Math 2280 - 1 Schedule and Homework Problems Aug. 26, 2003 Treibergs Turn in the starred problems only. Your solutions must be self-contained and complete to receive full credit. Homework from each week (M,T,W,F) is due the following Wednesday. Homework which is more than one week late but not more than two weeks late receives half credit. Homework which is more than two weeks late will receive zero credit. ------------------------------------------------------------------------------- The problems listed here correspond to the SECOND EDITION of the text, ~~~~~~~~~~~~~~ by Edwards & Pinney, "Differential Equations and Boundary Value Problems, Computing & Modelling, 2nd ed. For the corresponding problems for the third edition, pls scroll down the page. ------------------------------------------------------------------------------- Second Edition Day, Sec. TOPIC Page[ Numbers ]     W, Aug. 20 1.1 Models 9[7,12,16*,29*,35,39] F 21 1.2 Integrating DE 17[5,10*,17,26*,34] M 25 1.3 Slope Fields 25[16*,26,32] T 26 1.4 Separable Eqns. 40[3,11,19,32*,52*], W 27 LAB F 29 1.5 Linear 1st order 53[9,15,33*,39] M, Sept. 1 LABOR DAY HOLIDAY T 2 1.6 Exact 69[5*,18,34*,51] W 3 2.1 Population Models 84[3,9*,25] F 5 2.2 Stability 93[9*,13,14] M 8 2.3 Acceleratiion 103[2,11*,21*,24] T 9 2.4-5 Euler Polygons 114[6*],124[7*] W 10 LAB F 12 2.6 Runge-Kutta 135[4*] M 15 3.1-2 2nd order linear 152[5,9*,12*,25,38*,46], 165[4,10*,15,23,27*] T 16 Review W 17 FIRST MIDTERM EXAM F 19 3.3 Homog., const. coef. 178[9*,10,15,24*,28,35*,40,46] M 22 3.3 Complex roots T 23 3.4 Vibrations 188[3*,10,13,18*,35-38] W 24 LAB F 26 3.5 Undetermined coef.'s 204[1,3*,5,7,9,18*, 34*,37,41,45,53*,60*] M 29 3.6 Resonance 216[4,10*,17,23,28*] T 30 3.7 Circuits 227[2*,3*,8,14,19*] W, Oct. 1 4.1-2 Systems 251[2,17*,24*,26*,27], 264[8,15*,34] F 3 FALL BREAK M 6 4.3 Systems numerically 278[6*,10,17] T 7 5.1 Eigenvectors 303[32*,38*], W 8 5.2 Eigenvalue method 318[9*,19*,30*,32,36,39*] F 10 5.3 Mechanical systems 330[3,9*,14*,16,19] M 13 5.4 Multiple EV's 349[5*,12,22*,25,35] T 14 Review W 15 LAB F 17 SECOND MIDSEMESTER EXAM M 20 5.5 Matrix exponential 363[3,7*,15,23,27*] T 21 Solving Systems W 22 5.6 Nonhomogeneous sys 373[5*,16,22*,31] F 24 6.1 Phase plane 384[11*,20,24*] M 27 6.2 Stability 398[8*,15,27,33*,37] T 28 6.3 Predator / Prey 412[2*,3*,5,8-10,13,17,21*]] W 29 Competition F 31 6.4 Nonlinear mech. sys. 427[4*,12] M, Nov. 3 6.5 Chaos T 4 7.1 Laplace Transform 454[2*,4,15,25,29*, 33,35,36,39*,41] W 5 LAB F 7 7.2 Laplace properties 466[3*,14*,19,24,29*,33*,35] M 10 7.3 Partial Fractions 476[3,7,10*,13,19*,30*,39*] T 11 7.4 Convolutions 487[3,11*,14,17,20*, 23,26,31*,36*] W 12 Review F 14 THIRD MIDSEMESTER EXAM M 17 7.5 Tansforming Periodic 498[5,14,25*,33] T 18 7.6 Delta functions 510[3*,10*,15,17,21] W 19 LAB F 21 9.1-2 Fourier Series 599[15*,23,27], 607[13*,17,24a*] M 24 9.3 Sine series 619[4,9,11*,20,22*] T 25 9.4 Applying F. S. 628[3*,8,15,18] W 26 9.5 Sep. Var. 640[3,10*,14,15*,17,18*,19] F 28 THANKSGIVNG HOLIDAY M, Dec. 1 9.6 Wave Equation 655[3,6,11,13,14,15,16,17,19] T 2 9.7 Laplace's Equation 668[5,9,11] W 3 Review W 10 FINAL EXAM 8:00 ­ 10:00 AM ------------------------------------------------------------------------------- The problems listed here correspond to the THIRD EDITION of the text, ~~~~~~~~~~~~~ by Edwards & Pinney, "Differential Equations and Boundary value Problems, Computing & Modelling, 3nd ed. For the corresponding problems for the second edition, pls scroll to the top of the page. ------------------------------------------------------------------------------- Third Edition Day, Sec. TOPIC Page[ Numbers ]     W, Aug. 20 1.1 Models 8[7,12,16*,29*,35,39] F 21 1.2 Integrating DE 16[5,10*,17,30*,37] M 25 1.3 Slope Fields 25[(A = see below)*,16,29] T 26 1.4 Separable Eqns. 40[3,11,19,36*, 55(refers to 54),58*], W 27 LAB F 29 1.5 Linear 1st order 54[9,15,33*,39] M, Sept. 1 LABOR DAY HOLIDAY T 2 1.6 Exact 71[5*,18,34*,63] W 3 2.1 Population Models 86[7,13*,30] F 5 2.2 Stability 96[9*,21,23] M 8 2.3 Acceleratiion 106[2,11*,21*,24] T 9 2.4-5 Euler Polygons 119[6*],129[7*] W 10 LAB F 12 2.6 Runge-Kutta 139[4*] M 15 3.1-2 2nd order linear 155[5,9*,12*,25,38*,46], 167[4,10*,15,23,27*] T 16 Review W 17 FIRST MIDTERM EXAM F 19 3.3 Homog., const. coef. 180[9*,10,15,24*,28,35*,40,46] M 22 3.3 Complex roots T 23 3.4 Vibrations 192[3*,10,13,18*,35-38] W 24 LAB F 26 3.5 Undetermined coef.'s 207[1,3*,5,7,9,18*, 34*,37,41,45,53*,60*] M 29 3.6 Resonance 218[4,10*,17,23,28*] T 30 3.7 Circuits 228[2*,3*,8,14,19*] W, Oct. 1 4.1-2 Systems 251[2,17*,24*,26*,27], 262[8,15*,34] F 3 FALL BREAK M 6 4.3 Systems numerically 274[6*,10,17] T 7 5.1 Eigenvectors 297[32*,38*], W 8 5.2 Eigenvalue method 312[9*,19*,30*,32,36,39*] F 10 5.3 Mechanical systems 324[3,9*,14*,16,19] M 13 5.4 Multiple EV's 341[(B=see below) 5*,12,22*,25,35] T 14 Review W 15 LAB F 17 SECOND MIDSEMESTER EXAM M 20 5.5 Matrix exponential 356[3,7*,15,23,27*] T 21 Solving Systems W 22 5.6 Nonhomogeneous sys 364[5*,16,22*,31] F 24 6.1 Phase plane 375[11*,20,24*] M 27 6.2 Stability 389[8*,15,27,33*,37] T 28 6.3 Predator / Prey 402[(C = see below)*,3*,5,8-10,13,17,21*] W 29 Competition F 31 6.4 Nonlinear mech. sys. 418[4*,12] M, Nov. 3 6.5 Chaos T 4 7.1 Laplace Transform 444[2*,4,15,25,29*, 33,35,36,39*,41] W 5 LAB F 7 7.2 Laplace properties 455[3*,14*,19,24,29*,33*,35] M 10 7.3 Partial Fractions 465[3,7,10*,13,19*,30*,39*] T 11 7.4 Convolutions 474[3,11*,14,17,20*, 23,26,31*,36*] W 12 Review F 14 THIRD MIDSEMESTER EXAM M 17 7.5 Tansforming Periodic 484[5,14,25*,33] T 18 7.6 Delta functions 495[3*,10*,15,17,21] W 19 LAB F 21 9.1-2 Fourier Series 580[15*,23,27], 586[13*,17,24a*] M 24 9.3 Sine series 598[4,9,11*,20,22*] T 25 9.4 Applying F. S. 606[3*,8,15,18] W 26 9.5 Sep. Var. 618[3,10*,14,15*,17,18*,19] F 28 THANKSGIVNG HOLIDAY M, Dec. 1 9.6 Wave Equation 630[3,6,11,13,14,15,16,17,19] T 2 9.7 Laplace's Equation 642[5,9,11] W 3 Review W 10 FINAL EXAM 8:00 ­ 10:00 AM = = = = = = = = = = = = = = = = = = = = = = = = = = = = = = = = = = = = = = = = A. Identify the isoclines of the given differential equation. Draw a sketch showing several of the isoclines, each marked with short line segments having the appropriate slope. dy / dx = x^2 - y^2 B. The instructions should be "Find the general solution." C. Separate variables in the system dx / dt = ax - pxy, dy / dt = -by + qxy to derive the general solution a ln y + b ln x - qx - py = C If an implicit function plotter is available, choose fixedpositive values of a, b, p, and q, then plot contour curves through selected initial points near the critical point (b / p, a / p ). (Sketching by hand is OK!) -------------------------------------------------------------------------------