Solutions for CALCULUS: EARLY TRANSCENDENTALS (LCPO)
Problem 3QC:
What are the domain and range of f(x)=x1/7? What are the domain and range of f(x)=x1/10?Problem 2E:
What is the domain of a polynomial?Problem 3E:
Graphs of functions Find the linear functions that correspond to the following graphs. 11.Problem 4E:
Determine the linear function g whose graph is parallel to the line y=2x+1 and passes through the...Problem 5E:
What is the domain of a rational function?Problem 7E:
Graphs of piecewise functions Write a definition of the functions whose graphs are given. 19.Problem 8E:
The graph of y=x is shifted 2 units to the right and 3 units up. Write an equation for this...Problem 13E:
Transformations of y = |x| The functions f and g in the figure are obtained by vertical and...Problem 14E:
Transformations Use the graph of f in the figure to plot the following functions. a. y = f(x) b. y =...Problem 15E:
Graph of a linear function Find and graph the linear function that passes through the points (1, 3)...Problem 16E:
Graph of a linear function Find and graph the linear function that passes through the points (2, 3)...Problem 17E:
Linear function Find the linear function whose graph passes though the point (3, 2) and is parallel...Problem 18E:
Linear function Find the linear function whose graph passes though the point (1, 4) and is...Problem 19E:
Yeast growth Consider a colony of yeast cells that has the shape of a cylinder. As the number of...Problem 20E:
Yeast growth Consider a colony of yeast cells that has the shape of a cylinder. As the number of...Problem 21E:
Demand function Sales records indicate that if Blu-ray players are priced at 250, then a large store...Problem 22E:
Fundraiser The Biology Club plans to have a fundraiser for which 8 tickets will be sold. The cost of...Problem 23E:
Bald eagle population Since DDT was banned and the Endangered Species Act was passed in 1973, the...Problem 24E:
Taxicab fees A taxicab ride costs 3.50 plus 2.50 per mile. Let m be the distance (in miles) from the...Problem 25E:
Defining piecewise functions Write a definition of the function whose graph is given. 25.Problem 26E:
Graphs of piecewise functions Write a definition of the functions whose graphs are given. 20.Problem 27E:
Parking fees Suppose that it costs 5 per minute to park at the airport with the rate dropping to 3...Problem 28E:
Taxicab fees A taxicab ride costs 3.50 plus 2.50 per mile for the first 5 miles, with the rate...Problem 33E:
Piecewise linear functions Graph the following functions. 27. f(x)={2x1ifx11if1x12x1ifx1Problem 34E:
Piecewise linear functions Graph the following functions. 28. f(x)={2x+2ifx0x+2if0x23x/2ifx2Problem 35E:
Graphs of functions a. Use a graphing utility to produce a graph of the given function. Experiment...Problem 36E:
Graphs of functions a. Use a graphing utility to produce a graph of the given function. Experiment...Problem 37E:
Graphs of functions a. Use a graphing utility to produce a graph of the given function. Experiment...Problem 38E:
Graphs of functions a. Use a graphing utility to produce a graph of the given function. Experiment...Problem 40E:
Graphs of functions a. Use a graphing utility to produce a graph of the given function. Experiment...Problem 41E:
Features of a graph Consider the graph of the function f shown in the figure. Answer the following...Problem 42E:
Features of a graph Consider the graph of the function g shown in the figure. a. Give the...Problem 43E:
Relative acuity of the human eye The fovea centralis (or fovea) is responsible for the sharp central...Problem 44E:
Slope functions Determine the slope function S(x) for the following functions. 44.f(x=3)Problem 45E:
Slope functions Determine the slope function for the following functions. 35. f(x) = 2x + lProblem 46E:
Slope functions Determine the slope function for the following functions. 36. f(x) = |x|Problem 47E:
Slope functions Determine the slope function S(x) for the following functions. 47.Use the figure for...Problem 48E:
Slope functions Determine the slope function S(x) for the following functions. 48.Use the figure for...Problem 49E:
Area functions Let A(x) be the area of the region bounded by the t-axis and the graph of y = f(t)...Problem 50E:
Area functions Let A(x) be the area of the region bounded by the t-axis and the graph of y = f(t)...Problem 51E:
Area functions Let A(x) be the area of the region bounded by the t-axis and the graph of y = f(t)...Problem 52E:
Area functions Let A(x) be the area of the region bounded by the t-axis and the graph of y = f(t)...Problem 53E:
Explain why or why not Determine whether the following statements are true and give an explanation...Problem 55E:
Transformations of f(x) = x2 Use shifts and scalings to transform the graph of f(x) = x2 into the...Problem 56E:
Transformations of f(x)=x Use shifts and scalings to transform the graph of f(x)=x into the graph of...Problem 57E:
Shifting and scaling Use shifts and scalings to graph the given functions. Then check your work with...Problem 58E:
Shifting and scaling Use shifts and scalings to graph the given functions. Then check your work with...Problem 59E:
Shifting and scaling Use shifts and scalings to graph the given functions. Then check your work with...Problem 60E:
Shifting and scaling Use shifts and scalings to graph the given functions. Then check your work with...Problem 62E:
Shifting and scaling Use shifts and scalings to graph the given functions. Then check your work with...Problem 64E:
Shifting and scaling Use shifts and scalings to graph the given functions. Then check your work with...Problem 65E:
Intersection problems Find the following points of intersection. 65.The point(s) of intersection of...Problem 66E:
Intersection problems Use analytical methods to find the following points of intersection. Use a...Problem 67E:
Intersection problems Use analytical methods to find the following points of intersection. Use a...Problem 68E:
Two semicircles The entire graph of f consists of the upper half of a circle of radius 2 centered at...Problem 77E:
Tennis probabilities Suppose the probability of a server winning any given point in a tennis match...Problem 78E:
Temperature scales a. Find the linear function C = f(F) that gives the reading on the Celsius...Problem 79E:
Automobile lease vs. purchase A car dealer offers a purchase option and a lease option on all new...Problem 80E:
Walking and rowing Kelly has finished a picnic on an island that is 200 m off shore (see figure)....Problem 81E:
Optimal boxes Imagine a lidless box with height h and a square base whose sides have length x. The...Problem 82E:
Composition of polynomials Let f be an nth-degree polynomial and let g be an mth-degree polynomial....Problem 83E:
Parabola vertex property Prove that if a parabola crosses the x-axis twice, the x-coordinate of the...Browse All Chapters of This Textbook
Chapter 1 - FunctionsChapter 1.1 - Review Of FunctionsChapter 1.2 - Representing FunctionsChapter 1.3 - Inverse, Exponential, And Logarithmic FunctionsChapter 1.4 - Trigonometric Functions And Their InversesChapter 2 - LimitsChapter 2.1 - The Idea Of LimitsChapter 2.2 - Definitions Of LimitsChapter 2.3 - Techniques For Computing LimitsChapter 2.4 - Infinite Limits
Chapter 2.5 - Limits At InfinityChapter 2.6 - ContinuityChapter 2.7 - Precise Definitions Of LimitsChapter 3 - DerivativesChapter 3.1 - Introducing The DerivativesChapter 3.2 - The Derivative As A FunctionChapter 3.3 - Rules Of DifferentiationChapter 3.4 - The Product And Quotient RulesChapter 3.5 - Derivatives Of Trigonometric FunctionsChapter 3.6 - Derivatives As A Rates Of ChangeChapter 3.7 - The Chain RuleChapter 3.8 - Implicit DifferentiationChapter 3.9 - Derivatives Of Logarithmic And Exponential FunctionsChapter 3.10 - Derivatives Of Inverse Trigonometric FunctionsChapter 3.11 - Related RatesChapter 4 - Applications Of The DerivativeChapter 4.1 - Maxima And MinimaChapter 4.2 - Mean Value TheoremChapter 4.3 - What Derivative Tell UsChapter 4.4 - Graphing FunctionsChapter 4.5 - Optimization ProblemsChapter 4.6 - Linear Approximation And DifferentialsChapter 4.7 - L'hopital's RuleChapter 4.8 - Newton's MethodChapter 4.9 - AntiderivativesChapter 5 - IntegrationChapter 5.1 - Approximating Areas Under CurvesChapter 5.2 - Definite IntegralsChapter 5.3 - Fundamental Theorem Of CalculusChapter 5.4 - Working With IntegralsChapter 5.5 - Substitution RuleChapter 6 - Applications Of IntegrationChapter 6.1 - Velocity And Net ChangeChapter 6.2 - Regions Between CurvesChapter 6.3 - Volume By SlicingChapter 6.4 - Volume By ShellsChapter 6.5 - Length Of CurvesChapter 6.6 - Surface AreaChapter 6.7 - Physical ApplicationsChapter 7 - Logarithmic And Exponential, And Hyperbolic FunctionsChapter 7.1 - Logarithmic And Exponential Functions RevisitedChapter 7.2 - Exponential ModelsChapter 7.3 - Hyperbolic FunctionsChapter 8 - Integration TechniquesChapter 8.1 - Basic ApproachesChapter 8.2 - Integration By PartsChapter 8.3 - Trigonometric IntegralsChapter 8.4 - Trigonometric SubstitutionsChapter 8.5 - Partial FractionsChapter 8.6 - Integration StrategiesChapter 8.7 - Other Methods Of IntegrationChapter 8.8 - Numerical IntegrationChapter 8.9 - Improper IntegralsChapter 9 - Differential EquationsChapter 9.1 - Basic IdeasChapter 9.2 - Direction Fields And Euler's MethodChapter 9.3 - Separable Differential EquationsChapter 9.4 - Special First-order Linear Differential EquationsChapter 9.5 - Modeling With Differential EquationsChapter 10 - Sequences And Infinite SeriesChapter 10.1 - An OverviewChapter 10.2 - SequencesChapter 10.3 - Infinite SeriesChapter 10.4 - The Divergence And Integral TestsChapter 10.5 - Comparison TestsChapter 10.6 - Alternating SeriesChapter 10.7 - The Ration And Root TestsChapter 10.8 - Choosing A Convergence TestChapter 11 - Power SeriesChapter 11.1 - Approximating Functions With PolynomialsChapter 11.2 - Properties Of Power SeriesChapter 11.3 - Taylor SeriesChapter 11.4 - Working With Taylor SeriesChapter 12 - Parametric And Polar CurvesChapter 12.1 - Parametric EquationsChapter 12.2 - Polar CoordinatesChapter 12.3 - Calculus In Polar CoordinatesChapter 12.4 - Conic SectionsChapter 13 - Vectors And The Geometry Of SpaceChapter 13.1 - Vectors In The PlaneChapter 13.2 - Vectors In Three DimensionsChapter 13.3 - Dot ProductsChapter 13.4 - Cross ProductsChapter 13.5 - Lines And Planes In SpaceChapter 13.6 - Cylinders And Quadric SurfacesChapter 14 - Vector-valued FunctionsChapter 14.1 - Vector-valued FunctionsChapter 14.2 - Calculus Of Vector-valued FunctionsChapter 14.3 - Motion In SpaceChapter 14.4 - Length Of CurvesChapter 14.5 - Curvature And Normal VectorsChapter 15 - Functions Of Several VariablesChapter 15.1 - Graphs And Level CurvesChapter 15.2 - Limits And ContinuityChapter 15.3 - Partial DerivativesChapter 15.4 - The Chain RuleChapter 15.5 - Directional Derivatives And The GradientChapter 15.6 - Tangent Planes And Linear ProblemsChapter 15.7 - Maximum/minimum ProblemsChapter 15.8 - Lagrange MultipliersChapter 16 - Multiple IntegrationChapter 16.1 - Double Integrals Over Rectangular RegionsChapter 16.2 - Double Integrals Over General RegionsChapter 16.3 - Double Integrals In Polar CoordinatesChapter 16.4 - Triple IntegralsChapter 16.5 - Triple Integrals In Cylindrical And Spherical CoordinatesChapter 16.6 - Integrals For Mass CalculationsChapter 16.7 - Change Of Variables In Multiple IntegralsChapter 17 - Vector CalculusChapter 17.1 - Vector FieldsChapter 17.2 - Line IntegralsChapter 17.3 - Conservative Vector FieldsChapter 17.4 - Green's TheoremChapter 17.5 - Divergence And CurlChapter 17.6 - Surface IntegralsChapter 17.7 - Stokes' TheoremChapter 17.8 - Divergence TheoremChapter B - Algebra ReviewChapter C - Complex Numbers
Sample Solutions for this Textbook
We offer sample solutions for CALCULUS: EARLY TRANSCENDENTALS (LCPO) homework problems. See examples below:
Chapter 1, Problem 1REChapter 2, Problem 1REChapter 3, Problem 1REChapter 4, Problem 1REChapter 5, Problem 1REChapter 6, Problem 1REChapter 7, Problem 1REChapter 8, Problem 1REChapter 9, Problem 1RE
Chapter 10, Problem 1REChapter 11, Problem 1REChapter 12, Problem 1REChapter 13, Problem 1REThe given vector valued function is r(t)=〈cost,et,t〉+C. Substitute t=0 in the vector as follows....The given function is, g(x,y)=ex+y. Let ex+y=k. Take log on both sides. ex+y=kln(ex+y)=ln(k)x+y=lnk...Chapter 16, Problem 1REChapter 17, Problem 1REChapter B, Problem 1EChapter C, Problem 1E
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