[list][*]Charge $5 for the first hour and $8 for each additional hour[/*][*]Charge $15 for the first hour and $6 for each additional hour[/*][/list][br]Explain your reasoning. 

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[/img][br]Describe what is happening in each tank. Either draw a picture in the applet below, say it verbally, or write a few sentences.[/size][/size]

[size=150][size=100]Use the table to estimate when the tanks will have the same amount of water.[/size][/size]

The amount of water (in liters) in tank 1 after [math]t[/math] minutes is [math]30t+25[/math]. The amount of water (in liters) in tank 2 after [math]t[/math] minutes is [math]-20t+1000[/math]. Find the time when the amount of water will be equal.

At a certain time of day, the travel time it takes elevator A to reach height [math]h[/math] in meters is [math]0.8+16[/math] seconds.[br][br]The travel time it takes elevator B to reach height [math]h[/math] in meters is [math]-0.8h+12[/math] 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[/img][br][/size][/size][size=150][size=100]What is the height of each elevator at this time?[/size][/size]

[size=150][size=100]How long would it take each elevator to reach ground level at this time?[/size][/size]

[size=150][size=100]If the two elevators travel toward one another, at what height do they pass each other? [/size][/size]

[size=150][size=100]How long would it take?[/size][/size]

[size=150][size=100]If you are on an underground parking level 14 meters below ground, which elevator would reach you first?[/size][/size]

[size=150][size=100]In a two-digit number, the ones digit is twice the tens digit. If the digits are reversed, the new number is 36 more than the original number. Find the number.[/size][/size]

[size=150][size=100]The sum of the digits of a two-digit number is 11. If the digits are reversed, the new number is 45 less than the original number. Find the number.[/size][/size]

[size=150][size=100]The sum of the digits in a two-digit number is 8. The value of the number is 4 less than 5 times the ones digit. Find the number.[/size][/size]