[*][/*][*][b][center]Ecuaciones lineales[/center][/b][/*][*][/*][left][/left][b]Objetivo de aprendizaje: [/b]Comprende y aplica el lenguaje de las ecuaciones lineales al desarrollar ejercicios prácticos que permitan dar respuesta a diferentes situaciones problemáticas.

Grado de una ecuación lineal. El grado de una ecuación lo determina el exponente mayor de la incógnita. A continuación hay algunos ejemplos que ilustran la diferencia entre ecuaciones lineales y no lineales: 2x + 6 = 12. La ecuación es de primer grado, ya que la incógnita no está elevada a ningún número. 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[/img][br][br]Método para Resolver Ecuaciones Lineales.[br] 1. Eliminar denominadores: multiplicando ambas partes de la ecuación por el mínimo común múltiplo de los denominadores. (Propiedad 2) [br]2. Eliminar paréntesis. (Propiedad distributiva)[br] 3. Transposición de términos. Conseguir una ecuación de la forma a ⋅ x = b. (Propiedad 1). 4. Despejar la incógnita. (Propiedad 2). [br]5. Comprobar la solución. Ejemplo.[br][br] 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[/img][br][b]INSTRUCCIONES:[/b][br][br]Los estudiantes resolverán por medio de juegos interactivos las ecuaciones lineales que los detectives les indicarán. [br][br][list][*]Resuelve la ecuación correctamente.[br][/*][*]Selecciona el número siendo la incógnita.[br][/*][*]Comprueba si está correcta la respuesta.[br][/*][/list]