[size=150][table][tr][td][br]Más tarde, se dio cuenta de que no había pedido suficientes suministros. Hizo otro pedido de 8 de las mismas calculadoras y 1 más de la misma cinta métrica. Pagando $178.50.[/td][td][img]data:image/png;base64,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[/img][br][/td][/tr][/table][br][br]Este sistema representa las condiciones de esta situación:[br][math]\begin{cases} \begin {align}20c + 10m &= 495\\ 8c + \hspace{4.5mm} m &= 178.50 \end{align}\end{cases}[/math][br][br]Discute en parejas:[/size][list=1][*]En esta situación, ¿qué significan las soluciones de la primera ecuación? [br][/*][*]¿Qué significan las soluciones de la segunda ecuación?[/*][*]Para cada ecuación, ¿cuántas soluciones posibles hay? ¿Cómo lo sabes?[/*][*]En esta situación, ¿qué significa la solución del sistema?[br][/*][/list]

[size=150]Encuentra la solución del sistema. Explica o muestra tu razonamiento.[/size][br]

[math]\begin {cases} \begin {align}2x + 3y &= \hspace {2mm}7\\ \text-2x +4y &= 14 \end {align} \end {cases}[/math]

[math]\begin {cases} \begin {align}2x + 3y &= \hspace {2mm}7\\ 3x -3y &= 3 \end {align} \end {cases}[/math]

[math]\begin {cases} \begin {align}2x + 3y &= 5\\ 2x +4y &= 9 \end {align} \end {cases}[/math]

[math]\begin {cases} \begin {align}2x + 3y &=16\\ 6x -5y &= 20 \end {align} \end {cases}[/math]

Dado el siguiente sistema de tres ecuaciones: [br][math]\begin{cases}3 x + 2y - z = 7 \\ \text{-} 3x + y +2z =\text- 14 \\ 3x+y-z=10 \end{cases}[/math][br][list][*]Utiliza el método de eliminación en las primeras dos ecuaciones y obtendrás una nueva ecuación. [br][/*][*]Utiliza el método de eliminación en las dos últimas ecuaciones (elimina la misma variable que en el primer paso) y obtendrás una nueva ecuación.[/*][*]Resuelve el sistema de las dos nuevas ecuaciones. [/*][*]Sustituye los valores resultantes para obtener la solución de las tres variables. [/*][/list][list][/list]¿Cual es la solución del sistema de ecuaciones original) [br]