Screenshot oder Photo der Aufgaben hochladen.[br][br]Bearbeite folgendes [url=https://www.uebungskoenig.de/fileadmin/user_upload/uebungskoenig/mathe/klasse8/gebrochenrational/gebrochen_rationale_funktionen_2.pdf]Arbeitsblatt[/url] und vergleiche es mit den [url=https://www.uebungskoenig.de/fileadmin/user_upload/uebungskoenig/mathe/klasse8/gebrochenrational/gebrochen_rationale_funktionen_2_loesung.pdf]Lösungen[/url].[br][img]data:image/png;base64,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[/img]