In der Mathematik werden verschiedene Methoden benutzt eine Funktion darzustellen, d.h. anzugeben, welches Element der Zielmenge die Funktion den verschiedenen Elementen der Startmenge zuordnet.[br][size=150][br]Pfeildiagramm [br][/size]Das Pfeildiagramm wird selten benutzt, da es viel Platz benötigt und wenig übersichtlich ist.[br][br]            [b][size=100][size=200]f[/size][/size][/b][br] 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[/img]

Viel eher stellt man die Funktion in einer [b][i]Wertetabelle [/i][/b]dar.[br]In die obere Zeile schreibt man die x-Werte und in die untere Zeile direkt unten drunter dazu gehörigen Funktionswert.[br]Die im Pfeildiagramm definierte Funktion f notiert man in einer Wertetabelle daher auf folgende Weise:[br] [img]data:image/png;base64,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[/img]

Am häufigsten stellt man eine Funktion durch einen (Funktions)Graphen dar.[br]Wir zeigen, wie man die als Wertetabelle gegebene Funktion f[br] 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[/img][br]durch einen Graphen darstellt.[br][br]Zuerst zeichnen wir ein kartesisches Koordinatensystem:[br] [img]data:image/png;base64,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[/img][br]Es ist üblich, dass die x-Werte, also die Elemente der Startmenge auf der [b]x-Achse[/b] (der horizontalen Achse) aufgetragen werden. Daher zeichnen wir auf der x-Achse eine Skala für die Elemente der Startmenge ein:[br] [img]data:image/png;base64,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[/img][br][br]Dann zeichnen wir auf der y-Achse eine Skala für die Elemente der Zielmenge ein. [br]Da die Werte hier von 0 bis 600 reichen, müssen wir grössere Skalenabstände wählen.[br] [img]data:image/png;base64,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[/img][br]Nun können wir die Zuordnung durch einen Graphen darstellen:[br][br]In der Tabelle lesen wir ab, dass f(-3) = 0 ist.[br]Der Funktionswert von -3 ist also 0. Das stellen wir im Koordinatensystem folgendermassen dar:[br]Wir gehen auf der x-Achse (sie zeigt die Elemente der Startmenge ) zu x = -3.[br] [img]data:image/png;base64,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[/img][br][br][br]Nun setzen wir bei x = -3 einen Punkt, dessen y-Koordinate gleich dem dazugehörigen Funktionswert ist.[br]Es ist f(-3) = 0 Also setzen wir bei x = -3 einen Punkt auf der Höhe von y = 0, und d.h. auf Höhe der x-Achse:[br][br] [img]data:image/png;base64,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[/img][br]Fertig![br]Als nächstes lesen wir in der Wertetabelle ab, dass f(0) = 300 ist.[br]Das stellen wir im Schaubild dar, indem wir bei x = 0 einen Punkt mit der y-Koordinate 300 setzen:[br] [img]data:image/png;base64,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[/img]

Bei den letzten beiden Einträgen der Tabelle, f(2) = 300 und f(5) = 600 verfahren wir genauso.[br][br]Hier die Wertetabelle [br] 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[/img][br][br]und der fertige Funktionsgraph:[br] 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[/img][br][br]Umfasst die Startmenge nicht nur einzelne Zahlen, sondern einen ganzen Zahlenbereich, dann besteht der Graph aus so vielen Punkte, dass er wie in diesem Schaubild eine Linie ist:[br] [img]data:image/png;base64,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[/img][br]

An diesem Beispiel zeigen wir, wie man an einem Graphen Funktionswerte abliest.[br]Wir wollen wissen, welche Zahl die oben als Graph dargestellte Funktion f der Zahl -3 zuordnet[br]Mit anderen Worten: wir wollen den Funktionswert der Funktion f von x = -3 ablesen.[br]Wieder anders ausgedrückt: wir wollen f(-3) ablesen.[br][br]Dazu gehen wir auf der x-Achse zur Stelle x = -3 . [br](x-Achse weil die x-Werte, also die Elemente der Startmenge, auf der x-Achse aufgetragen sind.)[br] 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[/img][br][br]Bei x = -3 gehen wir nun bis zum Graphen und dann rüber zur y-Achse. Dort lesen wir ab, auf welcher Höhe der Graph verläuft: [br] [img]data:image/png;base64,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[/img][br][br]Wir lesen ab: es ist y = -1[br]Der Funktionswert (der Funktion f) von x = -3 ist damit -1. [br]In der üblichen Kurzschrift notiert: f(-3) = -1.