The axis labeled [math]b[/math] represents account balance in dollars. The axis labeled [math]d[/math] represents the day.[br][br][img]data:image/png;base64,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[/img][br][br]Estimate the greatest account balance. On which day did it occur?

Estimate the least account balance. On which day did it occur?

What does the point [math]\left(6,-50\right)[/math] tell you about the account balance?

How can we interpret [math]\mid-50\mid[/math] in the context?

The axis labeled [math]T[/math] represents temperatures in degrees Fahrenheit. The axis labeled [math]d[/math] represents the day.[br][br][img]data:image/png;base64,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[/img][br]What was the warmest high temperature?

Write an inequality to describe the high temperatures, [math]H[/math], over the 8-day period.[list=1][/list]

What was the coldest low temperature?[list=1][/list]

Write an inequality to describe the low temperatures, [math]L[/math], over the 8-day period.

On which day(s) did the [i]largest[/i] difference between the high and low temperatures occur? Write down this difference.[list=1][/list]

On which day(s) did the [i]smallest[/i] difference between the high and low temperatures occur? Write down this difference.[list=1][/list]

[size=150]The point [math]\left(0,3\right)[/math] is 4 taxicab units away from [math]\left(-4,3\right)[/math] and 4 taxicab units away from [math]\left(2,1\right)[/math].[/size][br]Find as many other points as you can that are 4 taxicab units away from [i]both [math]\left(-4,3\right)[/math][/i] and [math]\left(2,1\right)[/math].[br][br]Use the applet below to help you.

Are there any points that are 3 taxicab units away from both points?

[size=150]The inequalities [math]h>2[/math] and [math]h<60[/math] represent the height requirements for an amusement park ride, where [math]h[/math] represents a person's height in inches.[br][/size][br]Write a sentence or draw a sign below that describes these rules as clearly as possible.

At 9 a.m., it was below freezing. In what quadrant would this point be plotted?

At 11 a.m., it was [math]10°C[/math]. In what quadrant would this point be plotted?

Choose another time and temperature. Then tell the quadrant where the point should be plotted.

What does the point [math]\left(0,0\right)[/math] represent in this context?

[math]3a=12[/math]

[math]b+3.3=8.9[/math]

[math]1=\frac{1}{4}c[/math]

[math]5\frac{1}{2}=d+\frac{1}{4}[/math]

[math]2e=6.4[/math]