In Exercises 14, describe the set of inputs, the set of outputs, and the rule for each function.The amount of your paycheck before taxes is a function of the number of hours worked.
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1
Infinite Geometric Series
1.1
Real Numbers, Relations, and Functions
1.2
Mathematical Patterns
1.3
Arithmetic Sequences
1.4
Lines
1.5
Linear Models
1.6
Geometric Sequences
2
Maximum Area
2.1
Solving Equations Graphically
2.2
Solving Quadratic Equations Algebraically
2.3
Applications of Equations
2.4
Other Types of Equations
2.5
Inequalities
2.5.A
Excursion: Absolute-Value Inequalities
3
Instantaneous Rates of Change
3.1
Functions
3.2
Graphs of Functions
3.3
Quadratic Functions
3.4
Graphs and Transformations
3.4.A
Excursion: Symmetry
3.5
Operations on Functions
3.5.A
Excursion: Iterations and Dynamical Systems
3.6
Inverse Functions
3.7
Rates of Change
4
Optimization Applications
4.1
Polynomial Functions
4.2
Real Zeros
4.3
Graphs of Polynomial Functions
4.3.A
Excursion: Polynomial Models
4.4
Rational Functions
4.5
Complex Numbers
4.5.A
Excursion: The Mandelbrot Set
4.6
The Fundamental Theorem of Algebra
5
Tangents to Exponential Functions
5.1
Radicals and Rational Exponents
5.2
Exponential Functions
5.3
Applications of Exponential Functions
5.4
Common and Natural Logarithmic Functions
5.5
Properties and Laws of Logarithms
5.5.A
Excursion: Logarithmic Functions to
Other Bases
5.6
Solving Exponential and Logarithmic Equations
5.7
Exponential, Logarithmic, and Other Models
6
Optimization with Trigonometry
6.1
Right-Triangle Trigonometry
6.2
Trigonometric Applications
6.3
Angles and Radian Measure
6.4
Trigonometric Functions
6.4
Review Exercises
6.5
Basic Trigonometric Identities
7
Approximations with Infinite Series
7.1
Graphs of the Sine, Cosine,
and Tangent Functions
7.2
Graphs of the Cosecant, Secant, and
Cotangent Functions
7.3
Periodic Graphs and Amplitude
7.4
Periodic Graphs and Phase Shifts
7.4.A
Excursion: Other Trigonometric Graphs
8.1
Graphical Solutions to Trigonometric Equations
8.2
Inverse Trigonometric Functions
8.3
Algebraic Solutions of Trigonometric Equations
8.4
Simple Harmonic Motion and Modeling
8.4.A
Excursion: Sound Waves
9.1
Identities and Proofs
9.2
Thomas W. Hungerford
9.2 A
Excursion: Lines and Angles
9.3
Other Identities
9.4
Using Trigonometric Identities
10.1
The Law of Cosines
10.2
The Law of Sines
10.3
The Complex Plane and Polar Form for Complex Numbers
10.4
DeMoivres Theorem and nth Roots of Complex Numbers
10.5
Vectors in the Plane
10.6
Applications of Vectors in the Plane
10.6 A
Excursion: The Dot Product
11.1
Ellipses
11.2
Analytic Geometry
11.3
Analytic Geometry
11.4
Analytic Geometry
11.4.A
Analytic Geometry
11.5
Analytic Geometry
11.6
Analytic Geometry
11.7
Analytic Geometry
11.7.A
Analytic Geometry
12.1
Systems and Matrices
12.2
Systems and Matrices
12.3
Systems and Matrices
12.4
Systems and Matrices
12.5
Systems and Matrices
12.5.A
Systems and Matrices
13.1
Basic Statistics
13.2
Measures of Center and Spread
13.3
Basic Probability
13.4
Determining Probabilities
13.4 A
Excursion: Binomial Experiments
13.5
Normal Distributions
14.1
Limits of Functions
14.2
Properties of Limits
14.2.A
Excursion: One-Sided Limits
14.3
The Formal Definition of Limit
14.4
Continuity
14.5
Limits Involving Infinity
Textbook Solutions for Precalculus
Chapter 3.1 Problem 13
Question
Exercises 1334 refer to the functions below. Find theindicated value of the function.
Solution
The first step in solving 3.1 problem number 13 trying to solve the problem we have to refer to the textbook question: Exercises 1334 refer to the functions below. Find theindicated value of the function.
From the textbook chapter Functions you will find a few key concepts needed to solve this.
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full solution
Title
Precalculus 1
Author
Threasa Z. Boyer, Teresa Henry, Chris Rankin, Manda Reid
ISBN
9780030416477
Exercises 1334 refer to the functions below. Find theindicated value of the function
Chapter 3.1 textbook questions
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Chapter 3: Problem 1 Precalculus 1
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Chapter 3: Problem 2 Precalculus 1
In Exercises 14, describe the set of inputs, the set of outputs, and the rule for each function.Your shoe size is a function of the length of your foot.
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Chapter 3: Problem 3 Precalculus 1
In Exercises 14, describe the set of inputs, the set of outputs, and the rule for each function.In physics, the pressure P of a gas kept at a constant volume is a function of the temperature T, related by the formula for some constant k.
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Chapter 3: Problem 4 Precalculus 1
In Exercises 14, describe the set of inputs, the set of outputs, and the rule for each function.The number of hours of daylight at a certain latitude is a function of the day of the year. The following graph shows the number of hours of daylight that corresponds to each day.
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Chapter 3: Problem 5 Precalculus 1
In Exercises 512, determine whether the equation defines y as a function of x.
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Chapter 3: Problem 6 Precalculus 1
In Exercises 512, determine whether the equation defines y as a function of x.
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Chapter 3: Problem 7 Precalculus 1
In Exercises 512, determine whether the equation defines y as a function of x.
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Chapter 3: Problem 8 Precalculus 1
In Exercises 512, determine whether the equation defines y as a function of x.
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Chapter 3: Problem 9 Precalculus 1
In Exercises 512, determine whether the equation defines y as a function of x.
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Chapter 3: Problem 10 Precalculus 1
In Exercises 512, determine whether the equation defines y as a function of x.
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Chapter 3: Problem 11 Precalculus 1
In Exercises 512, determine whether the equation defines y as a function of x.
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Chapter 3: Problem 12 Precalculus 1
In Exercises 512, determine whether the equation defines y as a function of x.
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Chapter 3: Problem 13 Precalculus 1
Exercises 1334 refer to the functions below. Find the indicated value of the function.
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Chapter 3: Problem 14 Precalculus 1
Exercises 1334 refer to the functions below. Find theExercises 1334 refer to the functions below. Find the indicated value of the function.
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Chapter 3: Problem 15 Precalculus 1
Exercises 1334 refer to the functions below. Find the indicated value of the function.
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Chapter 3: Problem 16 Precalculus 1
Exercises 1334 refer to the functions below. Find the indicated value of the function.
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Chapter 3: Problem 17 Precalculus 1
Exercises 1334 refer to the functions below. Find the indicated value of the function.
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Chapter 3: Problem 18 Precalculus 1
Exercises 1334 refer to the functions below. Find theExercises 1334 refer to the functions below. Find the indicated value of the function.
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Chapter 3: Problem 19 Precalculus 1
Exercises 1334 refer to the functions below. Find the indicated value of the function.
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Chapter 3: Problem 20 Precalculus 1
Exercises 1334 refer to the functions below. Find the indicated value of the function.
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Chapter 3: Problem 21 Precalculus 1
Exercises 1334 refer to the functions below. Find theExercises 1334 refer to the functions below. Find the indicated value of the function.
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Chapter 3: Problem 22 Precalculus 1
Exercises 1334 refer to the functions below. Find the indicated value of the function.
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Chapter 3: Problem 23 Precalculus 1
Exercises 1334 refer to the functions below. Find the indicated value of the function.
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Chapter 3: Problem 24 Precalculus 1
Exercises 1334 refer to the functions below. Find theExercises 1334 refer to the functions below. Find the indicated value of the function.
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Chapter 3: Problem 25 Precalculus 1
Exercises 1334 refer to the functions below. Find the indicated value of the function.
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Chapter 3: Problem 26 Precalculus 1
Exercises 1334 refer to the functions below. Find the indicated value of the function.
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Chapter 3: Problem 27 Precalculus 1
Exercises 1334 refer to the functions below. Find theExercises 1334 refer to the functions below. Find the indicated value of the function.
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Chapter 3: Problem 28 Precalculus 1
Exercises 1334 refer to the functions below. Find the indicated value of the function.
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Chapter 3: Problem 29 Precalculus 1
Exercises 1334 refer to the functions below. Find the indicated value of the function.
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Chapter 3: Problem 30 Precalculus 1
Exercises 1334 refer to the functions below. Find theExercises 1334 refer to the functions below. Find the indicated value of the function.
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Chapter 3: Problem 31 Precalculus 1
Exercises 1334 refer to the functions below. Find the indicated value of the function.
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Chapter 3: Problem 32 Precalculus 1
Exercises 1334 refer to the functions below. Find the indicated value of the function.
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Chapter 3: Problem 33 Precalculus 1
Exercises 1334 refer to the functions below. Find the indicated value of the function.
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Chapter 3: Problem 34 Precalculus 1
Exercises 1334 refer to the functions below. Find the indicated value of the function.
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Chapter 3: Problem 35 Precalculus 1
In Exercises 3542, compute and simplify the differ- ence quotient (shown below). Assume
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Chapter 3: Problem 36 Precalculus 1
In Exercises 3542, compute and simplify the differ- ence quotient (shown below). Assume
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Chapter 3: Problem 37 Precalculus 1
In Exercises 3542, compute and simplify the differ- ence quotient (shown below). Assume
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Chapter 3: Problem 38 Precalculus 1
In Exercises 3542, compute and simplify the differ- ence quotient (shown below). Assume
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Chapter 3: Problem 39 Precalculus 1
In Exercises 3542, compute and simplify the differ- ence quotient (shown below). Assume
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Chapter 3: Problem 40 Precalculus 1
In Exercises 3542, compute and simplify the differ- ence quotient (shown below). Assume
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Chapter 3: Problem 41 Precalculus 1
In Exercises 3542, compute and simplify the differ- ence quotient (shown below). Assume
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Chapter 3: Problem 42 Precalculus 1
In Exercises 3542, compute and simplify the differ- ence quotient (shown below). Assume
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Chapter 3: Problem 43 Precalculus 1
In Exercises 4356, determine the domain of the func- tion according to the domain convention.
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Chapter 3: Problem 44 Precalculus 1
In Exercises 4356, determine the domain of the func- tion according to the domain convention.
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Chapter 3: Problem 45 Precalculus 1
In Exercises 4356, determine the domain of the func- tion according to the domain convention.
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Chapter 3: Problem 46 Precalculus 1
In Exercises 4356, determine the domain of the func- tion according to the domain convention.
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Chapter 3: Problem 47 Precalculus 1
In Exercises 4356, determine the domain of the func- tion according to the domain convention.
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Chapter 3: Problem 49 Precalculus 1
\In Exercises 4356, determine the domain of the func- tion according to the domain convention.
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Chapter 3: Problem 50 Precalculus 1
In Exercises 4356, determine the domain of the func- tion according to the domain convention.
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Chapter 3: Problem 51 Precalculus 1
In Exercises 4356, determine the domain of the func- tion according to the domain convention.
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Chapter 3: Problem 52 Precalculus 1
In Exercises 4356, determine the domain of the func- tion according to the domain convention.
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Chapter 3: Problem 53 Precalculus 1
In Exercises 4356, determine the domain of the func- tion according to the domain convention.
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Chapter 3: Problem 54 Precalculus 1
In Exercises 4356, determine the domain of the func- tion according to the domain convention.
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Chapter 3: Problem 55 Precalculus 1
In Exercises 4356, determine the domain of the func- tion according to the domain convention.
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Chapter 3: Problem 56 Precalculus 1
In Exercises 4356, determine the domain of the func- tion according to the domain convention.
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Chapter 3: Problem 57 Precalculus 1
In Exercises 5762, find the following:a. b. c. d. e. The domain of
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Chapter 3: Problem 58 Precalculus 1
In Exercises 5762, find the following: a. b. c. d. e. The domain of
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Chapter 3: Problem 59 Precalculus 1
In Exercises 5762, find the following:In Exercises 5762, find the following:a. b. c. d. e. The domain of
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Chapter 3: Problem 60 Precalculus 1
In Exercises 5762, find the following:a. b. c. d. e. The domain of
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Chapter 3: Problem 61 Precalculus 1
In Exercises 5762, find the following:a. b. c. d. e. The domain of
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Chapter 3: Problem 62 Precalculus 1
In Exercises 5762, find the following:a. b. c. d. e. The domain of
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Chapter 3: Problem 63 Precalculus 1
Find an equation that expresses the area A of a circle as a function of its a. radius r b. diameter d
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Chapter 3: Problem 64 Precalculus 1
Find an equation that expresses the area A of a square as a function of its a. side s b. diagonal d
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Chapter 3: Problem 65 Precalculus 1
A box with a square base of side x is four times higher than it is wide. Express the volume V of the box as a function of x.
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Chapter 3: Problem 66 Precalculus 1
The surface area of a cylindrical can of radius r and height h is If the can is twice as high as the diameter of its top, express its surface area S as a function of r. t.
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Chapter 3: Problem 67 Precalculus 1
A rectangular region of 6000 square feet is to be fenced in on three sides with fencing that costs $3.75 per foot and on the fourth side with fencing that costs $2.00 per foot. a. Express the cost of the fence as a function of the length x of the fourth side. b. Find the domain of the function.
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Chapter 3: Problem 68 Precalculus 1
A box with a square base measuring is to be made of three kinds of wood. The cost of the wood for the base is $0.85 per square foot; the wood for the sides costs $0.50 per square foot, and the wood for the top $1.15 per square foot. The volume of the box must be 10 cubic feeta. Express the total cost of the box as a function of the length t. b. Find the domain of the function.
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Chapter 3: Problem 69 Precalculus 1
A man walks for 45 minutes at a rate of 3 mph, then jogs for 75 minutes at a rate of 5 mph, then sits and rests for 30 minutes, and finally walks for 90 minutes at a rate of 3 mph. a. Write a piecewise-defined function that expresses his distance traveled as a function of time. b. Find the domain of the function.
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Chapter 3: Problem 70 Precalculus 1
Average tuition and fees in private four-year colleges in recent years were as follows. (Source: The College Board) Year Tuition & fees 1995 $12,432 1996 $12,823 1997 $13,664 1998 $14,709 1999 $15,380 2000 $16,332 a. Use linear regression to find the rule of a function f that gives the approximate average tuition in year x, where corresponds to 1990. b. Find and How do they compare with the actual data? c. Use f to estimate tuition in 2003.
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Chapter 3: Problem 71 Precalculus 1
Suppose that a state income tax law reads as follows: f 162, f 182, f 1102. x 0 Annual income Amount of tax less than $2000 0 $2000$6000 2% of income over $2000 more than $6000 $80 plus 5% of income over $6000 Write a piecewise-defined function that represents the income tax law. What is the domain of the function?
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Chapter 3: Problem 72 Precalculus 1
72. The table below shows the 2002 federal income tax rates for a single person.Write a piecewise-defined function such that is the tax due on a taxable income of dollars. What is the domain of the function? b. Find , , and . T124,0002 T135,0002 T1100,0002
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