Date Due  Reading  Problems ( *= interesting but optional)  Optional  
1/2127 
CET 1.1 SC 0.B1 Numbers [online] 
WA: Review: Algebra; Lines; Circles; Functions; Trig  SC 0.A What is Calculus?MD: Visualizing Functions(VF) 

1/2728 
SC
0.B2 Functions [online]
CGC:Chapters 1 and 0. CET: Appendix B 
WA: HW #1 M109 1.1 Function Notation and Representation  Online
Mapping Figure ActivitiesMD: Linear Functions(LF) 

1/2830 
CET: 1.2 SC 0.C [online] 
WA: HW #2 M109 Lines (repeat of review!) and models  On
Moodle: SC 0.B3 Lines Practice Reality Quiz 1. 

2/36 
2.1 CGC pp 7782 SC 1.A and 1.B 
WA: HW #3 M109 Secant&Tangent Lines, Av. Rates (2.1)  On
Moodle:SC I.A; I.B Stewart: 1.3 , 1.4 

2/67 
2.7 On Moodle: SC I.D On Moodle: SC I. E 
HW #4 109 The Derivative! (2.7)  2.7: 3(a[ignore i and ii.Use
4steps as in class],b), 4(a[ignore i and ii.Use 4steps as in class],b), 9 

2/72/11 
2.8 3.1 CGC pp 8389 
HW #5 109 The Derivative More(2.8)  2.7: Use the
4 steps method with x or t = a when appropriate in
11,13,1719; 25 2.8: 1;3;1922 Use the 4 steps method to find f '(a) 

2/1314 
3.1 On Moodle SC I F.1 Review CGC pp 7789 
HW #6 109 The Derivative for some Fns! (3.1)  
2/1719 
3.1 
HW #7 109 The Derivative Calculus Begins (3.1)  
2/1820 
3.1 CGC p2934, 9293. 
HW #8 109 The Derivative Calculus w/ e^x (3.1)  
2/2021  3.2 CGC p9496  HW #8.5 109 Products (3.2)  
2/21 
2.8 CGC 7778, 81 
HW #9 109 Calculus... 2nd and 1st Deriv. (3.1)  
2/2124 
2.5, 3.1,3.2 
HW #10 109 Products w / ln (3.2)  CGC104106 Example 1.  
2/2425  2.5
pp118120; 126127 2.8 p 157160 Example 5 Differentiability and continuity 3.2  HW #12 109 Continuity and IVT (2.5)  
2/2425  2.5
pp118120; 126127 2.8 p 157160 Example 5 Differentiability and continuity 3.2  HW #12 109 Continuity and IVT (2.5)  
2/28  4.8 pp
338340 Read
web materials on Newton's Method. Review for MONDAY: Appendix D Especially formulae 68,10,12,13  HW #13 109 Newton's Method (4.8)  
3/3  3.2  HW #14 109 Product and Quotient Rules (3.2)  
3/4  3.3 Trig
Derivatives  HW #15 109 Trigonometric Functions ( 3.3 )  
3/710  3.4 The
Chain Rule  HW #16 109 Chain Rule I ( 3.4 )  
3/11  3.9 Related Rates  HW #17 109 Related Rates, More Chain
Rule(3.9+)  
3/1325  2.5 Implicit
differentiation Read web materials on implicit differentiation.  HW #18 109 Implicit
Diff'n ( 3.5 )  
HW #19 S14 109 Implicit Differentiation&Rates 3.4 

3/1425  3.6 Logs  HW #20 109 Ln and
logarithmic diff'n (3.6 )  
3/27  3.10
(i) 250251 (ii) 253254 Read web materials on differentials SC Ch 3A1 on Moodle CGC pp 145148  HW #20.5 109 Estimation (linear & dy) (3.10 )  
3/28  4.1 OnLine tutorial on Max/mins  HW #21 109 Extremes ( 4.1 )  
4.7  HW #22 109 Extremes II (4.7)  
4.3(i)
290292 (ii)292297  HW #23 109 MVT Plus ( 4.2
&4.3 ) HW #24 109 concavity I (4.3)  
HW #25 109 Concavity II(& Words) ( 4.3 & 4.7 )  
2.2, 4.4 (Asymptotes,
infinite limits)  HW #26 109 Graphing+max/min (2.6; 4.5, 4.7)  
Below this line is not yet assigned!  
IVA(Online)
A java graph showing f (x)=P'(x) related for f a cubic polynomial 
HW #27 109 Antiderivatives and DE's (4.9)  
4.9 IVB (Online) Read 
HW #28 109 Indefinite
Integrals & IVP's (4.9) 

9.2 (i)
585588 IVD (online) 
HW #29 109 direction fields DE's & IVP's (9.2)  
Examination #2 Self
Scheduled (See Moodle) 
Covers primarily Assignments 1829. 

IVE (online)  HW #30 109 Euler's Method ( 9.2)  
Marginal
Cost ? 

Read web materials on trigonometric derivatives.  HW #17 109 Trigonometric Functions II ( 3.3 )  
3.7, 3.8 
HW #22 109 Ln and differentiation (3.6)  
(i)pp271274
(ii) pp275276 plus (iii) reread ... all 


4.7  HW #24 109 Extremes II (4.7)  
4.2 The MVT!  
4.3(i)
287289 (ii) 290294 
HW #25 109 MVT Plus ( 4.2
&4.3 ) HW #26 109 concavity I (4.3) 

2.2 pp9496 Vertical Asymptotes  HW #27 109 Concavity II (and Words) ( 4.3 & 4.7 )  
4.4 (i)
298302 Horiz. Asymptotes (ii) 

4.6 (i)
Read Examples 13! (ii) Read Example 4 
HW #29 109 Graphing (with tech)+max/min (4.6, 4.7)  
9.2 (i)
572575 (ii) 575577 
HW #31 109 direction fields DE's & IVP's (9.2)  
IVE (online)  HW #32 109 Euler's Method ( 9.2)  
IVF READ  
VA ( On Line) NEW!  HW #33 109 The Fundamental theorem I  
5.3 (i)
and (ii) p391392 (iii) p393396 
HW #33 109 The Fundamental theorem I  
Appendix E
p.A34 Sum Notation 

5.4 (i)and
(ii)p347350 (iii)351352 

5.5 (i)
400403 (ii) 403406 

5.2 (i) p;
Example 2a; . (ii) 

6.5  
6.1 (i)
pages (ii) pages 

6.2 (i)
pp (ii) pp (iii)p 

6.3  
6.4 p  
2.4?  
(i) Sens. Calc. I.C.1 on Probability Models  
5.1  

Week 



Friday 

1  120 No Class MLK Day 
121 Introduction & Review 
123 More review. 
124 The Tangent Problem Circle... parabola. 
2  127 Lines: slopes Mapping diagrams. 
128 Slopes of tangents revisited. 
130 Models:  131rates 
3  23 Velocities and tangents: Introduction to the Derivative 
24 More on Derivatives. 
26 Start on the calculus of
derivatives; 
27 More calculus notation !Start calculus core and rules. 
4 Summary
#1 due Monday 210 Problem of the Week #1: Thursday 2132014 
210 Powers, sums, constant
multiples. 
211 More Core and rules applied.
Proof of Sum and Scalar rules 
213Calculus for Negative powers. Fractional Powers 
214 Use of "limit" Notation. Begin Exponential functions. 
5 
217 More on Exponential and
rules... A function without a derivative. x. Begin product rule? 
218 The Product Rule 
220The second derivative and acceleration. ln derivative  a quick look. 
221 More on ln and derivatives of log base b.
More functions without derivatives. 
6 Problem
of the Week #2 due Tuesday 225 Summary #2 due Thursday 227 
224 Functions and "continuity"  225 Diff => Cont. One sided Limits. Infinite limits. (sqrt(x)) Intermediate Value Theorem and applications to estimating solutions to equations. 
227 Marginal cost. IVT and more on estimates for solving equations.Newton's method. Quotient Rule ? 
228 More Newton's Method (?)
TRIG! 
7 
33 Finish sine, cosine, etc. 
34Chain Rule  36 More chain rule  37 More chain rule and applications to related rates 
8 Exam I Self scheduled: Wed. 311 
310 More chain rule and applications to related rate.  311 implicit differentiation.  313 Ln the last core function again!. 
314 More applications of ln log diff. Preview of remainder of course: What the derivative can tell us. 
317 to 321 No classes. Spring break 

9 Summary #3 due 327 
324 Linear estimates  325 The differential. Read web materials on differentials First Derivative analysis of function behavior. Continuity and Extremes. 
327 1st deriv analysis for extremes  328 Extreme Problems 
10  331 NO Class. CC day  41.Extremes and
increasing/decreasing derivative analysis for local
extremes. 
43 The
Mean Value Theorem: A fundamental theorem of calculus and it application to derivative analysis. proof. 
44 Concavity and
the second derivative The second derivative Test for extremes, 
11  47 Still more on asymptotes and
extremes. 
48 Asymptotes. 
410 More Extreme Problems and other applications
of the derivative. Vertical Tangents and Cusps 
411 The
Mean Value Theorem: Proof. Begin Differential Equations, DE's Solutions 
12 POW # 4 Due
Friday April 18, 2014 
414 More Extreme Problems and Graphing? 
415 antiderivatives, Initial
Value Problems. Simple calculus for antiderivatives, 
417 Tangent (Direction) fields. 
418 Euler's Method 
13 Summary #4 due Monday 421 Exam II self scheduled TBA 
421Euler and ... Area  422 Euler and ... Area and ..
FT of Calc. 
424 The Definite Integral and
the FT of C 
425 
14 
428 
429 
51 
52 
15 Summary #6 TBA  55 
56 
58 
59 
16 Final
Examination Self scheduled Review Session Sunday TBA 
Monday May 12 10:2012:10 Art 27 
Thursday May 15 10:2012:10 FH 177 
Thursday May 15 12:4014:30 Art 27 
Friday May 16 10:2012:10 FH 177 