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