Wiederholung: Flächeninhalt von Vierecken

FLINK-Team, 23. 9. 2025

Obsah

  1. Rechteck und Quadrat
    1. Flächeninhalt von einem Rechteck
    2. Einfluss einer Änderung von b auf den Flächeninhalt eines Quadrats
    3. Gemischte Aufgaben - Dezimalzahlen
    4. Im Zirkus
  2. Parallelogramm und Raute
    1. Flächeninhalt Parallelogramm
    2. Auswirkungen von Änderungen auf den Flächeninhalt des Parallelogramms
    3. Flächeninhalt Parallelogramm berechnen
    4. Eine bunte Tüte an Parallelogramm-Aufgaben
  3. Deltoid
    1. Flächeninhalt eines Deltoids
    2. Einfluss von Änderungen auf den Flächeninhalt
    3. Flächeninhalt berechnen
    4. Dragomir und seine Familie
  4. Trapez
    1. Flächeninhalt eines Trapezes
    2. Auswirkungen von Änderungen auf den Flächeninhalt
    3. Flächeninhalt berechnen
    4. Mathe-Monkey im Trapezdschungel

1.

Rechteck und Quadrat

  • 1. Flächeninhalt von einem Rechteck
  • 2. Einfluss einer Änderung von b auf den Flächeninhalt eines Quadrats
  • 3. Gemischte Aufgaben - Dezimalzahlen
  • 4. Im Zirkus

1.1.

Flächeninhalt von einem Rechteck

Gegeben ist ein Rechteck mit Länge a und Breite b.[br]Wie kannst du den Flächeninhalt A dieses Rechtecks berechnen?
Ein Rechteck hat folgende Seitenlängen:[br]a = 7 cm[br]b = 4 cm[br][br]Berechne den Flächeninhalt.
Wie kannst du den Flächeninhalt A eines Quadrats mit der Seitenlänge s berechnen?
Ein Quadrat hat die Seitenlänge s = 10 mm.[br]Berechne den Flächeninhalt.
FLINK-Team

1.2.

1.3.

1.4.

2.

Parallelogramm und Raute

  • 1. Flächeninhalt Parallelogramm
  • 2. Auswirkungen von Änderungen auf den Flächeninhalt des Parallelogramms
  • 3. Flächeninhalt Parallelogramm berechnen
  • 4. Eine bunte Tüte an Parallelogramm-Aufgaben

2.1.

Flächeninhalt Parallelogramm

★☆☆ [br]Berechne den Flächeninhalt A des Parallelogramms mit folgenden Bestimmungsstücken.[br]a = 6 cm[br]h[sub]a[/sub] = 2 cm
★★☆ [br]Selina und Anna berechnen den Flächeninhalt des dargestellten Parallelogramms.[br][br][img width=468,height=211]https://lh7-us.googleusercontent.com/fSEJcxzCODo5THuPKIwAHKIfb6xE2HEY-Di_nnkxqeaX8LnGxrxgBoCJNXF9j7_n0vAXtYybTFdLgwCYnkV8ickkvXw_ADyUK7vsOKCou_xifUBOCqAYrsRNtc2G2fI4JQggee3shpXUSjUUjBsHGwY[/img][br][br]Selina rechnet: [br]Flächeninhalt = Seitenlänge · zugehöriger Höhe[br]A = a · h[sub]a[/sub][br]A = 5 · 3 [br]A = 15 cm² [br][br]Anna rechnet: [br]Flächeninhalt = Seitenlänge · zugehöriger Höhe [br]A = b · h[sub]b[/sub][br]A = 4 · 3,75[br]A = 15 cm²[br][br]Begründe, warum Selina und Anna beide zum selben Ergebnis gelangen.
★★★ [br]Jonas zeichnet die Höhe h[sub]a[/sub] im Parallelogramm beliebig ein.[br]Jonas verschiebt die 2 Teile so, dass ein flächengleiches Rechteck entsteht.[br]Argumentiere, warum die Formel für den Flächeninhalt gilt, egal wo die Höhe h[sub]a[/sub] innerhalb des Parallelogramms eingezeichnet wird.[br][br][img]data:image/png;base64,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[/img]
FLINK-Team

2.2.

2.3.

2.4.

3.

Deltoid

  • 1. Flächeninhalt eines Deltoids
  • 2. Einfluss von Änderungen auf den Flächeninhalt
  • 3. Flächeninhalt berechnen
  • 4. Dragomir und seine Familie

3.1.

Flächeninhalt eines Deltoids

★☆☆ [br]Mit welcher Formel kann der Flächeninhalt A eines Deltoids berechnet werden?
★☆☆ ✏️[br]Berechne den Flächeninhalt A des Deltoids mit den folgenden Diagonalenlänge:[br]e = 11 cm[br]f = 6 cm
★☆☆ ✏️[br]Tobi berechnet den Flächeninhalt eines Deltoids mit den Diagonalenlängen e = 5 cm und f = 4 cm folgendermaßen: [br][math]A=e·f=5\cdot4=20[/math][br]A = 20 cm[sup]2[/sup][br]Beschreibe, welcher Fehler Tobi unterlaufen ist.[br]Stelle das Ergebnis richtig.
★★☆ [br]Moritz behauptet: "Ich kann den Flächeninhalt A eines Deltoids berechnen, indem ich zuerst die Länge beider Diagonalen multipliziere und dann durch 2 dividiere."[br][math]A=\frac{e·f}{2}[/math][br]Erkläre mithilfe einer Skizze warum Moritz recht hat.
FLINK-Team

3.2.

3.3.

3.4.

4.

Trapez

  • 1. Flächeninhalt eines Trapezes
  • 2. Auswirkungen von Änderungen auf den Flächeninhalt
  • 3. Flächeninhalt berechnen
  • 4. Mathe-Monkey im Trapezdschungel

4.1.

Flächeninhalt eines Trapezes

★☆☆ [br]Mit welchen Formeln kann der Flächeninhalt dieses Trapezes berechnet werden?[br][img]data:image/png;base64,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[/img]
★☆☆ [br]Gib eine Formel zur Berechnung des Flächeninhalts dieses Trapezes an.[br]Verwende dazu die vorgegebenen Variablen.[br][br][img]data:image/png;base64,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[/img]
★☆☆ ✏️[br]Berechne den Flächeninhalt des Trapezes mit den folgenden Angaben:[br]a = 12 cm[br]c = 7 cm[br]h = 5 cm
★★★[br]Aida hat den Flächeninhalt eines Trapezes folgendermaßen berechnet.[br]Beschreibe Aidas Lösungsweg in eigenen Worten.[br][br][img]data:image/png;base64,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[/img][br][math]A_1=\frac{2\cdot4}{2}=4[/math][br][math]A_2=4\cdot4=16[/math][br][math]A_3=\frac{4\cdot3}{2}=6[/math][br][math]A_{Trapez}=4+16+6=26[/math] [math]cm^2[/math]
Schau dir die Herleitung der Flächeninhaltsformel noch einmal ganz genau an![br]Nimm dann ein Blatt Papier und eine Schere zur Hand und führe sie selbst aus. [br]
FLINK-Team

4.2.

4.3.

4.4.

Informace