# Calculus 1st edition

Laura Taalman and Peter Kohn
Publisher: W. H. Freeman

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• Chapter 0: Functions and Precalculus
• 0.1: Functions and Graphs (21)
• 0.2: Operations, Transformations, and Inverses (22)
• 0.3: Algebraic Functions (8)
• 0.4: Exponential and Trigonometric Functions (30)
• 0.5: Logic and Mathematical Thinking (31)
• 0: Chapter Review (6)
• 0: Self-Test

• Chapter 1: Limits
• 1.1: An Intuitive Introduction to Limits (17)
• 1.2: Formal Definition of Limit (13)
• 1.3: Delta-Epsilon Proofs (16)
• 1.4: Continuity and Its Consequences (19)
• 1.5: Limit Rules and Calculating Basic Limits (21)
• 1.6: Infinite Limits and Indeterminate Forms (22)
• 1: Chapter Review (4)
• 1: Self-Test

• Chapter 2: Derivatives
• 2.1: An Intuitive Introduction to Derivatives (8)
• 2.2: Formal Definition of the Derivative (36)
• 2.3: Rules for Calculating Basic Derivatives (23)
• 2.4: The Chain Rule and Implicit Differentiation (16)
• 2.5: Derivatives of Exponential and Logarithmic Functions (10)
• 2.6: Derivatives of Trigonometric and Hyperbolic Functions (11)
• 2: Chapter Review (1)
• 2: Self-Test

• Chapter 3: Applications of the Derivative
• 3.1: The Mean Value Theorem (10)
• 3.2: The First Derivative and Curve Sketching (7)
• 3.3: The Second Derivative and Curve Sketching (14)
• 3.4: Optimization (11)
• 3.5: Related Rates (10)
• 3.6: L'Hôpital's Rule (46)
• 3: Chapter Review (3)
• 3: Self-Test

• Chapter 4: Definite Integrals
• 4.1: Addition and Accumulation (18)
• 4.2: Riemann Sums (11)
• 4.3: Definite Integrals (21)
• 4.4: Indefinite Integrals (39)
• 4.5: The Fundamental Theorem of Calculus (21)
• 4.6: Areas and Average Values (20)
• 4.7: Functions Defined by Integrals (8)
• 4: Chapter Review (9)
• 4: Self-Test

• Chapter 5: Techniques of Integration
• 5.1: Integration by Substitution (21)
• 5.2: Integration by Parts (22)
• 5.3: Partial Fractions and Other Algebraic Techniques (14)
• 5.4: Trigonometric Integrals (20)
• 5.5: Trigonometric Substitution (13)
• 5.6: Improper Integrals (16)
• 5.7: Numerical Integration (7)
• 5: Chapter Review (9)
• 5: Self-Test

• Chapter 6: Applications of Integration
• 6.1: Volumes by Slicing (19)
• 6.2: Volumes by Shells (20)
• 6.3: Arc Length and Surface Area (19)
• 6.4: Real-World Applications of Integration (17)
• 6.5: Differential Equations (20)
• 6: Chapter Review (4)
• 6: Self-Test

• Chapter 7: Sequences and Series
• 7.1: Sequences (17)
• 7.2: Limits of Sequences (12)
• 7.3: Series (21)
• 7.4: Introduction to Convergence Tests (14)
• 7.5: Comparison Tests (9)
• 7.6: The Ratio and Root Tests (18)
• 7.7: Alternating Series (11)
• 7: Chapter Review
• 7: Self-Test

• Chapter 8: Power Series
• 8.1: Power Series (21)
• 8.2: Maclaurin Series and Taylor Series (18)
• 8.3: Convergence of Power Series (14)
• 8.4: Differentiating and Integrating Power Series (18)
• 8: Chapter Review (10)
• 8: Self-Test

• Chapter 9: Parametric Equations, Polar Coordinates, and Conic Sections
• 9.1: Parametric Equations (26)
• 9.2: Polar Coordinates (29)
• 9.3: Graphing Polar Equations
• 9.4: Computing Arc Length and Area with Polar Functions (15)
• 9.5: Conic Sections (21)
• 9: Chapter Review (2)
• 9: Self-Test

• Chapter 10: Vectors
• 10.1: Cartesian Coordinates (19)
• 10.2: Vectors (31)
• 10.3: Dot Product (22)
• 10.4: Cross Product (15)
• 10.5: Lines in Three-Dimensional Space (28)
• 10.6: Planes (17)
• 10: Chapter Review
• 10: Self-Test

• Chapter 11: Vector Functions
• 11.1: Vector-valued Functions (8)
• 11.2: The Calculus of Vector Functions (26)
• 11.3: Unit Tangent and Unit Normal Vectors (13)
• 11.4: Arc Length Parametrizations and Curvature (15)
• 11.5: Motion (6)
• 11: Chapter Review
• 11: Self-Test

• Chapter 12: Multivariable Functions
• 12.1: Functions of Two and Three Variables (8)
• 12.2: Open Sets, Closed Sets, Limits, and Continuity (12)
• 12.3: Partial Derivatives (23)
• 12.4: Directional Derivatives and Differentiability (22)
• 12.5: The Chain Rule and the Gradient (16)
• 12.6: Extreme Values (11)
• 12.7: Lagrange Multipliers (10)
• 12: Chapter Review
• 12: Self-Test

• Chapter 13: Double and Triple Integrals
• 13.1: Double Integrals over Rectangular Regions (18)
• 13.2: Double Integrals over General Regions (13)
• 13.3: Double Integrals using Polar Coordinates (12)
• 13.4: Applications of Double Integrals (14)
• 13.5: Triple Integrals (10)
• 13.6: Integration using Cylindrical and Spherical Coordinates (10)
• 13.7: Jacobians and Change of Variables (6)
• 13: Chapter Review
• 13: Self-Test

• Chapter 14: Vector Analysis
• 14.1: Vector Fields (8)
• 14.2: Line Integrals (14)
• 14.3: Surfaces and Surface Integrals (11)
• 14.4: Green's Theorem (14)
• 14.5: Stokes' Theorem (10)
• 14.6: The Divergence Theorem (13)
• 14: Chapter Review
• 14: Self-Test

## Questions Available within WebAssign

Most questions from this textbook are available in WebAssign. The online questions are identical to the textbook questions except for minor wording changes necessary for Web use. Whenever possible, variables, numbers, or words have been randomized so that each student receives a unique version of the question. This list is updated nightly.

##### Question Group Key
Tutorial - Tutorial Question
XP - Extra Problem

##### Question Availability Color Key
BLACK questions are available now
GRAY questions are under development

Group Quantity Questions
Chapter 0: Functions and Precalculus
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0.2 22 001 024.Tutorial 030 031 032 033 034 035 067 069 071 072 073 074 075 076 078 079 080 084 501.XP 502.XP
0.3 8 001 028 029 031 035 036 037 042
0.4 30 001 010 027 029 032 034 036 037 038 039 040 041 042 043 044 048 049 050 051 053 058 061 063 083 084 501.XP 502.XP 503.XP 504.XP 505.XP
0.5 31 001 017 018 019 020 021 022 023 024 025 026 027 028 029 030 031 032 033 034 035 036 037 038 039 040 041 042 043 044 045 046
Chapter 1: Limits
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1.4 19 001 007 008 009 010 011 012 024 035 036 040 041 042 052 053 054 058 067 072
1.5 21 001 013 016 017 025 026 027 028 030 041 042 044 051 063 065 068 071 074 079 083 501.XP
1.6 22 007 008 009 010 023 036 037 038 046 048 050 054 056 060 062 066 068 074 076 501.XP 502.XP 503.XP
Chapter 2: Derivatives
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2.5 10 017 018 019 020 021 023 026 031 034 048
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Chapter 3: Applications of the Derivative
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Chapter 4: Definite Integrals
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4.4 39 021 022 023 024 025 026 027 028 029 030 031 032 033 034 035 037 038 039 040 041 042 043 044 045 046 047 048 049 050 051 052 053 054 055 057 059 060 061 062
4.5 21 019 020 021 022 023 025 029 033 034 035 039 040 041 044 045 046 048 057 059 060.Tutorial 063
4.6 20 028 030 031 034 036 037 041 042 043 045 047 056 057 058 061 063 064 068 069 071
4.7 8 028 030 035 036 042 045 050 053
Chapter 5: Techniques of Integration
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5.6 16 021 022 023 024 033 035 037 040.Tutorial 042 045 047 049 052 055 058 061
5.7 7 023 025 029 030 033 035 037
Chapter 6: Applications of Integration
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6.3 19 021 022 027 028 031 032 033 037 038 039 040 041 043.Tutorial 044 063 064 066 067 068 071
6.4 17 019 020 023 042 043 044 045 046 049 050 052 053 056 059 065 066 067
6.5 20 019 020 021 022 023 024 029 030 032 033 034 035 036 037 041 042 045 049 050 051
Chapter 7: Sequences and Series
7.1 17 027 028 029 032 035 043 044 045 046 047 048 049 050 053 063 071 075
7.2 12 023 024 029 030 033 036 039 042 049 050 056 058
7.3 21 022 024 025 030 032 033 038 041 043 044 045 046 047 049 053 054 055 056 058 059 068
7.4 14 018 019 024 026 027 030 031 032 035 036 040 041 050 501.XP
7.5 9 022 027 029 031 032 035 038 047 048
7.6 18 021 022 023 024 025 026 029 031 033 034 035 036 039 041 046 053 054 057
7.7 11 027 030 032 033 035 044 048 049 050 051 059
Chapter 8: Power Series
8.R 10 001 012 015 016 017 018 019 020 021 022
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8.3 14 017 020 021 022 023 025 026 037 038 040 041 051 052 061
8.4 18 025 026 028 029 031 033 036a 037a 038a 039a 040a 043 045 049 053 055 059 501.XP
Chapter 9: Parametric Equations, Polar Coordinates, and Conic Sections
9.R 2 010 501.XP.Tutorial
9.1 26 017 018 021 025 026 029 034 037 041 042 043 045 046 047 049 050 051 053 055 056 057 058 059 060 065 501.XP
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9.4 15 017 018 023 026 027 029 031 032 033 034 036 038 039 040 043
9.5 21 018 019 020 021 022 023 024 025 028 029 033 034 035 036 037 038 039 040 041 042 043
Chapter 10: Vectors
10.1 19 021 022 023 024 025 026 027 028 029 030 031 032 033 034 035 036 037 038 039
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10.3 22 022 023 024 025 026 027 028 029 031 032 033 034 037 043 044 045 046 049 050 051 501.XP 502.XP
10.4 15 022 023 024 026 032 033 034 035 036 037 038 039 040 041 501.XP
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10.6 17 021 022 023 024 025 026 028 029 030 035 036 037 038 039 048 049 055
Chapter 11: Vector Functions
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11.5 6 017 019 022 032 501.XP 502.XP
Chapter 12: Multivariable Functions
12.1 8 022 023 024 027 028 032 035 036
12.2 12 033 034 035 036 037 038 039 041 042 043 045 046
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12.6 11 021 023 027 028 029 030 037 040 047 501.XP 502.XP
12.7 10 024.Tutorial 026 027 028 029 031 033 037 040 043
Chapter 13: Double and Triple Integrals
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13.2 13 032 034 036 039 041 042 044 045 048 052 058 061 501.XP.Tutorial
13.3 12 029 030 035 036 039 041 043 047 051 055 058 059
13.4 14 025 026 028 032 033 035 039 042 046 049 053 056 057 058
13.5 10 025 026 028 032 033 042 058 060 501.XP 502.XP
13.6 10 024 025 026 027 028 029 048 049 052 053
13.7 6 028 039 040 041 042 050
Chapter 14: Vector Analysis
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14.2 14 021 023 024 025 029 030 031 034 038 039 045 050 052 053
14.3 11 021 024 025 031 033 038 042 043 052 501.XP 502.XP
14.4 14 017 019 020 022 026 027 028 029 030 032 036 038 044 045
14.5 10 020 021 023 024 026 027 031 032 037 038
14.6 13 021 022 023 025 026 027 029 032 033 037 038 042 043
Total 1535 (1)