Taller de Ciencias: mayo 2016

miércoles, 18 de mayo de 2016

La agrupación de los átomos de C

Esto es una representación de las uniones que tienen los átomos de C en el grafito, cada uno de sus átomos se une mediante enlaces covalentes a otros 3 átomos de C. De esta manera quedan e- libres que son los que hacen que este sólido covalente sea conductor eléctrico.

Cristales de azúcar

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

https://www.youtube.com/watch?v=cjJSeAB_URs

martes, 3 de mayo de 2016

HUEVO EN AGUA.

En un principio pensábamos que los dos huevos (el de mayor y menor caducidad) se hundirían en el agua. Pero lo que ocurrió fue que el huevo más 'viejo' de quedó flotando y el otro, se hundió.
La explicación es que los huevos an perdiendo masa al paso del tiempo, masa que que es expulsada por los poros de su cáscara. Al disminuir la masa del huevo siendo ahora menor que la del agua, el huevo flota.