What is the most expensive a book could be?
Write an inequality to represent costs of books at the sale.
Explain your reasoning.[br]
[size=150]Consider a rectangular prism with length 4 and width and height [math]d[/math].[br][/size][br]Find an expression for the volume of the prism in terms of [math]d[/math].[br][br][img]data:image/png;base64,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[/img]
Compute the volume of the prism when [math]d=1[/math], when [math]d=2[/math], and when [math]d=\frac{1}{2}[/math].
The number -15 is further away from 0 than the number -12 on the number line.
The number -12 is a distance of 12 units away from 0 on the number line.
The distance between -12 and 0 on the number line is greater than -15.
The numbers 12 and -12 are the same distance away from 0 on the number line.
The number -15 is less than the number -12.
The number 12 is greater than the number -12.
[math]2x-\frac{1}{2}[/math]