|
|
| Línea 49: |
Línea 49: |
| | ====Ilustrando el Modelo de Polarización ==== | | ====Ilustrando el Modelo de Polarización ==== |
| | Esta simulación procura ilustrar el modelo del fenómeno de polarización. | | Esta simulación procura ilustrar el modelo del fenómeno de polarización. |
| − | <center><ggb_applet width="543" height="462" version="4.4" ggbBase64="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" </center> | + | <center><ggb_applet width="538" height="462" version="4.4" ggbBase64="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" </center> |
| | Un filtro de polarización tiene un eje particular de transmisión y solo se admite la alineación y el paso de las ondas de luz con tal eje. | | Un filtro de polarización tiene un eje particular de transmisión y solo se admite la alineación y el paso de las ondas de luz con tal eje. |
| | En esta simulación, las ondas no polarizadas pasan a través del polarizador vertical, permaneciendo solo sus componentes verticales. | | En esta simulación, las ondas no polarizadas pasan a través del polarizador vertical, permaneciendo solo sus componentes verticales. |
Revisión del 23:01 30 mar 2014
Tutorial: Deslizándose por la Ley de Snell
Diseño del Centro Babbage
Para seguir la tutela de este instructivo de Centro Babbage, conviene abrir la pantalla de Ventana GeoGebra y avanzar paso a paso.
La propuesta es construir un escenario ilustrativo de la Ley de Snell como el siguiente.
Establecerlo empleando las herramientas que nos ofrece GeoGebra y apelando en particular a la Herramienta de Deslizador para explorar los resultados según diversas relaciones entre los índices de refracción de uno y otro medio.
Mientras se construye este escenario de simulación dinámica, se aprenderá cómo emplear una serie de herramientas, en la siguiente secuencia:
1 Para ilustrar el fenómeno se delinea el límite de la interfaz entre uno y otro medio, llamando C al punto de incidencia, trazando además una perpendicular a tal límite que pasa por C y una circunferencia de radio l.
2 Con la Herramienta de Vector se representa al rayo.
3 Crear el punto F de intersección de la recta del rayo incidente y la circunferencia de radio l y, empleando la Herramienta de Simetría Axial se procede a trazar el rayo reflejado..
4 Trazar la perpendicular al límite entre medios que pasa por el punto F y establecer la relación de valores entre sendos índices de refracción de uno y otro medio. Para hacerlo de modo simple, se crea un deslizador con un rango de variación entre 0.2 y 35 para poder explorar las situaciones en que n_2 < n_1 y en los que es mayor.
5 Trazar la Circunferencia[C, l razón_{n_2/n_1}] siendo l la longitud elegida para la primera circunferencia y estando n_2 relacionada a n_1 a través del deslizador correspondiente.
6 Trazar los puntos de intersección entre la circunferencia recién creada y la perpendicular f al límite entre medios que pasa por F.
7 El rayo refractado queda determinado por los puntos C y H (siendo H el punto H de intersección, en el medio 2, de la perpendicular f y la segunda circunferencia).
8 Con la Herramienta de Ángulo se señalan los de incidencia y refracciíón así como el de desviación, como se ilustra en la figura.
9 Explorar el comportamiento del fenómeno simulado geométrica y esquemáticamente..
Ilustrando el Modelo de Polarización
Esta simulación procura ilustrar el modelo del fenómeno de polarización.
<ggb_applet width="538" height="462" version="4.4" ggbBase64="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"
Un filtro de polarización tiene un eje particular de transmisión y solo se admite la alineación y el paso de las ondas de luz con tal eje.
En esta simulación, las ondas no polarizadas pasan a través del polarizador vertical, permaneciendo solo sus componentes verticales.
Esta onda transversa vertical se aproxima al polarizador vertical. Si el polarizador se rota, solo un componente de la onda puede atravesarlo.
Si se lo rota 90 grados, la onda se detiene completamente.
Tildando las casillas, se pueden intercalar de uno a tres polarizadores para notar qué sucede, incluso modificando los correspondientes ángulos.
Para iniciar la animación, se debe recurrir al deslizador inferior izquierdo..
