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| Einige Übungen sind dem gleichnamigen Lernpfad [http://www.austromath.at/medienvielfalt/materialien/int_einfuehrung/lernpfad/ Einführung in die Integralrechnung] der österreichischen Arbeitsgruppe [http://www.austromath.at/medienvielfalt/ Medienvielfalt im Mathematikunterricht] entnommen, die aus einer Kooperation von [http://www.mathe-online.at/ mathe-online] und [http://www.geogebra.at GeoGebra] entstanden ist. | | Einige Übungen sind dem gleichnamigen Lernpfad [http://www.austromath.at/medienvielfalt/materialien/int_einfuehrung/lernpfad/ Einführung in die Integralrechnung] der österreichischen Arbeitsgruppe [http://www.austromath.at/medienvielfalt/ Medienvielfalt im Mathematikunterricht] entnommen, die aus einer Kooperation von [http://www.mathe-online.at/ mathe-online] und [http://www.geogebra.at GeoGebra] entstanden ist. |
| [[Datei:Logo Mathematik-digital 2011.png|200px|right|verweis=Mathematik-digital]] | | [[Datei:Logo Mathematik-digital 2011.png|200px|right|verweis=Mathematik-digital]] |
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| '''Materialien:'''{{pdf|Infini_AB1.pdf|Das bestimmte Integral}}; {{pdf|Infini AB02.pdf|Aufgaben mit Lösung}}; {{pdf|Infini_AB7.pdf|Integralfunktion}}|Lernpfad}} | | '''Materialien:'''{{pdf|Infini_AB1.pdf|Das bestimmte Integral}}; {{pdf|Infini AB02.pdf|Aufgaben mit Lösung}}; {{pdf|Infini_AB7.pdf|Integralfunktion}}|Lernpfad}} |
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| #Berechne die zugehörige Ober- und Untersumme. | | #Berechne die zugehörige Ober- und Untersumme. |
| #Gib auch das arithmetische Mittel von Ober- und Untersumme als Näherungswert für die Fläche unter dem Funktionsgraphen an.|3=Üben}} | | #Gib auch das arithmetische Mittel von Ober- und Untersumme als Näherungswert für die Fläche unter dem Funktionsgraphen an.|3=Üben}} |
| <div class="mw-collapsible mw-collapsed" data-expandtext="Lösungsvorschläge anzeigen" data-collapsetext="Lösungsvorschläge verbergen"> | | <div class="loesung-verstecken mw-collapsible mw-collapsed" data-expandtext="Lösungsvorschläge anzeigen" data-collapsetext="Lösungsvorschläge verbergen"> |
| {| class="wikitable" | | {| class="wikitable" |
| |- | | |- |
| | x || 0 || 0,5 || 1 || 1,5 ||2 || 2,5 || 3 || 3,5 || 4 | | |x||0||0,5||1||1,5||2||2,5||3||3,5||4 |
| |- | | |- |
| | f(x) || 0 || 0,0625 || 0,25 || 0,5625 || 1 || 1,5625 || 2,25 || 3,0625 || 4 | | |f(x)||0||0,0625||0,25||0,5625||1||1,5625||2,25||3,0625||4 |
| |} | | |} |
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| '''Mittelwert: 5,375''' | | '''Mittelwert: 5,375''' |
| </div> | | </div> |
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| {{Box|1=Aufgabe 2|2= Gegeben ist die Funktion f(x) = 0.5 x². | | {{Box|1=Aufgabe 2|2= Gegeben ist die Funktion f(x) = 0.5 x². |
| #Zerlege das Intervall [0;1] mit dem Schieberegler in gleichlange Teilintervalle und bestimme die zugehörige Ober- und Untersumme mit dem Applet. | | #Zerlege das Intervall [0;1] mit dem Schieberegler in gleichlange Teilintervalle und bestimme die zugehörige Ober- und Untersumme mit dem Applet. |
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" enableRightClick="false" showAlgebraInput="false" enableShiftDragZoom="true" showMenuBar="false" showToolBar="false" showToolBarHelp="true" enableLabelDrags="false" showResetIcon="true" /> | | <ggb_applet width="648" height="588" version="4.4" id="kj3t88nw" enableRightClick="false" showAlgebraInput="false" enableShiftDragZoom="true" showMenuBar="false" showToolBar="false" showToolBarHelp="true" enableLabelDrags="false" showResetIcon="true" /> |
| |3=Üben}} | | |3=Üben}} |
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| </div> | | </div> |
| <div class="width-1-2"> | | <div class="width-1-2"> |
| {{#evu:https://www.youtube.com/watch?v=lP1sALCSxQs | | {{#ev:youtube|lP1sALCSxQs|460}}</div> |
| |alignment=right|dimensions=350
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| }}</div> | |
| </div> | | </div> |
| |3=Unterrichtsidee}} | | |3=Unterrichtsidee}} |
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| #Betrachte im Applet die Integralfunktion | | #Betrachte im Applet die Integralfunktion |
| #Bearbeite als Zusammmenfassung das {{pdf|Infini_AB7.pdf|Arbeitsblatt "Die Integralfunktion"}} | | #Bearbeite als Zusammmenfassung das {{pdf|Infini_AB7.pdf|Arbeitsblatt "Die Integralfunktion"}} |
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| [[Kategorie:Integralrechnung|!]]
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| [[Kategorie:ZUM2Edutags]]
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| <metakeywords>ZUM2Edutags,ZUM-Wiki,Mathematik-digital,Einführung in die Integralrechnung,Mathematik,Einführung,Integralrechnung,12. Klasse,Oberstufe,Lernpfad</metakeywords>
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| [[Kategorie:Interaktive Übung]] | | [[Kategorie:Interaktive Übung]] |
| [[Kategorie:GeoGebra]] | | {{DEFAULTSORT:Integralrechnung}} |
| | [[Kategorie:Analysis]] |