Función cuadrática: distintas expresiones, elementos y gráfica

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[/img]
¿Qué expresión de la función cuadrática conviene usar para empezar?
Si necesita resolver un sistema de ecuaciones, puede usar la vista CAS de GeoGebra.[br]En el siguiente video se explican los comandos.
Vista CAS
En el siguiente applet de GeoGebra debe ingresar los elementos y las expresiones de la función cuadrática para verificar los resultados obtenidos.
Cargar una foto con la resolución del ejercicio.

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