[size=200][b][color=#9900ff]Problem 1[/color][/b][/size]
[img]data:image/png;base64,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[/img][br]How many ounces of food were in the bag 12 days after Andre bought it?[br]
How many days did it take for the bag to contain 16 ounces of food?[br]
How much did the bag weigh before it was opened?[br]
About how many days did it take for the bag to be empty?[br]
[size=200][b][color=#9900ff]Problem 2[/color][/b][/size]
[size=150]The graph shows the relationship between the total cost, in dollars, and the number of hats ordered.[/size][br][img]data:image/png;base64,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[/img][br]What does the slope of the graph tell us in this situation?
[size=200][b][color=#9900ff]Problem 3[/color][/b][/size]
[img]data:image/png;base64,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[/img][br]What is the slope of the graph? [br]
What does the slope tell us about this situation?[br]
Write an equation that represents the relationship between the hikers' distance from the start of the trail, [math]x[/math], and their elevation, [math]y[/math].[br]
Does the equation [math]y-250x=50[/math]0 represent the same relationship between the distance from the start of trail and the elevation? Explain your reasoning.[br]
[size=200][b][color=#9900ff]Problem 4[/color][/b][/size]
The stickers cost $1.50 a sheet and the cardstock cost $3.50 per pack. The equation [math]1.5s+3.5c=21[/math] represents the relationship between sheets of stickers,[math] [/math]s, packs of cardstocks, [math]c[/math], and the dollar amount a kindergarten teacher spent on these supplies. 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[/img][br]Explain how we can tell that this graph represents the given equation.[br][br]
What do the vertical and horizontal intercepts, [math](0,6)[/math] and [math](14,0)[/math], mean in this situation?[br]
[size=200][b][color=#9900ff]Problem 5[/color][/b][/size]
[size=150]Explain why the equation [math]2(3x-5)=6x+8[/math] has no solutions.[/size]