Caso 2 Factor Común por agrupación [br][br][b][i]Pasos: [/i][/b][br]1) Consiste en agrupar entre paréntesis los términos que tienen factor común, separados los grupos por el signo del primer término de cada grupo.[br]2) La agrupación puede hacerse generalmente de más de un modo con tal que[br]los dos términos que se agrupen tengan algún factor común, y siempre que las[br] cantidades que quedan dentro del paréntesis después de sacar el factor común[br] en cada grupo, sean exactamente iguales.[br]3) Después de lo anterior se utiliza el procedimiento del caso I, Factor Común[br] Polinomio.[br][img]https://i.ytimg.com/vi/5vyGUZbL4YE/hqdefault.jpg[/img][br]__________________________________https://i.pinimg.com/600x315/89/cf/41/89cf4121484064f8695ef9f42c62ceb4.jpg[br]____________________[br][b]Ejemplos:[br]1) ax + ay + 4x + 4y =[br](ax + ay)(4x + 4y)=[br] a(x + y) + 4(x + y) = [br](x + y)(a + 4)[/b][br] [br][b]2) 2y[sup]2[/sup] – 6y + 5y + 15 =[br] (2y[sup]2[/sup] – 6y) + (5y - 15)=[br] 2y(y - 3) + 5(y - 3)= [br](y - 3)(2y + 5)[br][br]3) 8ac - 4ad - 6bc + 3bd = [br](8ac – 4ad) – (6bc – 3bd)=  [br]4a(2c - d) – 3b(2c - d) = [br](2c - d)(4a - 3b)[br][img]data:image/png;base64,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[/img][br][/b]