[size=150]Suppose that during its flight, the elevation [math]e[/math] (in feet) of a certain airplane and its time [math]t[/math], in minutes since takeoff, are related by a linear equation. Consider the graph of this equation, with time represented on the horizontal axis and elevation on the vertical axis. For this situation, decide if the slope is positive, zero, or negative.[/size][br][br]The plane is cruising at an altitude of 37,000 feet above sea level.

The plane is descending at rate of 1000 feet per minute.

The plane is ascending at a rate of 2000 feet per minute.

[size=150]A group of hikers park their car at a trail head and walk into the forest to a campsite. The next morning, they head out on a hike from their campsite walking at a steady rate. The graph shows their distance in miles, [math]d[/math], from the car after [math]h[/math] hours of hiking.[/size][br][img]data:image/png;base64,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[/img][br]How far is the campsite from their car? Explain how you know.

Write an equation that describes the relationship between [math]d[/math] and [math]h[/math].

After how many hours of hiking will they be 16 miles from their car? Explain or show your reasoning.

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[/img][br][br] [br]Select [b]all[/b] the statements about the situation that are true.