☆ Fridolin hat den Umfang u der zusammengesetzten Figur folgendermaßen berechnet:[br]u = 2 · (17 + 6) + 2 · (5 + 6) - 2 · 5 = 46 + 22 - 10 = 58 cm.[br][br]Beschreibe Fridolins Rechenweg in eigenen Worten![br][img]data:image/png;base64,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[/img]
[br]Fridolin hat die Figur in zwei Rechtecke unterteilt und deren Umfänge addiert.[br]Da dann die schwarz strichlierte Strecke doppelt gezählt wurde, hat Fridolin diese 2-mal abgezogen.[br][br][img]data:image/png;base64,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[/img]