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Hallo und willkommen bei physik-fragen.de. Auf Anhieb ist deine Frage schwer verständlich, da wird eine Fläche als 5 m ausgewiesen und eine Kraft hat die Einheit \(\frac{m}{s^2}\) .
Sehe ich das richtig, dass du ein Gewicht von 50 kg an einem 15 m langen Ausleger befestigen möchtest? Der Ausleger ist an einer Wand befestigt. Dann sieht das so aus:
![](data:image/png;base64,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)
Mit 490,5 N zieht das Gewicht die Konstruktion nach unten (blaue Kraft). Die Wand "drückt" die Konstruktion mit der gleichen Kraft nach oben (grüne Kräfte). Wie sich das zwischen den Punkten A und B aufteilt, kann man nur schwer berechnen. Der ungünstigste Fall ist der Punkt A. Dann "zieht" die Wand im Punkt A auch noch an der Konstruktion und drückt im Punkt B gegen die Konstruktion (rote Kräfte). Diese Kräfte sind dreimal so hoch wie die Gewichtskraft. Als Resultierende ergibt sich hier \(F_{max}\).
Grundlage für meine Berechnung:
Summe aller Kräfte in x-Richtung = 0
Summe aller Kräfte in y-Richtung = 0 (hier nur einmal die grüne Kraft ansetzen)
Summe aller Momente um jeden Punkt = 0 (auch hier nur einmal die grüne Kraft ansetzen)
Hilft dir diese Info weiter?
Sehe ich das richtig, dass du ein Gewicht von 50 kg an einem 15 m langen Ausleger befestigen möchtest? Der Ausleger ist an einer Wand befestigt. Dann sieht das so aus:
Mit 490,5 N zieht das Gewicht die Konstruktion nach unten (blaue Kraft). Die Wand "drückt" die Konstruktion mit der gleichen Kraft nach oben (grüne Kräfte). Wie sich das zwischen den Punkten A und B aufteilt, kann man nur schwer berechnen. Der ungünstigste Fall ist der Punkt A. Dann "zieht" die Wand im Punkt A auch noch an der Konstruktion und drückt im Punkt B gegen die Konstruktion (rote Kräfte). Diese Kräfte sind dreimal so hoch wie die Gewichtskraft. Als Resultierende ergibt sich hier \(F_{max}\).
Grundlage für meine Berechnung:
Summe aller Kräfte in x-Richtung = 0
Summe aller Kräfte in y-Richtung = 0 (hier nur einmal die grüne Kraft ansetzen)
Summe aller Momente um jeden Punkt = 0 (auch hier nur einmal die grüne Kraft ansetzen)
Hilft dir diese Info weiter?
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Punkte: 510
Punkte: 510