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Calculus: 1001 Practice Problems For Dummies (+ Free Online Practice)


Calculus: 1001 Practice Problems For Dummies (+ Free Online Practice)


1. Aufl.

von: Patrick Jones

19,99 €

Verlag: Wiley
Format: EPUB
Veröffentl.: 05.05.2022
ISBN/EAN: 9781119883678
Sprache: englisch
Anzahl Seiten: 608

DRM-geschütztes eBook, Sie benötigen z.B. Adobe Digital Editions und eine Adobe ID zum Lesen.

Beschreibungen

<p><b>Practice your way to a higher grade in Calculus!</b></p> <p>Calculus is a hands-on skill. You’ve gotta use it or lose it. And the best way to get the practice you need to develop your mathematical talents is <i>Calculus: 1001 Practice Problems For Dummies</i>.</p> <p>The perfect companion to <i>Calculus For Dummies</i>—and your class— this book offers readers challenging practice problems with step-by-step and detailed answer explanations and narrative walkthroughs. You’ll get free access to all 1,001 practice problems online so you can create your own study sets for extra-focused learning.</p> <p>Readers will also find:</p> <ul> <li>A useful course supplement and resource for students in high school and college taking Calculus I</li> <li>Free, one-year access to all practice problems online, for on-the-go study and practice</li> <li>An excellent preparatory resource for faster-paced college classes</li> </ul> <p><i>Calculus: 1001 Practice Problems For Dummies (+ Free Online Practice)</i> is an essential resource for high school and college students looking for more practice and extra help with this challenging math subject.</p> <p><i>Calculus: 1001 Practice Problems For Dummies </i>(9781119883654) was previously published as <i>1,001 Calculus Practice Problems For Dummies</i> (9781118496718). While this version features a new <i>Dummies </i>cover and design, the content is the same as the prior release and should not be considered a new or updated product.</p>
<p><b>Introduction 1</b></p> <p>What You’ll Find 1</p> <p>Beyond the Book 2</p> <p>Where to Go for Additional Help 2</p> <p><b>Part 1: The Questions 5</b></p> <p><b>Chapter 1: Algebra Review</b> 7</p> <p>The Problems You’ll Work On 7</p> <p>What to Watch Out For 7</p> <p>Simplifying Fractions 8</p> <p>Simplifying Radicals 8</p> <p>Writing Exponents Using Radical Notation 9</p> <p>The Horizontal Line Test 9</p> <p>Find Inverses Algebraically 10</p> <p>The Domain and Range of a Function and Its Inverse 10</p> <p>Linear Equations 10</p> <p>Quadratic Equations 11</p> <p>Solving Polynomial Equations by Factoring 11</p> <p>Absolute Value Equations 12</p> <p>Solving Rational Equations 12</p> <p>Polynomial and Rational Inequalities 12</p> <p>Absolute Value Inequalities 13</p> <p>Graphing Common Functions 13</p> <p>Domain and Range from a Graph 14</p> <p>End Behavior of Polynomials 15</p> <p>Adding Polynomials 15</p> <p>Subtracting Polynomials 15</p> <p>Multiplying Polynomials 16</p> <p>Long Division of Polynomials 16</p> <p><b>Chapter 2: Trigonometry Review 17</b></p> <p>The Problems You’ll Work On 17</p> <p>What to Watch Out For 17</p> <p>Basic Trigonometry 18</p> <p>Converting Degree Measure to Radian Measure 18</p> <p>Converting Radian Measure to Degree Measure 19</p> <p>Finding Angles in the Coordinate Plane 19</p> <p>Finding Common Trigonometric Values 21</p> <p>Simplifying Trigonometric Expressions 21</p> <p>Solving Trigonometric Equations 22</p> <p>Amplitude, Period, Phase Shift, and Midline 23</p> <p>Equations of Periodic Functions 24</p> <p>Inverse Trigonometric Function Basics 26</p> <p>Solving Trigonometric Equations Using Inverses 27</p> <p><b>Chapter 3: Limits and Rates of Change 29</b></p> <p>The Problems You’ll Work On 29</p> <p>What to Watch Out For 29</p> <p>Finding Limits from Graphs 30</p> <p>Evaluating Limits 31</p> <p>Applying the Squeeze Theorem 32</p> <p>Evaluating Trigonometric Limits 33</p> <p>Infinite Limits 33</p> <p>Limits from Graphs 36</p> <p>Limits at Infinity 37</p> <p>Horizontal Asymptotes 38</p> <p>Classifying Discontinuities 38</p> <p>Continuity and Discontinuities 39</p> <p>Making a Function Continuous 40</p> <p>The Intermediate Value Theorem 41</p> <p><b>Chapter 4: Derivative Basics 43</b></p> <p>The Problems You’ll Work On 43</p> <p>What to Watch Out For 43</p> <p>Determining Differentiability from a Graph 44</p> <p>Finding the Derivative by Using the Definition 45</p> <p>Finding the Value of the Derivative Using a Graph 46</p> <p>Using the Power Rule to Find Derivatives 47</p> <p>Finding All Points on a Graph Where Tangent Lines Have a Given Value 48</p> <p><b>Chapter 5: The Product, Quotient, and Chain Rules 49</b></p> <p>The Problems You’ll Work On 49</p> <p>What to Watch Out For 49</p> <p>Using the Product Rule to Find Derivatives 50</p> <p>Using the Quotient Rule to Find Derivatives 51</p> <p>Using the Chain Rule to Find Derivatives 53</p> <p>More Challenging Chain Rule Problems 54</p> <p><b>Chapter 6: Exponential and Logarithmic Functions and Tangent Lines 55</b></p> <p>The Problems You’ll Work On 55</p> <p>What to Watch Out For 55</p> <p>Derivatives Involving Logarithmic Functions 56</p> <p>Logarithmic Differentiation to Find the Derivative 56</p> <p>Finding Derivatives of Functions Involving Exponential Functions 57</p> <p>Finding Equations of Tangent Lines 58</p> <p>Finding Equations of Normal Lines 58</p> <p><b>Chapter 7: Implicit Differentiation 59</b></p> <p>The Problems You’ll Work On 59</p> <p>What to Watch Out For 59</p> <p>Using Implicit Differentiation to Find a Derivative 60</p> <p>Using Implicit Differentiation to Find a Second Derivative 60</p> <p>Finding Equations of Tangent Lines Using Implicit Differentiation 61</p> <p><b>Chapter 8: Applications of Derivatives 63</b></p> <p>The Problems You’ll Work On 63</p> <p>What to Watch Out For 63</p> <p>Finding and Evaluating Differentials 64</p> <p>Finding Linearizations 64</p> <p>Using Linearizations to Estimate Values 64</p> <p>Understanding Related Rates 65</p> <p>Finding Maxima and Minima from Graphs 66</p> <p>Using the Closed Interval Method 67</p> <p>Finding Intervals of Increase and Decrease 68</p> <p>Using the First Derivative Test to Find Local Maxima and Minima 68</p> <p>Determining Concavity 69</p> <p>Identifying Inflection Points 69</p> <p>Using the Second Derivative Test to Find Local Maxima and Minima 69</p> <p>Applying Rolle’s Theorem 70</p> <p>Using the Mean Value Theorem 70</p> <p>Applying the Mean Value Theorem to Solve Problems 70</p> <p>Relating Velocity and Position 71</p> <p>Finding Velocity and Speed 71</p> <p>Solving Optimization Problems 72</p> <p>Doing Approximations Using Newton’s Method 73</p> <p>Approximating Roots Using Newton’s Method 74</p> <p><b>Chapter 9: Areas and Riemann Sums 75</b></p> <p>The Problems You’ll Work On 75</p> <p>What to Watch Out For 75</p> <p>Calculating Riemann Sums Using Left Endpoints 76</p> <p>Calculating Riemann Sums Using Right Endpoints 76</p> <p>Calculating Riemann Sums Using Midpoints 77</p> <p>Using Limits and Riemann Sums to Find Expressions for Definite Integrals 77</p> <p>Finding a Definite Integral from the Limit and Riemann Sum Form 78</p> <p>Using Limits and Riemann Sums to Evaluate Definite Integrals 78</p> <p><b>Chapter 10: The Fundamental Theorem of Calculus and the Net Change Theorem 79</b></p> <p>The Problems You’ll Work On 79</p> <p>What to Watch Out For 80</p> <p>Using the Fundamental Theorem of Calculus to Find Derivatives 80</p> <p>Working with Basic Examples of Definite Integrals 81</p> <p>Understanding Basic Indefinite Integrals 82</p> <p>Understanding the Net Change Theorem 84</p> <p>Finding the Displacement of a Particle Given the Velocity 85</p> <p>Finding the Distance Traveled by a Particle Given the Velocity 85</p> <p>Finding the Displacement of a Particle Given Acceleration 86</p> <p>Finding the Distance Traveled by a Particle Given Acceleration 86</p> <p><b>Chapter 11: Applications of Integration 87</b></p> <p>The Problems You’ll Work On 87</p> <p>What to Watch Out For 87</p> <p>Areas between Curves 88</p> <p>Finding Volumes Using Disks and Washers 89</p> <p>Finding Volume Using Cross-Sectional Slices 91</p> <p>Finding Volumes Using Cylindrical Shells 92</p> <p>Work Problems 94</p> <p>Average Value of a Function 98</p> <p><b>Chapter 12: Inverse Trigonometric Functions, Hyperbolic Functions, and L’Hôpital’s Rule 101</b></p> <p>The Problems You’ll Work On 101</p> <p>What to Watch Out For 102</p> <p>Finding Derivatives Involving Inverse Trigonometric Functions 102</p> <p>Finding Antiderivatives by Using Inverse Trigonometric Functions 103</p> <p>Evaluating Hyperbolic Functions Using Their Definitions 104</p> <p>Finding Derivatives of Hyperbolic Functions 104</p> <p>Finding Antiderivatives of Hyperbolic Functions 105</p> <p>Evaluating Indeterminate Forms Using L’Hôpital’s Rule 105</p> <p><b>Chapter 13: U-Substitution and Integration by Parts 109</b></p> <p>The Problems You’ll Work On 109</p> <p>What to Watch Out For 109</p> <p>Using u-Substitutions 110</p> <p>Using Integration by Parts 111</p> <p><b>Chapter 14: Trigonometric Integrals, Trigonometric Substitution, and Partial Fractions 115</b></p> <p>The Problems You’ll Work On 115</p> <p>What to Watch Out For 116</p> <p>Trigonometric Integrals 116</p> <p>Trigonometric Substitutions 118</p> <p>Finding Partial Fraction Decompositions (without Coefficients) 119</p> <p>Finding Partial Fraction Decompositions (Including Coefficients) 120</p> <p>Integrals Involving Partial Fractions 120</p> <p>Rationalizing Substitutions 121</p> <p><b>Chapter 15: Improper Integrals and More Approximating Techniques 123</b></p> <p>The Problems You’ll Work On 123</p> <p>What to Watch Out For 123</p> <p>Convergent and Divergent Improper Integrals 124</p> <p>The Comparison Test for Integrals 125</p> <p>The Trapezoid Rule 126</p> <p>Simpson’s Rule 126</p> <p><b>Part 2: The Answers 127</b></p> <p><b>Chapter 16: Answers and Explanations 129</b></p> <p>Index 581</p>
<p><b>Patrick Jones</b> has a master’s degree in Mathematics from the University of Louisville. He has taught at University of Louisville, Vanderbilt University, and Austin Community College. Jones now primarily spends his time expanding his Youtube video library as PatrickJMT.</p>
<p><b>Become a calculus whiz</b></p> <p><i>Calculus: 1001 Practice Problems For Dummies</i> gives you more than one thousand chances to build your calculus skills. This workbook is full of practice problems covering every topic in your Calculus I course. Limits, derivatives, integration, important calculus theorems, areas, functions—it’s all here. Pencil your way through the book or get online to track your progress and build customized problem sets. Then, follow along with step-by-step answer explanations for every solution. <p><b>Go online and find: <ul><li>A free one-year subscription to all problems </li> <li>Multiple-choice questions on many of the topics you’ll encounter in your calculus course </li> <li>Personalized reports that track your progress and help show you where you need to study the most</li> <li>Customizable practice sets for self-directed study</li> <li>Practice problems categorized as easy, medium, or hard</b></li></ul> <p><b>Go online! <ul><li>Practice problems for each topic</li> <li>Detailed explanations for every question</li> <li>Access all 1,001 practice problems </b></li></ul>

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