5. Last, Jared considers, as a worst-case scenario, the possibility that his data might be growing sinusoidally, with its minimum at (1, 60) and its maximum at (6, 535). Find a sinusoidal model (that is, a function of either the form y = 1A sin(k(x - c)) + B that has these properties. Use a graphing utility such as desmos.com to graph your y = LA cos(k(x - c)) + B function. Include the points (1, 60), (3, 230), and (6, 535 ) on your graph.Jared has opened a small online store selling hand-knit dog sweaters. and over the course of his first six months of business his sales revenues have steadily increased. In his first month of operation, he sold just $60 worth of sweaters, in his third month he sold $230 worth of sweaters, and in his sixth month he sold $535 worth of sweaters. Jared is not sure whether his revenues are growing linearly or not, and he wants to be able to make long-term forecasts. so he wants to explore various possible models to describe his revenues. In this project. you will explore various ways of modeling a function that passes through the points (1, 60), (3, 230), and (6, 535). Answer the questions below and then upload it for your instructor to grade