Math 2001 Calculus 1
Fall 2006
MTWThF 8-8:50 Room 232
Homework Files
Test Files
Textbook Calculus, by Thomas & Finney, pub Addison Wesley
9th: ISBN: 0201531747 Alternate: ISBN 0-321-19363-6
Calculator TI 83+ or equivalent
Website http://cs.fdltcc.edu/m2001
Instructor Ted Wetherbee
Office: W217 11-12am M-F, 879-0840
Email: ted@fdltcc.edu
Wetherbee's schedule:
| _ | Monday | Tuesday | Wednesday | Thursday | Friday |
| 8-9 | Math 2001 room 232 | Math 2001 room 232 | Math 2001 room 232 | Math 2001 room 232 | Math 2001 room 232 |
| 9-10 |
Math 0030 room 228 | _ | Math 0030 room 228 | _ | Math 0030 room 228 |
| 10-11 | Math 1010 room 228 | _ | Math 1010 room 228 | _ | Math 1010 room 228 |
| 11-12 | office | office | office | office | office |
| 12-1:15 | _ | Math 1030room 232 | _ | Math 1030room 232 | _ |
| 6-8:45 | Math 1030room 228 | _ | _ | _ | _ |
Grading
4 tests 4x100 = 400
1 final 400
60 homework 60x5 = 300
------------------------------------------
TOTAL 1100
90-100% A, 80-90% B, 70-80% C, 60-70% D, 0-60% F
Homework
There is homework from the textbook and/or handouts for you to complete after
each class. Textbook problems are answered in the back of the book., and there
are solution manuals available, but you should first attempt every problem on
your own before seeking help, and your solutions should be your own. Write
out the problem, and show your work to the solution. I will not be harsh on
homework errors so long as I can clearly see where the errors occur. Exam
problems will be similar to homework problems, so you should consider your
homework problems as your required exam preparation. Be neat! Be clear!
See me when you have questions and problems! Never miss class to complete
a homework assignment!
Tests
The five tests need to be completed for credit in this class. We will review
tests the previous class day. You will receive sample tests for preparation.
These samples are straightforward in that you can ensure success on tests by
ensuring that you know how to do every sample test problem on your own.
Never miss an in-class test in hopes of gaining an extra study day.
NOTES
1) Let me know if there is reason for special accommodation so that I can make
arrangements for you.
2) It is my observation gathered from years of teaching math courses that people
who attend every class, read their textbook, complete their homework assignments
(on time), and study carefully for tests always pass and almost always get good grades.
3) Come to class every day! This is the easy way to ensure success.
Tentative schedule for Math 2001 Fall 2006:
28aug intro P1 reals
Homework 1: P1 # 1, 3, 5-37 odds, 43*, 45*, 47*, 49*
29aug P2 plane, increments
Homework 2: P2 # 1,9,13,19,21,29,31,41,43,47,53,55
30aug P3 functions
Homework 3: P3 # 3, 5, 9, 19, 31, 33, 43, 45, 49, 51, 55a, 61*
31aug P4 graphs
Homework 4: P4 # 5, 17, 29, 41, 49, 51, 81
1sep P5 trig defs
Homework 5: P5 # 1, 3, 5, 7, 9, 11
4sep HOLIDAY
5sep P5 trig graphs
Homework 6: P5 # 13-29 odds, 61, 63, 65
6sep P5 trig equ and indentities
Homework 7: trig_fun.pdf handout
7sep 1.1 rates of change
Homework 8: 1.1 # 1, 5, 11, 17, 21-31 odds, 39
8sep 1.2 limits
Homework 9: 1.2 # 1-25 odds, 45a, 37, 40, 41
11sep 1.3 formal limit defs
Homework 10: 1.3 # 7, 9, 15, 21, 25, 39
12sep 1.4 extensions of limit concept
Homework 11: 1.4 # 11,13,15,17,21,23,25
13sep 1.5 continuity
Homework 12: 1.5 # 15, 39, 47, 63, 69
14sep 1.6 tangent lines
Homework 13: 1.6 # 5-23 odds
15sep review P
18sep Test 1
19sep 2.1 derivative
Homework 14: 2.1 # 1,3,5,17,19,27,29,31
20sep 2.2 diff rules
Homework 15: #1-31 oddds, 40*, 50*
21sep 2.3 rates of change
Homework 16: 2.3 # 9, 11, 13, 19, 29, 35
22sep 2.4 derivatives of trig functions
Homework 17: 2.4 # 1-25 odds
25sep 2.5 chain rule
Homework 18: 2.5 # 1-49 odds
26sep 2.6 implicit diff
Homework 19: 2.6 # 1-13 odds, 19-33 odds, 37, 39, 47, 49, 61
27sep 2.7 related rates
28sep review chapter 2
29sep Test 2
2oct 3.1 extreme values
3oct 3.2 mean value theorem
4oct 3.3 1st derivative test
5oct 3.4 graphing with y' and y"
6oct 3.5 assymtotes
9oct 3.6 optimization
10oct 3.6 optimization
11oct 3.7 differentials and linearization
12oct 3.8 Newton's method
13oct (3.8) lab on Newton's method
16oct review chapter 3
17oct test 3
18oct 4.1 indefinite integral
19oct 4.2 diff equations
20oct NO CLASSES
23oct 4.3 substitution
24oct 4.4 estimating withfinite sums
25oct 4.5 Riemann sums
26oct 4.5 Riemann sums
27oct 4.6 mean value theorem
30oct 4.7 fundamental theorem of calculus
31oct 4.8 substitution in definite integrals
1nov 4.9 numerical integration
2nov (4.9) num int lab
3nov 5.1 area between curves
6nov 5.1 area between curves
7nov 5.2 volumes by slicing
8nov 5.3 solids of revolution
9nov 5.4 cylindrical shells
10nov HOLIDAY
13nov 5.5 lengths of plane curves
14nov 5.6 surfaces of revolution
15nov 5.7 moments and centers of mass
16nov 5.7 moments and centers of mass
17nov 5.8 work
20nov 5.9 fluid pressures and force
21nov 5.10 modeling applications
22nov review chapters 4 & 5
23nov HOLIDAY
24nov HOLIDAY
27nov test 4
28nov 6.1 inverses and derivatives
29nov 6.2 natural logs
30nov 6.3 exp function
1dec 6.4 a^x and logax
4dec 6.5 growth and decay
5dec 6.6 L'Hopital's rule
6dec 6.7 relative rates of growth
7dec 6.8 inverse trig functions
8dec 6.9 derivatives if inv trig functions
11dec 6.10 hyoerbolic trig functions
12dec 6.11 1st order diff equ
13dec 6.12 Euler's method, shooting
14dec (6.12) numerical sol lab
15dec review final
18dec Final exam 8-10