Week 



Friday 

1  No Class MLK Day 
120 Introduction & Review 
122 More review. Differential equations and IVA IVB IVC Direction Fields IV.D 
123 IVA IVB IVC Direction Fields IV.D 
2 
126 Direction Fields Continued. IV.D 
127
Euler's Method IV.E 
129
Begin Models for (Population) Growth and
Decay: y' = k y; y(0)=1. k = 1. The exponential function.VI.A estimate e from (1+1/n)^{n}. Models for learning. y' = k / x; y(1)=0. k =1 VI.B 
130
More on the relation between the DE y'=y with
y(0)=1 and e^{x}. 
3 POW #1 Due Summary #1 due 
22 Models for learning. y' = k / x; y(1)=0. k =1 VI.B y = ln (x) and ln(2) lnx and integration of 1/x. More on ln and exp! SC VI.C Review Substitution 
23 Begin Bounded learning. Improper Integrals I 
25 More on improper integrals Bounded learning and Arctan. VI.D 
26 More DE models. Separation of variables. 
4 POW #2: Due 216 
29 More Review Substitution(ii) Growth/Decay Models. [Symbolic] . The Logistic Model  210 More logistic.  29 Integration of rational functions I. VII.F  210 Problems from web Assign Breath 
5 Summary #2 due 223 
216 Rational functions II VII.F 
217End
Rational Functions Improper Integrals II Start 
216 Improper Integrals II Continued Start Integration by Parts. VII.C 
217 Integration by parts I VII.C 
6 POW #3: Due 32 
223
Integration by parts. II VII.C Reduction Formula and integration by parts. 
224Numerical Integration. (linear), V.D  223Numerical
Integration. (quadratic), V.D Improper Integrals and comparison tests III 
224Application to estimation of integral More Comparison Tests for improper integrals. 
7 Summary #3 due 36 
32 Breath Start Taylor Theory for e^x. Taylor . IXA 
33Applications: Definite integrals and DE's.  35 Taylor theory: Finish IXA..  36 IXB MacLaurin Polynomials 
8
Exam I Self scheduled: 
39
IXB
MacLaurin Polynomials (cont'd) 
310
Review for exam #1 (?)Taylor Theory for remainder proven. 
312
IX.C More on finding MacLaurin
Polynomials & Taylor theory. 
313 More
MacLaurin. IX.D Taylor
Theory derivatives, integrals, and ln(x) Use of absolute values. How Newton used Geometric series to find ln(.9) 
9  NO Classes : Spring Break! 

10 POW #4: Due 
323 IX.D Taylor
Theory derivatives, integrals, and ln(x) Use of absolute values. 
324Taylor Theory: End First Round 
326 Begin Sequences and series. Geometric sequences. 
327 X.A
Sequence properties: Unification. Bounded Monotonic convergence Theorem 
11  330 Series Conv. I Geometric and Taylor Series. geometric series X.B1_4 Theorem on R_{n} Taylor polys and Series. 
331 NO Class CC Day 
42
Series Conv. II Harmonic Series. The divergence test. 
43 Incr&bdd above implies convergent. 
12Summary #4 due 46  46
Series Conv. III Positive series & Integral test. 
47 Positive comparison test 
49Ratio
test for Positive Series X.B5 
410 Series
Conv. IV Alternating Series Series 
13 Summary #5 due 417  413
Conv.VI Absolute conv. & conditional: The
General ratio test: Intro to power series concepts of convergence and functions. Taylor Series convergence. Series to solve DE's  Motivations f''(x) = f(x) with f(0)=0 and f'(0)=1 Begin Power Series I XI.A 
414 Power Series II (Interval of convergence)XI.A Taylor Series 
416 Power Series III (DE's) Start Trig Integrals I sin & cos 
417
exp(pi*i) = 1 Power Series IV (Functions and DE's) Trig Integrals II sec&tan 
14 Exam II self scheduled 422 
420
Trig substitution (begin area of circle) I (sin) VII.E Favorite estimates Arctan(1) = pi/4. 
4 21
Area Revisited 
423
Area II Volume I Trig substitution II (tan and sec) VII.E 
424 More trig area More area ("dy") 
15
POW #5 Due: 427 
427
volume I Work Parametric curves I 
428
Parametric curves II :Arc Length VIII.B 
430 Average Value Volume II Polar Curves I 
51
Polar curves II Parametric curves III tangents Conics I Intro to locianalytic geometry issues.(parabolae, ellipses) Conics II More on Ellipse and Parabola. Conics III The hyperbolae 
16 Summary #6 
54 Surface Area ? The conics IV Hyperbolic functions: DE's, Taylor Series, Algebra and Hyperbolas. 
55 Darts ?? Probability density, mean 
57
L'Hospital's rule? Proof Of L'Hospital's Rule? 
58 
17 Final Examination Self
scheduled Rooms TBA Review Session: Sunday 510 TBA 
Monday May 11, 12:4014:30  Wednesday May 13, 10:2012:10  Thursday May 14, 10:2012:10 Thursday, May 14, 15:0016:50. 
Friday, May 15 10:2012:10. 
Last updated: 1/19/2015
Background Assessment Quiz 
20 points 
Reality Quizzes  100 points 
Homework  100 points 
POW's 
50 points 
Summary work  30 points 
2 Midterm Examinations  200 points 
Final Examination  200 or 400 points 
Total  700 or 900 points 
Some accommodations may take up to several
weeks to arrange. http://www.humboldt.edu/disability/
Add/Drop
policy: Students are responsible for knowing the
University policy, procedures, and schedule for
dropping or adding classes.
http://pine.humboldt.edu/registrar/students/regulations/schedadjust.html
During an emergency, information can be found campus
conditions at: 826INFO or www.humboldt.edu/emergency
http://www.humboldt.edu/studentrights/attendancebehavior
You may use my office hours or faculty shared office hours for some additional work on these background areas either as individuals or in small groups. My office time is also available to discuss routine problems from homework after they have been discussed in class and reality check quizzes as well as using technology.
Calculus Dropin Tutoring from HSU Faculty in BSS 308 (Tentative 172015)
Time  Monday  Tuesday  Wednesday  Thursday  Friday 

910 AM 
Freedman 
Oliver  Flashman  Lauck  Freedman 
1011 AM 
X 
X 
X  X 
X 
1112 AM 
X  X  Lauck  X  X 
121 PM 
Johnson

Flashman 
x 
Flashman  Johnson 
12 PM  X  X  X  X  X 
23 PM  X  X  X  X  X 
34 PM 
X  X  X  Oliver  X 
45 PM 
Goetz 
Goetz 
X 
X  X 