Änderungen von Dokument BPE 5.1 Ortslinien und Geometrie im Dreieck

Zuletzt geändert von Holger Engels am 2025/12/01 19:31

Von 24.3 nach 25.1 Von 36.1 nach 37.1

Von Version 25.1

bearbeitet von Dirk Tebbe
am 2025/11/05 15:59

Änderungskommentar: Es gibt keinen Kommentar für diese Version

Auf Version 36.1

bearbeitet von kerstinhauptmann
am 2025/11/06 12:31

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Zusammenfassung

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Anhänge (0 geändert, 4 hinzugefügt, 0 gelöscht)

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Seiteneigenschaften

Dokument-Autor

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--XWiki.dirktebbe
++XWiki.kerstinhauptmann

Inhalt

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  [[Kompetenzen.K1]] [[Kompetenzen.K6]] Ich kann den Satz des Thales beweisen.
  [[Kompetenzen.K4]] [[Kompetenzen.K5]] Ich kann den Satz des Thales zur Prüfung auf Orthogonalität und zur Konstruktion eines rechten Winkels nutzen.
--{{aufgabe id="Grundkonstruktion Mittelsenkrechte" afb="I" quelle="Kerstin Hauptmann, Heiko Kraiß, Dirk Tebbe" kompetenzen="K4, K5, K6" zeit="15" cc="by-sa"}}
++{{aufgabe id="Erarbeitungsaufgabe Ortslinien" afb="III" quelle="Kerstin Hauptmann, Heiko Kraiß, Dirk Tebbe" kompetenzen="K1,K4, K5, K6" zeit="15" cc="by-sa"}}
  Im Koordinatensystem sind die Punkte {{formula}}A(-1|-2), B(5|3){{/formula}}  und {{formula}}C(3|7){{/formula}} gegeben.
  (%class=abc%)
 . Zeichne {{formula}}A, B{{/formula}}  und {{formula}}C{{/formula}} in ein Koordinatensystem ein und konstruiere zur Strecke {{formula}}\overline{AB}{{/formula}} und zur Strecke {{formula}}\overline{AC}{{/formula}} jeweils die Mittelsenkrechte.
 . Die beiden Mittelsenkrechten schneiden sich in einem Punkt {{formula}}S{{/formula}}. Messe jeweils die Entfernung von {{formula}}S{{/formula}} zu {{formula}}A, B{{/formula}}  und {{formula}}C{{/formula}}. Was stellst du fest?
--1. Überprüfe durch Konstruktion, ob die Mittelsenkrechte der Strecke {{formula}}\overline{BC}{{/formula}} ebenfalls durch den Punkt  {{formula}}S{{/formula}} verläuft.
++1. Ermittle grafisch durch Konstruktion, ob die Mittelsenkrechte der Strecke {{formula}}\overline{BC}{{/formula}} ebenfalls durch den Punkt  {{formula}}S{{/formula}} verläuft.
 . Beschreibe, welche Bedeutung Punkt {{formula}}S{{/formula}} für das Dreieck {{formula}}ABC{{/formula}} hat.
  {{/aufgabe}}
--{{aufgabe id="Haltestellen" afb="II" quelle="Kerstin Hauptmann, Heiko Kraiß, Dirk Tebbe" kompetenzen="K3, K4," zeit="10" cc="by-sa"}}
++{{aufgabe id="Grundkonstruktion Mittelsenkrechte" afb="I" quelle="Kerstin Hauptmann, Heiko Kraiß, Dirk Tebbe" kompetenzen="K2,K4, K5, K6" zeit="15" cc="by-sa"}}
++Im Koordinatensystem sind die Punkte {{formula}}A(-1|-2), B(5|3){{/formula}}  und {{formula}}C(3|7){{/formula}} gegeben.
++(%class=abc%)
++1. Zeichne {{formula}}A, B{{/formula}}  und {{formula}}C{{/formula}} in ein Koordinatensystem ein und konstruiere zur Strecke {{formula}}\overline{AB}{{/formula}} und zur Strecke {{formula}}\overline{AC}{{/formula}} jeweils die Mittelsenkrechte.
++1. Die beiden Mittelsenkrechten schneiden sich in einem Punkt {{formula}}S{{/formula}}. Messe jeweils die Entfernung von {{formula}}S{{/formula}} zu {{formula}}A, B{{/formula}}  und {{formula}}C{{/formula}}. Was stellst du fest?
++1. Ermittle grafisch durch Konstruktion, ob die Mittelsenkrechte der Strecke {{formula}}\overline{BC}{{/formula}} ebenfalls durch den Punkt  {{formula}}S{{/formula}} verläuft.
++1. Beschreibe, welche Bedeutung Punkt {{formula}}S{{/formula}} für das Dreieck {{formula}}ABC{{/formula}} hat.
++{{/aufgabe}}
++
++{{aufgabe id="Haltestellen" afb="II" quelle="Kerstin Hauptmann, Heiko Kraiß, Dirk Tebbe" kompetenzen="K2,K3, K4,K6" zeit="10" cc="by-sa"}}
  Leo, Karmen und Moritz wohnen im gleichen Ort. Stellt man ihre Wohnhäuser in einem Koordinatensystem dar, dann wohnt Leo in  {{formula}}L(-1|-7){{/formula}}, Karmen in {{formula}}K(4|6){{/formula}} und Moritz in {{formula}}M(8|8){{/formula}}.
  (%class=abc%) Alle drei fahren mit dem Bus zur Schule. Die Bushaltestellen befinden sich in den Punkten {{formula}}A(-2|1){{/formula}} und {{formula}}B(6|-3){{/formula}}.
 . Untersuche, welches der Kinder von seinem Wohnort zu den beiden Haltestellen gleich weit hat.
@@ -23,7 +23,7 @@
 . Ermittle weitere Punkte, die von den beiden Haltestellen jeweils gleich weit entfernt sind und nenne die Ortslinie, auf der all diese Punkte liegen.
  {{/aufgabe}}
--{{aufgabe id="Anwendungsaufgabe" afb="II" quelle="Kerstin Hauptmann, Heiko Kraiß, Dirk Tebbe" kompetenzen="K4, K5" zeit="10" cc="by-sa"}}
++{{aufgabe id="Anwendungsaufgabe" afb="II" quelle="Kerstin Hauptmann, Heiko Kraiß, Dirk Tebbe" kompetenzen="K4, K5" zeit="15" cc="by-sa"}}
 . Zeichne die Gerade {{formula}}g:y=-0,5\cdot x - 2{{/formula}} und den Punkt {{formula}}P(2|4){{/formula}} in ein Koordinatensystem ein.
 . Konstruiere die Gerade, die senkrecht zu {{formula}}g{{/formula}} steht und durch {{formula}}P{{/formula}} geht. Gib ihre Gleichung an.
 . Konstruiere die Gerade, die von {{formula}}g{{/formula}} und {{formula}}P{{/formula}} den gleichen Abstand hat.
@@ -34,8 +34,8 @@
  Ein Dreieck im Koordinatensystem hat die Eckpunkte {{formula}}A(-1|-2), B(5|3){{/formula}}  und {{formula}}C(3|7){{/formula}}.
  (%class=abc%)
--1. Berechne die Gleichung der Gerade, die durch {{formula}}A{{/formula}}und durch den Mittelpunkt der Strecke {{formula}}BC{{/formula}} geht. Überprüfe dein Ergebnis in einem Schaubild.
--1. Berechne die Gleichung der Gerade, die durch den Punkt {{formula}}B{{/formula}} und durch den Mittelpunkt der Strecke {{formula}}AC{{/formula}} geht. Überprüfe dein Ergebnis im Schaubild.
++1. Bestimme die Gleichung der Gerade, die durch {{formula}}A{{/formula}} und durch den Mittelpunkt der Strecke {{formula}}BC{{/formula}} geht. Überprüfe dein Ergebnis in einem Schaubild.
++1. Bestimme die Gleichung der Gerade, die durch den Punkt {{formula}}B{{/formula}} und durch den Mittelpunkt der Strecke {{formula}}AC{{/formula}} geht. Überprüfe dein Ergebnis im Schaubild.
 . Der Schnittpunkt der Geraden (Seitenhalbierenden) ist der Schwerpunkt des Dreiecks. Berechne diesen Schwerpunkt.
  {{/aufgabe}}

Grundkonstruktion Mittelsenkrechte.ggb

Author

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Grundkonstruktion Mittelsenkrechte.svg

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Haltestelle .svg

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Haltestelle.ggb

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Änderungen von Dokument BPE 5.1 Ortslinien und Geometrie im Dreieck

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