Ferris wheel trigonometry questions There are 32 passenger “pods” which are evenly spaced around the Ferris wheel. The Ferris wheel starts to move and spins 1 rotation every 5 minutes. This is an example of a periodic function, because the View full question and answer details: https://www. Graph of h(t)=9-8cos(18t) If you're seeing this message, it means we're having trouble loading external resources on our website. a) Determine a sinusoidal equation that gives Sandy’s height, h, above the ground as a function of A ferris wheel, centre O, has a diameter of 10m and carries eight equally spaced carriages for children to sit in. For how many minutes of any revolution is your seat above 15 meters? Whiteboard. The ride takes 4 minutes to complete one revolution. The wheel has a 16 {\displaystyle {\mathit {16}}\,} meter diameter, and turns at three revolutions per minute, with its lowest point one meter above the ground. Explain why your May 2, 2014 · Lesson: Ferris Wheel Exam-Style Question Sometimes I just want to remind myself and others that not every lesson has to be “special” or involve a game or video. Aug 8, 2019 · "Jacob and Emily ride a Ferris wheel at a carnival in Vienna. Ruby has a pulse rate of 73 beats per minute and a This video explains how to determine the equation that models the height of person on a Ferris wheel. Ferris Wheels—Using Trigonometric Functions to Model Cyclical Behavior Engage NY's files Mathematics High School: Algebra II Module 2. A Ferris wheel has a radius of 26 m and its centre is 29 m above the ground. Exam questions lessons every we Ferris wheel problem: Trig Past Paper Questions. When viewed from the side where passengers board, the Ferris wheel rotates counterclockwise and makes two full turns each minute. The Ferris wheel at Navy Pier has a diameter of 140 feet. What is the height of the center of the wheel above the base of the incline when the wheel has rolled 5 ft up the incline? Trigonometry; Trigonometry questions and answers; Ferris Wheel Worksheet A Ferris wheel is 60 meters in diameter and rotates once every three minutes The center axle of the Ferris wheel is 40 meters from the ground. Provide an equation of such a sine function that will ensure that the Ferris wheel’s minimum height of the ground is 0. Apply your knowledge of trignometric functions and ratios to solve word problems dealing with ferris wheels. 4/(60/15) and got 0. The wheel docs every minute. kastatic. Dec 8, 2007 · Trigonometry problems dealing with the height of two people on a ferris wheen The graph will be shown (0<x<360), and a ferris wheel can be animated (animate theta… Use sliders to adjust the a,b,c,d parameters in y=asin(bx+c)+d. The height above the ground, H metres, of a passenger on a Ferris wheel t minutes after the wheel starts turning, is modelled by the equation H = α − 10 cos (80 t)° + 3 sin (80 t)° where α is a constant. It takes her 1. Lessons that are successful are those where students learn to think better and experience mathematics at work. At the bottom of the ride, the passenger is 2 m above the ground. How fast is a rider rising or falling when he/she is 6 m The height above the ground, H metres, of a passenger on a Ferris wheel t minutes after the wheel starts turnmg, is modelled by the equation where a IS a constant. The London Eye1 is a huge Ferris wheel with diameter 135 meters (443 feet) in London, England, which completes one rotation every 30 minutes. So for this part I tool 1. kasandbox. Write an equation to describe the height of a rider on the Ferris wheel starting at its lowest point. a) Determine the cosine equation of the graph, if the rider gets on at the lowest point. Download free-response questions from past exams along with scoring guidelines, sample responses from exam takers, and scoring distributions. At what times is your height 9 m above the ground? Write your answer correct to the nearest second. Formula used : Amplitude, vertical shift d= (max+min)/2. In these exercises, students encounter parameterized functions for the position of the Ferris wheel. Trigonometry word problems (part 1) 19. When loading, people are 4 feet above the ground. A Ferris wheel has a diameter of 30 m, with the centre Example: One of the most common applications of trigonometric functions is, Ferris wheel, since the up and down motion of a rider follows the shape of sine or cosine graph. You start your ride from the bottom of the wheel. We are using the Understanding the trigonometric period of a function is essential for deciphering cyclic patterns in trigonometry, such as the moving seat of a Ferris wheel. The radius of the wheel is 25 ft. I've query regarding a subquestion (c) the shortest distance between carriages 1 and 4. In reality, no one boards a Ferris wheel halfway up; passengers board at the bottom of the wheel. Sketch a graph of your height as a rider as a function of time. 4 3 minutes, every time around. (K/U) b) Determine the linear velocity, in metres per second. a) Sketch the sinusoidal graph showing how your height above the ground varies during the first two cycles. Your step up to seat on the wheel at the bottom 2 feet above the ground so you are sitting 4 feet above the ground to start. In this presentation, Mohammed (B. IIT Bombay and a Master in Engineering from The University of Queensland Australia) presents an easy to follow explan Dec 18, 2016 · After years of seeing other teachers share pictures of the unit circle projects their students created, I decided to finally take the plunge. Google Classroom PRACTICE Trig Word Problems 1. A pod’s position can be determined by the angle, radians, which is measured anticlockwise from the positive -direction, as shown in the diagram below. There is a cart that is 8 feet deep moving towards the ferris wheel at 15 feet per second, the cart is 240 feet to the left of the wheel. Navigation Word Problem; 22. Learn how to solve this common trig word problem involving a ferris wheel. It rotates once every 48 seconds. Thanks A Ferris wheel with a 48-foot diameter makes one revolution every 3 minutes. (a) What are the maximum and minimum heights of the Ferris wheel? Nov 22, 2020 · Precalculus Trigonometry Ferris Wheel Question A Ferris wheel is 12 meters in diameter and makes one counterclockwise revolution every 6 minutes. Question . I cannot assuming that the Ferris wheel rotates at a constant speed once the ride begins. As the Ferris wheel rotates counterclockwise, a passenger’s height above the horizonal axis increases, and reaches its maximum of 25 feet above the axis after 90° of rotation. The wheel makes a full rotation every 40 seconds. B=π/2. To truly model the motion of a Ferris wheel, we need to start with passengers on the bottom of the wheel. b) Sketch two complete cycles of a graph representing the height of a rider above the ground, assuming the rider gets on the The following diagram represents a large Ferris wheel, with a diameter of 100 metres. Download. Join my Saturdays free power hour!https://betteryourmaths. The London Eye 1 is a huge Ferris wheel 135 meters (394 feet) tall in London, England, which completes one rotation every 30 minutes. The period of the Ferris wheel is _____ sec Here we tackle some sinusoidal function word problems. A Ferris wheel is 45 meters in diameter and boarded from a platform that is 1 meter above the ground. 3) The summary provides the cosine equation to model the rider's height over time and calculates the height at 52 seconds. The Ferris wheel must start $0. if a person starts the ride 10 feet off the ground, give the cosine function of the ride. Explore math with our beautiful, free online graphing calculator. Ferris Wheel Trig Problem; 24. A carnival has a Ferris wheel that is feet in diameter with passenger cars. If the center of the wheel is 30 ft above the ground, how long after reaching the low point is a rider 50 ft above the ground? Solving this problem rests on constructing a good diagram. PART A – Riding the Wheel . The wheel does 3 rotations every minute. 5 m above ground. Passengers get on at the wheels lowest point which is 1 meter above ground level. 35 of a revolutions. The six o’clock position on the Ferris wheel is level with the loading platform. Cookie Consent We use cookies and other tracking technologies to offer you a better experience, personalize content and ads, and to analyze our performance and site traffic. Supposing the minimum height of the Ferris Wheel occurs when t=0, write the sinusoidal function for the height as a function of time. time. Trig identies part 3 (part 5 if you watch the proofs) 18. What is the angle from the ground up to the center of the Ferris wheel and how long is the cable? Answer Nov 15, 2023 · How Trigonometry is Used in Ferris Wheel Trigonometry, a branch of mathematics that focuses on the relationships between the sides and angles of triangles, plays a crucial role in many real-life applications. $\endgroup$ – Mar 1, 2019 · A Ferris wheel has a radius of 10 m and rotates at a rate of one revolution every 48 s. Solutions are in the images below. To reach Merit, the student could link the solutions back to the problem to find an IBDP Maths AA: Topic : SL 3. A Ferris wheel with radius 40 feet completes 1 revolution every 60 seconds. When we look at the behavior of this Ferris wheel it is clear that it completes 1 cycle, or 1 revolution, and then repeats this revolution over and over again. Sketch the graphs Ferris Wheel Questions 1. It rotates once every 53 seconds. In this video, you'll learn the answers to questions like:• What is the trig functi Step 1: Turn the Ferris Wheel Step 2: Study how the red graph created by the turning Ferris Wheel Step 3: Use the slider of a, b, c to find a function that best describes the relationship between the time elapsed and the height of the red car on the Ferris Wheel? Step 4: After you find the function, Click on New and do it again. A person on the Ferris wheel is closest to the ground at t=0 seconds. The height of a passenger will vary with time. It rotates once every 40 seconds. com/watch?v=9EewrkE9hyE&list=PLJ-ma5dJyAqpk9ZsAGhMFco8b3_rlmcPu&index=1Volume of water in a tilted pipe: htt Determine how fast a passenger on the wheel is going vertically upwards when the passenger is at point A, 6 metres higher than the centre of the wheel, and is rising. S Jan 6, 2015 · Also, using the info from earlier, I found that if I doubled 24m/160s i would get 48m/320s, which conveniently matches the diameter of the ferris wheel. With the equation, the height is determined and the ti May 19, 2015 · This common word problem always seems tricky, but we show you how to break the question down to develop a trig equation. Example A Ferris Wheel 50 ft in diameter makes one revolution every 40 seconds. It gets up to speed (t=0) when Jennifer is at the 3 o'clock position. Write down the height of P above ground level Jul 16, 2020 · Question: Suppose you wanted to model a Ferris wheel using a sine function that took $60$ seconds to complete one revolution. create a graph that shows how a passenger’s height on the Ferris wheel depends on the number of degrees of rotation from the boarding point of the Ferris wheel. Graph functions, plot points, visualize algebraic equations, add sliders, animate graphs, and more. Located in Singapore, the Ferris wheel soars to a height of 541 feet—a little more than a tenth of a mile! Described as an observation wheel, riders enjoy spectacular views as they travel from the ground to the peak and down again in a repeating pattern. It has a diameter of 26 feet, and rotates once every 32 seconds. Jul 13, 2022 · A cable that anchors the center of the London Eye Ferris wheel to the ground must be replaced. Apr 26, 2020 · Stack Exchange Network. • Have you ever ridden a Ferris wheel? • Ferris wheels are circular and rotate about the center. Formative Assessment Lesson: Ferris Wheel A Classroom Challenge ( aka formative assessment lesson) is a classroom-ready lesson that supports formative assessment. The lesson’s approach first allows students to demonstrate their prior understandings and abilities in employing the mathematical practices, and then involves students in resolving Jul 4, 2012 · A wheel 5 feet in diameter rolls up with an incline of 18 degrees 20 minutes. Let y=f(t) be the person's height above the ground at time t seconds. The wheel starts with P at the lowest point, at ground level. 3. One way to solve this problem involves solving the trigonometric equation sin = 5 10 A Ferris wheel is modelled as a circle with centre and radius m. The center of the Ferris wheel is 70 meters above the ground and the second anchor on the ground is 23 meters from the base of the wheel. Draw this Ferris Wheel, labeling the radius, height, and center. We have a diver who starts at the 3 O'clock position of the wheel moving counter clockwise. You can also move this point if you choose. Learn how with our guided example questions. There are 8 cars on the ride, spaced every \(45^{\circ}\). Sandy gets on the Ferris wheel at its lowest point, and then the wheel starts to rotate. Draw a diagram of the Navy Pier Ferris wheel and the boarding platform. One of the most common application questions for graphing trigonometric functions involves Ferris wheels, since the up and down motion of a rider follows the shape of a sine or cosine graph. Dec 11, 2023 · Ferris Wheel trigonometry word problem. This student has solved trigonometric equations to find the correct intervals for both Ferris wheels (3). The problems cover a range of concepts including finding heights of a Ferris wheel over time, sketching trig function graphs, using trig identities and formulas, solving equations, and finding lengths and areas in geometric shapes. Refer to the diagram below. Dr As you ride a ferris wheel, your distance from the ground varies sinusoidally with time. Part 2 of the ferris wheel problems. If you're behind a web filter, please make sure that the domains *. Grade 11 trigonometry problems and questions with answers and solutions are presented. -cumulative four-trigonometry A Ferris wheel with a radius of 20 m rotates once every 35 seconds. Imagine that you are riding on a Ferris wheel. A Ferris wheel problem is presented with the following details: 1) The Ferris wheel has a diameter of 30 m and rotates once every 60 seconds. The bottom of the wheel is 1 m above the ground. Trigonometry word problems (part 2) 20. The period of a trigonometric function like the sine or cosine is the length of one complete cycle of the wave. 2m. Using the inverse trig functions, we can solve for the angles of a right triangle given two sides. Equations used : Y = aSin (bx-c)+d or. How many minutes of the ride are spent higher than 27 meters above the ground? Round to the nearest second The below graph shows two revolutions around the Ferris wheel. org are unblocked. 2. The carriages are numbered from 1-8. b) Sketch two complete cycles of a graph representing the height of a rider above the ground, assuming the rider gets on the Dec 6, 2015 · Say it takes x seconds to go around the wheel from start to finish, I would like to find the height of the passenger at n seconds, or x+n seconds, for any ferris wheel assuming you knew the radius, and the speed at which the outer circumference of the wheel was moving (v). 1. Let P be a point on the wheel. Nov 5, 2016 · So I have this question here ''You have designed a Ferris wheel of diameter 20 m that rotates at a rate of 1 revolution per minute. With the equation, the height is determined and the times are determined when a person is at a specific height. The wheel completes 1 full revolution in 10 minutes. The function has a maximum of 3 at x = 2 and a low point of –1. Example 1 An airplane needs to fly to an airfield located 300 miles east and 200 miles north of its current location. And since the radius is 24m, and Ruby starts at (assuming) a min height of 1m, I figure at 25 m she will be halfway up the ferris wheel and at 49m she will be at the top of the ferris wheel. Then consider a ride on the Singapore Flyer, the world’s tallest Ferris wheel. Then student discover how changing the ferris wheel changes the sine curve. 5, we used trigonometry on a right triangle to solve for the sides of a triangle given one side and an additional angle. In 2021 the largest Ferris wheel was the Ain Dubai (or Dubai Eye). Let t be the number of seconds that have elapsed since you began moving. The following diagram represents a large Ferris wheel, with a diameter of 100 metres. Identify key This is a demonstration of a ferris wheel I created in GeoGebra designed to inspire and motivate my students to learn about trigonometric transformations. Before starting here - complete the question. Let 𝜃=0 represent the position of car 1 at the bottom of the wheel in the diagram above. If you're seeing this message, it means we're having trouble loading external resources on our website. Assume the person gets to ride for two revolutions. Damebir 1. The wheel completes one revolution every 40 Inverse Trig Functions Trig equations A Ferris wheel is boarded at ground level, is 20 meters in diameter, and makes one revolution every 4 minutes. c. It stands 10 feet off the ground. Modelling with trigonometric functions. (a) Write down the height of Pabove ground level after (i) 10 Apr 2, 2021 · The Ferris Wheel has a diameter of 30 meters, the center is 19 meters off the ground and it makes 2 revolutions per min. Nov 7, 2013 · Part 2: How long does the Ferris wheel take to make one complete revolution? Part 3: Assuming Sandra begins the ride at the top, how far from the ground is the edge of the Ferris wheel when Sandra's height above the ground reaches a minimum? *I just got thrown in this online class, with no real instruction. Problems and Questions A ferris wheel with a radius of 25 meters makes one rotation every 36 seconds. from your Trig I class handout, on the height of a Ferris Wheel. 3 seconds and 43. 2) The center is 18 m above the ground. Mar 27, 2022 · The Anansi the Spider ride is a small Ferris wheel at a children's amusement park. The wheel rotates at a constant rate, in an anticlockwise (counter-clockwise) direction. This Ferris wheel is 250 meters tall and takes 38 minutes to complete one revolution. a) Draw the graph of the situation, starting with a person getting on at the bottom of the wheel at time t = 0 seconds. Teacher guide Ferris Wheel T-1 Ferris Wheel MATHEMATICAL GOALS This lesson unit is intended to help you assess how well students are able to: • Model a periodic situation, the height of a person on a Ferris wheel, using trigonometric functions. Describe how the shape of the sine curve models the distance your friend is to the platform you are on. The wheel has 40 gondolas that seat six passengers each. There are many parameters you can adjust here: Period Number of Revs to Complete Height of Lowest Car Diameter of Wheel You can also manually enter the x -coordinate of the red point and Explore math with our beautiful, free online graphing calculator. Refer to PRACTICE QUESTION #8. The radius of the Ferris wheel is 60 feet. Oct 27, 2014 · As a Ferris wheel turns , the distance a rider is above the ground varies sinusoidally with time. Find the angle θ (radians). 1)View SolutionHelpful TutorialsHarmonic Identities Rsin(x ± α), Rcos(x ± α)Harmonic identities - Max and Min Click here to see the mark scheme for this question2)View SolutionHelpful TutorialsHarmonic Identities Rsin(x ± α), Rcos(x ± α)Harmonic identities - Max and MinPart (a): Part (b): Part (c): 3)View SolutionHelpful TutorialsHarmonic Identities Rsin(x ± α), Rcos(x ± α)Harmonic Ferris Wheel Questions 1. Use this applet as a resource to check solutions to problems involving this context. 4) It also shows that the rider is at a height of 20 m at 16. The highest point on the wheel is 43 feed above the ground. The wheel rotates at a constant rate, in an counter-clockwise direction. (b)Once the wheel is built, John suggests that Tiff should take the first ride. Law of cosines; 21. Jul 17, 2020 · Question: Suppose you wanted to model a Ferris wheel using a sine function that took 60 seconds to complete one revolution. The following are word problems that use periodic trigonometry functions to model behavior. 16. The wheel starts with Pat the lowest point, at ground level. The wheel starts turning when Tiff is at the location P, which makes an angle θ with the horizontal, as pictured. The lowest point of the wheel is 5 feet above ground. Derive the formula for the height of your seat at time (t). Provide an equation of such a sine function that will ensure that the Ferris wheel's minimum height of the ground is $0. Suppose you get on at S and the wheel starts to rotate. I saw checkpoint answer sheets, answer is 9. The wheel is 15 feet off the ground and has a diameter of 100 feet. The center of the wheel is 28 feet above the ground. This pattern is an example of a periodic function. com/resources/answers/931910/how-many-minutes-of-the-ride-are-spent-higher-than-23-meters-above-the Mar 17, 2023 · A Ferris wheel ride varies sinusoidally. IB DP Maths AA :HL Papers -2: All Topics. a) Determine the angular velocity, in radians per second. We use periodic functions to model phenomena that exhibit cyclical behavior, such Subject: Trig - Ferris wheel Name: Anthony Who are you: Student A ferris wheel is 250 feet in diameter and revolves every 40 seconds when in motion. Figure 3 shows the graph of H against t for two complete cycles of the wheel. Y = aCos (bx-c)+d. Question: Task 3: Trigonometry: The Ferris wheel The Ferris wheel at an amusement park measures 16 m in diameter. One revolution takes 20 minutes. Given that the initial height of the passenger above the ground is I metre, Radian Measurement Playlist: https://www. Period=4. f(x)=Acos(Bx-C)+D. Students can now use right-triangle trigonometry and simple proportions (see below picture) to derive the parametric representation of a point (x(t),y(t)) on the rotating Ferris wheel as a function of time, thereby establishing that the height is a sinusoidal function of t. It takes about 6 minutes for the Navi Pier Ferris wheel to complete one rotation. Using Newton's second law determine where the magnitude of the force the seat exerts on you is: a) Smallest, so the rider feels the "lightest" b) Largest, so the rider feels the "heaviest“ A. As the wheel turns, your height above the ground increases and then decreases again, repeating the same pattern each time the Ferris wheel makes a complete rotation. Assume that a person has just boarded the Ferris wheel from the platform and that the Ferris wheel starts spinning at time t=0. Passengers get on at points, which is 1 m above the level ground. The Ferris wheel is 16 feet from top to bottom, and kids load into Car 1 from below on a platform that is 4 feet off the ground. a) At the bottom of the Ferris wheel b) At the top of the Ferris wheel B. Big Idea After many days of investigation, students will finally apply their previous knowledge to this new problem--and take the first steps to extend right triangle trigonometry to all points on the unit circle. (I have uploaded a complete solution to the question, a link is on D2L right where you found the link to this assignment) 1. Feb 26, 2018 · Ferris Wheel problem for Precalculus Explore trigonometry with interactive simulations of sine, cosine, and tangent functions using degrees or radians. The seats are like points on the circle. Find a formula for the height function h(t). Let Pbe a point on the wheel. If the center of the wheel is 30ft above the ground, how long after reaching the lowest point is a rider 50 ft above the ground? I've tried a number of things, but I realize I'm probably just having trouble figuring out the arc length from the bottom of the wheel to the point where the rider's their new $1 million Ferris wheel ride. Write the trigonometric equation for the function with a period of 6. A Ferris wheel is an amusement ride consisting of a large rotating … How trigonometry is used in Ferris wheel? Read . Stack Exchange network consists of 183 Q&A communities including Stack Overflow, the largest, most trusted online community for developers to learn, share their knowledge, and build their careers. If you are using assistive technology and need help accessing these PDFs in another format, contact Services for Students with Disabilities at 212-713-8333 or by email at [email protected] . Riders board the Ferris wheel from a platform that is feet above the ground. (b) The operator of the Ferris wheel stands directly below the centre such that the bottom of the Ferris wheel is level with his eyeline. a) At the top of the Ferris wheel May 7, 2020 · A Ferris wheel has a radius of 20 m. Write the trigonometric equation for the function with a period of 5, a low point of – 3 at x=1 and an amplitude of 7. SWBAT apply knowledge of right triangle trigonometry to find the exact height of a rider at any point on the Ferris Wheel. The spokes of the wheel correspond to what feature of a circle? • What kind of symmetry does a Ferris wheel exhibit? As you work through the problems in this task, look for answers to these questions: This document contains 9 multi-part math problems involving trigonometric functions, graphs, equations, circles, and triangles. Any help regarding above is really appreaciated. 7 seconds This applet graphs the height of an person riding a Ferris Wheel vs. Ferris Wheel Trigonometry Problem This video explains how to determine the equation that models the height of person on a Ferris wheel. The center of the Ferris wheel is 30 feet above the ground. com/power-hourFerris wheel. youtube. There are several parameters you can adjust here: Period Number of Revs to Complete Height of Lowest Car Diameter of Wheel You can also manually enter y-coordinate of the purple point. 5\,\textrm{m}$ above ground. This evidence is a student’s response to the TKI task ‘Maths End Ferris Wheels’. This student has selected and used properties of trigonometric functions in finding the correct equation of the Kiddy-wheel (1) and solved a trigonometric equation to find an interval when Jade is above 5 m (2). Trig identities part 2 (parr 4 if you watch the proofs) 17. The wheel makes a full circle every 8 seconds and has a diameter of 40 feet. Past Paper questions on solving trig equations (factorising): This applet graphs the height of an person riding a Ferris Wheel vs. Question: (1) Jennifer boards a Ferris wheel with radius 25 feet. A Ferris wheel has a radius of 35 m and starts 2 m above the ground. Example1. Ferris Wheel Trig Problem (part 2) 25. 4 seconds to reach the top of the ride. Tech. wyzant. a. Proof Law of Sines; 23. 8: Solving trigonometric equations: IB style Questions HL Paper 2. I have found: A=60. Explain your answer. The Ferris Wheel is 8m in diameter. Oct 6, 2012 · A Ferris wheel (d=50ft) makes 1 revolution/40 sec. In reality, the speed would increase from 0 ft/min to a fairly constant rate and then slowly decrease as the ride ends and the wheel comes to a stop. The Ferris wheel must start 0. I assigned my trig students the task of creating a visual representation (2d or 3d) of the unit circle in lieu of a semester test in trigonometry. Then 3. Given that riders board the Ferris wheel at ground level, how long does it take for a rider to go from ground level to a height of 9 meters? identifying the correct equation of the Kiddy-wheel (1) and finding the correct equation of the Flying-high wheel (2). in your own notes / the Trig handout Topic 5 Practice Explore math with our beautiful, free online graphing calculator. If the Ferris wheel continues to turn, how high off the ground is a person after 45 minutes? 5. 34. When the last passenger boards the ferris wheel and the ride starts moving, let your position be modeled by the diagram provided. Fun Trig Question: Advanced Functions (MHF4U) Task 3: Trigonometry: The Ferris wheel The Ferris wheel at an amusement park measures 16 m in diameter. org and *. 5 m. Whats the equation to use? Trigonometry; Trigonometry questions and answers; 1. One such application is the design and operation of Ferris wheels. Amplitude: A= Midline: h= Period: P= b. 1) A ferris wheel is 4 feet off the ground. 5\,\textrm{m}$. The ride takes 1 minute for a full rotation. Jul 31, 2018 · You are standing at a base of a Ferris Wheel which is 4 m above ground while your friend is riding. It takes you 5 seconds to reach the top of the wheel In Section 5. mxaybhv kigse rrfl pemsx mzfuojj hjgll jceks qxljb zhgs ocgagf xvxil adsabv kxmprk zycu dmh