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| 01/24
01/29 01/31 |
Introduction | 9.1,2:Vectors
9.3: The Dot Product 9.4: The Cross Product 9.6: Planes in 3-Space |
| 02/04,
02/06 |
9.7: Quadric Surfaces
10.1: Vector Functions and Space Curves |
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| 02/11,
02/13 |
10.2: Derivatives and Integrals of Vector Functions
10.3: Ballistic and Planetary Motion 11.1: Functions of Several Varables |
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| 02/18,
02/20 |
11.2: Limits and Continuity
11.3: Partial Derivatives |
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| 02/25,
02/27 |
11.4: Tangent Planes, Approximations....
11.5: The Chain Rule |
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| 03/04,
03/06 |
March 7: Midterm I
In Recitation |
11.6: Directional Derivatives and the Gradient
Review |
| 03/11,
03/13 |
11.7: Extrema of functions of two variables
11.8: Lagrange Multipliers |
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| 03/18,
03/20 |
Spring Break | |
| 03/25,
03/27 |
12.1: Double Integrals over Rectangular region
12.2: Double Integrals over Non-Rectangular region 12.3: Double integrals in Polar Coordinates |
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| 04/01,
04/03 |
12.4: Surface Area
12.5: Triple Integrals 12.7: Cylindrical and Spherical Coordinates |
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| 04/08,
04/10 |
April 11: Midterm II
In Recitation |
12.8:Jacobians and Change of Variables
Review |
| 04/15,
04/17 |
April 17 no class | 13.1: Vector Fields:Curl and Divergence |
| 04/22,
04/24 |
13.2: Line Integrals
13.3: Independence of Path |
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| 04/29,
05/01 |
13.4: Green's Theorem
13.5: Surface Integrals 13.6: Stokes Theorem |
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| 05/06,
05/08 |
13.7: The Divergence Theorem
Review |