Section-Control (2_086)

Grundkompetenz: AG 2.1, AN 1.1, AN 1.3
Section-Control bezeichnet ein System zur Überwachung der Einhaltung von Tempolimits im Straßenverkehr. Dabei wird nicht die Geschwindigkeit an einem bestimmten Punkt gemessen, sondern die mittlere Geschwindigkeit über eine längere Strecke ermittelt.
a)
In einem [math]6km[/math] langen Baustellenbereich wird eine Section-Control errichtet.[br]Es gilt eine zulässige Höchstgeschwindigkeit von[math]60km/h[/math].[br][br]Jemand behauptet: „Wenn ich die zulässige Höchstgeschwindigkeit im gesamten Baustellenbereich um [math]10\%[/math] überschreite, dann verkürzt sich meine Fahrzeit im Baustellenbereich um [math]10\%[/math].“[br][br][br][b][size=150][br]1) Weisen Sie nach, dass diese Behauptung falsch ist.[/size][/b]
b)
Im nachstehenden Weg-Zeit-Diagramm ist die Fahrt eines Fahrzeugs in einem überprüften Bereich dargestellt.[br][img]data:image/png;base64,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[/img][br][br][br][b][size=150][br]1) Ermitteln Sie die mittlere Geschwindigkeit des Fahrzeugs auf der ersten Weghälfte.[/size][/b]
[b][size=150]2) Argumentieren Sie, dass die mittlere Geschwindigkeit auf der ersten Weghälfte kleiner als die mittlere Geschwindigkeit auf der zweiten Weghälfte ist. [/size][/b]
c)
Ein Fahrzeug fährt durch einen Bereich, der durch eine Section-Control überwacht wird.[br]Seine Geschwindigkeit nimmt auf diesem Streckenabschnitt linear ab.[br][img]data:image/png;base64,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[/img][br]Die Endgeschwindigkeit [math]v_E[/math], die Fahrzeit [math]t[/math] und der zurückgelegte Weg [math]s[/math] sind bekannt.[br][br][br][br][b][size=150]1) Erstellen Sie eine Formel zur Berechnung der Anfangsgeschwindigkeit [math]v_A[/math] des Fahrzeugs.[/size][/b]
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