A power company serves two different cities, City A and City B. The power requirements | StudySoup
Functions Modeling Change: A Preparation for Calculus | 4th Edition | ISBN: 9780470484753 | Authors: Eric Connally Deborah Hughes-Hallett, Andrew M. Gleason

Table of Contents

1
LINEAR FUNCTIONS AND CHANGE

1-1
FUNCTIONS AND FUNCTION NOTATION

1-2
RATE OF CHANGE

1-3
LINEAR FUNCTIONS

1-4
FORMULAS FOR LINEAR FUNCTIONS

1-5
GEOMETRIC PROPERTIES OF LINEAR FUNCTIONS

1-6
FITTING LINEAR FUNCTIONS TO DATA

2
FUNCTIONS

2-1
INPUT AND OUTPUT

2-2
DOMAIN AND RANGE

2-3
PIECEWISE-DEFINED FUNCTIONS

2-4
COMPOSITE AND INVERSE FUNCTIONS

2-5
CONCAVITY

3
QUADRATIC FUNCTIONS

3-1
INTRODUCTION TO THE FAMILY OF QUADRATIC FUNCTIONS

3-2
THE VERTEX OF A PARABOLA

4
EXPONENTIAL FUNCTIONS

4-1
INTRODUCTION TO THE FAMILY OF EXPONENTIAL FUNCTIONS

4-2
COMPARING EXPONENTIAL AND LINEAR FUNCTIONS

4-3
GRAPHS OF EXPONENTIAL FUNCTIONS

4-4
APPLICATIONS TO COMPOUND INTEREST

4-5
THE NUMBER e

5
LOGARITHMIC FUNCTIONS

5-1
LOGARITHMS AND THEIR PROPERTIES

5-2
LOGARITHMS AND EXPONENTIAL MODELS

5-3
THE LOGARITHMIC FUNCTION

5-4
LOGARITHMIC SCALES

6
TRANSFORMATIONS OF FUNCTIONS AND THEIR GRAPHS

6-1
VERTICAL AND HORIZONTAL SHIFTS

6-2
REFLECTIONS AND SYMMETRY

6-3
VERTICAL STRETCHES AND COMPRESSIONS

6-4
HORIZONTAL STRETCHES AND COMPRESSIONS

6-5
COMBINING TRANSFORMATIONS

7
TRIGONOMETRY IN CIRCLES AND TRIANGLES

7-1
INTRODUCTION TO PERIODIC FUNCTIONS

7-2
THE SINE AND COSINE FUNCTIONS

7-3
GRAPHS OF SINE AND COSINE

7-4
THE TANGENT FUNCTION

7-5
RIGHT TRIANGLES: INVERSE TRIGONOMETRIC FUNCTIONS

7-6
NON-RIGHT TRIANGLES

8
THE TRIGONOMETRIC FUNCTIONS

8-1
RADIANS AND ARC LENGTH

8-2
SINUSOIDAL FUNCTIONS AND THEIR GRAPHS

8-3
TRIGONOMETRIC FUNCTIONS: RELATIONSHIPS AND GRAPHS

8-4
TRIGONOMETRIC EQUATIONS AND INVERSE FUNCTIONS

8-5
POLAR COORDINATES

8-6
COMPLEX NUMBERS AND POLAR COORDINATES

9
TRIGONOMETRIC IDENTITIES AND THEIR APPLICATIONS

9-1
IDENTITIES, EXPRESSIONS, AND EQUATIONS

9-2
SUM AND DIFFERENCE FORMULAS FOR SINE AND COSINE

9-3
TRIGONOMETRIC MODELS

10
COMPOSITIONS, INVERSES, AND COMBINATIONS OF FUNCTIONS

10-1
COMPOSITION OF FUNCTIONS

10-2
INVERTIBILITY AND PROPERTIES OF INVERSE FUNCTIONS

10-3
COMBINATIONS OF FUNCTIONS

11
POLYNOMIAL AND RATIONAL FUNCTIONS

11-1
POWER FUNCTIONS

11-2
POLYNOMIAL FUNCTIONS

11-3
THE SHORT-RUN BEHAVIOR OF POLYNOMIALS

11-4
RATIONAL FUNCTIONS

11-5
THE SHORT-RUN BEHAVIOR OF RATIONAL FUNCTIONS

11-6
COMPARING POWER, EXPONENTIAL, AND LOG FUNCTIONS

11-7
FITTING EXPONENTIALS AND POLYNOMIALS TO DATA

12
VECTORS AND MATRICES

12-1
VECTORS

12-2
THE COMPONENTS OF A VECTOR

12-3
APPLICATION OF VECTORS

12-4
THE DOT PRODUCT

12-5
MATRICES

13
SEQUENCES AND SERIES

13-1
SEQUENCES

13-2
DEFINING FUNCTIONS USING SUMS: ARITHMETIC SERIES

13-3
FINITE GEOMETRIC SERIES

13-4
INFINITE GEOMETRIC SERIES

14
PARAMETRIC EQUATIONS AND CONIC SECTIONS

14-1
PARAMETRIC EQUATIONS

14-2
IMPLICITLY DEFINED CURVES AND CIRCLES

14-3
ELLIPSES

14-4
HYPERBOLAS

14-5
GEOMETRIC PROPERTIES OF CONIC SECTIONS

14-6
HYPERBOLIC FUNCTIONS

Textbook Solutions for Functions Modeling Change: A Preparation for Calculus

Chapter 9-3 Problem 9.3.6

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

Step 1 of 6)

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 &lt; 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 &lt; 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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Title Functions Modeling Change: A Preparation for Calculus  4 
Author Eric Connally Deborah Hughes-Hallett, Andrew M. Gleason
ISBN 9780470484753

A power company serves two different cities, City A and City B. The power requirements

Chapter 9-3 textbook questions

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