Jona hat versucht eine zwölfte Möglichkeit zu entwickeln das Netz eines Würfels mit der Kantenlänge a zu zeichnen. [br]Beschreibe, warum Jonas Zeichnung kein Netz darstellt. [br][img]data:image/png;base64,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[/img]
[br]Bei Jonas Zeichnung handelt es sich um kein Netz, da sich die beiden rot markierten Flächen beim Zusammenfalten überschneiden. [br]Eine Fläche des Würfels bleibt frei. [br][img]data:image/png;base64,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[/img]