SES # | TOPICS | KEY DATES |
---|---|---|
Derivatives | ||
0 | Recitation: graphing | |
1 | Derivatives, slope, velocity, rate of change | |
2 |
Limits, continuity Trigonometric limits |
|
3 | Derivatives of products, quotients, sine, cosine | |
4 |
Chain rule Higher derivatives |
|
5 | Implicit differentiation, inverses | Problem set 1 due |
6 |
Exponential and log Logarithmic differentiation; hyperbolic functions |
|
7 | Exam 1 review | |
8 | Exam 1 covering Ses #1-7 | |
Applications of Differentiation | ||
9 | Linear and quadratic approximations | |
10 | Curve sketching | |
11 | Max-min problems | Problem set 2 due |
12 | Related rates | |
13 | Newton’s method and other applications | |
14 |
Mean value theorem Inequalities |
Problem set 3 due |
15 | Differentials, antiderivatives | |
16 | Differential equations, separation of variables | |
17 | Exam 2 covering Ses #8-16 | |
Integration | ||
18 | Definite integrals | |
19 | First fundamental theorem of calculus | Problem set 4 due |
20 | Second fundamental theorem | |
21 | Applications to logarithms and geometry | |
22 | Volumes by disks, shells | Problem set 5 due |
23 | Work, average value, probability | |
24 | Numerical integration | |
25 | Exam 3 review | |
Techniques of Integration | ||
26 | Trigonometric integrals and substitution | |
27 | Exam 3 covering Ses #18-24 | Problem set 6 due |
28 | Integration by inverse substitution; completing the square | |
29 | Partial fractions | |
30 | Integration by parts, reduction formulae | Problem set 7 due |
31 | Parametric equations, arclength, surface area | |
32 |
Polar coordinates; area in polar coordinates Exam 4 review |
|
33 | Exam 4 covering Ses #26-32 | |
34 | Indeterminate forms - L’Hôspital’s rule | |
35 | Improper integrals | |
36 | Infinite series and convergence tests | |
37 | Taylor’s series | Problem set 8 due |
38 | Final review | |
Final exam |
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