[size=150]The temperature was recorded at several times during the day. Function [math]T[/math] gives the temperature in degrees Fahrenheit, [math]n[/math] hours since midnight.[/size][br][br][size=100][size=150]Here is a graph for this function.[/size][/size][br][img]data:image/png;base64,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[/img][br][size=150]For each time interval, decide if the average rate of change is positive, negative, or zero:[/size][br][br]From [math]n=1[/math] to [math]n=5[/math]

From [math]n=5[/math] to [math]n=7[/math]

From [math]n=10[/math] to [math]n=20[/math]

From [math]n=15[/math] to [math]n=18[/math]

From [math]n=20[/math] to [math]n=24[/math]

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[/img][br]Was the person walking faster between 20 and 40 seconds or between 80 and 100 seconds? 

Was the person walking faster between 0 and 40 seconds or between 40 and 100 seconds? [br]

[img]data:image/png;base64,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[/img][br][size=150]The function [math]P[/math] gives the percent of voters between 18 and 29 years old that participated in the election in year [math]t[/math].[br][/size][br]Determine the average rate of change for [math]P[/math] between 1992 and 2000.

Pick two different values of [math]t[/math] so that the function has a negative average rate of change between the two values. Determine the average rate of change.[br]

Pick two values of [math]t[/math] so that the function has a positive average rate of change between the two values. Determine the average rate of change.[br]

[size=150]Jada walks to school. The function [math]D[/math] gives her distance from school, in meters, as a function of time, in minutes, since she left home. [/size][br][br][size=100]What does [math]D\left(10\right)=0[/math] represent in this situation?[/size]

[size=150]Jada walks to school. The function [math]D[/math] gives her distance from school, in meters, [math]t[/math] minutes since she left home. [/size][br][br][size=100]Which equation tells us “Jada is 600 meters from school after 5 minutes”?[/size]

[size=150]The headline reads, “Vending machines are causing our youth to miss school!”[/size][br][br]What is wrong with this claim?

What is a better headline for this information?[br]