Class Schedule
This class schedule is approximate. That is, it is the plan for future classes, and a brief summary of past classes. You should attend class and do the homework for a better understanding of what is covered.
Week | Tuesday | Thursday | |||
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1 |
February 3 §9.1: Coordinates & Distances §9.2: Vectors |
February 5 §9.3: The Dot Product §9.4: The Cross Product & Planes |
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2 |
February 10 §9.5: Lines & Planes, Distance formulas §9.6: Functions & Graphs |
February 12 §9.6: Functions & Graphs §9.6: Level Curves, Quadrics |
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3 |
February 17 §10.1: Curves in Space §10.2: Velocity & Acceleration |
February 19 §10.3: Arc Length §10.4: Curvature |
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4 |
February 24 §9.7: Spherical & Cylindrical Coordinates §10.5: Parametric Surfaces |
February 26 §10.5: More Parametric Surfaces §11.1: Functions §11.2: Continuity |
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5 |
March 3 §11.3 Partial Derivatives PDE's and Solutions |
March 5 §11.4: Linear Approximation Review for First Exam Exam Tonight! |
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6 |
March 10 §11.5: The Gradient, the Chain Rule, & Implicit Differentiation |
March 12 §11.6 The Gradient & Tangent Spaces §11.6 The Directional Derivative |
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7 |
March 17 §11.7: Maxima & Minima §11.8: Lagrange Multipliers |
March 18 §11.8: More Lagrange Multipliers & Global Extremal Problems |
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SB |
March 25 Spring Break No Class |
March 27 Spring Break No Class |
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8 |
March 31 §§12.1–3: Double Integrals |
April 2 §12.3: More Double Integrals §12.4: Double Integrals in Polar Coordinates |
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9 |
April 7 §12.5: Applications of Double Integrals Review for Exam Two Exam Tonight! |
April 9 §12.6: Surface Area §12.7: Triple Integrals |
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10 |
April 14 §12.8: Triple Integrals in Cylindrical & Spherical Coordinates §13.1: Vector Fields |
April 16 §13.2: Line Integrals §13.3: The Fundamental Theorem for Line Integrals |
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11 |
April 21 §13.4: Green's Theorem §13.5: Curl and Divergence |
April 23 §13.5: More Curl and Divergence §13.6: Flux Integrals |
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12 |
April 28 §13.7: Stokes' Theorem § 13.8: The Divergence Theorem |
April 30 § 13.8: (More on) The Divergence Theorem § 13.9: Summary of Integral Theorems Review for the Final Exam |