11th Edition

ISBN: 9780136167716

Author: Sullivan

Publisher: PEARSON

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Textbook Question

Chapter 7.3, Problem 108AYU

The Ferris Wheel In 1893, George Ferris engineered the Ferris wheel. It was 250 feet in diameter. If a Ferris wheel makes 1 revolution every 40 seconds, then the function

$h (t) = 125 \sin (0.157 t - \frac{π}{2}) + 125$

represents the height $h$ , in feet, of a seat on the wheel as a function of time $t$ , where $t$ is measured in seconds. The ride begins when $t = 0$ .

a. During the first 40 seconds of the ride, at what time $t$ is an individual on the Ferris wheel exactly 125 feet above the ground?

b. During the first 80 seconds of the ride, at what time $t$ is an individual on the Ferris wheel exactly 250 feet above the ground?

c. During the first 40 seconds of the ride, over what interval of time $t$ is an individual on the Ferris wheel more than 125 feet above the ground?

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Chapter 7.3, Problem 107AYU

Chapter 7.3, Problem 109AYU

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