# Calculus: Tutorial Bank (Late Transcendentals) 1st edition

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• Chapter 1: Limits and Continuity
• 1.1: Introduction to Limits (12)
• 1.2: Evaluating Limits Using Limit Laws (14)
• 1.3: Continuity (12)
• 1.4: Evaluating Limits at Infinity (12)
• 1.5: The Precise Definition of a Limit (6)

• Chapter 2: Differentiation
• 2.1: Rates of Change: Secant Lines and Tangent Lines (18)
• 2.2: The Definition of the Derivative (14)
• 2.3: Power and Sum Rules (6)
• 2.4: Product and Quotient Rules (8)
• 2.5: Derivatives of Trigonometric Functions (8)
• 2.6: The Chain Rule (8)
• 2.7: Implicit Differentiation (6)

• Chapter 3: Applications of Differentiation
• 3.1: Linearization and Differentials (10)
• 3.2: Extreme Values of a Function (20)
• 3.3: Mean Value Theorem (8)
• 3.4: First and Second Derivative Tests (16)
• 3.5: Curve Sketching (2)
• 3.6: Optimization (12)
• 3.7: Related Rates (20)
• 3.8: Indeterminate Forms and L'Hospital's Rule (6)
• 3.9: Newton's Method (4)

• Chapter 4: Integration
• 4.1: Antiderivatives (14)
• 4.2: The Indefinite Integral (4)
• 4.3: The Area Under a Curve and Riemann Sums (6)
• 4.4: The Definite Integral (16)
• 4.5: The Fundamental Theorem of Calculus (16)

• Chapter 5: Inverse Functions
• 5.1: Exponential Functions (24)
• 5.2: Logarithmic Functions and Logarithmic Differentiation (32)
• 5.3: Inverse Trigonometric Functions (12)
• 5.4: Hyperbolic Functions (8)
• 5.5: Indeterminate Forms and L'Hospital's Rule (4)

• Chapter 6: Integration Techniques
• 6.1: The Substitution Method (12)
• 6.2: Integration by Parts (12)
• 6.3: Trigonometric Integrals (10)
• 6.4: Trigonometric Substitution (16)
• 6.5: Partial Fractions (14)
• 6.6: Integration by Tables and Computer Systems (6)
• 6.7: Improper Integrals (10)
• 6.8: Numeric Integration (10)

• Chapter 7: Applications of Integration
• 7.1: Areas Between Curves (10)
• 7.2: Volumes of Solids by Slicing (2)
• 7.3: Volumes of Revolution: The Disk and Washer Methods (12)
• 7.4: Volumes of Revolution: The Shell Method (12)
• 7.5: Arc Length and Areas of Surfaces of Revolution (16)
• 7.6: Average Value of a Function (6)
• 7.7: Work and Fluid Force (20)
• 7.8: Moments and Center of Mass (12)
• 7.9: Probability and Random Variables (8)
• 7.10: Economics (6)

• Chapter 8: Differential Equations
• 8.1: Introduction to Differential Equations (6)
• 8.2: Direction Fields and Euler's Method (6)
• 8.3: Separable Equations (14)
• 8.4: Exponential Growth and Decay (8)
• 8.5: The Logistic Equation (6)
• 8.6: First-Order Linear Equations (10)

• Chapter 9: Sequences and Series
• 9.1: Sequences (14)
• 9.2: Series (10)
• 9.3: The Integral Test (8)
• 9.4: The Comparison Tests (8)
• 9.5: Alternating Series, Absolute Convergence, and Conditional Convergence (14)
• 9.6: The Ratio and Root Tests (16)
• 9.7: Power Series (8)
• 9.8: Representing Functions as Power Series (4)
• 9.9: Taylor and Maclaurin Series (28)

• Chapter 10: Parametric Equations and Polar Coordinates
• 10.1: Parametric Equations (10)
• 10.2: The Calculus of Parametric Equations (16)
• 10.3: Polar Coordinates (10)
• 10.4: Calculus in Polar Coordinates (10)

• Chapter 11: Conic Sections
• 11.1: Introduction to Conic Sections (8)
• 11.2: Parametrized Conic Sections
• 11.3: Conic Sections in Polar Coordinates (10)

• Chapter 12: Vectors
• 12.1: Three-Dimensional Coordinate Systems (4)
• 12.2: Vectors (6)
• 12.3: The Dot Product (4)
• 12.4: The Cross Product (4)
• 12.5: Lines and Planes in Space (6)
• 12.6: Surfaces in Space (2)

• Chapter 13: Vector-Valued Functions
• 13.1: Vector-Valued Functions and Space Curves (4)
• 13.2: Calculus of Vector-Valued Functions (4)
• 13.3: Arc Length and Curvature (6)
• 13.4: Velocity and Acceleration (8)

• Chapter 14: Partial Derivatives
• 14.1: Multivariable Functions (4)
• 14.2: Limits and Continuity (2)
• 14.3: Partial Derivatives (4)
• 14.4: The Chain Rule (4)
• 14.5: Tangent Planes and Differentials (4)
• 14.6: Directional Derivatives and Gradients (4)
• 14.7: Extrema of Multivariable Functions (4)
• 14.8: Lagrange Multipliers (4)

• Chapter 15: Multiple Integration
• 15.1: Double Integrals over Rectangles
• 15.2: Iterated Integrals (2)
• 15.3: Double Integrals over General Regions (4)
• 15.4: Double Integrals in Polar Coordinates (4)
• 15.5: Applications of Double Integrals
• 15.6: Triple Integrals in Rectangular Coordinates (4)
• 15.7: Triple Integrals in Other Coordinate Systems
• 15.8: Change of Variables in Multiple Integrals (2)

• Chapter 16: Vector Calculus
• 16.1: Vector Fields (4)
• 16.2: Line Integrals (4)
• 16.3: Path Independence and Conservative Vector Fields (2)
• 16.4: Green's Theorem (4)
• 16.5: Parametric Surfaces and Areas (2)
• 16.6: Surface Integrals (6)
• 16.7: Curl and Divergence
• 16.8: Stokes's Theorem (4)
• 16.9: The Divergence Theorem (4)

• Chapter 17: Second-Order Differential Equations
• 17.1: Second-Order Linear Homogeneous Equations
• 17.2: Second-Order Linear Nonhomogeneous Equations
• 17.3: Applications of Second-Order Differential Equations
• 17.4: Infinite Series and Differential Equations

Power up your assignments with the WebAssign Calculus Tutorial Bank collection! Authored by the WebAssign Community of Teachers, this collection features 450 questions that cover the full Calculus curriculum, each featuring a multi-step tutorial that guides students to a deeper understanding of the skills and concepts. Ideal as extra problems for your assignments, or as extra practice for students, this new Additional Resource can be added to any WebAssign course at no additional cost.

Each question is available in two formats:

Stand-Alone Tutorial: Displays the full tutorial to students and assigns a point value for each part.

Pop-Up Tutorial: Presents students with a graded question and includes an ungraded interactive Tutorial as a supportive resource.

##### Question Group Key
Tut - Tutorial Question
Tut.SA - Stand Alone Tutorial

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

Group Quantity Questions
Chapter 1: Limits and Continuity
1.1 12 001a.Tut 001a.Tut.SA 001b.Tut 001b.Tut.SA 002a.Tut 002a.Tut.SA 003a.Tut 003a.Tut.SA 004a.Tut 004a.Tut.SA 005a.Tut 005a.Tut.SA
1.2 14 001a.Tut 001a.Tut.SA 001b.Tut 001b.Tut.SA 002a.Tut 002a.Tut.SA 002b.Tut 002b.Tut.SA 002c.Tut 002c.Tut.SA 003a.Tut 003a.Tut.SA 004a.Tut 004a.Tut.SA
1.3 12 001a.Tut 001a.Tut.SA 002a.Tut 002a.Tut.SA 003a.Tut 003a.Tut.SA 004a.Tut 004a.Tut.SA 005a.Tut 005a.Tut.SA 006a.Tut 006a.Tut.SA
1.4 12 001a.Tut 001a.Tut.SA 001b.Tut 001b.Tut.SA 002a.Tut 002a.Tut.SA 003a.Tut 003a.Tut.SA 004a.Tut 004a.Tut.SA 005a.Tut 005a.Tut.SA
1.5 6 001a.Tut 001a.Tut.SA 002a.Tut 002a.Tut.SA 002b.Tut 002b.Tut.SA
Chapter 2: Differentiation
2.1 18 001a.Tut 001a.Tut.SA 002a.Tut 002a.Tut.SA 003a.Tut 003a.Tut.SA 003b.Tut 003b.Tut.SA 004a.Tut 004a.Tut.SA 004b.Tut 004b.Tut.SA 005a.Tut 005a.Tut.SA 005b.Tut 005b.Tut.SA 006a.Tut 006a.Tut.SA
2.2 14 001a.Tut 001a.Tut.SA 002a.Tut 002a.Tut.SA 003a.Tut 003a.Tut.SA 003b.Tut 003b.Tut.SA 004a.Tut 004a.Tut.SA 004b.Tut 004b.Tut.SA 005a.Tut 005a.Tut.SA
2.3 6 001a.Tut 001a.Tut.SA 002a.Tut 002a.Tut.SA 003a.Tut 003a.Tut.SA
2.4 8 001a.Tut 001a.Tut.SA 002a.Tut 002a.Tut.SA 002b.Tut 002b.Tut.SA 003a.Tut 003a.Tut.SA
2.5 8 001a.Tut 001a.Tut.SA 001b.Tut 001b.Tut.SA 002a.Tut 002a.Tut.SA 003a.Tut 003a.Tut.SA
2.6 8 001a.Tut 001a.Tut.SA 002a.Tut 002a.Tut.SA 002b.Tut 002b.Tut.SA 003a.Tut 003a.Tut.SA
2.7 6 001a.Tut 001a.Tut.SA 001b.Tut 001b.Tut.SA 001c.Tut 001c.Tut.SA
Chapter 3: Applications of Differentiation
3.1 10 001a.Tut 001a.Tut.SA 001b.Tut 001b.Tut.SA 002a.Tut 002a.Tut.SA 003a.Tut 003a.Tut.SA 003b.Tut 003b.Tut.SA
3.2 20 001a.Tut 001a.Tut.SA 001b.Tut 001b.Tut.SA 001c.Tut 001c.Tut.SA 002a.Tut 002a.Tut.SA 002b.Tut 002b.Tut.SA 003a.Tut 003a.Tut.SA 003b.Tut 003b.Tut.SA 003c.Tut 003c.Tut.SA 003d.Tut 003d.Tut.SA 004a.Tut 004a.Tut.SA
3.3 8 001a.Tut 001a.Tut.SA 002a.Tut 002a.Tut.SA 003a.Tut 003a.Tut.SA 004a.Tut 004a.Tut.SA
3.4 16 001a.Tut 001a.Tut.SA 001b.Tut 001b.Tut.SA 002a.Tut 002a.Tut.SA 003a.Tut 003a.Tut.SA 003b.Tut 003b.Tut.SA 004a.Tut 004a.Tut.SA 005a.Tut 005a.Tut.SA 005b.Tut 005b.Tut.SA
3.5 2 001a.Tut 001a.Tut.SA
3.6 12 001a.Tut 001a.Tut.SA 002a.Tut 002a.Tut.SA 002b.Tut 002b.Tut.SA 002c.Tut 002c.Tut.SA 003a.Tut 003a.Tut.SA 004a.Tut 004a.Tut.SA
3.7 20 001a.Tut 001a.Tut.SA 002a.Tut 002a.Tut.SA 002b.Tut 002b.Tut.SA 003a.Tut 003a.Tut.SA 003b.Tut 003b.Tut.SA 004a.Tut 004a.Tut.SA 004b.Tut 004b.Tut.SA 005a.Tut 005a.Tut.SA 006a.Tut 006a.Tut.SA 007a.Tut 007a.Tut.SA
3.8 6 001a.Tut 001a.Tut.SA 001b.Tut 001b.Tut.SA 002a.Tut 002a.Tut.SA
3.9 4 001a.Tut 001a.Tut.SA 001b.Tut 001b.Tut.SA
Chapter 4: Integration
4.1 14 001a.Tut 001a.Tut.SA 002a.Tut 002a.Tut.SA 003a.Tut 003a.Tut.SA 004a.Tut 004a.Tut.SA 005a.Tut 005a.Tut.SA 005b.Tut 005b.Tut.SA 006a.Tut 006a.Tut.SA
4.2 4 001a.Tut 001a.Tut.SA 002a.Tut 002a.Tut.SA
4.3 6 001a.Tut 001a.Tut.SA 001b.Tut 001b.Tut.SA 002a.Tut 002a.Tut.SA
4.4 16 001a.Tut 001a.Tut.SA 002a.Tut 002a.Tut.SA 003a.Tut 003a.Tut.SA 003b.Tut 003b.Tut.SA 003c.Tut 003c.Tut.SA 004a.Tut 004a.Tut.SA 005a.Tut 005a.Tut.SA 006a.Tut 006a.Tut.SA
4.5 16 001a.Tut 001a.Tut.SA 001b.Tut 001b.Tut.SA 002a.Tut 002a.Tut.SA 002b.Tut 002b.Tut.SA 002c.Tut 002c.Tut.SA 002d.Tut 002d.Tut.SA 002e.Tut 002e.Tut.SA 003a.Tut 003a.Tut.SA
Chapter 5: Inverse Functions
5.1 24 001a.Tut 001a.Tut.SA 002a.Tut 002a.Tut.SA 003a.Tut 003a.Tut.SA 004a.Tut 004a.Tut.SA 005a.Tut 005a.Tut.SA 006a.Tut 006a.Tut.SA 007a.Tut 007a.Tut.SA 008a.Tut 008a.Tut.SA 009a.Tut 009a.Tut.SA 010a.Tut 010a.Tut.SA 011a.Tut 011a.Tut.SA 011b.Tut 011b.Tut.SA
5.2 32 001a.Tut 001a.Tut.SA 002a.Tut 002a.Tut.SA 003a.Tut 003a.Tut.SA 003b.Tut 003b.Tut.SA 003c.Tut 003c.Tut.SA 003d.Tut 003d.Tut.SA 004a.Tut 004a.Tut.SA 005a.Tut 005a.Tut.SA 006a.Tut 006a.Tut.SA 007a.Tut 007a.Tut.SA 008a.Tut 008a.Tut.SA 009a.Tut 009a.Tut.SA 010a.Tut 010a.Tut.SA 011a.Tut 011a.Tut.SA 012a.Tut 012a.Tut.SA 013a.Tut 013a.Tut.SA
5.3 12 001a.Tut 001a.Tut.SA 002a.Tut 002a.Tut.SA 002b.Tut 002b.Tut.SA 002c.Tut 002c.Tut.SA 003a.Tut 003a.Tut.SA 004a.Tut 004a.Tut.SA
5.4 8 001a.Tut 001a.Tut.SA 001b.Tut 001b.Tut.SA 001c.Tut 001c.Tut.SA 002a.Tut 002a.Tut.SA
5.5 4 001a.Tut 001a.Tut.SA 002a.Tut 002a.Tut.SA
Chapter 6: Integration Techniques
6.1 12 001a.Tut 001a.Tut.SA 002a.Tut 002a.Tut.SA 002b.Tut 002b.Tut.SA 002c.Tut 002c.Tut.SA 003a.Tut 003a.Tut.SA 003b.Tut 003b.Tut.SA
6.2 12 001a.Tut 001a.Tut.SA 001b.Tut 001b.Tut.SA 001c.Tut 001c.Tut.SA 001d.Tut 001d.Tut.SA 002a.Tut 002a.Tut.SA 002b.Tut 002b.Tut.SA
6.3 10 001a.Tut 001a.Tut.SA 001b.Tut 001b.Tut.SA 002a.Tut 002a.Tut.SA 002b.Tut 002b.Tut.SA 003a.Tut 003a.Tut.SA
6.4 16 001a.Tut 001a.Tut.SA 002a.Tut 002a.Tut.SA 002b.Tut 002b.Tut.SA 003a.Tut 003a.Tut.SA 003b.Tut 003b.Tut.SA 004a.Tut 004a.Tut.SA 004b.Tut 004b.Tut.SA 004c.Tut 004c.Tut.SA
6.5 14 001a.Tut 001a.Tut.SA 001b.Tut 001b.Tut.SA 001c.Tut 001c.Tut.SA 002a.Tut 002a.Tut.SA 002b.Tut 002b.Tut.SA 003a.Tut 003a.Tut.SA 003b.Tut 003b.Tut.SA
6.6 6 001a.Tut 001a.Tut.SA 001b.Tut 001b.Tut.SA 001c.Tut 001c.Tut.SA
6.7 10 001a.Tut 001a.Tut.SA 001b.Tut 001b.Tut.SA 002a.Tut 002a.Tut.SA 003a.Tut 003a.Tut.SA 004a.Tut 004a.Tut.SA
6.8 10 001a.Tut 001a.Tut.SA 002a.Tut 002a.Tut.SA 003a.Tut 003a.Tut.SA 003b.Tut 003b.Tut.SA 004a.Tut 004a.Tut.SA
Chapter 7: Applications of Integration
7.1 10 001a.Tut 001a.Tut.SA 001b.Tut 001b.Tut.SA 001c.Tut 001c.Tut.SA 002a.Tut 002a.Tut.SA 003a.Tut 003a.Tut.SA
7.2 2 001a.Tut 001a.Tut.SA
7.3 12 001a.Tut 001a.Tut.SA 001b.Tut 001b.Tut.SA 002a.Tut 002a.Tut.SA 003a.Tut 003a.Tut.SA 004a.Tut 004a.Tut.SA 004b.Tut 004b.Tut.SA
7.4 12 001a.Tut 001a.Tut.SA 001b.Tut 001b.Tut.SA 002a.Tut 002a.Tut.SA 003a.Tut 003a.Tut.SA 003b.Tut 003b.Tut.SA 004a.Tut 004a.Tut.SA
7.5 16 001a.Tut 001a.Tut.SA 001b.Tut 001b.Tut.SA 002a.Tut 002a.Tut.SA 003a.Tut 003a.Tut.SA 003b.Tut 003b.Tut.SA 003c.Tut 003c.Tut.SA 004a.Tut 004a.Tut.SA 004b.Tut 004b.Tut.SA
7.6 6 001a.Tut 001a.Tut.SA 002a.Tut 002a.Tut.SA 002b.Tut 002b.Tut.SA
7.7 20 001a.Tut 001a.Tut.SA 002a.Tut 002a.Tut.SA 002b.Tut 002b.Tut.SA 003a.Tut 003a.Tut.SA 003b.Tut 003b.Tut.SA 003c.Tut 003c.Tut.SA 004a.Tut 004a.Tut.SA 004b.Tut 004b.Tut.SA 004c.Tut 004c.Tut.SA 004d.Tut 004d.Tut.SA
7.8 12 001a.Tut 001a.Tut.SA 002a.Tut 002a.Tut.SA 002b.Tut 002b.Tut.SA 002c.Tut 002c.Tut.SA 002d.Tut 002d.Tut.SA 002e.Tut 002e.Tut.SA
7.9 8 001a.Tut 001a.Tut.SA 001b.Tut 001b.Tut.SA 002a.Tut 002a.Tut.SA 003a.Tut 003a.Tut.SA
7.10 6 001a.Tut 001a.Tut.SA 001b.Tut 001b.Tut.SA 001c.Tut 001c.Tut.SA
Chapter 8: Differential Equations
8.1 6 001a.Tut 001a.Tut.SA 001b.Tut 001b.Tut.SA 002a.Tut 002a.Tut.SA
8.2 6 001a.Tut 001a.Tut.SA 002a.Tut 002a.Tut.SA 002b.Tut 002b.Tut.SA
8.3 14 001a.Tut 001a.Tut.SA 001b.Tut 001b.Tut.SA 001c.Tut 001c.Tut.SA 001d.Tut 001d.Tut.SA 002a.Tut 002a.Tut.SA 003a.Tut 003a.Tut.SA 003b.Tut 003b.Tut.SA
8.4 8 001a.Tut 001a.Tut.SA 001b.Tut 001b.Tut.SA 002a.Tut 002a.Tut.SA 002b.Tut 002b.Tut.SA
8.5 6 001a.Tut 001a.Tut.SA 001b.Tut 001b.Tut.SA 001c.Tut 001c.Tut.SA
8.6 10 001a.Tut 001a.Tut.SA 001b.Tut 001b.Tut.SA 002a.Tut 002a.Tut.SA 002b.Tut 002b.Tut.SA 002c.Tut 002c.Tut.SA
Chapter 9: Sequences and Series
9.1 14 001a.Tut 001a.Tut.SA 001b.Tut 001b.Tut.SA 001c.Tut 001c.Tut.SA 001d.Tut 001d.Tut.SA 001e.Tut 001e.Tut.SA 002a.Tut 002a.Tut.SA 003a.Tut 003a.Tut.SA
9.2 10 001a.Tut 001a.Tut.SA 002a.Tut 002a.Tut.SA 002b.Tut 002b.Tut.SA 002c.Tut 002c.Tut.SA 003a.Tut 003a.Tut.SA
9.3 8 001a.Tut 001a.Tut.SA 001b.Tut 001b.Tut.SA 001c.Tut 001c.Tut.SA 002a.Tut 002a.Tut.SA
9.4 8 001a.Tut 001a.Tut.SA 002a.Tut 002a.Tut.SA 002b.Tut 002b.Tut.SA 002c.Tut 002c.Tut.SA
9.5 14 001a.Tut 001a.Tut.SA 001b.Tut 001b.Tut.SA 002a.Tut 002a.Tut.SA 003a.Tut 003a.Tut.SA 003b.Tut 003b.Tut.SA 003c.Tut 003c.Tut.SA 003d.Tut 003d.Tut.SA
9.6 16 001a.Tut 001a.Tut.SA 001b.Tut 001b.Tut.SA 001c.Tut 001c.Tut.SA 002a.Tut 002a.Tut.SA 002b.Tut 002b.Tut.SA 003a.Tut 003a.Tut.SA 003b.Tut 003b.Tut.SA 003c.Tut 003c.Tut.SA
9.7 8 001a.Tut 001a.Tut.SA 001b.Tut 001b.Tut.SA 001c.Tut 001c.Tut.SA 001d.Tut 001d.Tut.SA
9.8 4 001a.Tut 001a.Tut.SA 002a.Tut 002a.Tut.SA
9.9 28 001a.Tut 001a.Tut.SA 001b.Tut 001b.Tut.SA 001c.Tut 001c.Tut.SA 001d.Tut 001d.Tut.SA 002a.Tut 002a.Tut.SA 002b.Tut 002b.Tut.SA 002c.Tut 002c.Tut.SA 002d.Tut 002d.Tut.SA 002e.Tut 002e.Tut.SA 003a.Tut 003a.Tut.SA 004a.Tut 004a.Tut.SA 004b.Tut 004b.Tut.SA 004c.Tut 004c.Tut.SA 004d.Tut 004d.Tut.SA
Chapter 10: Parametric Equations and Polar Coordinates
10.1 10 001a.Tut 001a.Tut.SA 002a.Tut 002a.Tut.SA 002b.Tut 002b.Tut.SA 002c.Tut 002c.Tut.SA 002d.Tut 002d.Tut.SA
10.2 16 001a.Tut 001a.Tut.SA 001b.Tut 001b.Tut.SA 001c.Tut 001c.Tut.SA 001d.Tut 001d.Tut.SA 002a.Tut 002a.Tut.SA 002b.Tut 002b.Tut.SA 003a.Tut 003a.Tut.SA 003b.Tut 003b.Tut.SA
10.3 10 001a.Tut 001a.Tut.SA 001b.Tut 001b.Tut.SA 001c.Tut 001c.Tut.SA 001d.Tut 001d.Tut.SA 002a.Tut 002a.Tut.SA
10.4 10 001a.Tut 001a.Tut.SA 001b.Tut 001b.Tut.SA 001c.Tut 001c.Tut.SA 001d.Tut 001d.Tut.SA 002a.Tut 002a.Tut.SA
Chapter 11: Conic Sections
11.1 8 001a.Tut 001a.Tut.SA 002a.Tut 002a.Tut.SA 002b.Tut 002b.Tut.SA 003a.Tut 003a.Tut.SA
11.3 10 001a.Tut 001a.Tut.SA 001b.Tut 001b.Tut.SA 002a.Tut 002a.Tut.SA 002b.Tut 002b.Tut.SA 002c.Tut 002c.Tut.SA
Chapter 12: Vectors
12.1 4 001a.Tut 001a.Tut.SA 002a.Tut 002a.Tut.SA
12.2 6 001a.Tut 001a.Tut.SA 002a.Tut 002a.Tut.SA 003a.Tut 003a.Tut.SA
12.3 4 001a.Tut 001a.Tut.SA 001b.Tut 001b.Tut.SA
12.4 4 001a.Tut 001a.Tut.SA 002a.Tut 002a.Tut.SA
12.5 6 001a.Tut 001a.Tut.SA 002a.Tut 002a.Tut.SA 003a.Tut 003a.Tut.SA
12.6 2 001a.Tut 001a.Tut.SA
Chapter 13: Vector-Valued Functions
13.1 4 001a.Tut 001a.Tut.SA 002a.Tut 002a.Tut.SA
13.2 4 001a.Tut 001a.Tut.SA 002a.Tut 002a.Tut.SA
13.3 6 001a.Tut 001a.Tut.SA 002a.Tut 002a.Tut.SA 003a.Tut 003a.Tut.SA
13.4 8 001a.Tut 001a.Tut.SA 002a.Tut 002a.Tut.SA 003a.Tut 003a.Tut.SA 004a.Tut 004a.Tut.SA
Chapter 14: Partial Derivatives
14.1 4 001a.Tut 001a.Tut.SA 002a.Tut 002a.Tut.SA
14.2 2 001a.Tut 001a.Tut.SA
14.3 4 001a.Tut 001a.Tut.SA 002a.Tut 002a.Tut.SA
14.4 4 001a.Tut 001a.Tut.SA 002a.Tut 002a.Tut.SA
14.5 4 001a.Tut 001a.Tut.SA 002a.Tut 002a.Tut.SA
14.6 4 001a.Tut 001a.Tut.SA 002a.Tut 002a.Tut.SA
14.7 4 001a.Tut 001a.Tut.SA 002a.Tut 002a.Tut.SA
14.8 4 001a.Tut 001a.Tut.SA 001b.Tut 001b.Tut.SA
Chapter 15: Multiple Integration
15.2 2 001a.Tut 001a.Tut.SA
15.3 4 001a.Tut 001a.Tut.SA 001b.Tut 001b.Tut.SA
15.4 4 001a.Tut 001a.Tut.SA 002a.Tut 002a.Tut.SA
15.6 4 001a.Tut 001a.Tut.SA 002a.Tut 002a.Tut.SA
15.8 2 001a.Tut 001a.Tut.SA
Chapter 16: Vector Calculus
16.1 4 001a.Tut 001a.Tut.SA 002a.Tut 002a.Tut.SA
16.2 4 001a.Tut 001a.Tut.SA 002a.Tut 002a.Tut.SA
16.3 2 001a.Tut 001a.Tut.SA
16.4 4 001a.Tut 001a.Tut.SA 002a.Tut 002a.Tut.SA
16.5 2 001a.Tut 001a.Tut.SA
16.6 6 001a.Tut 001a.Tut.SA 002a.Tut 002a.Tut.SA 003a.Tut 003a.Tut.SA
16.8 4 001a.Tut 001a.Tut.SA 002a.Tut 002a.Tut.SA
16.9 4 001a.Tut 001a.Tut.SA 002a.Tut 002a.Tut.SA
Chapter 17: Second-Order Differential Equations
17 0
Total 900