La Hemimorfita presenta la siguiente composición (peso molecular de la fórmula empírica dividido por las sumas de los pesos atómicos de cada elemento para obtener el porcentaje de cada uno de ellos):
![](data:image/png;base64,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Cristales bien formados de pequeño tamaño, en forma tabular claramente hemimórficos (de aquí recibe el nombre), es decir, presenta terminaciones diferentes en el eje c, que es polar. Son frecuentes los cristales agrupados en forma de abanico así como, las formas estalactíticas, botroidales o terrosas.
Propiedades Físico/químicas
Mineral pesado, perfectamente exfoliable, transparente a traslúcido, de brillo vítreo. Color blanco, incluso azulado, verdoso, amarillento o parduzco.
Al calentarse se vuelve intensamente piezoeléctrico, es decir, los cristales se cargan de electricidad de signo opuesto en las extremidades opuestas del eje C o eje vertical.
Yacimiento/Formación
Es un mineral típico de la zona de oxidación de depósitos sulfurosos de Zn y Pb.
Minerales asociados
Smithsonita, cerusita, anglesita, esfalerita y galena.
Localidad de procedencia
Hemimorfita procedente de la Mina Ojuela, Mapimí, Durango, Mexico.
Presencia del mineral en la provincia de Granada
Desde hace mas de un siglo, se ha descrito este mineral en las calizas dolomíticas de Sierra Almijara y en los mantos alpujárrides de Motril, donde destaca la "Mina Pepita", en la que aparecia formando masas reniformes. También se ha descrito en Sierra de Baza, en las Albuñuelas y Gor.
Interés económico y aplicaciones industriales
Es un mineral secundario para la obtención del Zn. Básicamente posee un interés coleccionístico.
Enlaces recomendados
GLOSARIO GEOLÓGICO