1. Marissa is watching a honeybee return from her flower garden to a beehive in a branch of a nearby tree. She notices that the bee's path resembles part of a trigonometric function (see below).
Suppose that the flower is 2 ft above the ground, the beehive is 8 ft above the ground, and the horizontal distance from the flower to the beehive is 20 ft. Model this path with a sine or cosine function. Clearly indicate the following::
a. The maximum and minimum b. The midline c. The period and rate constant d. Write a formula for the function Clearly label all parts e. f. Sketch the graph​