$5 for 4 pounds of apples

$3.50 for [math]\frac{1}{2}[/math] pound of cheese

$8.25 for [math]1\frac{1}{2}[/math] pounds of coffee beans

$6.75 for [math]\frac{3}{4}[/math] pounds of fudge

$5.50 for a [math]6\frac{1}{4}[/math] pound pumpkin

[math]\frac{2}{3}\cdot\left(\frac{-4}{5}\right)[/math]

[math]\left(\frac{-5}{7}\right)\cdot\left(\frac{7}{5}\right)[/math]

[math]\left(\frac{-2}{39}\right)\cdot39[/math]

[math]\left(\frac{2}{5}\right)\cdot\left(\frac{-3}{4}\right)[/math]

Which equation represents the story?

What does [math]x[/math] represent in the equation you picked above?

Find the solution to the equation you picked above. Explain or show your reasoning.

What does the solution tell you about its situation?

Which equation represents the story?[br]

What does [math]x[/math] represent in the equation you picked above?

Find the solution to the equation you picked above. Explain or show your reasoning.

What does the solution tell you about its situation?

[size=150]Here is a diagram and its corresponding equation. [/size][br][br][img]data:image/png;base64,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[/img] [math]6\left(x+1\right)=24[/math][br][br]Find the solution to the equation and explain your reasoning.

[size=150]Below is a set of data about temperatures. The [i]range[/i] of a set of data is the distance between the lowest and highest value in the set. What is the range of these temperatures?[/size][br][br][math]9^\circ \text{C}, \text-3^\circ \text{C}, 22^\circ \text{C}, \text-5^\circ \text{C}, 11^\circ \text{C}, 15^\circ \text{C}[/math]

[size=150]A store is having a 25% off sale on all shirts. Explain or show two different ways to calculate the sale price for a shirt that normally costs $24.[/size]