Sep 1
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Math 223 August 25 – December 15, 2014 Monday Aug 25 13.1-Displacement Vectors First day of classes Tuesday Aug 26 13.2 -Vectors in General Wednesday Aug 27 13.3-The Dot Product Thursday Aug 28 13.4-The Cross Product Friday Aug 29 Sep 1 Sep 2 13.4 - Continued Preliminary Exam Sep 3 12.1-Functions Of Two Variables Sep 4 12.2-Graphs and Surfaces Sep 5 Sep 8 12.3-Contour Diagrams Last day to drop Using UAccess Sep 9 12.4-Linear Functions Sep 10 12.5- Functions of Three Variables Sep 11 14.1-The Partial Derivative Sep 12 Sep 15 14.2-Computing Partial Derivatives Analytically Sep 16 14.3-Local Linearity & Differentials Sep 17 Review Sep 18 Exam 1 Sunday, Sep 21 Last day to GRO Sep 22 14.4-Gradients & Directional Derivatives in the Plane Sep 23 14.4-continued 14.5- Gradients & Directional Derivatives in Space Sep 24 14.5-Continued Sep 25 14.6-The Chain Rule Sep 26 Sep 29 14.7-SecondOrder Partial Derivative Sep 30 14.7-Continued 15.1-Critical Points: Local Extrema & Saddle Points Oct 7 16.2-continued 16.3 – Triple Integrals Oct 1 15.1-Critical Points: Local Extrema & Saddle Points Oct 2 16.1-The Definite Integral of a Function of Two Variables Oct 3 Oct 14 16.5-Integrals in Cylindrical & Spherical Coordinate Oct 15 Review Oct 16 Exam 2 Oct 17 Oct 21 17.1-continued Oct 22 17.2-Motion, Velocity, & Acceleration Oct 23 17.3-Vector Fields Oct 24 Labor Day No School Oct 6 16.2-Iterated Integrals Oct 13 16.4-continued 16.5-Integrals in Cylindrical & Spherical Coordinates Oct 20 17.1-Parametric Curves Oct 8 16.3 – Triple Integrals Oct 9 16.4-Double Integrals in Polar Coordinates Oct 10 Math 223 Monday Oct 27 18.1-The Idea of a Line Integral Tuesday Oct 28 18.2-Computing Integrals over Parameterized Curves Wednesday Oct 29 18.2-continued Thursday Oct 30 18.3-Gradient Fields & Path Independent Fields Friday Sunday, November 2 – Last day to withdraw through UAccess Nov 3 18.3-continued Nov 4 18.4 Path Independent Vector Fields & Green’s Theorem Nov 5 18.4-continued Nov 6 Review Nov 7 Nov 10 Exam 3 Nov 11 Veterans Day No classes Nov 12 19.1-The Idea of Flux Integrals Nov 14 Nov 17 19.2-continued Nov 18 19.3-The Divergence of a Vector Field Nov 19 19.3-continued Nov 13 19.1-continued 19.2- Flux Integrals for Graphs, Cylinders, & Spheres Nov 20 19.4 The Divergence Theorem Nov 24 19.4-continued Nov 25 20.1- The Curl of a Vector Field Nov 26 20.1-continued Nov 27 Thanksgiving Recess Nov 28 Dec 1 20.2- Stokes’ Theorem Dec 2 20.2-continued Dec 3 Review Dec 4 Exam 4 Dec 5 Dec 8 Review Dec 9 Review Dec 10 Review Last day of classes Dec 11 Dec 12 Dec 15 Final Exam 1:00-3:00 pm Nov 21
