Grundkompetenz: AG 2.1, FA 1.5, AN 1.3, AN 2.1

Die Leistungskurve, auch Arbeitskurve genannt, ist die Darstellung der Arbeitsleistung einer Arbeitnehmerin/eines Arbeitnehmers in Abhängigkeit von der Tageszeit unter Berücksichtigung seiner Durchschnittsleistung ([math]100[/math] Prozent). 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[/img][br][br]Quelle: http://wirtschaftslexikon.gabler.de/Archiv/85252/leistungskurve-v9.html [30.05.2014].

[b][size=150]1) Lesen Sie ab, in welchen Zeitintervallen die Leistungsbereitschaft abnimmt.[/size][/b]

Um 9 Uhr beträgt die Leistungsbereitschaft einer Arbeitnehmerin [math]110\%[/math]. Um 12 Uhr[br]beträgt sie [math]140\%[/math]. Im Zeitintervall von 12 Uhr bis 14 Uhr beträgt die mittlere Änderungsrate[br]der Leistungsbereitschaft [math]-12\%[/math] pro Stunde.[br][br][br][br][b][size=150]1) Berechnen Sie die mittlere Änderungsrate der Leistungsbereitschaft im Zeitintervall von 9 Uhr bis 12 Uhr.[/size][/b]

[b][size=150]2) Berechnen Sie die Leistungsbereitschaft um 14 Uhr.[/size][/b]

Die Leistungsbereitschaft eines Arbeitnehmers kann im Zeitintervall von 0 Uhr bis 6 Uhr[br]durch die Funktion [math]f[/math] beschrieben werden. Dabei gilt:[br][br][math]f(t)=\frac{10}{3}\cdot t^2-20\cdot t+40[/math][br][br][math]t[/math] ... Zeit in Stunden, [math]0\le t\le6[/math][br][math]f(t)[/math] ... Leistungsbereitschaft zur Zeit [math]t[/math] in Prozent[br][br][br][br][b][size=150]1) Berechne[/size][size=150]n Sie die 1. Ableitung der Leistungsbereitschaft um 2:30 Uhr.[/size][/b]