[size=150]Lo primero que debes saber: [color=#980000]Este applet tiene el objeto de [b]motivar la intuición respecto a la definición formal de límite de una función en un punto a[/b], por lo que debe considerarse como provisional, y debe, [color=#0000ff]mediante la práctica y el estudio, [b]ser superado por el concepto formal.[br][br]Debes observar: [br]1) Una función: 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[/img][br][color=#980000]Que es ingresada en la casilla a la 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Una casilla para escribir un valor de 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[/img][br][color=#000000]Para definir un entorno de f(a) en el eje y:[br][img]data:image/png;base64,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[/img][br]3) Usando el deslizador en la parte inferior derecha:[br][img]data:image/png;base64,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[/img][br]Buscas la medida del intervalo, entorno de "a" en el eje x:[br][img]data:image/png;base64,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[/img][br]Tal que, la imagen de todo punto de dicho entorno de "a", se "encajen" dentro del entorno de f(a) que fue definido por el epsilón del punto 1).[br][br]Observa el video a continuación...[/color][/color][/b][/color][/color][/size]