Tarea 2_ Parte II: Conectar ecuaciones con gráficas (Alg1.2.10)

[size=200][b][color=#9900ff]Problema 1[/color][/b][/size]
Andrea compró una bolsa nueva de croquetas para gatos. Al día siguiente, la abrió para alimentar a su gato. La gráfica muestra cuántos kilogramos quedaron en la bolsa en los días posteriores a la compra.
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[/img][br]¿Cuántos kilogramos de croquetas había aproximadamente en la bolsa 12 días después de que Andrea la comprara?
¿Cuántos días tardó la bolsa en tener 16 kg. de croquetas?
¿Cuánto pesaba la bolsa antes de abrirla?
Aproximadamente, ¿cuántos días tardó en vaciarse la bolsa?
[size=200][b][color=#9900ff]Problema 2[/color][/b][/size]
Un equipo de béisbol compra gorras para sus jugadores.
[size=150]La gráfica muestra la relación entre el costo total, en dólares, y el número de gorras pedidas.[br][/size][br][img]data:image/png;base64,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[/img][br]¿Qué nos dice la pendiente de la gráfica en esta situación?
[size=200][b][color=#9900ff]Problema 3[/color][/b][/size]
[size=200][b][color=#9900ff]Problema 4[/color][/b][/size]
Una maestra de kínder compró para su clase, calcomanías y cartulinas con un total de $21.
Las calcomanías cuestan $1.50 por hoja y la cartulina cuesta $3.50 por paquete. La ecuación:  [math]1.5s+3.5c=21[/math]  representa la relación entre la hoja de calcomanías, s, los paquetes de cartulinas, c, y la cantidad de dólares que gastó la maestra de kínder.[br][br][img]data:image/png;base64,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[/img][br]Explica cómo podemos saber que esta gráfica representa a la ecuación dada.[br][br]
¿Qué significan la intersección vertical y la intersección horizontal, [math](0,6)[/math] y [math](14,0)[/math], en esta situación?[br]
[size=150]Explica por qué la ecuación [math]2(3x-5)=6x+8[/math] no tiene soluciones.[/size]
Schließen

Information: Tarea 2_ Parte II: Conectar ecuaciones con gráficas (Alg1.2.10)