A double ferris wheel is pictured below. A large rotating arm with diameter 22 is centered 15 meters off the ground, and completes one rotation every 13 minutes. At the end of each side of the large arm is a smaller wheel with diameter 6 meters, which completes one rotation about its center every 5 minutes. P If you board the ferris wheel at point P at time t = 0, and each wheel rotates in the direction shown by the arrows, find an equation for your height, H above ground after t minutes. H(t) =
A double ferris wheel is pictured below. A large rotating arm with diameter 22 is centered 15 meters off the ground, and completes one rotation every 13 minutes. At the end of each side of the large arm is a smaller wheel with diameter 6 meters, which completes one rotation about its center every 5 minutes. P If you board the ferris wheel at point P at time t = 0, and each wheel rotates in the direction shown by the arrows, find an equation for your height, H above ground after t minutes. H(t) =
Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
Section: Chapter Questions
Problem 1RQ
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Transcribed Image Text:A double ferris wheel is pictured below. A large rotating arm with diameter 22 is centered 15 meters off the
ground, and completes one rotation every 13 minutes. At the end of each side of the large arm is a smaller
wheel with diameter 6 meters, which completes one rotation about its center every 5 minutes.
P
If you board the ferris wheel at point P at time t = 0, and each wheel rotates in the direction shown by the
arrows, find an equation for your height, H above ground after t minutes.
H(t) =
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