Transformación Del Oleaje

Transformación del oleaje

Fuente:Sesión 8 2022. (2022, 2 diciembre). Genial.ly. https://view.genial.ly/61abdc56e078940d6d4225b3/presentation-sesion-8-2022 Creditos: Contenido creado por: Alec Nacif Serio Diseño creado por: Genial.ly

Generación en la Tormenta

Fetch

Difracción

Asomeramiento

Refracción

Set Up del Oleaje

Reflexión

Alcance de la Ola:

Rompimiento

Fetch

Esto indica el inicio del viaje de las olas

https://sailandtrip.com/wp-content/uploads/2014/09/Formacion-de-las-olas.jpg

Difracción

El inicio del oleaje empiza a curvarse ante obstaculos que haya.

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

Asomeramiento

Las olas al estar en aguas menos profundas, la altura de éstas aumenta

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

Refracción

- Las olas al llegar a la costa cambian de dirección - Donde se clasifica si el oleaje es divergente o convergente

https://geo.libretexts.org/@api/deki/files/17147/%25E6%2588%25AA%25E5%25B1%258F2021-10-21_%25E4%25B8%258B%25E5%258D%258810.11.56.png

Set Up Oleaje

Linea de la superficie arenosa que se forma en pendiente.

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

Generación de Tormenta

Transferencia de energía hacía la superficie del mar

https://www.iagua.es/sites/default/files/images/fases-de-una-tormenta.jpg

Reflexión

Se pierde muy poca energía al romper contra una barrera vertical

Rompimiento

Al llegar al area rocosa, se dice que llego al "rompiente"

https://www.researchgate.net/publication/289985113/figure/fig9/AS:391357106540557@1470318213926/Figura-9-Rompimiento-de-ondas-en-la-costa-Fuente-Calero-et-al-2004-El-proceso-en-el.png