1º.- Sacar factor común:[br] Si no es posible indica que el factor común es 1 (de grado 0)[br]2º.- Obtén una raíz y su factor correspondiente por Ruffini.[br]3º.- Resuelve la ecuación de segundo grado (aunque como hay más raíces enteras puedes seguir con Ruffini).[br] Indica las dos soluciones de la ecuación (raíces del polinomio) y sus factores correspondientes.[br] Los factores tiene que tener coeficientes enteros, nunca fracciones. [br][br]Siempre salen al menos dos raíces enteras.[br]La tercera raíz puede ser entera o racional.[br][br]Cada ejercicio vale 1 punto, y consta de 5 apartados de 0.2 puntos cada uno.[br]Si se falla uno de los apartados, el resto del ejercicio estará mal.[br][br]Cada vez que pulsas el botón EMPIEZA DE NUEVO cuenta como que has hecho un ejercicio.

A la hora de sacar factor común:[br]Si el polinomio empieza con un coeficiente negativo:[br][math]-x^3+3x^2-5x+1\longrightarrow S.F.C.=-1[/math] (gradoSFC =0)[br][math]-2x^3+3x^2-5x\longrightarrow S.F.C.=-x[/math] (gradoSFC = 1)[br][math]-2x^3+4x^2-2\longrightarrow S.F.C.=-2[/math] (gradoSFC =0) [br]Si empieza por un coeficiente positivo:[br][math]x^3+3x^2-5x+1\longrightarrow S.F.C.=1[/math] (gradoSFC =0) No se puede sacar factor común.[br][math]3x^3+3x^2-6x\longrightarrow S.F.C.=3x[/math] (gradoSFC =1)[br][br]Una vez que contestes correctamente a la pregunta "¿se puede sacar factor común de grado mayor que 0?" e indiques bien cuál es el factor común que se puede sacar, el programa indicará como queda el polinomio una vez realizado el procedimiento[br][img]data:image/png;base64,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[/img]