For which ticket prices will the theater earn no revenue? Explain how you know.[br]

At what ticket prices should the theater sell the tickets if it must earn at least $3,200 in revenue to break even (to not lose money) on the musical production? Explain how you know.[br]

[size=150]A company sells running shoes. If the price of a pair of shoes in dollars is [math]p[/math], the company estimates that it will sell [math]50,000-400p[/math] pairs of shoes.[br][/size][br]Write an expression that represents the revenue in dollars from selling running shoes if a pair of shoes is priced at [math]p[/math] dollars.

[size=150]The function [math]f[/math] represents the revenue in dollars the school can expect to receive if it sells [math]220-12x[/math] coffee mugs for [math]x[/math] dollars each.[br][br]Here is the graph of [math]f[/math].[/size][br][img]data:image/png;base64,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[/img][br]Select [b]all [/b]the statements that describe this situation.

[size=150]Write an equation to represent the relationship between the step number, [math]n[/math], and the number of small squares, [math]y[/math].[br][/size][br][img]data:image/png;base64,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[/img][br][br][size=100]Briefly describe how each part of the equation relates to the pattern.[/size]

Is the relationship between the step number and number of small squares quadratic? Explain how you know.[br]

[size=150]A small marshmallow is launched straight up in the air with a slingshot. The function [math]h[/math], given by the equation [math]h\left(t\right)=5+20t-5t^2[/math], describes the height of the marshmallow in meters as a function of time, [math]t[/math], in seconds since it was launched.[/size][br][br]Use graphing technology to graph the function [math]h[/math] in the applet below.[br][br]About when does the marshmallow reach its maximum height?

About how long does it take before the marshmallow hits the ground?

What domain makes sense for the function [math]h[/math] in this situation?[br]

[table][tr][td]Graph A[/td][td]Graph B[/td][/tr][tr][td][img]data:image/png;base64,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[/img][/td][/tr][tr][td]Graph 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[/img][/td][/tr][/table]Which graph could represent the distance fallen, in feet, as a function of time in seconds?

[size=150]A bacteria population, [math]p[/math], is modeled by the equation [math]p=100,000\cdot2^d[/math], where [math]d[/math] is the number of days since the population was first measured.[/size][br][br][size=100]Select [b]all[/b] statements that are true in this situation.[/size]