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Reid gets on a Ferris Wheel from a platform 3 feet above the ground (which is the low point of the rotation). The diameter of the Ferris Wheel is 20 feet, and one revolution takes 24 seconds. Write a function for Reid's height, in feet, in terms of his time, in seconds. a) Use your answer from problem 28 to determine Reid's height after 1 minute. b)Use your answer from problem 28 to determine when Reid's height will first reach 18 feet.

User Henriksen
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1 Answer

12 votes
12 votes

This corresponds to a sinusoidal graph, we have:

Radius= 20 feet, that corresponds to the amplitud (A)

One revolution takes 24 seconds, that corresponds to the period

Min= 3 feet

k=360/24=15

D= bottom distance+ amplitud=3+20=23 feet


\begin{gathered} \text{The movement is represented by the expression:} \\ y=A\cos (kx)+D \end{gathered}

Then, let x be the time, in seconds:


y=20\cos (15x)+23

a) To determine Reid's height after 1 minute= 60 seconds, substitute x=60


\begin{gathered} y=20\cos (15\cdot60)+23 \\ y=9\text{ f}eet \end{gathered}

b) To determine when Reid's height will first reach 18 feet, we have to substitute y=18 feet, and isolate x:


\begin{gathered} 18=20\cos (15x)+23 \\ 18-23=20\cos (15x) \\ -5=20\cos (15x) \\ -(5)/(20)=\cos (15x) \\ -(1)/(4)=\cos (15x) \\ By\text{ trigonometric properties:} \\ 15x=\cos ^(-1)(-(1)/(4))+2\pi n \\ x=(\cos^(-1)(-(1)/(4)))/(15)+(2\pi n)/(15) \end{gathered}

User Philipk
by
3.0k points
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