[size=100][size=150]Oft wirken auf einen Körper mehrere Kräfte gleichzeitig.[br][br]Auf ein Auto beispielsweise wirken gleichzeitig die Motorkraft, die ihn beschleunigt, aber auch der Luftwiderstand und die Reibung von der Straße, die ihn bremsen.[/size][/size][br][br][br][img]data:image/png;base64,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[/img]

Übernimm folgenden Hefteintrag in dein Physik-Heft:[br][br][b][u]8. Resultierende Kraft[br][/u][br][/b]Wirken auf einen Körper zwei Kräfte gleichzeitig, so lässt sich die [u]resultierende Kraft[/u] mit Hilfe eines Kräfteparallelogramms finden.[br][br][img]data:image/png;base64,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[/img][br][br]Sonderfälle:[br][list][*]Die beiden Kräfte zeigen in dieselbe Richtung: F[sub]res[/sub] = F[sub]1 [/sub]+ F[sub]2[/sub][/*][*]Die beiden Kräfte zeigen in entgegengesetzte Richtungen: F[sub]res[/sub] = F[sub]1 [/sub]- F[sub]2[/sub][/*][/list][br][size=100][u]Kräftegleichgewicht[br][/u]Ein Körper, bei dem sich alle auf ihn wirkenden Kräfte ausgleichen, befindet sich im Kräftegleichgewicht.[br][br]Beispiel: Fallschirmspringer[br][/size][img]data:image/png;base64,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[/img]

[size=100][size=150]Du hast es geschafft![br][br]Jetzt solltest du[br][/size][/size][list][*][size=150]die Resultierende aus zwei Kräften konstruieren können.[/size][br][/*][/list][size=100][size=150][list][*]wissen, was man unter einem Kräftegleichgewicht versteht.[/*][/list][/size][/size]