[size=200]Wesentliche (didaktische) Grundvorstellungen der Differenzialrechnung:[br][list][*][size=200]Lokale Änderungsrate[/size][/*][*][size=200]Tangentensteigung[/size][/*][*][size=200]Lokale Linearität.[/size][/*][/list][size=150][size=100]Greefrath, Oldenburg, Siller, Ulm & Weigand (2016): Didaktik der Analysis.[/size][br][br][/size][/size][size=200]Zugehörige (fachliche) Aspekte:[br][list][*]Differenzenquotient, Ableitung als Grenzwert [/*][*]lokale Lineare Approximation. 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[/img][br][br][/size][/size]Greefrath, Siller, Oldenburg, Ulm, Weigand (2017): Aspekte und Grundvorstellungen von Ableitung und Integral. BzMU 2017. [br]