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<p><b>Introduction</b><b> 1</b></p> <p>About This Book 1</p> <p>Foolish Assumptions 2</p> <p>Icons Used in This Book 3</p> <p>Beyond the Book 3</p> <p>Where to Go from Here 3</p> <p><b>Part 1: Getting Started with Pre-Calculus</b><b> 5</b></p> <p><b>Chapter 1: Pre-Pre-Calculus</b><b> 7</b></p> <p>Pre-Calculus: An Overview 8</p> <p>All the Number Basics (No, Not How to Count Them!) 9</p> <p>The multitude of number types: Terms to know 9</p> <p>The fundamental operations you can perform on numbers 11</p> <p>The properties of numbers: Truths to remember 11</p> <p>Visual Statements: When Math Follows Form with Function 12</p> <p>Basic terms and concepts 13</p> <p>Graphing linear equalities and inequalities 14</p> <p>Gathering information from graphs 15</p> <p>Get Yourself a Graphing Calculator 16</p> <p><b>Chapter 2: Playing with Real Numbers</b><b> 19</b></p> <p>Solving Inequalities 19</p> <p>Recapping inequality how-tos 20</p> <p>Solving equations and inequalities when absolute value is involved 20</p> <p>Expressing solutions for inequalities with interval notation 22</p> <p>Variations on Dividing and Multiplying: Working with Radicals and Exponents 24</p> <p>Defining and relating radicals and exponents 24</p> <p>Rewriting radicals as exponents (or, creating rational exponents) 25</p> <p>Getting a radical out of a denominator: Rationalizing 26</p> <p><b>Chapter 3: The Building Blocks of Pre-Calculus Functions</b><b> 31</b></p> <p>Qualities of Special Function Types and Their Graphs 32</p> <p>Even and odd functions 32</p> <p>One-to-one functions 32</p> <p>Dealing with Parent Functions and Their Graphs 33</p> <p>Linear functions 33</p> <p>Quadratic functions 33</p> <p>Square-root functions 34</p> <p>Absolute-value functions 34</p> <p>Cubic functions 35</p> <p>Cube-root functions 36</p> <p>Graphing Functions That Have More Than One Rule: Piece-Wise Functions 37</p> <p>Setting the Stage for Rational Functions 38</p> <p>Step 1: Search for vertical asymptotes 39</p> <p>Step 2: Look for horizontal asymptotes 40</p> <p>Step 3: Seek out oblique asymptotes 41</p> <p>Step 4: Locate the x- and y-intercepts 42</p> <p>Putting the Results to Work: Graphing Rational Functions 42</p> <p><b>Chapter 4: Operating on Functions</b><b> 49</b></p> <p>Transforming the Parent Graphs 50</p> <p>Stretching and flattening 50</p> <p>Translations 52</p> <p>Reflections 54</p> <p>Combining various transformations (a transformation in itself!) 55</p> <p>Transforming functions point by point 57</p> <p>Sharpen Your Scalpel: Operating on Functions 58</p> <p>Adding and subtracting 59</p> <p>Multiplying and dividing 60</p> <p>Breaking down a composition of functions 60</p> <p>Adjusting the domain and range of combined functions (if applicable) 61</p> <p>Turning Inside Out with Inverse Functions 63</p> <p>Graphing an inverse 64</p> <p>Inverting a function to find its inverse 66</p> <p>Verifying an inverse 66</p> <p><b>Chapter 5: Digging Out and Using Roots to Graph Polynomial Functions</b><b> 69</b></p> <p>Understanding Degrees and Roots 70</p> <p>Factoring a Polynomial Expression 71</p> <p>Always the first step: Looking for a GCF 72</p> <p>Unwrapping the box containing a trinomial 73</p> <p>Recognizing and factoring special polynomials 74</p> <p>Grouping to factor four or more terms 77</p> <p>Finding the Roots of a Factored Equation 78</p> <p>Cracking a Quadratic Equation When It Won’t Factor 79</p> <p>Using the quadratic formula 79</p> <p>Completing the square 80</p> <p>Solving Unfactorable Polynomials with a Degree Higher Than Two 81</p> <p>Counting a polynomial’s total roots 82</p> <p>Tallying the real roots: Descartes’s rule of signs 82</p> <p>Accounting for imaginary roots: The fundamental theorem of algebra 83</p> <p>Guessing and checking the real roots 84</p> <p>Put It in Reverse: Using Solutions to Find Factors 90</p> <p>Graphing Polynomials 91</p> <p>When all the roots are real numbers 91</p> <p>When roots are imaginary numbers: Combining all techniques 95</p> <p><b>Chapter 6: Exponential and Logarithmic Functions</b><b> 97</b></p> <p>Exploring Exponential Functions 98</p> <p>Searching the ins and outs of exponential functions 98</p> <p>Graphing and transforming exponential functions 100</p> <p>Logarithms: The Inverse of Exponential Functions 102</p> <p>Getting a better handle on logarithms 102</p> <p>Managing the properties and identities of logs 103</p> <p>Changing a log’s base 105</p> <p>Calculating a number when you know its log: Inverse logs 105</p> <p>Graphing logs 106</p> <p>Base Jumping to Simplify and Solve Equations 109</p> <p>Stepping through the process of exponential equation solving 109</p> <p>Solving logarithmic equations 112</p> <p>Growing Exponentially: Word Problems in the Kitchen 113</p> <p><b>Part 2: The Essentials of Trigonometry</b><b> 117</b></p> <p><b>Chapter 7: Circling in on Angles</b><b> 119</b></p> <p>Introducing Radians: Circles Weren’t Always Measured in Degrees 120</p> <p>Trig Ratios: Taking Right Triangles a Step Further 121</p> <p>Making a sine 121</p> <p>Looking for a cosine 122</p> <p>Going on a tangent 124</p> <p>Discovering the flip side: Reciprocal trig functions 125</p> <p>Working in reverse: Inverse trig functions 126</p> <p>Understanding How Trig Ratios Work on the Coordinate Plane 127</p> <p>Building the Unit Circle by Dissecting the Right Way 129</p> <p>Familiarizing yourself with the most common angles 129</p> <p>Drawing uncommon angles 131</p> <p>Digesting Special Triangle Ratios 132</p> <p>The 45er: 45 -45 -90 triangle 132</p> <p>The old 30-60: 30 -60 -90 triangle 133</p> <p>Triangles and the Unit Circle: Working Together for the Common Good 135</p> <p>Placing the major angles correctly, sans protractor 135</p> <p>Retrieving trig-function values on the unit circle 138</p> <p>Finding the reference angle to solve for angles on the unit circle 142</p> <p>Measuring Arcs: When the Circle Is Put in Motion 146</p> <p><b>Chapter 8: Simplifying the Graphing and Transformation of Trig Functions</b><b> 149</b></p> <p>Drafting the Sine and Cosine Parent Graphs 150</p> <p>Sketching sine 150</p> <p>Looking at cosine 152</p> <p>Graphing Tangent and Cotangent 154</p> <p>Tackling tangent 154</p> <p>Clarifying cotangent 157</p> <p>Putting Secant and Cosecant in Pictures 159</p> <p>Graphing secant 159</p> <p>Checking out cosecant 161</p> <p>Transforming Trig Graphs 162</p> <p>Messing with sine and cosine graphs 163</p> <p>Tweaking tangent and cotangent graphs 173</p> <p>Transforming the graphs of secant and cosecant 176</p> <p><b>Chapter 9: Identifying with Trig Identities: The Basics</b><b> 181</b></p> <p>Keeping the End in Mind: A Quick Primer on Identities 182</p> <p>Lining Up the Means to the End: Basic Trig Identities 182</p> <p>Reciprocal and ratio identities 183</p> <p>Pythagorean identities 185</p> <p>Even/odd identities 188</p> <p>Co-function identities 190</p> <p>Periodicity identities 192</p> <p>Tackling Difficult Trig Proofs: Some Techniques to Know 194</p> <p>Dealing with demanding denominators 195</p> <p>Going solo on each side 199</p> <p><b>Chapter 10: Advanced Identities: Your Keys to Success</b><b> 201</b></p> <p>Finding Trig Functions of Sums and Differences 202</p> <p>Searching out the sine of <i>a b </i>202</p> <p>Calculating the cosine of <i>a b </i>206</p> <p>Taming the tangent of <i>a b </i>209</p> <p>Doubling an Angle and Finding Its Trig Value 211</p> <p>Finding the sine of a doubled angle 212</p> <p>Calculating cosines for two 213</p> <p>Squaring your cares away 215</p> <p>Having twice the fun with tangents 216</p> <p>Taking Trig Functions of Common Angles Divided in Two 217</p> <p>A Glimpse of Calculus: Traveling from Products to Sums and Back 219</p> <p>Expressing products as sums (or differences) 219</p> <p>Transporting from sums (or differences) to products 220</p> <p>Eliminating Exponents with Power-Reducing Formulas 221</p> <p><b>Chapter 11: Taking Charge of Oblique Triangles with the Laws of Sines and Cosines</b><b> 223</b></p> <p>Solving a Triangle with the Law of Sines 224</p> <p>When you know two angle measures 225</p> <p>When you know two consecutive side lengths 228</p> <p>Conquering a Triangle with the Law of Cosines 235</p> <p>SSS: Finding angles using only sides 236</p> <p>SAS: Tagging the angle in the middle (and the two sides) 238</p> <p>Filling in the Triangle by Calculating Area 240</p> <p>Finding area with two sides and an included angle (for SAS scenarios) 241</p> <p>Using Heron’s Formula (for SSS scenarios) 241</p> <p><b>Part 3: Analytic Geometry and System Solving</b><b> 243</b></p> <p><b>Chapter 12: Plane Thinking: Complex Numbers and Polar Coordinates</b><b> 245</b></p> <p>Understanding Real versus Imaginary 246</p> <p>Combining Real and Imaginary: The Complex Number System 247</p> <p>Grasping the usefulness of complex numbers 247</p> <p>Performing operations with complex numbers 248</p> <p>Graphing Complex Numbers 250</p> <p>Plotting Around a Pole: Polar Coordinates 251</p> <p>Wrapping your brain around the polar coordinate plane 252</p> <p>Graphing polar coordinates with negative values 254</p> <p>Changing to and from polar coordinates 256</p> <p>Picturing polar equations 259</p> <p><b>Chapter 13: Creating Conics by Slicing Cones</b><b> 263</b></p> <p>Cone to Cone: Identifying the Four Conic Sections 264</p> <p>In picture (graph form) 264</p> <p>In print (equation form) 266</p> <p>Going Round and Round: Graphing Circles 267</p> <p>Graphing circles at the origin 267</p> <p>Graphing circles away from the origin 268</p> <p>Writing in center–radius form 269</p> <p>Riding the Ups and Downs with Parabolas 270</p> <p>Labeling the parts 270</p> <p>Understanding the characteristics of a standard parabola 271</p> <p>Plotting the variations: Parabolas all over the plane 272</p> <p>The vertex, axis of symmetry, focus, and directrix 273</p> <p>Identifying the min and max of vertical parabolas 276</p> <p>The Fat and the Skinny on the Ellipse 278</p> <p>Labeling ellipses and expressing them with algebra 279</p> <p>Identifying the parts from the equation 281</p> <p>Pair Two Curves and What Do You Get? Hyperbolas 284</p> <p>Visualizing the two types of hyperbolas and their bits and pieces 284</p> <p>Graphing a hyperbola from an equation 287</p> <p>Finding the equations of asymptotes 287</p> <p>Expressing Conics Outside the Realm of Cartesian Coordinates 289</p> <p>Graphing conic sections in parametric form 290</p> <p>The equations of conic sections on the polar coordinate plane 292</p> <p><b>Chapter 14: Streamlining Systems, Managing Variables </b><b>295</b></p> <p>A Primer on Your System-Solving Options 296</p> <p>Algebraic Solutions of Two-Equation Systems 297</p> <p>Solving linear systems 297</p> <p>Working nonlinear systems 300</p> <p>Solving Systems with More than Two Equations 304</p> <p>Decomposing Partial Fractions 306</p> <p>Surveying Systems of Inequalities 307</p> <p>Introducing Matrices: The Basics 309</p> <p>Applying basic operations to matrices 310</p> <p>Multiplying matrices by each other 311</p> <p>Simplifying Matrices to Ease the Solving Process 312</p> <p>Writing a system in matrix form 313</p> <p>Reduced row-echelon form 313</p> <p>Augmented form 314</p> <p>Making Matrices Work for You 315</p> <p>Using Gaussian elimination to solve systems 316</p> <p>Multiplying a matrix by its inverse 320</p> <p>Using determinants: Cramer’s Rule 323</p> <p><b>Chapter 15: Sequences, Series, and Expanding Binomials for the Real World</b><b> 327</b></p> <p>Speaking Sequentially: Grasping the General Method 328</p> <p>Determining a sequence’s terms 328</p> <p>Working in reverse: Forming an expression from terms 329</p> <p>Recursive sequences: One type of general sequence 330</p> <p>Difference between Terms: Arithmetic Sequences 331</p> <p>Using consecutive terms to find another 332</p> <p>Using any two terms 332</p> <p>Ratios and Consecutive Paired Terms: Geometric Sequences 334</p> <p>Identifying a particular term when given consecutive terms 334</p> <p>Going out of order: Dealing with nonconsecutive terms 335</p> <p>Creating a Series: Summing Terms of a Sequence 337</p> <p>Reviewing general summation notation 337</p> <p>Summing an arithmetic sequence 338</p> <p>Seeing how a geometric sequence adds up 339</p> <p>Expanding with the Binomial Theorem 342</p> <p>Breaking down the binomial theorem 344</p> <p>Expanding by using the binomial theorem 345</p> <p><b>Chapter 16: Onward to Calculus</b><b> 351</b></p> <p>Scoping Out the Differences between Pre-Calculus and Calculus 352</p> <p>Understanding Your Limits 353</p> <p>Finding the Limit of a Function 355</p> <p>Graphically 355</p> <p>Analytically 356</p> <p>Algebraically 357</p> <p>Operating on Limits: The Limit Laws 361</p> <p>Calculating the Average Rate of Change 362</p> <p>Exploring Continuity in Functions 363</p> <p>Determining whether a function is continuous 364</p> <p>Discontinuity in rational functions 365</p> <p><b>Part 4: The Part of Tens</b><b> 367</b></p> <p><b>Chapter 17: Ten Polar Graphs </b><b>369</b></p> <p>Spiraling Outward 369</p> <p>Falling in Love with a Cardioid 370</p> <p>Cardioids and Lima Beans 370</p> <p>Leaning Lemniscates 371</p> <p>Lacing through Lemniscates 372</p> <p>Roses with Even Petals 372</p> <p>A rose Is a Rose Is a Rose 373</p> <p>Limaçon or Escargot? 373</p> <p>Limaçon on the Side 374</p> <p>Bifolium or Rabbit Ears? 374</p> <p><b>Chapter 18: Ten Habits to Adjust before Calculus</b><b> 375</b></p> <p>Figure Out What the Problem Is Asking 375</p> <p>Draw Pictures (the More the Better) 376</p> <p>Plan Your Attack — Identify Your Targets 377</p> <p>Write Down Any Formulas 377</p> <p>Show Each Step of Your Work 378</p> <p>Know When to Quit 378</p> <p>Check Your Answers 379</p> <p>Practice Plenty of Problems 380</p> <p>Keep Track of the Order of Operations 380</p> <p>Use Caution When Dealing with Fractions 381</p> <p>Index 383</p>

<p><b>Mary Jane Sterling</b> aught algebra, business calculus, geometry, and finite mathematics at Bradley University in Peoria, Illinois for more than 30 years. She is the author of several <i>For Dummies books,</i> including <i>Algebra Workbook For Dummies, Algebra II For Dummies,</i> and <i>Algebra II Workbook For Dummies.</i></p>

<ul> <li>Make sense of logarithms and exponentials</li> <li>Understand functions and solve linear equations</li> <li>Graph algebraic and trig functions</li> </ul> <p><b>Get ahead in pre-calculus</b></p> <p>Getting a handle on pre-calculus can feel a bit daunting, but this accessible, hands-on guide makes it easier than ever. By presenting the essential topics in a clear and concise manner, the book helps you improve your understanding of pre-calculus and become prepared for upper-level math courses—in a snap!</p> <p><b>Inside...</b></p> <ul> <li>Sharpen your algebraic skills</li> <li>Identify and conquer challenging processes</li> <li>Review angles and their properties</li> <li>Establish trig identities</li> <li>Work with conic sections</li> <li>Solve systems of equations</li> </ul>

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