Ya que sabemos cómo colocar dos puntos en el sistema de coordenadas, vamos a encontrar la relación que existe entre ellos mediante la distancia.
Sencillo, utilicemos el [b]Teorema de Pitágoras[/b]. ¿Recuerdas?[br][img]data:image/png;base64,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[/img]
Imagina que tienes los puntos: (-4,2) y (6,2). Para calcular la distancia entre ellos, utilizaremos el teorema de Pitágoras que acabamos de revisar.[br][br]Primero, escoge cuál punto será [br][img]data:image/png;base64,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[/img][br][img]data:image/png;base64,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[/img][br][br]Entonces, reemplazando:[br][img]data:image/png;base64,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[/img][br][img]data:image/png;base64,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[/img][br][img]data:image/png;base64,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[/img][br][img]data:image/png;base64,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[/img][br][br]La distancia entre los puntos (-4,2) y (6,2) es de 10 unidades.
Para los puntos anteriores, ¿Obtienes la misma distancia sí cambias el orden de [br][img]data:image/png;base64,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[/img][br][img]data:image/png;base64,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[/img]
Mueve los puntos a la posición indicada y responde las preguntas.
Mueve el punto A a las coordenadas (2, 4) y el punto B a las coordenadas (8, 2), ¿Cuál es la distancia entre ellos?
Mueve el punto A a las coordenadas (2, 8) y el punto B a las coordenadas (8, 0), ¿Cuál es la distancia entre ellos?
Mueve el punto A a las coordenadas (-4, 8) y el punto B a las coordenadas (6, 2), ¿Cuál es la distancia entre ellos?