Darstellungen von Funktionen in der Mathematik
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.
Pfeildiagramm
Das Pfeildiagramm wird selten benutzt, da es viel Platz benötigt und wenig übersichtlich ist.
f
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)
Wertetabelle
Viel eher stellt man die Funktion in einer Wertetabelle dar.
In die obere Zeile schreibt man die x-Werte und in die untere Zeile direkt unten drunter dazu gehörigen Funktionswert.
Die im Pfeildiagramm definierte Funktion f notiert man in einer Wertetabelle daher auf folgende Weise:
![](data:image/png;base64,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)
Funktionsgraph
Am häufigsten stellt man eine Funktion durch einen (Funktions)Graphen dar.
Wir zeigen, wie man die als Wertetabelle gegebene Funktion f
durch einen Graphen darstellt.
Zuerst zeichnen wir ein kartesisches Koordinatensystem:
Es ist üblich, dass die x-Werte, also die Elemente der Startmenge auf der x-Achse (der horizontalen Achse) aufgetragen werden. Daher zeichnen wir auf der x-Achse eine Skala für die Elemente der Startmenge ein:
Dann zeichnen wir auf der y-Achse eine Skala für die Elemente der Zielmenge ein.
Da die Werte hier von 0 bis 600 reichen, müssen wir grössere Skalenabstände wählen.
Nun können wir die Zuordnung durch einen Graphen darstellen:
In der Tabelle lesen wir ab, dass f(-3) = 0 ist.
Der Funktionswert von -3 ist also 0. Das stellen wir im Koordinatensystem folgendermassen dar:
Wir gehen auf der x-Achse (sie zeigt die Elemente der Startmenge ) zu x = -3.
Nun setzen wir bei x = -3 einen Punkt, dessen y-Koordinate gleich dem dazugehörigen Funktionswert ist.
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:
Fertig!
Als nächstes lesen wir in der Wertetabelle ab, dass f(0) = 300 ist.
Das stellen wir im Schaubild dar, indem wir bei x = 0 einen Punkt mit der y-Koordinate 300 setzen:
![](data:image/png;base64,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)
Bei den letzten beiden Einträgen der Tabelle, f(2) = 300 und f(5) = 600 verfahren wir genauso.
Hier die Wertetabelle
und der fertige Funktionsgraph:
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:
Funktionswerte am Graphen ablesen
An diesem Beispiel zeigen wir, wie man an einem Graphen Funktionswerte abliest.
Wir wollen wissen, welche Zahl die oben als Graph dargestellte Funktion f der Zahl -3 zuordnet
Mit anderen Worten: wir wollen den Funktionswert der Funktion f von x = -3 ablesen.
Wieder anders ausgedrückt: wir wollen f(-3) ablesen.
Dazu gehen wir auf der x-Achse zur Stelle x = -3 .
(x-Achse weil die x-Werte, also die Elemente der Startmenge, auf der x-Achse aufgetragen sind.)
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:
Wir lesen ab: es ist y = -1
Der Funktionswert (der Funktion f) von x = -3 ist damit -1.
In der üblichen Kurzschrift notiert: f(-3) = -1.