Due Date 
Reading for 3rd Edition  Recommended Problems Related Graded problems are on WebAssign 
Comments Optional Work 
HW #1 1/2225 
A.1
Review of Real Numbers A.3 Multiplying and Factoring 1.1 pp 36 
Moodle background
assessment quiz. A.1: 121 odd A.3: 113 odd; 3139 odd 

HW #2 1/2526 
1.1
Functions and
tables. A.5 pp A.2224 Solving equations 
A.5 17 odd, 1319 odd 1.1: 15, 7,9, 12, 15, 16, 22, 23, 25, 33 

HW
#3 1/2829 
1.2
Graphs Sensible Calculus 0.B.2 Functions 
Do
the
reading
first! 1.2: 1,2,4,5 [Draw a mappingtransformation figure for each function in this problem] [Read SC 0.B.2 to find out more about the mappingtransformation figure.] 

HW
#4 1/292/1 
1.3
Linear functions Summary: Functions and Linear Models 
1.2:
13, 17, 31
Draw a mapping figure
for each function. 1.3 : 19 odd, 11,12,29,41,33 
Try The
Moodle
Practice
Quiz on Functions Online Mapping Figure Activities (this may be slow downloading) 
HW #5 2/24 
1.4
Linear Models 2.1 Quadratic functions 
1.3:
37 49 odd,
55, 57, 59 1.4: 19 odd 2.1: 19 odd, 25, 27, 33 
1.4: 49 
HW #6 2/28 
1.4
Linear Models. A.5 ppA23A25 3.1 Average Rate of Change 
1.4:
12,
19,
21,22,25 3.1: 110, 1316, 21, 39, 40 
Online
Mapping Figure Activities (Again... ;) 
HW #6.5 2/911 
3.2 Pages
154158 The Derivative: A Numerical and Graphical Viewpoint 
3.2: 1,
2, 5, 9,12 

HW #7 2/911 
3.2
derivative estimates 3.3 The Derivative: An Algebraic Viewpoint 
3.2: 13, 16,
17,
19, 20; 23, 24 Use "4step process" from class 3.3: 1, 2, 5 [Ignore the problem instruction!] 

HW #8 2/11 
3.2
(graphical) 3.3 The Derivative: An Algebraic Viewpoint 
3.2:
33, 47, 49, 57, 58, 71, 83 3.3: 6,13 ,15,17, 23, 25 [Use "4step process"] 
Try Moodle Practice quiz on writing responses. 
HW #9 2/1216 
3.3
The
Derivative:
An
Algebraic
Viewpoint 3.4 The Derivative: Simple Rules 
3.4:111 odd; 1417; 1921  Practice Quiz on Slopes of Tangent Lines using 4 steps. 
HW #10 2/1619 
3.2 Derivative function graphs, interpretation  3.2 :39, 41, 42, 5964, 97,98, 109, 110  
HW#11 2/19 
3.4(Again) The Derivative: Simple Rules  3.4: 61, 65, 67,
71, 79; 29, 37, 41, 42, 53, 55, 63, 64 

HW #12 2/1922 
3.5
Marginal analysis Chapter 3 Summary as relevant. 4.1 Product Rule only! pp 241244 
3.5:
1,5,6,9,11,13 3.5: 19, 21,28 4.1: 13, 15, 16, 21, 22 

HW #13 2/2526 
4.1: Quotient Rule  4.1: 35, 37, 38, 43; 53, 59, 62  
HW #14 2/2224 
4.2 The Chain Rule  4.1:
63, 64, 71, 73 4.2 : 13 17, 55 

HW #15 2/233/4 
4.2 The
Chain
Rule 4.4 Implicit Differentiation (Skip Examples 2 and 3!) 
4.2: 25, 26, 33, 35 4.4 :11, 12, 15, 35, 36, 47 

HW#16 3/43/8 
5.4 Related Rates Especially Ex. 13  4.2: 47, 51,
53, 61, 62, 65 5.4: 9, 11, 13 (watch Ed for #11) 

Midterm Exam #1
SelfScheduled : Covers Material from HW # 115 and related
sections. see Sample Exam on Moodle. 

HW #17 3/89 
A.2: Exponents  A.2: 15,19, 23, 39, 41, 71  
HW #18 3/811 
3.6:
limits (numerical/graphical) P209216 omit EX.3. 3.7: limits and continuity 3.8 limits and continuity (alg) pp225 228 
3.6:
19, 21(a,b), 23(ae), 25(ae), 26(ae) 3.7: 13,14, 15 

HW#19 3/811 
5.4
Related
Rates 2.2: Exponential Functions 
5.4
17,
21,
25
2.2 : 3,4,9,11, 7, 13, 17 

HW #20 3/911 3/2225 
2
.2
pp94104(middle) exp'(x) = exp(x) Notes. 
2.2: 45,
47, 51, 63, 73, 59, 61 4.3: 7,8,45,51,53,85 

HW #21 3/22326 
2.3: pp.
110116
[Logarithmic functions] Log's Properties (on line). 
2.3: 14, 19  Sensible Calculus I.F.2 
HW #22 3/2326 
4.3:
Examples
15;
pp
265267. Derivatives for Log's & Exponential Functions 
4.3:1,2,15,17,19 2.3: 5, 7, 20, 21, 25,31, 45a, 48 a 4.3: 23, 27, 29, 33, 73 

HW #23 
2.3
Example
3 4.4 log differentiation Ex. 3 
2.3:
9,
11,
15 4.4: 31 , 32 
Slide
Rules! UNDERSTAND HOW + WHY a slide works, a full explanation 
HW #24 4/25 
The
Intermediate
Value
Theorem 3.8 pp225 230 middle: limits and continuity (alg) Online: cont and diff. 5.1: Maxima and Minima 
3.7: 20,27,
28 3.8: 39, 41, 46, 53 
continuity and differentiablity online materials( A and B) 
HW #25 4/25 
5.1:
Maxima
and Minima 5.2. Applications of Maxima and Minima 
5.1: 17 odd, 810, 12, 13,
15, 21, 23, 24, 25 5.1: 35, 39, 41, 44 5.2: 5, 11, 13 

HW #26 4/56 
5.2. Applications
of
Maxima
and
Minima5.1:
Maxima
and Minima 5.3 2nd deriv.pp317320 
5.2:15,
21
5.2:
25, 27, 29 5.3: 15,7,9,11,14 

HW #27 4/1213 
5.2 and 5.3 again!  5.3 : 1720, 23; 25, 29,31 5.2: 33, 35, 41, 45 

HW#28 4/1315 
3.6:
p212216 3.8: p229 5.3: p321324 
5.3: 35 37,41, 63, 67 3.6: 111 odd 

HW #29 4/1620 
3.6,3.8 Again!  3.8:
15,17,21,23,33,35,37
3.6: 25, 27,29 5.3: 39, 43, 45 
Online
Problems
on
Linear
Estimation 
Exam #2 
EXAMINATION
#
2
will
cover
material
from
Assignments
1528 and related sections of
the text. For Sample Exams II see Moodle. 
Review for Exam #2: (will not
be
collected): p 136[138]: 2,3,4 p288[294]: 1(a,e,g,i),2(c,d),3a,8a p350[361]: 1(a,d,f),2,4a,5(ac) 

HW #30 
6.1 The Indefinite
Integral p 353358 Differential equations and integration SC IV.A Online tutorial for 6.1. OnLine: Linear Estimation 
6.1: 113odd 

HW #31 
6.1 Applications p 359361  6.1: 15,17, 27, 35, 4144,51  
HW #32 
IV.E 6.3. The Definite Integral As a Sum. p 373376, 380 6.2 Substitution pp364367 
6.3: 15 odd, 15, 19, 21 6.2: 16; 21,23 
SC.III.AThe Differential 
HW #33 
8.1 Functions
of
Several
Variables.
p467471 6.4 The Definite Integral: Area p384386 6.5 pp392395 The Fundamental Theorem 
6.4: 15 odd, 21 6.5 : 1720; 67,68 8.1: 19 odd, 19, 20, 21, 29, 39, 43 
SC
IV.E 
HW #34 
6.5 pp 395  396  6.5: 2730, 61,63  
HW # 35 
6.4
pp
384 388 6.2 pp 368371 Substitution 6.5 example 5 8.3 pp 490  492 
6.2:
2733,59, 60 6.5: 45,47,59,63,64 8.3: 1 7 odd, 13, 41, 45 

HW #36 
7.2 pp 416420 (area
between curves) 7.2 p420426 (Surplus and social gain) 7.3 pp 430431 
7.2:1,3,5,11, 15 7.2: 25, 37, 49 7.3: 1 5odd, 29, 35a 

ASSIGNMENT
INVENTORY 

Reading INVENTORY 
Problems INVENTORY 
Optional INVENTORY 

7.5
p 442445 + 8.2 8.4 p498501 Critical points 
7.5: 17  Graphing, Technology problems from lab  


5.5
Elasticity and other economic applications of the derivative 
5.5: 1, 3, 14  
7.4 Future and present value. 

3.7, 5.3 Review p321323  3.7:
15,17, 2830 5.3: 47, 51, 63, 71 6.1: 5355, 57 

SC IV.E  
Solution to 7.2:42 (See the student solutions manual).  
8.2 8.4 p498501 Critical points 8.3 Second order partials 
8.2:
19 odd; 1118; 1925 odd;41, 49 8.4: 19 odd, 33, 37 8.3: 1925 odd; 29,33,38,51, 53 

7.5 8.4 pp 504505 
7.5: 11,
13, 17 8.4 :13, 15,17,19 

7.6  7.6: 1,3,13  

Future
and
present
value. Probability and DARTS 
7.4:1, 9, 21, 27  
3.6: 31  
3.8: 1125 odd; 3942  
6.5 396398 
6.4:22 

6.5:
9,11,4145 odd, 42, 65,81 

7.3:25  
7.6:25,
27 

8.2: 45 

Monday  Tuesday  Thursday 
Friday 
Week 1  No Class MLK Day 
1 19 Course Introduction  Numbers, Variables  Algebra Review Begin Functions. 
Week 2  125 More functions review The coordinate plane. Functions, graphs. 
116 Functions, graphs and models. 
Lines and models.  More Functions ,Points and Lines 
Summary of Weeks 1&2 Due Friday 3 pm. 
21 Models: Linear Functions. Slopes and rates  More linear
models. Quadratic functions. Estimation. 
More
Quadratics. Extremes and the tangent problem. 
Average rates, and slopes of secant and tangent lines. 
Week 4 (Graphing,
Technology) 
28 Instantaneous Rates. The Derivative 
More Motivation:
Marginal cost, rates and
slopes. 
The Derivative and algebra.  More on finding the derivative.Finding the
derivative as function. 
Week 5 Summary
of Weeks 35. Due Monday 2222 by 3 pm. 
215 Begin: The
Derivative Calculus Definition of the derivative. Justify the sum and constant multiple rules. Der. of 1/x 
Notation. Justification of the power rule for n>0. 
Graphical
Derivative as function graphs Discuss Sum rule interpretations. More on costs, revenues and profits 
Marginal Applications. Applications: Marginal vs. Average Cost Constant Multiple Rule Interpretations Start Product rule. 
Week 6 
222
Justify product rule. 
Start Quotient Rule.  More on the
Quotient rule. The Chain Rule 
Implicit functions. 
Week 7 Summary of Week 6&7 Due Friday 3 pm. Midterm Exam #1 SelfScheduled 33 
31 More Chain Rule Implicit Differentiation More Implicit Functions and related rates. 
More Implicit Functions and related rates. 
More Implicit Functions and related rates. Examples: f does not have a derivative at a. 

Week 8 
38 Begin Exponential
functions Limits and continuity, 
More limits and
continuity 
Interest and value.  No Class Furlough Day 
Week
9
Spring Break 

Week 10 Summary of Weeks 7 and 8 Due 4pm Friday 
322 More exponentials. e and
compunding interest continuously.Derivatives of exponentials, esp'ly
exp'(x)=exp(x). 
Derivatives of Exponentials. Start Logarithmic functions. 
Derivatives of Logarithms and Exponentials More on models with exp and log equations. 
More on log properties. Logarithmic scales. Slide Rules!? 
Week 11  329 NO Class Flashman Furlough Day 
More on log properties. Finish logs/exps. 
Log
scales? Continuity IVT 
More on Continuity. IVT. . 
Week 12 Summary of Weeks 9 & 10 Due Friday 
45 Begin Optimization and
First
Derivative
Analysis First Derivative Analysis 
More Optimization and Graphing.
Optimization: revenue example Optimization and IVT . 
More
Optimization and Graphing. The fence problem Optimization: revenue example Begin Second Derivatives acceleration 
Concavity and Curves 
Week 13  412 More on Concavity Horizontal Asymptotes. 
Vertical Asymptotes Linear Estimation and "Differentials." 
Estimating cost changes from marginal costs. Differential Notation(started) Costs, marginal costs, and estimation. 
1110 Relative error. Elasticity Begin Differential equations and integration IV.A 
Week 14Self
Scheduled Exam #2 Wednesday 1121 Lab ? 
419  Review for Exam #2?  More
DE's. Acceleration and integration Introduction to the definite Integral. IV.E 
Euler's
Method.
The Definite Integral 
Week 15 Summary of Weeks 1215 Due Friday 
426 Intro to functions of 2 or more. Functions of many variables. Tables for 2 variables. Riemann Sums and Estimating Change The definite integral and The FTofC. 
Area . Finding area by estimates and using antiderivatives. Fundamental Theorem I 
More
Notation,
Area
and
applications:
Interpreting
definite
integrals.
Average Value. Partial derivatives. 1st order. linear estimation. 
Substitution 
Week 16 
5 3 Linear Estimations and Partial Derivatives. Visualizing Functions of 2 variables: level curves, 
More on Area and integration. 2nd order partial derivatives Extremes (Critical points) 
Substitution
in
an
indefinite
integral! Area between curves. Consumer& Producer Surplus; Social Gain. graphs of z=f(x,y) 
Improper Integrals I and II Future and present value. Least Squares example 
Week 17 Final Examination Review Session Sunday 13 pm BSS Room TBA 
I.
Differential
Calculus:
A. *Definition
of the Derivative
B. The
Calculus of Derivatives
C. Applications
of derivatives
D. Theory 
E. Several Variable Functions Partial derivatives. II. Differential Equations and Integral Calculus:
A. Indefinite
Integrals (Antiderivatives) Definition/ Estimates/ Simple Properties / Substitution *Interpretations (area / change in position/ Net costrevenuesprofit) *THE FUNDAMENTAL THEOREM OF CALCULUS  evaluation form
