Toda función exponencial es de la forma f(x)=ax, donde a es la base, que siempre será un número mayor de cero y diferente de 1. El exponente x es cualquier número real. [br][br]Características:[br][br]1) Su dominio es el conjunto de números reales.[br][br]2) Su alcance es el conjunto de números reales mayores de cero.[br][br]3) Si 01,entonces su gráfica tiene comportamiento creciente en todo su dominio.[br][br]5) Pasa por el punto (1,a), intercepto en el eje de y es igual a 1, no hay interceptos en el eje de x.[br][br]Ejemplo de gráfica:[br][br][img]data:image/jpeg;base64,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[/img]