[size=150]¿Cuál es la pendiente de la gráfica [math]5x-2y=20[/math]?[/size]

[size=150]¿Cuál es la intersección con el eje [math]y[/math] de cada una de las siguientes ecuaciones?[/size][br][br][math]y=6x+2[/math]

[math]10x+5y=30[/math]

[math]y-6=2(3x-4)[/math]

[size=150]Roberto quería encontrar las intersecciones con los ejes de la ecuación:  [math]10x+4y=20[/math]. Primero decidió poner la ecuación en la forma pendiente-intersección. Aquí está su trabajo:[br][br][center][math]10x+4y=20[/math][br][math]4y=20-10x[/math][br][math]y=5-10x[/math][/center]Concluyó que la intersección con el eje [math]x[/math] es [math](\frac{1}{2},0)[/math] y la intersección con el eje y es [math](0,5)[/math].[/size][br][br]¿Qué error cometió Roberto?

¿Cuáles son las intersecciones con los ejes de esta recta? Explica o muestra tu razonamiento.[br]

[size=150]¿Qué gráfica representa la ecuación [math]12=3x+4y[/math]? Explica cómo lo sabes.[/size][br][table][tr][td]A[br][img]data:image/png;base64,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[/img][/td][td]B[br][img]data:image/png;base64,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[/img][/td][/tr][/table]

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[/img][br]¿Cuánto dinero tiene Ana en su cuenta después de 10 días?[br]

¿Cuánto tiempo le tomó ahorrar $200?

¿Cuánto dinero tenía Ana en su cuenta de ahorro cuando empezó a ahorrar con regularidad?

Escribe una ecuación para representar la cantidad de pesos en su cuenta de ahorro y el número de días de ahorro. Asegúrate de especificar qué representa cada variable.

[size=150]La gráfica muestra las posibles combinaciones de la cantidad de boletos para adultos y la cantidad de boletos para estudiantes que se vendieron.[br][/size][br][img]data:image/png;base64,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[/img][br]¿Qué significa la intersección vertical [math](0,200)[/math] en esta situación?