# Tentative Schedule and Homework

 Date Reading Topics Written Homework Webwork 1/6 Mon 12.1-12.5, Matrix Operations-1, Matrix Operations-2 Matrix operations and review FERPA 1/8 Wed 14.1,14.3-14.6, Derivative as a matrix Derivative as matrices, gradients, directional derivatives, tangent planes (Exercise, Solution) Set 1 due 1/10 Fri Derivative as a matrix Derivatives as matrices, chain rule (Exercise, Solution) Set 2 due 1/13 Mon Linear Transformations Linear transformations (Exercise, Solution) Set 3 due 1/15 Wed 15.1-15.2 Double integrals over rectangles, iterated integrals (Exercise, Solution) HW 1 due Set 4 due x-hour (Tue or Thur) 10.3 Polar coordinates (Exercise, Solution) HW 1 Solution 1/17 Fri 15.3 Iterated integrals, Fubini's Theorem, integration over non-rectangular regions (Exercise, Solution) Set 5 due 1/20 Mon Martin Luther King Day (Class will meet during x-hour) Set 6 due 1/21 Tue or  1/22 Wed 15.4 Integration in polar coordinates (Exercise, Solution) HW 2 due on Wed (1/22) Set 7 due (1/22) 1/22 Wed or 1/23 Thur 15.7-15.8 Triple integration, cylindrical coordinates (Exercise, Solution) HW 2 Solution 1/24 Fri 15.5, 15.9 Applications of double integrals, Spherical coordinates (Exercise, Solution) Set 8 due 1/27 Mon 15.9 Spherical coordinates (continued)(Exercise, Solution) Set 9 due 1/29 Wed Review HW 3 due Set 10 due 1/31 Fri 15.10 Change of variables HW 3 Solution 1/31 Fri Exam I (Time : 3:00-5:00 PM, Location : Silsby 28) Practice Exam, Solution EXAM 1 Solution 2/3 Mon 15.10 Change of variables (continued) Set 11 due 2/4 Tue or 2/5 Wed 16.1 Vector field (Exercise, Solution) HW 4 due 2/5 Wed or 2/6 Thur 16.2 Line integrals of scalar functions (Exercise, Solution) HW 4 Solution Set 12 due (2/5) 2/7 Fri No class - Winter Carnival (Class will meet during x-hour) Set 13 due 2/10 Mon 16.2-16.3 Line integrals of vector fields (Exercise, Solution) Set 14 due 2/12 Wed 16.3 The Fundamental Theorem of Calculus for line integrals (Exercise, Solution) HW 5 due Set 15 due 2/14 Fri 16.4 Green's Theorem (Exercise, Solution) HW 5 Solution Set 16 due 2/17 Mon 16.4 Green's Theorem (Exercise, Solution) Set 17 due x-hour (Tue or Thur) QA 2/19 Wed Review HW 6 due Set 18 due 2/21 Fri 16.6 Parametrizing surfaces, tangent planes (Exercise, Solution) HW 6 Solution 2/21 Fri Exam II (Time : 3:00-5:00 PM, Location : Silsby 28) Practice Exam, Solution EXAM 2 Solution 2/24 Mon 16.6 Surface area (Exercise, Solution) Set 19 due x-hour (Tue or Thur) 16.5 Curl and Divergence 2/26 Wed 16.7 Surface integrals of scalar functions and vector functions HW 7 due (2/26) Set 20 due 2/28 Fri 16.7,16.9 Surface integrals of vector functions (continued), The Divergence Theorem (Exercise, Solution) HW 7 Solution Set 21 due 3/3 Mon 16.9 The Divergence Theorem (Exercise, Solution) Set 22 due 3/4 Tue or 3/5 Wed 16.8 Stokes' Theorem (Exercise, Solution) HW 8 due on Wed (3/5) 3/5 Wed or 3/6 Thur 16.8 Stokes' Theorem (continued) HW 8 Solution Set 23 due (3/5) 3/7 Fri Review HW 9 and HW 9 Solution Set 24 due 3/9 Sun QA Session - Cho (2:00-3:00PM, Kemeny 007) QA Session - Gordon (7:45-9:00PM, Kemeny 007) 3/11 Tue Final exam (Time : 3:00PM-6:00PM, Location : Moore Filene) Practice Exam, Solution Final Solution