[size=100]★☆☆ [br]Beschreibe die besonderen Eigenschaften einer Streckensymmetrale.[br]Verwende für deine Antwort die Begriffe der Wortwolke.[br][br][/size][img]data:image/png;base64,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[/img]

★☆☆ [br]Der Punkt P liegt auf der Streckensymmetrale [math]s_{AB}[/math].[br]Der Abstand des Punktes P vom Punkt A beträgt 3 cm.[br]Gib den Abstand des Punktes P vom Punkt B an.

★☆☆ [br]Gib drei verschiedenen Punkte in Koordinatenschreibweise an, die auf der abgebildeten Streckensymmetrale liegen.[br][br][img]data:image/png;base64,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[/img]

★☆☆ [br]Bei welchen Darstellungen ist die Gerade [math]s_{AB}[/math] eine Streckensymmetrale?