Zwei Zahlen sollen am Zahlenstrahl verglichen werden. [br]Wie erkennst du die kleinere Zahl?

Hawa soll die Zahlen 1,34 und 1,32 am Zahlenstrahl einzeichnen.[br]Beschreibe, was Hawa besser machen könnte.[br][img]data:image/png;base64,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[/img]

Flo soll entscheiden, welche Zahl kleiner ist. 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[/img][br]Flo argumentiert: "1,15 liegt weiter rechts am Zahlenstrahl als 1,13. Daher ist 1,13 größer."[br]Stimmt Flos Lösung? Begründe![br]