Boarding for a ferris wheel occurs on a platform next to the 6:00 position (see image). The ferris wheel makes one full revolution every 5 minutes. (Assume the ferris wheel never stops rotating). The ferris wheel reaches a maximum height of 104 feet above the ground. Determine a cosine function that models the height h(feet) an occupant is above the ground at time t (minutes). Let t = 0 correspond to boarding the ferris wheel from the platform. h=h(t) = m 12 feet feet

Boarding for a ferris wheel occurs on a platform next to the 6:00 position (see image). The ferris wheel makes one full revolution every 5 minutes. (Assume the ferris wheel never stops rotating). The ferris wheel reaches a maximum height of 104 feet above the ground. Determine a cosine function that models the height h(feet) an occupant is above the ground at time t (minutes). Let t = 0 correspond to boarding the ferris wheel from the platform. h=h(t) = m 12 feet feet

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter6: The Trigonometric Functions

Section6.5: Trigonometric Graphs

Problem 5E

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Question

Boarding for a ferris wheel occurs on a platform next to the 6:00 position (see image). The ferris wheel makes
one full revolution every 5 minutes. (Assume the ferris wheel never stops rotating).
The ferris wheel reaches a maximum height of 104 feet above the ground.
Determine a cosine function that models the height h(feet) an occupant is above the ground at time t
(minutes).
Let t = 0 correspond to boarding the ferris wheel from the platform.
h=h(t) =
m
12 feet
feet

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