[size=150]Jada is riding on a Ferris wheel. Her height, in feet, is modeled by the function [math]h\left(m\right)=100\sin\left(-\frac{\pi}{2}+\frac{2\pi m}{10}\right)+110[/math], where [math]m[/math] is the number of minutes since she got on the ride.[br][/size][br]How many minutes does it take the Ferris wheel to make one full revolution? Explain how you know.[br]

What is the radius of the Ferris wheel? Explain how you know.[br]

[size=100]The vertical position, in feet, of the point [math]P[/math] on a windmill is represented by [math]y=5\sin\left(\frac{2\pi t}{3}\right)+20[/math], where [math]t[/math] is the number of seconds after the windmill started turning at a constant speed. Select [b]all [/b]the true statements.[/size]

A seat on a Ferris wheel travels [math]250\pi[/math] feet in one full revolution. How many feet is the carriage from the center of the Ferris wheel?

How many feet does a person on the carousel travel during these 8 revolutions?[br]

What angle does the carousel travel through?[br]

What is the relationship between the angle of rotation and the distance traveled on this carousel? Explain your reasoning. [br]

[size=150]For which angle measures between 0 and [math]2\pi[/math] is the cosine negative and the sine positive?[br][/size]

[size=150]For which angle measures between 0 and [math]2\pi[/math] is the cosine negative and the sine negative?[br][/size]

[size=150]A [math]\frac{\pi}{2}[/math] radian rotation takes a point [math]D[/math] on the unit circle to a point [math]E[/math]. Which other radian rotation also takes point [math]D[/math] to point [math]E[/math]?[/size]

A windmill blade spins in a counterclockwise direction, making one full revolution every 5 seconds. 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[/img][br]Which statements are true? Select [b]all [/b]that apply.

[img]data:image/png;base64,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[/img][br]Which equation has this graph?