| # | Date | Topic | Homework | |
|---|---|---|---|---|
| 1 | W 1/28 | Introduction | p. 411: 5, 7, 9, 12, 17, 19 (bring to class Friday; do not hand in) | |
| 2 | F 1/30 | Worksheet on numerical integration | - | |
| 3 | M 2/2 | (5.5) Finding indefinite integrals by substitution | HW 1: p. 420 (5.5): 1, 3, 5, 7, 11, 21, 23, 27, 31, 37 (due 2/4) | |
| 4 | W 2/4 | Substitution for definite integrals | HW 2: p. 420 (5.5): 36, 38, 49 55, 60. Note: #36 uses an antidifferentiation formula I haven't mentioned yet. #60: Think "out of the box"! | |
| - | - | (6.1) Area between curves | HW2 (con't) p. 442 (6.1): 1, 5 (due 2/9) | |
| 5 | F 2/6 | Accumulation function worksheet | - | |
| 6 | M 2/9 | (6.2) Volume of solid of revolution | HW3: p. 442 (6.1): 3, 6, 14, 17; p. 452 (6.2): 3 (due 2/16) | |
| 7 | W 2/11 | Fundamental Theorem of Calculus (5.3) | - | |
| 8 | F 2/13 | Quiz 2 | - | |
| 9 | M 2/16 | Inverse trigonometric functions (p. 232) | HW 4: p. 234: 41, 42, 43; p. 421: 22, 32, 42 | |
| 10 | W 2/18 | Arc length (8.1) | HW 5: p. 552: 1, 7, 8 (Due 2/23) | |
| 11 | F 2/20 | Quiz 3; Introduction to Maple worksheet | - | |
| 12 | M 2/23 | Differential equations: checking solutions, solving by separation of variables (9.3) | HW6: P. 591 (9.1): 1, 3, 5; p. 607 (9.3): 1, 3, 5 (Due 2/27) | |
| 13 | W 2/25 | Direction fields (9.2) | HW7: p. 599 (9.2): 1, 3-6, 9 (due 3/1). Also start growing mold on bread. | |
| 14 | F 2/27 | Quiz 4 (arclength, volumes, inverse trig) | HW 8 (review problems for test; somewhat harder): p. 420 (5.5): 65; p. 431: 20, 35; p. 442 (6.1): 7, 8; C1 (below) (due 3/3) | |
| 15 | M 3/1 | Euler's method for solving DE (9.2) | HW 9 (homework using tables, CAS): p. 552 (8.1) 27; p. 541 (7R): 54bcd (Due 3/10) | |
| 16 | W 3/3 | - | HW 10 (9.2): p. 599: 22, 23 (Due 3/10) | |
| 17 | F 3/5 | Test 1 (on material through 2/20) | - | |
| 18 | M 3/8 | Logistic growth model (9.5) | HW 11 (9.5) p. 629: 1, 7, 13ab (due 3/22) | |
| 19 | W 3/10 | Intro to ODEA | Work through the ODEA tutorial. Also do Exploration 1 through Problem 2. | |
| 20 | F 3/12 | - | Problem C2 (Due 3/23) | |
| 21 | M 3/22 | - | - | |
| 22 | W 3/23 | Predator-prey using ODEA (9.7) | HW 12: p. 642: 1, 2, 5, 6, 10abc Note change in problem 10 (due 3/29) | |
| 23 | F 3/25 | Quiz 5 on sections 9.2, 9.3 | - | |
| - | - | Lorenz equations | HW 13 (handout) (due 3/31) | |
| 24 | M 3/29 | Series (11.2) | HW 14: p. 720 (11.2): 3, 4, 5, 8, 11, 13 (due 4/2) | |
| 25 | W 3/31 | Harmonic series (p. 717); Alternating series (11.5) | HW 15: p. 739: 2, 3, 4, 14, 16 (Due 4/7) | |
| 26 | F 4/2 | Tayor and MacLaurin series (11.10) | HW 16: p. 770: 3, 4, 7, 8 (Due 4/9) | |
| 27 | M 4/5 | - | - | |
| 28 | W 4/7 | Radius of convergence (p. 751) (If the power series is the sum of terms (c_n)(x^n), then the radius of convergence is R is the limit as n approaches infinity of the absolute value of c_n/c_{n+1}.) | HW 17: (11.9) p. 759: 3, 4, 5, 9 (Due 4/12) NB. Just find the radius of convergence, not the "interval of convergence". | |
| 29 | F 4/9 | Predator-prey lab | - | |
| 30 | M 4/12 | - | - | |
| 31 | W 4/14 | - | - | |
| 32 | F 4/16 | Test II (on material through 3/25) | Test II: take-home part | - |
| 33 | M 4/19 | Drug concentration (handout) | HW 18: In handout p. 287: 1, 2, 4, 5, 8 (Due 4/23) NB. Problem 2d appears not to make sense. | |
| 34 | W 4/21 | Paramteric curves (10.1) | HW 19: p. 656: 1, 2, 13, 14 (due 4/26) | |
| 35 | F 4/23 | Summary of series and power series | - | |
| 36 | M 4/26 | - | Power series review questions (not to be handed in): p. 787: 40, 47, 49 | |
| 37 | W 4/28 | Euler's formula (p. A53) | HW 20: Using Euler's formula, find formulas for cos(3x) and sin(3x) (Due 5/3) | |
| - | - | Calculus of power series (10.2) | HW 21: p. 666: 1, 3, 7, 8 (Due 5/3) | |
| 38 | F 4/30 | - | - | |
| 39 | M 5/3 | - | - | |
| - | T 5/4 | - | All homework and rewrites (except ..) due at 5pm today |