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Thomas Calculus 13th [Solutions]
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58 Chapter 1 Functions<br />
Copyright<br />
2014 Pearson Education, Inc.
58 Chapter 1 Functions Copyright 2014 Pearson Education, Inc.
- Page 7:
1 Functions 1 TABLE OF CONTENTS 1.1
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8.3 Trigonometric Integrals 569 8.4
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2 Chapter 1 Functions 15. The domai
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4 Chapter 1 Functions 3 0 0 ( 1) 1
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6 Chapter 1 Functions 43. Symmetric
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8 Chapter 1 Functions 68. (a) From
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10 Chapter 1 Functions The complete
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12 Chapter 1 Functions 35. 36. 37.
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14 Chapter 1 Functions (c) domain:
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16 Chapter 1 Functions 69. 3 y f (
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18 Chapter 1 Functions (c) (d) 80.
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20 Chapter 1 Functions 21. 22. peri
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22 Chapter 1 Functions 40. sin(2 x)
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24 Chapter 1 Functions 65. A 2, B 2
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26 Chapter 1 Functions 1.4 GRAPHING
- Page 69:
28 Chapter 1 Functions 17. [ 5, 1]
- Page 73:
30 Chapter 1 Functions 35. 36. 37.
- Page 77: 32 Chapter 1 Functions 9. 10. 11. 2
- Page 81: 34 Chapter 1 Functions 35. After t
- Page 85: 36 Chapter 1 Functions 24. Step 1:
- Page 89: 38 Chapter 1 Functions y 1 36. y =
- Page 93: 40 Chapter 1 Functions 56. (a) (b)
- Page 97: 42 Chapter 1 Functions 1 50 50 50 (
- Page 101: 44 Chapter 1 Functions 10. 5 3 5 y(
- Page 105: 46 Chapter 1 Functions 37. (a) ( f
- Page 109: 48 Chapter 1 Functions 50. (a) Shif
- Page 113: 50 Chapter 1 Functions 65. Let h he
- Page 117: 52 Chapter 1 Functions 81. (a) No (
- Page 121: 54 Chapter 1 Functions 11. If f is
- Page 125: 56 Chapter 1 Functions 21. (a) y =
- Page 131: CHAPTER 2 LIMITS AND CONTINUITY 2.1
- Page 135: 19. (a) (b) g( x) g g(2) g(1) 2 1 x
- Page 139: Section 2.2 Limit of a Function and
- Page 143: Section 2.2 Limit of a Function and
- Page 147: Section 2.2 Limit of a Function and
- Page 151: Section 2.2 Limit of a Function and
- Page 155: Section 2.2 Limit of a Function and
- Page 159: Section 2.3 The Precise Definition
- Page 163: Section 2.3 The Precise Definition
- Page 167: Section 2.3 The Precise Definition
- Page 171: Section 2.3 The Precise Definition
- Page 175: Section 2.4 One-Sided Limits 81 2.4
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Section 2.4 One-Sided Limits 83 17.
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Section 2.4 One-Sided Limits 85 44.
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Section 2.5 Continuity 87 19. Disco
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Section 2.5 Continuity 89 49. The f
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Section 2.5 Continuity 91 65. Yes,
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13. (a) 2 3 2 lim x x lim 2 x x 5 7
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Section 2.6 Limits Involving Infini
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Section 2.6 Limits Involving Infini
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Section 2.6 Limits Involving Infini
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Section 2.6 Limits Involving Infini
- Page 219:
Chapter 2 Practice Exercises 103 2.
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Chapter 2 Practice Exercises 105 17
- Page 227:
Chapter 2 Practice Exercises 107 38
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Chapter 2 Additional and Advanced E
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Chapter 2 Additional and Advanced E
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Chapter 2 Additional and Advanced E
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CHAPTER 3 DERIVATIVES 3.1 TANGENTS
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Section 3.1 Tangents and the Deriva
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Section 3.1 Tangents and the Deriva
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Section 3.2 The Derivative as a Fun
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Section 3.2 The Derivative as a Fun
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Section 3.2 The Derivative as a Fun
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Right-hand derivative: When h 0,1 h
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Section 3.2 The Derivative as a Fun
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63-68. Example CAS commands: Maple:
- Page 279:
Section 3.3 Differentiation Rules 1
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Section 3.3 Differentiation Rules 1
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Section 3.3 Differentiation Rules 1
- Page 291:
Section 3.4 The Derivative as a Rat
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Section 3.4 The Derivative as a Rat
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Section 3.4 The Derivative as a Rat
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Section 3.5 Derivatives of Trigonom
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Section 3.5 Derivatives of Trigonom
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Section 3.5 Derivatives of Trigonom
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Section 3.5 Derivatives of Trigonom
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Section 3.6 The Chain Rule 153 2 2
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Section 3.6 The Chain Rule 155 44.
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Section 3.6 The Chain Rule 157 71.
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Section 3.6 The Chain Rule 159 11 2
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Section 3.6 The Chain Rule 161 sin
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Section 3.7 Implicit Differentiatio
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Section 3.7 Implicit Differentiatio
- Page 347:
Section 3.7 Implicit Differentiatio
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Section 3.7 Implicit Differentiatio
- Page 355:
Section 3.8 Derivatives of Inverse
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Section 3.8 Derivatives of Inverse
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Section 3.8 Derivatives of Inverse
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Section 3.8 Derivatives of Inverse
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109 110. Example CAS commands: Sect
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Section 3.9 Inverse Trigonometric F
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Section 3.9 Inverse Trigonometric F
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Section 3.9 Inverse Trigonometric F
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Section 3.10 Related Rates 187 5. y
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Section 3.10 Related Rates 189 27.
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Section 3.10 Related Rates 191 43.
- Page 399:
Section 3.11 Linearization and Diff
- Page 403:
Section 3.11 Linearization and Diff
- Page 407:
Section 3.11 Linearization and Diff
- Page 411:
plot(err(x), x 1..2, title #absolut
- Page 415:
Chapter 3 Practice Exercises 201 28
- Page 419:
Chapter 3 Practice Exercises 203 58
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Chapter 3 Practice Exercises 205 84
- Page 427:
Chapter 3 Practice Exercises 207 (b
- Page 431:
Chapter 3 Practice Exercises 209 11
- Page 435:
Chapter 3 Practice Exercises 211 13
- Page 439:
Chapter 3 Practice Exercises 213 (b
- Page 443:
Chapter 3 Additional and Advanced E
- Page 447:
Chapter 3 Additional and Advanced E
- Page 451:
CHAPTER 4 APPLICATIONS OF DERIVATIV
- Page 455:
Section 4.1 Extreme Values of Funct
- Page 459:
Section 4.1 Extreme Values of Funct
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Section 4.1 Extreme Values of Funct
- Page 467:
Section 4.1 Extreme Values of Funct
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Section 4.1 Extreme Values of Funct
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Section 4.1 Extreme Values of Funct
- Page 479:
Section 4.2 The Mean Value Theorem
- Page 483:
27. r ( ) sec 1 5 ( ) (sec )(tan )
- Page 487:
Section 4.2 The Mean Value Theorem
- Page 491:
Section 4.3 Monotonic Functions and
- Page 495:
Section 4.3 Monotonic Functions and
- Page 499:
33. (a) 34. (a) 35. (a) 2 2 1/2 g(
- Page 503:
Section 4.3 Monotonic Functions and
- Page 507:
Section 4.3 Monotonic Functions and
- Page 511:
(b) The graph of f rises when f 0,
- Page 515:
Section 4.3 Monotonic Functions and
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86. f(x) is increasing since 1 5/3
- Page 523:
Section 4.4 Concavity and Curve Ske
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5 4 21. When y x 5 x , then 4 3 3 3
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31. When y x , then y 1 and x 2 2 3
- Page 535:
2 2 40. When y x , then x y 2 x 2 2
- Page 539:
Section 4.4 Concavity and Curve Ske
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Section 4.4 Concavity and Curve Ske
- Page 547:
Section 4.4 Concavity and Curve Ske
- Page 551:
Section 4.4 Concavity and Curve Ske
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Section 4.4 Concavity and Curve Ske
- Page 559:
Section 4.4 Concavity and Curve Ske
- Page 563:
The line x 2 is a vertical asymptot
- Page 567:
104. 105. Section 4.4 Concavity and
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3 2 2 Section 4.4 Concavity and Cur
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Section 4.5 Indeterminate Forms and
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Section 4.5 Indeterminate Forms and
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Section 4.5 Indeterminate Forms and
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Section 4.5 Indeterminate Forms and
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Section 4.5 Indeterminate Forms and
- Page 595:
Section 4.6 Applied Optimization 29
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16. (a) The base measures 10 2x in.
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2 3 Section 4.6 Applied Optimizatio
- Page 607:
Section 4.6 Applied Optimization 29
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Section 4.6 Applied Optimization 29
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Section 4.6 Applied Optimization 30
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Section 4.6 Applied Optimization 30
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Section 4.7 Newtons Method 305 4. 2
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Section 4.7 Newtons Method 307 20.
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Section 4.8 Antiderivatives 309 4.8
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Section 4.8 Antiderivatives 311 42.
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85. (a) Wrong: (b) (c) d dx 3 (2x 1
- Page 643:
Section 4.8 Antiderivatives 315 2 2
- Page 647:
Section 4.8 Antiderivatives 317 128
- Page 651:
Chapter 4 Practice Exercises 319 12
- Page 655:
Chapter 4 Practice Exercises 321 27
- Page 659:
45. (a) y 6 x( x 1)( x 2) (b) 3 2 6
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52. The graph of the first derivati
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Chapter 4 Practice Exercises 327 74
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92. (a) The distance between the pa
- Page 675:
Chapter 4 Practice Exercises 331 10
- Page 679:
Chapter 4 Practice Exercises 333 12
- Page 683:
Chapter 4 Practice Exercises 335 x
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Chapter 4 Additional and Advanced E
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Chapter 4 Additional and Advanced E
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Chapter 4 Additional and Advanced E
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CHAPTER 5 INTEGRATION 5.1 AREA AND
- Page 703:
Section 5.1 Area and Estimating wit
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Section 5.1 Area and Estimating wit
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Section 5.2 Sigma Notation and Limi
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Section 5.2 Sigma Notation and Limi
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Section 5.2 Sigma Notation and Limi
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Section 5.3 The Definite Integral 3
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Section 5.3 The Definite Integral 3
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Section 5.3 The Definite Integral 3
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Section 5.3 The Definite Integral 3
- Page 739:
65. Consider the partition P that s
- Page 743:
74. See Exercise 73 above. On [0, 0
- Page 747:
Section 5.3 The Definite Integral 3
- Page 751:
Section 5.4 The Fundamental Theorem
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Section 5.4 The Fundamental Theorem
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Section 5.4 The Fundamental Theorem
- Page 763:
Section 5.4 The Fundamental Theorem
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Section 5.4 The Fundamental Theorem
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93. Example CAS commands: Maple: f
- Page 775:
Section 5.5 Indefinite Integrals an
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Section 5.5 Indefinite Integrals an
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Section 5.5 Indefinite Integrals an
- Page 787:
80. Let 2 u t du dt du dt Section 5
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1 1 11. (a) Let u 4 5 t t ( u 4), d
- Page 795:
Section 5.6 Substitution and Area B
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Section 5.6 Substitution and Area B
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61. AREA A1 A2 A3 A1: For the sketc
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Section 5.6 Substitution and Area B
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Section 5.6 Substitution and Area B
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Section 5.6 Substitution and Area B
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Section 5.6 Substitution and Area B
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Section 5.6 Substitution and Area B
- Page 827:
Chapter 5 Practice Exercises 407 CH
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Chapter 5 Practice Exercises 409 10
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Chapter 5 Practice Exercises 411 1
- Page 839:
Chapter 5 Practice Exercises 413 33
- Page 843:
Chapter 5 Practice Exercises 415 57
- Page 847:
80. Let u 7 5r du 5 dr 1 du dr; r 0
- Page 851:
Chapter 5 Practice Exercises 419 10
- Page 855:
Chapter 5 Practice Exercises 421 11
- Page 859:
Chapter 5 Additional and Advanced E
- Page 863:
Chapter 5 Additional and Advanced E
- Page 867:
29. (a) (b) 1 g(1) f ( t) dt 0 1 3
- Page 871:
Chapter 5 Additional and Advanced E
- Page 875:
CHAPTER 6 APPLICATIONS OF DEFINITE
- Page 879:
Section 6.1 Volumes Using Cross-Sec
- Page 883:
Section 6.1 Volumes Using Cross-Sec
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Section 6.1 Volumes Using Cross-Sec
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Section 6.1 Volumes Using Cross-Sec
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Section 6.1 Volumes Using Cross-Sec
- Page 899:
Section 6.2 Volumes Using Cylindric
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Section 6.2 Volumes Using Cylindric
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Section 6.2 Volumes Using Cylindric
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Section 6.2 Volumes Using Cylindric
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Section 6.2 Volumes Using Cylindric
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Section 6.2 Volumes Using Cylindric
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Section 6.3 Arc Length 455 2. dy 3
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Section 6.3 Arc Length 457 9. dx 1
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Section 6.3 Arc Length 459 19. (a)
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Section 6.3 Arc Length 461 32. (a)
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Section 6.4 Areas of Surfaces of Re
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Section 6.4 Areas of Surfaces of Re
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Section 6.4 Areas of Surfaces of Re
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Section 6.5 Work and Fluid Forces 4
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(d) In a location where water weigh
- Page 959:
Section 6.5 Work and Fluid Forces 4
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Section 6.5 Work and Fluid Forces 4
- Page 967:
38. Using the coordinate system giv
- Page 971:
Section 6.6 Moments and Centers of
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mass: 2 dm dA 3 1 x dx . The moment
- Page 979:
Section 6.6 Moments and Centers of
- Page 983:
Section 6.6 Moments and Centers of
- Page 987:
Section 6.6 Moments and Centers of
- Page 991:
Section 6.6 Moments and Centers of
- Page 995:
Section 6.6 Moments and Centers of
- Page 999:
Chapter 6 Practice Exercises 493 6.
- Page 1003:
(b) shell method: Chapter 6 Practic
- Page 1007:
Chapter 6 Practice Exercises 497 x
- Page 1011:
Chapter 6 Practice Exercises 499 0
- Page 1015:
(a) Chapter 6 Additional and Advanc
- Page 1019:
10. Converting to pounds and feet,
- Page 1023:
Chapter 6 Additional and Advanced E
- Page 1027:
CHAPTER 7 INTEGRALS AND TRANSCENDEN
- Page 1031:
Section 7.1 The Logarithm Defined a
- Page 1035:
Section 7.1 The Logarithm Defined a
- Page 1039:
61. y = ln kx y = ln x + ln k; thus
- Page 1043:
Section 7.2 Exponential Change and
- Page 1047:
Section 7.2 Exponential Change and
- Page 1051:
37. 0 kt A A e and Section 7.2 Expo
- Page 1055:
Section 7.3 Hyperbolic Functions 52
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Section 7.3 Hyperbolic Functions 52
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Section 7.3 Hyperbolic Functions 52
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Section 7.3 Hyperbolic Functions 52
- Page 1071:
Section 7.4 Relative Rates of Growt
- Page 1075:
Section 7.4 Relative Rates of Growt
- Page 1079:
Section 7.4 Relative Rates of Growt
- Page 1083:
Chapter 7 Practice Exercises 535 CH
- Page 1087:
Chapter 7 Practice Exercises 537 (d
- Page 1091:
Chapter 7 Practice Exercises 539 30
- Page 1095:
Chapter 7 Additional and Advanced E
- Page 1099:
CHAPTER 8 TECHNIQUES OF INTEGRATION
- Page 1103:
Section 8.1 Using Basic Integration
- Page 1107:
Section 8.1 Using Basic Integration
- Page 1111:
Section 8.1 Using Basic Integration
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Section 8.1 Using Basic Integration
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Section 8.1 Using Basic Integration
- Page 1123:
Section 8.2 Integration by Parts 55
- Page 1127:
Section 8.2 Integration by Parts 55
- Page 1131:
Section 8.2 Integration by Parts 55
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Section 8.2 Integration by Parts 56
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Section 8.2 Integration by Parts 56
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Section 8.2 Integration by Parts 56
- Page 1147:
Section 8.2 Integration by Parts 56
- Page 1151:
Section 8.3 Trigonometric Integrals
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Section 8.3 Trigonometric Integrals
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Section 8.3 Trigonometric Integrals
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Section 8.3 Trigonometric Integrals
- Page 1167:
Section 8.4 Trigonometric Substitut
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Section 8.4 Trigonometric Substitut
- Page 1175:
Section 8.4 Trigonometric Substitut
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Section 8.4 Trigonometric Substitut
- Page 1183:
Section 8.5 Integration of Rational
- Page 1187:
Section 8.5 Integration of Rational
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Section 8.5 Integration of Rational
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Section 8.5 Integration of Rational
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Section 8.5 Integration of Rational
- Page 1203:
Section 8.6 Integral Tables and Com
- Page 1207:
Section 8.6 Integral Tables and Com
- Page 1211:
Section 8.6 Integral Tables and Com
- Page 1215:
Section 8.6 Integral Tables and Com
- Page 1219:
Section 8.6 Integral Tables and Com
- Page 1223:
Section 8.6 Integral Tables and Com
- Page 1227:
Section 8.7 Numerical Integration 6
- Page 1231:
Section 8.7 Numerical Integration 6
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Section 8.7 Numerical Integration 6
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Section 8.7 Numerical Integration 6
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Section 8.7 Numerical Integration 6
- Page 1247:
Section 8.8 Improper Integrals 617
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Section 8.8 Improper Integrals 619
- Page 1255:
Section 8.8 Improper Integrals 621
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1 sin x 56. 2 x 1 sin x dx; 0 2 2 2
- Page 1263:
Section 8.8 Improper Integrals 625
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Section 8.8 Improper Integrals 627
- Page 1271:
Section 8.9 Probability 629 In orde
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Section 8.9 Probability 631 20. 3/2
- Page 1279:
Section 8.9 Probability 633 36. For
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Section 8.9 Probability 635 52 . 20
- Page 1287:
Chapter 8 Practice Exercises 637 56
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Chapter 8 Practice Exercises 639 (3
- Page 1295:
Chapter 8 Practice Exercises 641 42
- Page 1299:
Chapter 8 Practice Exercises 643 d
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Chapter 8 Practice Exercises 645 9
- Page 1307:
Chapter 8 Practice Exercises 647 3/
- Page 1311:
Chapter 8 Practice Exercises 649 li
- Page 1315:
Chapter 8 Additional and Advanced E
- Page 1319:
Chapter 8 Additional and Advanced E
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Chapter 8 Additional and Advanced E
- Page 1327:
Chapter 8 Additional and Advanced E
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t b t t Chapter 8 Additional and Ad
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CHAPTER 9 FIRST-ORDER DIFFERENTIAL
- Page 1339:
Section 9.1 Solutions, Slope Fields
- Page 1343:
Section 9.1 Solutions, Slope Fields
- Page 1347:
Section 9.1 Solutions, Slope Fields
- Page 1351:
Section 9.1 Solutions, Slope Fields
- Page 1355:
Section 9.2 First-Order Linear Equa
- Page 1359:
Section 9.2 First-Order Linear Equa
- Page 1363:
Section 9.3 Applications 675 6. 2 2
- Page 1367:
14. (a) dV (5 3) 2 V 100 2t dt The
- Page 1371:
Section 9.4 Graphical Solutions of
- Page 1375:
Section 9.4 Graphical Solutions of
- Page 1379:
Section 9.4 Graphical Solutions of
- Page 1383:
Section 9.4 Graphical Solution of A
- Page 1387:
Implies coexistence is not possible
- Page 1391:
Section 9.5 Systems of Equations an
- Page 1395:
Section 9.5 Systems of Equations an
- Page 1399:
Chapter 9 Practice Exercises 693 1
- Page 1403:
Chapter 9 Practice Exercises 695 24
- Page 1407:
Chapter 9 Practice Exercises 697 33
- Page 1411:
Chapter 9 Additional and Advanced E
- Page 1415:
CHAPTER 10 INFINITE SEQUENCES AND S
- Page 1419:
Section 10.1 Sequences 703 40. 1 n
- Page 1423:
Section 10.1 Sequences 705 70. 1 n
- Page 1427:
95. Since a n converges Section 10.
- Page 1431:
111. 3( n 1) 1 3 1 3 4 3 1 2 2 a n
- Page 1435:
Section 10.1 Sequences 711 133. a2k
- Page 1439:
Section 10.2 Infinite Series 713 12
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Section 10.2 Infinite Series 715 40
- Page 1447:
Section 10.2 Infinite Series 717 61
- Page 1451:
Section 10.2 Infinite Series 719 87
- Page 1455:
6. f ( x ) 1 is positive, continuou
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Section 10.3 The Integral Test 723
- Page 1463:
Section 10.3 The Integral Test 725
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Section 10.3 The Integral Test 727
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Section 10.4 Comparison Tests 729 4
- Page 1475:
Section 10.4 Comparison Tests 731 1
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Section 10.4 Comparison Tests 733 3
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Section 10.4 Comparison Tests 735 1
- Page 1487:
Section 10.4 Comparison Tests 737 6
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Section 10.5 Absolute Convergence;
- Page 1495:
Section 10.5 Absolute Convergence;
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Section 10.5 Absolute Convergence;
- Page 1503:
Section 10.6 Alternating Series and
- Page 1507:
Section 10.6 Alternating Series and
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Section 10.6 Alternating Series and
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Section 10.6 Alternating Series and
- Page 1519:
Section 10.7 Power Series 753 6. n
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Section 10.7 Power Series 755 17. l
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Section 10.7 Power Series 757 25. n
- Page 1531:
Section 10.7 Power Series 759 1 2 1
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Section 10.7 Power Series 761 inter
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Section 10.7 Power Series 763 3 5 1
- Page 1543:
Section 10.8 Taylor and Maclaurin S
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Section 10.8 Taylor and Maclaurin S
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Section 10.9 Convergence of Taylor
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Section 10.9 Convergence of Taylor
- Page 1559:
Section 10.9 Convergence of Taylor
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Section 10.9 Convergence of Taylor
- Page 1567:
Section 10.10 The Binomial Series a
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Section 10.10 The Binomial Series a
- Page 1575:
Section 10.10 The Binomial Series a
- Page 1579:
Section 10.10 The Binomial Series a
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Section 10.10 The Binomial Series a
- Page 1587:
Chapter 10 Practice Exercises 787 1
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Chapter 10 Practice Exercises 789 3
- Page 1595:
Chapter 10 Practice Exercises 791 4
- Page 1599:
Chapter 10 Practice Exercises 793 7
- Page 1603:
Chapter 10 Additional and Advanced
- Page 1607:
Chapter 10 Additional and Advanced
- Page 1611:
Chapter 10 Additional and Advanced
- Page 1615:
CHAPTER 11 PARAMETRIC EQUATIONS AND
- Page 1619:
Section 11.1 Parametrizations of Pl
- Page 1623:
Section 11.1 Parametrizations of Pl
- Page 1627:
Section 11.1 Parametrizations of Pl
- Page 1631:
Section 11.2 Calculus with Parametr
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Section 11.2 Calculus with Parametr
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Section 11.2 Calculus with Parametr
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Section 11.2 Calculus with Parametr
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Section 11.2 Calculus with Parametr
- Page 1651:
Section 11.3 Polar Coordinates 819
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Section 11.3 Polar Coordinates 821
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Section 11.3 Polar Coordinates 823
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Section 11.4 Graphing Polar Coordin
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Section 11.4 Graphing Polar Coordin
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Section 11.4 Graphing Polar Coordin
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Section 11.4 Graphing Polar Coordin
- Page 1679:
9. r 2cos and r 2sin 2cos 2sin cos
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17. r sec and A r 2 4cos 4cos sec c
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Section 11.5 Areas and Lengths in P
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Section 11.6 Conic Sections 839 9.
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Section 11.6 Conic Sections 841 25.
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Section 11.6 Conic Sections 843 42.
- Page 1703:
Section 11.6 Conic Sections 845 56.
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Section 11.6 Conic Sections 847 72.
- Page 1711:
Section 11.7 Conics in Polar Coordi
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Section 11.7 Conics in Polar Coordi
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Section 11.7 Conics in Polar Coordi
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Section 11.7 Conics in Polar Coordi
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Section 11.7 Conics in Polar Coordi
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75. (a) Perihelion a ae a(1 e ), Ap
- Page 1735:
Chapter 11 Practice Exercises 861 1
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Chapter 11 Practice Exercises 863 2
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Chapter 11 Practice Exercises 865 3
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Chapter 11 Practice Exercises 867 5
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Chapter 11 Practice Exercises 869 7
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CHAPTER 11 ADDITIONAL AND ADVANCED
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Chapter 11 Additional and Advanced
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Chapter 11 Additional and Advanced
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CHAPTER 12 VECTORS AND THE GEOMETRY
- Page 1771:
Section 12.1 Three-Dimensional Coor
- Page 1775:
Section 12.2 Vectors 881 66. 2 2 2
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Section 12.2 Vectors 883 25. length
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Section 12.2 Vectors 885 F 1 sin 40
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Section 12.3 The Dot Product 887 11
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Section 12.3 The Dot Product 889 28
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Section 12.3 The Dot Product 891 40
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Section 12.4 The Cross Product 893
- Page 1803:
23. (a) u v 6, u w 81, v w 18 none
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Section 12.4 The Cross Product 897
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Section 12.5 Lines and Planes in Sp
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Section 12.5 Lines and Planes in Sp
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Section 12.5 Lines and Planes in Sp
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L1 & L3: x 3 2t 3 2r 2t 2r 0 t r 0
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Section 12.6 Cylinders and Quadric
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Section 12.6 Cylinders and Quadric
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Section 12.6 Cylinders and Quadric
- Page 1839:
Chapter 12 Practice Exercises 913 1
- Page 1843:
Chapter 12 Practice Exercises 915 2
- Page 1847:
i j k Chapter 12 Practice Exercises
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Chapter 12 Practice Exercises 919 (
- Page 1855:
Chapter 12 Additional and Advanced
- Page 1859:
Chapter 12 Additional and Advanced
- Page 1863:
Chapter 12 Additional and Advanced
- Page 1867:
CHAPTER 13 VECTOR-VALUED FUNCTIONS
- Page 1871:
Section 13.1 Curves in Space and Th
- Page 1875:
Section 13.1 Curves in Space and Th
- Page 1879:
Section 13.2 Integrals of Vector Fu
- Page 1883:
Section 13.2 Integrals of Vector Fu
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dr dt Section 13.2 Integrals of Vec
- Page 1891:
Section 13.2 Integrals of Vector Fu
- Page 1895:
t Section 13.3 Arc Length in Space
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Section 13.3 Arc Length in Space 94
- Page 1903:
Section 13.4 Curvature and Normal V
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8. (a) Section 13.4 Curvature and N
- Page 1911:
Section 13.4 Curvature and Normal V
- Page 1915:
Section 13.4 Curvature and Normal V
- Page 1919:
Section 13.5 Tangential and Normal
- Page 1923:
Section 13.5 Tangential and Normal
- Page 1927:
Section 13.5 Tangential and Normal
- Page 1931:
Section 13.6 Velocity and Accelerat
- Page 1935:
13. Assuming Earth has a circular o
- Page 1939:
Chapter 13 Practice Exercises 963 i
- Page 1943:
Chapter 13 Practice Exercises 965 1
- Page 1947:
Chapter 13 Practice Exercises 967 2
- Page 1951:
Chapter 13 Additional and Advanced
- Page 1955:
i j k 9. (a) ur u cos sin 0 k a rig
- Page 1959:
CHAPTER 14 PARTIAL DERIVATIVES 14.1
- Page 1963:
17. (a) Domain: all points in the x
- Page 1967:
Section 14.1 Functions of Several V
- Page 1971:
44. (a) (b) Section 14.1 Functions
- Page 1975:
Section 14.1 Functions of Several V
- Page 1979:
Section 14.1 Functions of Several V
- Page 1983:
Section 14.2 Limits and Continuity
- Page 1987:
Section 14.2 Limits and Continuity
- Page 1991:
Section 14.2 Limits and Continuity
- Page 1995:
Section 14.3 Partial Derivatives 99
- Page 1999:
Section 14.3 Partial Derivatives 99
- Page 2003:
Section 14.3 Partial Derivatives 99
- Page 2007:
Section 14.3 Partial Derivatives 99
- Page 2011:
Section 14.4 The Chain Rule 999 92.
- Page 2015:
Section 14.4 The Chain Rule 1001 w
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Section 14.4 The Chain Rule 1003 18
- Page 2023:
Section 14.4 The Chain Rule 1005 y
- Page 2027:
Section 14.4 The Chain Rule 1007 46
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Section 14.5 Directional Derivative
- Page 2035:
Section 14.5 Directional Derivative
- Page 2039:
Section 14.5 Directional Derivative
- Page 2043:
Section 14.6 Tangent Planes and Dif
- Page 2047:
Section 14.6 Tangent Planes and Dif
- Page 2051:
Section 14.6 Tangent Planes and Dif
- Page 2055:
Section 14.6 Tangent Planes and Dif
- Page 2059:
Section 14.6 Tangent Planes and Dif
- Page 2063:
Section 14.7 Extreme Values and Sad
- Page 2067:
Section 14.7 Extreme Values and Sad
- Page 2071:
2 33. (i) On OA, f ( x, y) f (0, y)
- Page 2075:
38. (i) On OA, f ( x, y) f (0, y) 2
- Page 2079:
Section 14.7 Extreme Values and Sad
- Page 2083:
Section 14.7 Extreme Values and Sad
- Page 2087:
Section 14.7 Extreme Values and Sad
- Page 2091:
Section 14.7 Extreme Values and Sad
- Page 2095:
5. We optimize Section 14.8 Lagrang
- Page 2099:
15. T (8x 4 y) i ( 4x 2 y) j and Se
- Page 2103:
Section 14.8 Lagrange Multipliers 1
- Page 2107:
34. Q( p, q, r) 2( pq pr qr ) and G
- Page 2111:
Section 14.8 Lagrange Multipliers 1
- Page 2115:
49-54. Example CAS commands: Maple:
- Page 2119:
Section 14.9 Taylors Formula for Tw
- Page 2123:
Section 14.10 Partial Derivatives w
- Page 2127:
Section 14.10 Partial Derivatives w
- Page 2131:
Chapter 14 Practice Exercises 1059
- Page 2135:
Chapter 14 Practice Exercises 1061
- Page 2139:
Chapter 14 Practice Exercises 1063
- Page 2143:
Chapter 14 Practice Exercises 1065
- Page 2147:
Chapter 14 Practice Exercises 1067
- Page 2151:
74. (i) On OA, 2 f ( x, y) f (0, y)
- Page 2155:
(iii) On CD, 3 f ( x, y) f (1, y) y
- Page 2159:
Chapter 14 Practice Exercises 1073
- Page 2163:
96. Let Chapter 14 Practice Exercis
- Page 2167:
Chapter 14 Additional and Advanced
- Page 2171:
Chapter 14 Additional and Advanced
- Page 2175:
21. (a) k is a vector normal to wil
- Page 2179:
CHAPTER 15 MULTIPLE INTEGRALS 15.1
- Page 2183:
Section 15.1 Double and Iterated In
- Page 2187:
7. 8. Section 15.2 Double Integrals
- Page 2191:
Section 15.2 Double Integrals Over
- Page 2195:
Section 15.2 Double Integrals Over
- Page 2199:
Section 15.2 Double Integrals Over
- Page 2203:
Section 15.2 Double Integrals Over
- Page 2207:
Section 15.2 Double Integrals Over
- Page 2211:
Section 15.2 Double Integrals Over
- Page 2215:
Section 15.3 Area by Double Integra
- Page 2219:
Section 15.3 Area by Double Integra
- Page 2223:
Section 15.4 Double Integrals in Po
- Page 2227:
Section 15.4 Double Integrals in Po
- Page 2231:
Section 15.4 Double Integrals in Po
- Page 2235:
Section 15.4 Double Integrals in Po
- Page 2239:
6. The projection of D onto the xy
- Page 2243:
Section 15.5 Triple Integrals in Re
- Page 2247:
Section 15.5 Triple Integrals in Re
- Page 2251:
Section 15.6 Moments and Centers of
- Page 2255:
Section 15.6 Moments and Centers of
- Page 2259:
Section 15.6 Moments and Centers of
- Page 2263:
Section 15.7 Triple Integrals in Cy
- Page 2267:
Section 15.7 Triple Integrals in Cy
- Page 2271:
Section 15.7 Triple Integrals in Cy
- Page 2275:
66. average 1 2 3 Section 15.7 Trip
- Page 2279:
Section 15.7 Triple Integrals in Cy
- Page 2283:
Section 15.8 Substitutions in Multi
- Page 2287:
Section 15.8 Substitutions in Multi
- Page 2291:
Section 15.8 Substitutions in Multi
- Page 2295:
Section 15.8 Substitutions in Multi
- Page 2299:
Chapter 15 Practice Exercises 1143
- Page 2303:
Chapter 15 Practice Exercises 1145
- Page 2307:
Chapter 15 Practice Exercises 1147
- Page 2311:
53. x u y and y v x u v and y v 1 1
- Page 2315:
Chapter 15 Additional and Advanced
- Page 2319:
Chapter 15 Additional and Advanced
- Page 2323:
CHAPTER 16 INTEGRALS AND VECTOR FIE
- Page 2327:
Section 16.1 Line Integrals 1157 1
- Page 2331:
Section 16.1 Line Integrals 1159 34
- Page 2335:
Section 16.2 Vector Fields and Line
- Page 2339:
(b) Section 16.2 Vector Fields and
- Page 2343:
Section 16.2 Vector Fields and Line
- Page 2347:
Section 16.2 Vector Fields and Line
- Page 2351:
Section 16.2 Vector Fields and Line
- Page 2355:
Section 16.2 Vector Fields and Line
- Page 2359:
11. 2 2 Section 16.3 Path Independe
- Page 2363:
Section 16.3 Path Independence, Pot
- Page 2367:
Section 16.3 Path Independence, Pot
- Page 2371:
Section 16.4 Greens Theorem in the
- Page 2375:
Section 16.4 Greens Theorem in the
- Page 2379:
Section 16.4 Greens Theorem in the
- Page 2383:
Section 16.5 Surfaces and Area 1185
- Page 2387:
(b) In a fashion similar to cylindr
- Page 2391:
Section 16.5 Surfaces and Area 1189
- Page 2395:
Section 16.5 Surfaces and Area 1191
- Page 2399:
Section 16.5 Surfaces and Area 1193
- Page 2403:
Section 16.5 Surfaces and Area 1195
- Page 2407:
Section 16.6 Surface Integrals 1197
- Page 2411:
Section 16.6 Surface Integrals 1199
- Page 2415:
Section 16.6 Surface Integrals 1201
- Page 2419:
Section 16.6 Surface Integrals 1203
- Page 2423:
Section 16.6 Surface Integrals 1205
- Page 2427:
Section 16.7 Stokes Theorem 1207 i
- Page 2431:
Section 16.7 Stokes Theorem 1209 2
- Page 2435:
Section 16.7 Stokes Theorem 1211 C
- Page 2439:
Section 16.8 The Divergence Theorem
- Page 2443:
Section 16.8 The Divergence Theorem
- Page 2447:
Section 16.8 The Divergence Theorem
- Page 2451:
30. By Exercise 29, 2 f g d f g f g
- Page 2455:
Chapter 16 Practice Exercises 1221
- Page 2459:
Chapter 16 Practice Exercises 1223
- Page 2463:
Chapter 16 Practice Exercises 1225
- Page 2467:
Chapter 16 Practice Exercises 1227
- Page 2471:
Chapter 16 Practice Exercises 1229
- Page 2475:
Chapter 16 Additional and Advanced
- Page 2479:
Chapter 16 Additional and Advanced
- Page 2483:
CHAPTER 17 SECOND-ORDER DIFFERENTIA
- Page 2487:
ww w w 2 2 Section 17.1 Second-Orde
- Page 2491:
Section 17.1 Second-Order Linear Eq
- Page 2495:
Section 17.2 Nonhomogeneous Linear
- Page 2499:
Section 17.2 Nonhomogeneous Linear
- Page 2503:
2 dy dx dy dx Section 17.2 Nonhomog
- Page 2507:
dy w dx œc1sin x c2cos x cos xlnks
- Page 2511:
Section 17.3 Applications 1017 ! !
- Page 2515:
5 10 5È 2 2 5 dy 5È2 dy 1 16 $ È
- Page 2519:
Section 17.4 Euler Equations 1021 "
- Page 2523:
Section 17.5 Power-Series Soutions
- Page 2527:
∞ ∞ ∞ # ww w # 5. x y 2xy 2
- Page 2531:
# ww # 11. x 1y 6y 0 x 1 n2 nn 1c x
- Page 2535:
∞ ∞ ∞ ww w 17. y xy 3y œ 0
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