Linda boards a Ferris Wheel from the bottom, at the 6 o'clock position, and the Ferris Wheel rotates counter-clockwise. The center of the Ferris wheel is 35 feet above the ground and the radius of the Ferris wheel is 18 feet. 1. After the Ferris Wheel has rotated π radians from when Linda boarded the wheel at the bottom, what is Linda's height above the ground in feet? 2. Define a function f that represents Linda's height in feet above the ground in terms of the measure of the rotation angle in radians, θ, since she boarded. (In your formula, express her initial 6 o'clock position as a negative angle, rather than as a positive angle.

Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
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Chapter2: Second-order Linear Odes
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Linda boards a Ferris Wheel from the bottom, at the 6 o'clock position, and the Ferris Wheel rotates counter-clockwise. The center of the Ferris wheel is 35 feet above the ground and the radius of the Ferris wheel is 18 feet.

1. After the Ferris Wheel has rotated π radians from when Linda boarded the wheel at the bottom, what is Linda's height above the ground in feet?

2. Define a function f that represents Linda's height in feet above the ground in terms of the measure of the rotation angle in radians, θ, since she boarded. (In your formula, express her initial 6 o'clock position as a negative angle, rather than as a positive angle.

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