Details

Calculus Essentials For Dummies


Calculus Essentials For Dummies


1. Aufl.

von: Mark Ryan

6,99 €

Verlag: Wiley
Format: EPUB
Veröffentl.: 15.04.2019
ISBN/EAN: 9781119591221
Sprache: englisch
Anzahl Seiten: 192

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

Beschreibungen

<p><i>Calculus Essentials For Dummies</i> (9781119591207) was previously published as <i>Calculus Essentials For Dummies </i>(9780470618356). 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> </p> <p>Many colleges and universities require students to take at least one math course, and Calculus I is often the chosen option. <i>Calculus Essentials For Dummies</i> provides explanations of key concepts for students who may have taken calculus in high school and want to review the most important concepts as they gear up for a faster-paced college course. Free of review and ramp-up material, <i>Calculus Essentials For Dummies</i> sticks to the point with content focused on key topics only. It provides discrete explanations of critical concepts taught in a typical two-semester high school calculus class or a college level Calculus I course, from limits and differentiation to integration and infinite series. This guide is also a perfect reference for parents who need to review critical calculus concepts as they help high school students with homework assignments, as well as for adult learners headed back into the classroom who just need a refresher of the core concepts.</p> <p><i><b>The Essentials For Dummies</b></i><b> Series</b><br /> Dummies is proud to present our new series, <i>The Essentials For Dummies</i>. Now students who are prepping for exams, preparing to study new material, or who just need a refresher can have a concise, easy-to-understand review guide that covers an entire course by concentrating solely on the most important concepts. From algebra and chemistry to grammar and Spanish, our expert authors focus on the skills students most need to succeed in a subject.</p>
<p><b>Introduction 1</b></p> <p>About This Book 1</p> <p>Conventions Used in This Book 2</p> <p>Foolish Assumptions 2</p> <p>Icons Used in This Book 3</p> <p>Where to Go from Here 3</p> <p><b>Chapter 1: Calculus: No Big Deal</b><b> 5</b></p> <p>So What is Calculus Already? 5</p> <p>Real-World Examples of Calculus 7</p> <p>Differentiation 8</p> <p>Integration 9</p> <p>Why Calculus Works 11</p> <p>Limits: Math microscopes 11</p> <p>What happens when you zoom in 12</p> <p><b>Chapter 2: Limits and Continuity</b><b> 15</b></p> <p>Taking it to the Limit 15</p> <p>Three functions with one limit 15</p> <p>One-sided limits 17</p> <p>Limits and vertical asymptotes 18</p> <p>Limits and horizontal asymptotes 18</p> <p>Instantaneous speed 19</p> <p>Limits and Continuity 21</p> <p>The hole exception 22</p> <p><b>Chapter 3: Evaluating Limits</b><b> 25</b></p> <p>Easy Limits 25</p> <p>Limits to memorize 25</p> <p>Plug-and-chug limits 26</p> <p>“Real” Limit Problems 26</p> <p>Factoring 27</p> <p>Conjugate multiplication 27</p> <p>Miscellaneous algebra 28</p> <p>Limits at Infinity 29</p> <p>Horizontal asymptotes 30</p> <p>Solving limits at infinity 31</p> <p><b>Chapter 4: Differentiation Orientation</b><b> 33</b></p> <p>The Derivative: It’s Just Slope 34</p> <p>The slope of a line 35</p> <p>The derivative of a line 36</p> <p>The Derivative: It’s Just a Rate 36</p> <p>Calculus on the playground 36</p> <p>The rate-slope connection 38</p> <p>The Derivative of a Curve 39</p> <p>The Difference Quotient 40</p> <p>Average and Instantaneous Rate 46</p> <p>Three Cases Where the Derivative Does Not Exist 47</p> <p><b>Chapter 5: Differentiation Rules</b><b> 49</b></p> <p>Basic Differentiation Rules 49</p> <p>The constant rule 49</p> <p>The power rule 49</p> <p>The constant multiple rule 50</p> <p>The sum and difference rules 51</p> <p>Differentiating trig functions 52</p> <p>Exponential and logarithmic functions 52</p> <p>Derivative Rules for Experts 53</p> <p>The product and quotient rules 53</p> <p>The chain rule 54</p> <p>Differentiating Implicitly 59</p> <p><b>Chapter 6: Differentiation and the Shape of Curves</b><b> 61</b></p> <p>A Calculus Road Trip 61</p> <p>Local Extrema 63</p> <p>Finding the critical numbers 63</p> <p>The First Derivative Test 65</p> <p>The Second Derivative Test 66</p> <p>Finding Absolute Extrema on a Closed Interval 69</p> <p>Finding Absolute Extrema over a Function’s Entire Domain 71</p> <p>Concavity and Inflection Points 73</p> <p>Graphs of Derivatives 75</p> <p>The Mean Value Theorem 78</p> <p><b>Chapter 7: Differentiation Problems</b><b> 81</b></p> <p>Optimization Problems 81</p> <p>The maximum area of a corral 81</p> <p>Position, Velocity, and Acceleration 83</p> <p>Velocity versus speed 84</p> <p>Maximum and minimum height 86</p> <p>Velocity and displacement 87</p> <p>Speed and distance travelled 88</p> <p>Acceleration 89</p> <p>Tying it all together 90</p> <p>Related Rates 91</p> <p>A calculus crossroads 91</p> <p>Filling up a trough 94</p> <p>Linear Approximation 97</p> <p><b>Chapter 8: Introduction to Integration </b><b>101</b></p> <p>Integration: Just Fancy Addition 101</p> <p>Finding the Area under a Curve 103</p> <p>Dealing with negative area 105</p> <p>Approximating Area 105</p> <p>Approximating area with left sums 105</p> <p>Approximating area with right sums 108</p> <p>Approximating area with midpoint sums 110</p> <p>Summation Notation 112</p> <p>Summing up the basics 112</p> <p>Writing Riemann sums with sigma notation 113</p> <p>Finding Exact Area with the Definite Integral 116</p> <p><b>Chapter 9: Integration: Backwards Differentiation </b><b>119</b></p> <p>Antidifferentiation: Reverse Differentiation 119</p> <p>The Annoying Area Function 121</p> <p>The Fundamental Theorem 124</p> <p>Fundamental Theorem: Take Two 126</p> <p>Antiderivatives: Basic Techniques 128</p> <p>Reverse rules 128</p> <p>Guess and check 130</p> <p>Substitution 132</p> <p><b>Chapter 10: Integration for Experts </b><b>137</b></p> <p>Integration by Parts 137</p> <p>Picking your u 139</p> <p>Tricky Trig Integrals 141</p> <p>Sines and cosines 141</p> <p>Secants and tangents 144</p> <p>Cosecants and cotangents 147</p> <p>Trigonometric Substitution 147</p> <p>Case 1: Tangents 148</p> <p>Case 2: Sines 150</p> <p>Case 3: Secants 151</p> <p>Partial Fractions 152</p> <p>Case 1: The denominator contains only linear factors 152</p> <p>Case 2: The denominator contains unfactorable quadratic factors 153</p> <p>Case 3: The denominator contains repeated factors 155</p> <p>Equating coefficients 155</p> <p><b>Chapter 11: Using the Integral to Solve Problems</b><b> 157</b></p> <p>The Mean Value Theorem for Integrals and Average Value 158</p> <p>The Area between Two Curves 160</p> <p>Volumes of Weird Solids 162</p> <p>The meat-slicer method 162</p> <p>The disk method 163</p> <p>The washer method 165</p> <p>The matryoshka doll method 166</p> <p>Arc Length 168</p> <p>Improper Integrals 171</p> <p>Improper integrals with vertical asymptotes 171</p> <p>Improper integrals with infinite limits of integration 173</p> <p><b>Chapter 12: Eight Things to Remember </b><b>175</b></p> <p><i>a<sup>2</sup>- b<sup>2</sup> = </i>(<i>a - b</i>)(<i>a + b</i>) 175</p> <p><i>0/5 = 0 </i>But <i>5/0 </i>is Undefined 175</p> <p>SohCahToa 175</p> <p>Trig Values to Know 176</p> <p><i>sin<sup>2</sup></i><i>ϴ + cos<sup>2</sup>ϴ = 1 </i>176</p> <p>The Product Rule 176</p> <p>The Quotient Rule 176</p> <p>Your Sunglasses 176</p> <p>Index 177</p>
<p><b>Mark Ryan</b> is the owner of The Math Center in Chicago, Illinois, where he teaches students in all levels of mathematics, from pre-algebra to calculus. He is the author of <i>Calculus For Dummies</i> and <i> Geometry For Dummies.</i>
<ul> <li>The "must-know" formulas and equations</li> <li>Exactly what you need to know to conquer calculus</li> <li>Core calculus topics in quick, focused lessons</li> </ul> <p><b>The key concepts for crushing calculus</b> <p>This practical, friendly guide provides clear explanations of the core concepts you need to take your calculus skills to the next level. Understand how differentiation works, from finding the slope of a curve to finding the minimum and maximum values of a function. Discover how integration and area approximation are used to solve calculus problems. Get the lowdown on limits and continuity. And more! This book is perfect for cramming, homework help, or review. <p><b>Inside...</b> <ul> <li>Differentiation rules</li> <li>Integration techniques</li> <li>The fundamental theorem</li> <li>Optimization problems</li> <li>How to calculate volumes of unusual solids</li> <li>Tips for working with linear approximation</li> <li>Real-world examples</li> </ul>

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