Didaktik 08 - 10: Unterschied zwischen den Versionen

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" 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====Formel====
 
====Formel====
<math>l= \frac{L}{r}\pi\sum_{x=1}^{n}</math>
+
<math>l= \frac{L}{r}\pi\sum_{i=1}^{10}1+0,05i</math>

Version vom 9. Dezember 2011, 01:21 Uhr

Das Gast-Wiki im Geo-Wiki: Didaktik der anwendungsbezogenen Mathematik

Inhaltsverzeichnis

Ideensammlung

Funktionales Denken

Proportionalität

Was ist, was soll Sachrechnen

Sachrechnen

Folien vom 18.11. als PDF (mit Office 2010 hat es dann doch geklappt.) Sachrechnen


Def. Sachrechnen (aus Greefrath. 2010. S. 12)
"Sachrechnen im weiteren Sinne bezeichnet die Auseinandersetzung mit der Umwelt, sowie die Beschäftigung mit wirklichkeitsbezogenen Aufgaben im Mathematikunterricht."
--Löwenzahn 16:24, 27. Nov. 2011 (CET)

Funktionen des Sachrechnens nach Winter

Sachrechnen als Lernstoff

Die mathematischen Inhalte des Sachrechnens stehen im Vordergrund. Greefrath setzt vorallem den Schwerpunkt auf die Inhalte der Größen, des Prozent- und Zinsrechnens. Allerdings ist der Inhalt stark davon abhängig wie der Mathematikunterricht gestaltet wird. Das Wichtige dabei ist, dass ein realitätsbezogener Kontext vorliegt. (Vgl. Greefrath. 2010. S. 13)
--Löwenzahn 16:31, 27. Nov. 2011 (CET)

Vermittlung von Größenvorstellungen

Längen
Flächeninhalte
Volumina
1 m^3

Ster 01.jpg
Ster 02.jpg
Ster 03.jpg

Zeit
Massen
Gewichte
Geschwindigkeiten
Dichten
Informationen

(Byte, GB, ....)

Sachrechnen als Lernprinzip

Sachrechnen als Lernziel

Komplexität von Sachrechenaufgaben

Simplex

Unter einem Simplex versteht man eine Struktur vom folgenden Typ:

Zwei Eingabedaten wird durch deren Verknüpfung mittels einer Rechenoperation ein Ausgabedatum zugeordnet.

Komplex

Unter einem Komplex versteht man die Verkettung mehrerer Simplexe. Man unterscheidet linerare und verzweigte Komplexe.

linearer Komplex

Verzweigter Komplex

Modellierung

Realsituation

Kabeltrommel.png
Wieviel m Kabel passt auf die Trommel?

Realmodell

Kabeltrommel 01.png Schätzung:

  • r= 0,05 m
  • R_2 = 1 m
  • R_1 = 2 m
  • L = 2 m

Lauter Kreise Modell Reamodell lauter Kreise.jpg

mathematisches Modell

Kalkulationstabelle

Formel

l= \frac{L}{r}\pi\sum_{i=1}^{10}1+0,05i

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