Observando la imagen. Identifica cuales son las pendientes de cada una de las rectas. Luego determina si estas son crecientes o decrecientes.[br] [img]data:image/png;base64,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[/img][br]

¿Qué sucede con la recta al graficar la función con pendiente igual a 0? Argumenta tu respuesta. [b](Recuerda que puedes ayudarte de los deslizadores para responder esta pregunta).[/b]

Dada la función [math]y=2x-4[/math] señala todas las alternativas que sean verdaderas y justifica las falsas. [b]Recuerda apoyarte del Apple anterior para responder esta pregunta.[/b]

Hallar la función lineal que representa la situación.

¿Cuánto debo pagar si recorrí 20 cuadras? ¿y 3 kilómetros?

[i]Si mi amiga Ana pagó $54,80 ¿Cuántas cuadras recorrió?[/i]