- Page 3 and 4: About the Authors Titu Andreescu re
- Page 5 and 6: Titu Andreescu University of Wiscon
- Page 7 and 8: vi Contents Vectors 41 The Dot Prod
- Page 9 and 10: viii Preface Throughout MOSP, full
- Page 12 and 13: Abbreviations and Notation Abbrevia
- Page 16 and 17: 1 Trigonometric Fundamentals Defini
- Page 18 and 19: and 1. Trigonometric Fundamentals 3
- Page 20 and 21: 1. Trigonometric Fundamentals 5 A E
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- Page 24 and 25: 1. Trigonometric Fundamentals 9 A B
- Page 26 and 27: 1. Trigonometric Fundamentals 11 Fo
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- Page 38 and 39: 1. Trigonometric Fundamentals 23 Ex
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- Page 44 and 45: (3) |AF | |FB| · |BD| |DC| · |CE|
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- Page 48 and 49: Think Outside the Box 1. Trigonomet
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- Page 56 and 57: 1. Trigonometric Fundamentals 41 In
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1. Trigonometric Fundamentals 49 We
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1. Trigonometric Fundamentals 51 ci
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1. Trigonometric Fundamentals 53 so
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1. Trigonometric Fundamentals 55 Th
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1. Trigonometric Fundamentals 57 Ex
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1. Trigonometric Fundamentals 59 or
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1. Trigonometric Fundamentals 61 Z2
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2 Introductory Problems 1. Let x be
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2. Introductory Problems 65 12. In
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2. Introductory Problems 67 (e) csc
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2. Introductory Problems 69 32. Sho
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2. Introductory Problems 71 48. Fin
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74 103 Trigonometry Problems (a) Pr
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76 103 Trigonometry Problems 15. Fo
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78 103 Trigonometry Problems 29. Le
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80 103 Trigonometry Problems 42. Le
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4 Solutions to Introductory Problem
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4. Solutions to Introductory Proble
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4. Solutions to Introductory Proble
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4. Solutions to Introductory Proble
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4. Solutions to Introductory Proble
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17. Prove that 4. Solutions to Intr
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4. Solutions to Introductory Proble
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4. Solutions to Introductory Proble
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4. Solutions to Introductory Proble
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4. Solutions to Introductory Proble
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4. Solutions to Introductory Proble
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implying that n = 23. 4. Solutions
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4. Solutions to Introductory Proble
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Hence 4. Solutions to Introductory
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4. Solutions to Introductory Proble
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4. Solutions to Introductory Proble
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4. Solutions to Introductory Proble
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4. Solutions to Introductory Proble
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9 4 csc2 α ≥ 4. Solutions to Int
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4. Solutions to Introductory Proble
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4. Solutions to Introductory Proble
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126 103 Trigonometry Problems (a) M
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128 103 Trigonometry Problems (b) F
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130 103 Trigonometry Problems 7. Le
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132 103 Trigonometry Problems and s
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134 103 Trigonometry Problems which
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136 103 Trigonometry Problems Solut
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138 103 Trigonometry Problems or co
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140 103 Trigonometry Problems Expan
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142 103 Trigonometry Problems Set T
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144 103 Trigonometry Problems Let x
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146 103 Trigonometry Problems imply
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148 103 Trigonometry Problems formu
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150 103 Trigonometry Problems To es
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152 103 Trigonometry Problems The a
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154 103 Trigonometry Problems imply
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156 103 Trigonometry Problems Note
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158 103 Trigonometry Problems α +
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160 103 Trigonometry Problems Equat
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162 103 Trigonometry Problems Equal
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164 103 Trigonometry Problems 38. L
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166 103 Trigonometry Problems Solut
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168 103 Trigonometry Problems Apply
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170 103 Trigonometry Problems y 2 s
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̸ 172 103 Trigonometry Problems (|
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174 103 Trigonometry Problems Simil
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176 103 Trigonometry Problems Third
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178 103 Trigonometry Problems The p
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180 103 Trigonometry Problems By th
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182 103 Trigonometry Problems Conse
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184 103 Trigonometry Problems 47. [
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186 103 Trigonometry Problems or 7
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188 103 Trigonometry Problems We es
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190 103 Trigonometry Problems X X1
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192 103 Trigonometry Problems so si
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194 103 Trigonometry Problems side
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196 103 Trigonometry Problems where
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Glossary Arithmetic-Geometric Means
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Chebyshev Polynomials Glossary 201
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Glossary 203 Heron’s Formula The
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Glossary 205 Periodic Function A fu
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Addition and Subtraction Formulas:
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Glossary 209 that is, x 1 + x 2 +·
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212 103 Trigonometry Problems 9. An
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214 103 Trigonometry Problems 39. L