(Level 1) Identify the Midline/Amplitude and Period of the function
Midline:
Amplitude:
Period:
(Level 2) Graph the function. Must complete at least 3 cycles.
(Level 3) Graph the function. Must complete at least 3 cycles.
(Level 4) A small Ferris wheel follows a path of the function modeled below. Graph the function below and identify the following where x represents minutes and f(x) the height of the Ferris wheel.
How long does it take for the Ferris wheel to complete a rotation?
Explain how you know?
Based on the equation, what part of the Ferris wheel to they board? How do you know?
How high off the ground is the center of the Ferris Wheel?
(Level 1) Identify the Midline/Amplitude and Period of the function. Is it a sin or cos function?
Mid line:
Amplitude:
Period:
sin/cos:
(Level 2) What is the equation of the function graphed below?
(Level 3) What is the equation of the function graphed below?
(Level 4) A Ferris wheel has a radius of 60 feet and it's center is 100 ft above the ground. A person boards the Ferris wheel at the highest point and it rotates counter-clockwise. It takes the Ferris wheel 160 seconds to make a full rotation around. Write and graph an equation for the Ferris wheel where x represents seconds and y represents ft above the ground.