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Solve the problems below. Copy the description of your Ferris wheel in the text box an: include that as part of your initial Discussion post in Brightspace. Using "copy" from here in Mobius and "paste" into Brightspace should work. Hint: This is similar to Question 48 in Section 8.1 of our textbook. We covered thi: section In "5-1 Reading and Participation Activities: Graphs of the Sine and [:08th Functions" in Module Five. You can check your answers to part a and c to make sure the you are on the right track. A Ferris wheel is 29 meters in diameter and completes 1 full revolution in 8 minutes. A Ferris wheel is 29 meters in diameter and boarded from a platform that is 1 meter above the ground. The six o'clock position on the Ferris wheel is level with the loading platform. The wheel completes 1 full revolution in 8 minutes. The function h (it) gives a person's height in meters above the ground t minutes after the wheel begins to turn. a. Find the amplitude. midline. and period of h (t). Enter the exact answers. Amplitude: A = Number meters Midline: h = Number meters Period: P : Number minutes b. Assume that a person has just boarded the Ferris wheel from the platform and that the Ferris wheel starts spinning at timet = 0. Find a formula for the height function h (t) Hints: - What is the value of h (0)? - Is this the maximum value of h (t) the minimum value of h (t), or a value betweer the two? - The function sin (t) has a value between its maximum and minimum at t = 0 , s: can h (t) be a straight sine function? - The function cos (t) has its maximum at t = 0, so can h (t) be a straight cosine function? c. If the Ferris wheel continues to turn, how high off the ground is a person after 2f minutes? Number