Graph y = t + 5 sin t and y = t on 0 t 2. Where do the two graphs intersect if t is not restricted to 0 t 2?
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Textbook Solutions for Functions Modeling Change: A Preparation for Calculus
Question
A power company serves two different cities, City A and City B. The power requirements of both cities vary in a predictable fashion over the course of a typical day. (a) At midnight, the power requirement of City A is at a minimum of 40 megawatts. (A megawatt is a unit of power.) By noon the city has reached its maximum power consumption of 90 megawatts and by midnight it once again requires only 40 megawatts. This pattern repeats every day. Find a possible formula for f(t), the power, in megawatts, required by City A as a function of t, in hours since midnight. (b) The power requirements, g(t) megawatts, of City B differ from those of City A. For t, in hours since midnight, g(t) = 80 30 sin 12 t . Give the amplitude and the period of g(t), and a physical interpretation of these quantities. (c) Graph and find all t such that f(t) = g(t), 0 t < 24. Interpret your solution(s) in terms of power usage. (d) Why should the power company be interested in the maximum value of the function h(t) = f(t) + g(t), 0 t < 24? What is the approximate maximum of this function, and approximately when is it attained? (e) Find a formula for h(t) as a single sine function. What is the exact maximum of this function?
Solution
The first step in solving 9-3 problem number 6 trying to solve the problem we have to refer to the textbook question: A power company serves two different cities, City A and City B. The power requirements of both cities vary in a predictable fashion over the course of a typical day. (a) At midnight, the power requirement of City A is at a minimum of 40 megawatts. (A megawatt is a unit of power.) By noon the city has reached its maximum power consumption of 90 megawatts and by midnight it once again requires only 40 megawatts. This pattern repeats every day. Find a possible formula for f(t), the power, in megawatts, required by City A as a function of t, in hours since midnight. (b) The power requirements, g(t) megawatts, of City B differ from those of City A. For t, in hours since midnight, g(t) = 80 30 sin 12 t . Give the amplitude and the period of g(t), and a physical interpretation of these quantities. (c) Graph and find all t such that f(t) = g(t), 0 t < 24. Interpret your solution(s) in terms of power usage. (d) Why should the power company be interested in the maximum value of the function h(t) = f(t) + g(t), 0 t < 24? What is the approximate maximum of this function, and approximately when is it attained? (e) Find a formula for h(t) as a single sine function. What is the exact maximum of this function?
From the textbook chapter TRIGONOMETRIC MODELS you will find a few key concepts needed to solve this.
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