pi /6}}\cdot 20\,.}$

Die Höhe des Schwerpunktes des aufgefüllten Dreiecks ist (wie bei jedem Dreieck, vergleiche Fakt) gleich ${\displaystyle {}{\frac {2}{3}}\cdot 20}$. Wir behaupten

${\displaystyle {}{\frac {1}{2}}{\sqrt {2+{\sqrt {3}}}}\cdot {\sqrt {\pi /6}}\cdot 20>{\frac {2}{3}}\cdot 20\,,}$

was zu

${\displaystyle {}{\sqrt {2+{\sqrt {3}}}}\cdot {\sqrt {\pi /6}}>{\frac {4}{3}}\,}$

bzw. zu

${\displaystyle {}(2+{\sqrt {3}})\cdot \pi /6>{\frac {16}{9}}\,}$

bzw. zu

${\displaystyle {}(2+{\sqrt {3}})\cdot \pi >{\frac {32}{3}}\,}$

äquivalent ist. Wegen ${\displaystyle {}{\sqrt {3}}>1,7}$ und ${\displaystyle {}\pi >3,1}$ gilt in der Tat

${\displaystyle {}(2+{\sqrt {3}})\cdot \pi >3,7\cdot 3,1=11,47>{\frac {32}{3}}\,.}$