Week 



Friday 

1  116 No Class MLK Day 
117 Introduction & Review 
119 More review. 
120 The Tangent Problem Circle... parabola. 
2 
123 Lines: slopes Mapping figures. 
124 Slopes of tangents revisited. 
126 Models: rates Introduction to the Derivative 
127 More on the Derivative 
3 Summary #1 due Thursday 22 
130 More on Derivatives. Start on the calculus of derivatives; Notation! 
131More calculus and "limit"
notation ! 
22 More! 
23Start calculus core and rules. 
4 Problem of the Week #1: Due Monday 213 (revised 27)  26 Powers, sums, constant
multiples. 
27 More Core and rules applied. Negative powers. Begin Exponential functions. 
29 More on Exponential and rules Start fractional Powers 
210 Proof of Sum and Scalar rules A function without a derivative. x. 
5 Summary
#2 due Thursday 216 
213 ln derivative  a quick
look. Marginal cost. 
214The second derivative and
acceleration. 
216 Functions and "continuity" More functions without derivatives. Infinite limits. (sqrt(x)) 
217 Diff => Cont. One sided Limits. 
6 POW #2: Due Thursday 223  220 Intermediate Value Theorem and applications to estimating solutions to equations. 
221 Product Rule IVT and inequalities. 
223 Quotient Rule IVT and more on estimates for solving equations. 
224 Newton's method(?) 
7 Summary #3 due Thursday 31 
227More Newton's Method 
228 TRIG! 
31Finish sine, cosine, etc. Chain Rule 
32 More chain rule and applications to related rates 
8
Exam I Self scheduled: Wed. 38 
35 more related rates . 
36 , implicit differentiation. 
38 Ln the last core function.More applications of ln 
39log diff. 
No classes. Spring break 

9POW #3:
Due Thursday 3 24 
319 Preview of remainder of
course., extremes Extremes and applications 
320 Linear estimates  322 The differential. Read web materials on differentials 
323First Derivative analysis of
function behavior. 
10 Summary #4 due Thursday 329  326 Continuity and Extremes.1st deriv analysis for extremes.  327.Extreme Problems 
329
The Mean Value Theorem: A fundamental theorem of calculus and it application to derivative analysis. proof. 
330 No Class CC Day 
11 POW #4: Due Thursday 45  42 Concavity and the second
derivative More Extreme Problems and other applications of the derivative. 
43The second derivative Test for
extremes, 
45 Still more on asymptotes and extremes. Vertical Tangent lines.  46 Asymptotes. 
12 Summary #5 due 414  49 Vertical Tangents and Cusps Begin Differential Equations, DE's Solutions 
410 antiderivatives, Initial Value Problems.  412 Simple calculus
for antiderivatives, Tangent (Direction) fields. 
413 
13 Exam II self scheduled Wed. 418 
416 Euler's Method 
417 Euler and ... Area and ..
FT of Calc. 
419 The Definite Integral and
the FT of C 
420 
14POW
#5: Due 426 
423 
424 
426 
427 
15 Summary #6  430 
51 
53 
54 
16 Final Examination
Self scheduled Review Session: Sunday TBA 
57 
58
FOR 107: 15001700 
59 
510
ARTA_027 08001000 
511 FH 177: 10201220 FOR 107: 15001700 
Date Due  Reading  Problems ( *= interesting but optional)  Optional  
1/2023 
1.1 SC 0.B1 Numbers [online] 
WA: Review: Algebra; Lines; Circles; Functions; Trig  SC 0.A What is Calculus?  
1/2324 
SC
0.B2 Functions [online] CET: Appendix B 
WA: HW #1 M109 1.1 Function Notation and Representation  Online Mapping Figure Activities  
1/24 
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. 

1/2730 
2.1 
WA: HW #3 M109 Secant&Tangent Lines, Av. Rates (2.1)  On
Moodle:SC I.A; I.B Stewart: 1.3 , 1.4 

1/3031 
2.7On
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 

1/312/2 
2.8 3.1 
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) 

2/69 
3.1 On Moodle SC I F.1 
HW #6 109 The Derivative for some Fns! (3.1)  
2/9 
3.1 
HW #7 109 The Derivative Calculus Begins (3.1)  
2/13 
3.1 
HW #8 109 The Derivative Calculus w/ e^x (3.1)  
2/1416 
2.8 
HW #9 109 Calculus... 2nd and 1st Deriv. (3.1)  
2/2021 
2.5, 3.1,  HW #10 109S12 Continuity I ( 2.5)  
2/2324 
2.5 pp118120; 126127 2.8 p 157160 Example 5 Differentiability and continuity 3.2 
HW
#11 109 Continuity and IVT (2.5) HW #12 109 Products ( 3.2 ) 

2/2427 
3.2 
HW #13 109 Product and Quotient Rules (3.2)  
2/2728 
4.8 pp 338340 Read
web materials on Newton's Method. Review for MONDAY: Appendix D Especially formulae 68,10,12,13 
HW #14 109 Newton's Method (4.8)  
3/1 
3.3 Trig
Derivatives 
HW #15 109 Trigonometric Functions ( 3.3 )  
3/2 
3.4 The Chain Rule

HW #16 109 Chain Rule I ( 3.4 )  
3/5 
3.9 Related Rates 
HW #17 109
Related Rates, More Chain Rule(3.9+) 

3/20 
2.5 Implicit
differentiation Read web materials on implicit differentiation. 
HW #18 109 Implicit Diff'n ( 3.5 ) 

3/22 
3.6 Logs  HW #19 109 Ln and logarithmic diff'n (3.6 ) 

3/23 
3.10 (i) 250251
(ii) 253254 Read web materials on differentials SC Ch 3A1 on Moodle 
HW #20 109 Estimation (linear & dy) (3.10 ) 

3/2627 
4.1 OnLine tutorial on Max/mins 
HW #21 109 Extremes ( 4.1 )  
3/29 
4.7  HW #22 109 Extremes II (4.7)  
4/14 
4.3(i) 290292 (ii)292297 
HW #23 109
MVT Plus ( 4.2 &4.3 ) HW #24 109 concavity I (4.3) 

4/5 
HW #25 109SP12 Concavity II(& Words) ( 4.3 & 4.7 )  
4/9 
2.2, 4.4 (Asymptotes,
infinite limits) 
HW #26 109SP12 Graphing+max/min (2.6; 4.5, 4.7)  
4/1012 
IVA(Online)
A java graph showing f (x)=P'(x) related for f a cubic polynomial 
HW #27 109SP12 Antiderivatives and DE's (4.9)  
4/1213 
4.9 IVB (Online) Read 
HW #28 109SP12 Indefinite
Integrals & IVP's (4.9) 

4/16 
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. 

4/19 
IVE (online)  HW #30 109 Euler's Method ( 9.2)  
Below this line is not assigned!  
MarginalCost ? 

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  

1. use skills beyond the level of intermediate algebra to solve problems through quantitative reasoning.
2. apply mathematical concepts and quantitative reasoning to problems.
Every other week (with some exceptions) partnerships will submit a response to the "problem/activity of the week." (POW)
All cooperative partnership work will be
graded 5 (well done), 4
(OK), 3 (acceptable), or 1(unacceptable) and will be used in
determining the 50 points allocated for cooperative
assignments.
CRDT  20 points 
Reality Quizzes  150 points 
Oral Quiz  20 points 
2 Midterm Examinations  200 points 
Homework  110 points 
Cooperative work  50 points 
Final Examination  200/300 points 
Total  750/850 points 
Calculus Dropin Tutoring from HSU Faculty is available in BSS 308
Time

Monday 
Tuesday 
Wednesday 
Thursday 
Friday 
23 PM 
X 
X 
X 
Johnson 

34 PM 
Freedman Haag 
Freedman 
Haag 
Johnson 
Lauck 
45 PM 
Goetz 
Goetz 
Flashman 
x 
x 
56 PM 
Lauck 
Flashman 
Flashman  x 
x 