[size=200][b][color=#9900ff]Problema 1[/color][/b][/size]
Selecciona todos los puntos que están en la gráfica de la ecuación: [math]4y-6x=12[/math].
[size=200][b][color=#9900ff]Problema 2[/color][/b][/size]
[size=150]A continuación se muestra la gráfica de la ecuación: [math]x+3y=6[/math].[/size][br][img]data:image/png;base64,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[/img][br]Selecciona todas las parejas de coordenadas que representan una solución a la ecuación.
[size=200][b][color=#9900ff]Problema 3[/color][/b][/size]
Después de vender [math]x[/math] entradas para adulto y [math]y[/math] entradas para niños, el teatro recauda $275 dólares.[br][img]data:image/png;base64,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[/img][br]¿Qué significa el punto [math](30,7)[/math] en esta situación?
[size=200][b][color=#9900ff]Problema 4[/color][/b][/size]
Escribe una ecuación que represente la relación entre la cantidad de dólares que Ximena tiene en su cuenta bancaria y el número de semana que lo ahorra.[br]
¿Cuántas semanas le toma a Ximena tener $250 dólares en su cuenta bancaria? Marca este punto en la gráfica.
[size=200][b][color=#9900ff]Problema 5[/color][/b][/size]
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[/img][br][br]Selecciona todas las ecuaciones que representan la relación entre la cantidad de dinero, [math]A[/math], y el número de meses, [math]m[/math].