Wiederholung GW der Klasse 6

Löse die Aufgaben im Heft.

([math]x,y\in\mathbb{Q}[/math])[br][br][size=150]1.[/size][br][br][math]\frac{1}{6}=\frac{x}{54}[/math][br]

2.

[math]\frac{5}{8}-\frac{3}{8}:6=[/math]

3.

[math]\frac{5}{7}\cdot\left(-\frac{1}{5}\right)=[/math]

4.

[math]3^4-3^3=[/math]

5.

[math]x+6,2=5,7[/math]

6.

Die Zahlenpaare sind zueinander direkt proportional. [br]a) Übernimm die Tabelle und ergänze die Lücken.[br]b) Zeichne den Graphen.[br][br][table][tr][td]x [/td][td]1[/td][td]6[/td][td]8[/td][td][/td][/tr][tr][td]y [/td][td][br][/td][td]1,5[/td][td][/td][td]2,5[/td][/tr][/table]

[br]a)[br][table][tr][td]x [/td][td]1[/td][td]6[/td][td]8[/td][td][b][color=#0000ff]10[/color][/b][/td][/tr][tr][td]y [/td][td][b][color=#0000ff]0,25[/color][/b][/td][td] 1,5[/td][td][b][color=#0000ff]2[/color][/b][/td][td]2,5[/td][/tr][/table][br]b)[br][img]data:image/png;base64,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[/img]

7.

20% von 90 kg

8.

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[/img]

9.

Die Grundseite g eines Parallelogramms ist 16 cm lang, die zugehörige Höhe h = 5 cm.[br]Berechne den Flächeninhalt.

10.

Die Kantenlänge a eines Würfels ist 4 cm lang.[br]Berechne Volumen und Oberflächeninhalt des Würfels.

Information: Wiederholung GW der Klasse 6