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| 01/24
01/29 01/31 |
Introduction | 10.1,2:Vectors
10.3: The Dot Product 10.4: The Cross Product |
| 02/05,
02/07 |
10.5: Lines and Planes
10.6: Vector Method 11.1: Vector Functions and Space Curves 11.2: Derivatives and Integrals of Vector Functions |
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| 02/12,
02/14 |
11.3: Ballistic and Planetrary Motion
11.4: Tangent and Normal Vectors.... 11.5: Acceleration |
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| 02/19,
02/21 |
12.1: Functions of Several Variables
12.2: Limits and Continuity Review |
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| 02/26,
02/28 |
02/26;
Mid term I
in class, Ch 10.1-11.5 |
12.3: Partial Derivatives
12.4: Tangent Planes, Approximations.... |
| 03/05
03/07 |
12.5: The Chain Rule
12.6: Directional Derivatives and the Gradient |
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| 03/12,
03/14 |
12.7: Exterma of functionf of two variables
12.8: Lagrange Multipliers |
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| 03/19,
03/21 |
13.1: Double Integrals over Rectangular region
13.2:Double Integrals over Non-Rectangular region 13.3: Double integrals in Polar Coordinates 13.4: Surface Area |
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| 04/02,
04/04 |
13.5.Trifle Integrals
13.8: Jacobians and change of variables Review |
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| 04/09,
04/11 |
04/09: Mid Term II
in class, Ch.12.1-13.4 |
14.1: Vector Fields:Curl and Divergence
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| 04/16,
04/18 |
04/18 no class | 14.2: Line Integrals
14.3: Independence of Path |
| 04/23,
04/25 |
14.4: Green's Theorem
14.5: Surface Integrals 14.6: Stokes Theorem |
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| 04/30,
05/02 |
14.7: The Divergence Theorem
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