Volumen eines Quaders

Aufgabe 1
Die quaderförmige Box ist 6 cm lang, 3 cm breit und 1 cm hoch.[br]Wie viele Einheitswürfel mit Kantenlänge 1 cm passen in die Box?[br][img]data:image/png;base64,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[/img]
Aufgabe 2
Die quaderförmige Box ist 6 cm lang, 3 cm breit und 2 cm hoch.[br]Wie viele Einheitswürfel mit Kantenlänge 1 cm passen in die Box?[br][img]data:image/png;base64,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[/img]
Erklärung
[color=#980000]Der Einheitswürfel hat die Kantenlänge 1 cm.[br][br]Wir betrachten die quaderförmige Box mit[br]Länge l = 6 cm,[br]Breite b = 3 cm und[br]Höhe h = 2 cm.[br][/color]
[list][*][color=#980000]Anzahl der Einheitswürfel, die in die Länge der Box passen: 6[/color][/*][*][color=#980000]Anzahl der Einheitswürfel, die in die Breite der Box passen: 3[br][/color][/*][*][color=#980000]Anzahl der Einheitswürfel, die in die Höhe der Box passen: 2[/color][br][/*][/list][br][color=#0000ff]Anzahl der Einheitswürfel, die in den Quader passen[/color] [color=#980000]= [/color][math]6\cdot3\cdot2[/math][color=#980000] Einheitswürfel = 36 Einheitswürfel[/color][br][br]([color=#980000]dies entspricht dem[/color] [color=#0000ff]Rauminhalt des Quaders = [/color][color=#0000ff]V[sub]Quader[/sub][/color])
[size=150][color=#980000][i][b]"Kenne ich also die Maße eines Quaders in cm, dann kann ich einfach den Rauminhalt V des Quaders berechnen, zum Beispiel [/b][/i][/color][math]V=6cm\cdot3cm\cdot2cm=36cm^3[/math][color=#980000][i][b] . [br]Ich merke mir: Volumen eines Quaders ist [u]Länge mal Breite mal Höhe[/u]"[/b][/i][/color][/size][br][br][size=100][color=#980000]36 cm³ ist das gleiche Volumen, das 36 Einheitswürfel besitzen![br][/color][/size][color=#980000](Begründung: der Einheitswürfel ist ein Quader mit l = 1 cm, b = 1 cm und h = 1 cm, also [/color][math]V_{Einheitswürfel}=1cm\cdot1cm\cdot1cm=1cm^3[/math][color=#980000].)[/color]
[br] [br] [br] [br]Übernimm den Hefteintrag:[br]
Quader Volumen Hefteintrag

Information