[i]Autor: Toni Gomà[/i][br][br][i]ABCD[/i] és un quadrat. [i]E[/i] és el punt mitjà del costat [i]AB[/i]. [i]EF[/i] és perpendicular a la diagonal [i]AC[/i].  Quina fracció de l’àrea del quadrat ocupa el triangle [i]CFE[/i]?[br][br][img]data:image/png;base64,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[/img][br][br][br]