★☆☆ [br]Benny war 9 Tage im Urlaub. Jeder Urlaubstag war auch ein Badetag.[br]Gib die relative Häufigkeit von Bennys Badetagen an.[br]

[size=100]★☆☆ ✏️[br]Laya hat 52 Stück Kekse gebacken.[br]Die relative Häufigkeit der Schokoladenkekse beträgt [math]\frac{3}{4}[/math].[br]Berechne, wie viel Stück Schokoladenkekse Laya gebacken hat.[/size]

★☆☆[br]Im Sprachgebrauch verwendet man oft die Wörter absolut oder relativ[br]“Das ist mir absolut egal.”[br]“Die Suppe ist relativ heiß.”[br][br]Erkläre, was die Wörter absolut und relativ bedeuten.[br]Betrachte dazu den Wortsalat. Bringe die Wörter in die richtige Reihenfolge.[br][br]1. Absolut[br]Zusammenhang - unabhängig - ist - anderen - von - Ein - absoluter - Einflüssen.[br][br]2. Relativ[br]Bezug - Relative - stehen - zueinander. - Größen - in

★★☆ [br]Die relative Häufigkeit von Mikas Badetagen im Urlaub ist 1. [br]Was bedeutet diese relative Häufigkeit? 

★★☆ [br]Anna berechnet eine relative Häufigkeit und erhält als Ergebnis 1,2.[br]Warum kann dieses Ergebnis nicht stimmen?

★★★[br]Bauer Konrad sagt: “35 % aller meiner Tiere sind Hühner.”[br]Bäuerin Simone behauptet: “Bei mir sind 90 % aller Tiere Hühner.”[br]35 % ist zwar weniger als 90 %, trotzdem hat Bauer Konrad absolut gesehen mehr Hühner.[br][br]Wie kann das sein? Finde eine mögliche Erklärung.

🔎[br]Lotrecht zeigt immer zum Erdmittelpunkt und ist daher absolut.[br]Senkrecht hingegen ist ein relativer Begriff.[br][br]Wieso ist das so? Finde eine Erklärung!

✋Würfel[br]👥 Führt den Zufallsversuch "Würfeln mit einem Spielwürfel" selbst durch. [br]Arbeitet zu zweit und würfelt insgesamt 100-mal. [br]Legt eine Tabelle für die Strichliste, die absolute Häufigkeit und die relative Häufigkeit an. [br]Tragt eure Ergebnisse in die Tabelle ein. [br]Vergleicht eure Wurfverteilungen in der Klasse. 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[/img]

★☆☆ [br]Wird ein Spielwürfel genau 6-mal geworfen, so ist die Wahrscheinlichkeit jede der Augenzahlen von 1 bis 6 genau einmal zu würfeln, gering. [br]Erkläre, warum das so ist. [br][br]Verwende dazu die Begriffe aus der Wortwolke: Schätzwert, geringe Versuchsanzahl, relative Häufigkeit, Wahrscheinlichkeit

★★☆ [br]Sami hat ein Glücksrad mit 4 gleich großen Sektoren [b]200-mal[/b] gedreht und hat folgende Tabelle mit den absoluten Häufigkeiten erstellt. [br][img]data:image/png;base64,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[/img][br]Sami behauptet: “Die Wahrscheinlichkeit, dass der Pfeil auf dem roten Sektor zum Stehen kommt, beträgt 42 %.”[br]Sami ist bei der Berechnung jedoch ein Fehler unterlaufen. [br]Stelle Samis Aussage richtig.

★★★[br]Maxi hat eine Münze 20-mal geworfen. [br]Maxi behauptet dabei jedes Mal "Kopf" erhalten zu haben. [br]Begründe, warum es Maxis Behauptung kritisch zu betrachten gilt.