Select [b]all [/b]of the ordered pairs [math](x,y)[/math] that are solutions to the linear equation [math]2x+3y=6[/math].
[size=150]The graph shows a linear relationship between [math]x[/math] and [math]y[/math]. [math]x[/math] represents the number of comic books Priya buys at the store, all at the same price, and [math]y[/math] represents the amount of money (in dollars) Priya has after buying the comic books.[/size][br][img]data:image/png;base64,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[/img][size=100][br][br]Find and interpret the [math]x[/math]- and [math]y[/math]-intercepts of this line.[/size]
Find and interpret the slope of this line.
[size=150][size=100]Find an equation for this line.[/size][/size]
[size=150][size=100]If Priya buys 3 comics, how much money will she have remaining?[/size][/size]
Match each equation with its three solutions.
[math]y=1.5x[/math]
[math]2x+3y=7[/math]
[math]x-y=4[/math]
[math]3x=\frac{y}{2}[/math]
[math]\text{y = -x +1}[/math]
[size=150][size=100]A container of fuel dispenses fuel at the rate of 5 gallons per second. If [math]y[/math] represents the amount of fuel remaining in the container, and [math]x[/math] represents the number of seconds that have passed since the fuel started dispensing, then [math]x[/math] and [math]y[/math] satisfy a linear relationship. [/size][/size][size=150][br][br][size=100]In the coordinate plane, will the slope of the line representing that relationship have a positive, negative, or zero slope? Explain how you know.[/size][/size]
A sandwich store charges a delivery fee to bring lunch to an office building. One office pays $33 for 4 turkey sandwiches. Another office pays $61 for 8 turkey sandwiches. How much does each turkey sandwich add to the cost of the delivery? Explain how you know.