[size=150]Rewrite the rational function [math]g(x)=\frac{x-4}{x}[/math] in the form [math]g(x)=c+\frac{r}{x}[/math], where [math]c[/math] and [math]r[/math] are constants.[/size]

[size=150]The average cost (in dollars) per mile for riding [math][/math]x miles in a cab is [math]c(x)=\frac{2.5+2x}{x}[/math].[/size][br] As [math]x[/math] gets larger and larger, what does the end behavior of the function tell you about the situation?

[size=150]The graphs of two rational functions [math]f[/math] and [math]g[/math] are shown. One of them is given by the expression [math]\frac{2-3x}{x}[/math]. [/size][br][img]data:image/png;base64,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[/img][br] Which graph is it? Explain how you know.

[img]data:image/png;base64,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[/img]

[size=150]State the degree and end behavior of [math]f(x)=5x^3-2x^4-6x^2-3x+7[/math]. Explain or show your reasoning.[/size]

[size=150]The graphs of two rational functions [math]f[/math] and [math]g[/math] are shown. Which function must be given by the expression of [math]\frac{10}{x-3}[/math]? Explain how you know.[br][/size][br][img]data:image/png;base64,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[/img][br]