Listed #'s correspond to class lessons and topics. Do the homework that corresponds to the lesson of the day. There won't be any special announcement or reminders each day about homework. Study notes and do the practice questions to be ready for the next day. Unannounced quizzes may include homework questions. Do all homeworks in a dedicated notebook.
Calculus by Larson, Hostetler, and Edwards, 8th Edition. Link to exercises and Odd numbered solutions
#  Lesson  Homework 

1  Equation and its graph  P.1 # 25, 29,31,63,69, complete Learning Agreement 
2  Functions  P.3 # 1, 3,11,19,25,57,63 
Exam #1  CH P Review # 3,5,25,29,39,40  
3  Limit  1.2 # 1,7,11,13,17,20,25 
4  Limit Laws  1.3 # 9,17,37,39,41 
5  Limit techniques  1.3 # 51,53,57,69,77 
6  Continuous Functions  1.4 # 1,3,11,17,41,57 
7  Intermediate Value Theorem  1.4 # 83,84,87,89 
8  Infinite Limits and Vertical Asymptotes  1.5 # 1,3,11,17,29,35,43 
Exam #2  CH 1 Review # 17, 21,35,47,51,55,61  
9  Tangent line to a curve  2.1 # 3,5,7,11 
10  Derivative Function  2.1 # 25,35,53,54,55 
11  Differentiability and Continuity  2.1 # 57,81,83,85 
12  Alternate form of the derivative  2.1 # 3740,71,77,95 
13  Differentiation Rules  2.2 # 3,9,31,39,41,43,47,57,75 
14  Product Rule  2.3 # 1,5,17,35,39 
15  Quotient Rule  2.3 # 25,41,69,81,93 
16  Derivatives of Trigonometric Functions  2.3 # 51,53,103,111,113 
17  Chain Rule  2.4 # 9,29,59,79 
18  Chain Rule – Trigonometric Functions  2.4 # 41,45,47,89 
19  Implicit Differentiation  2.5 # 3,5,11,29,35,47 
Exam#3  CH 2 Review # 5,7,41,45,49,57,79,101  
20  Velocity Acceleration  Handout 
21  Related Rates  Handout 
Exam#4  2.6 # 27  
22  Extreme Values  3.1 # 3,7,11,21,27,55,56,57,58 
23  Rolle’s Theorem and Mean Value Theorem  3.2 # 1,5,31,33,41,45 
24  Increasing Decreasing Functions  3.3 # 5,17,38,41,57,63 
25  Concavity and Second Derivative Test  3.4 # 5,11,17,53,54,55,56 
26  Horizontal Asymptotes  3.5 # 1,17,29,31,52,53,54 
27  Summary of CurveSketching  3.6 # 1,2,3,4,5,6,17 
28  Optimization  Handout 
29  Newton’s Method  3.8 # 1,5,15,21,23 
Exam#5  CH 3 Review # 3,5,9,27,28,41,49  
30  Antiderivative  4.1 # 1,21,25,27,33,43 
31  Sigma Notation  4.2 # 1,17,35,39 
32  Area of a Plane Region 
Part I: 4.2 # 25,31,47,49
Part II: 4.3 # 7,19,27,43,47

33  Fundamental Theorem of Calculus  4.4 # 9,21,31,33,39 
34  Mean Value Theorem for Integrals  4.4 # 43,47,51 
35  Second Fundamental Theorem  4.4 # 73,77,83,87,89 
36  USubstitution  4.5 # 11,17,29,45,89,101 
37  Trapezoidal Rule  4.6 # 1,11,21 
38  Simpsons Rule – BC  4.6 # 17,22 
Exam#6  CH 4 Review # 9,23,41,53,63,73,91  
39  Natural Log function  5.1 # 21,27,33,37,95 
40  Derivative of a log function  5.1 # 41,45,47,57,69 
41  Log rule for integration  5.2 # 1,5,33,49,83,87 
42  Derivatives of Inverse Functions  5.3 # 5,912,43,71,77 
43  Natural Exponential Function  5.4 # 33,39,45,51,57,91 
44  Functions with bases other than e  5.5 # 37,39,43,57,63,69 
45  Derivatives and integrals of Inverse Trig Functions 
5.6 # 5,41,49,48,61
5.7 # 1,13,65

Exam#7  CH 5 Review # 15,17,21,47,49,67,69,71  
46  Slope Fields  6.1 # 13, 4956 
47  Euler’s Method – BC  6.1 # 69,71 
48  Separable Equations  6.3 # 1,7,13,15 
49  GrowthDecayLogistic  Handout 
Exam#8  
50  Area Between Two Curves  7.1 # 1,3,5,13,21 
51  Volumes by Crosssection  7.2 # 61, Handout 
52  Volumes Disk Method  7.2 # 3,5,7,11 
53  Washer Method  7.2 # 13,19,27 
54  Shell Method  7.3 # 3,13,15,21,27 
55  Arc length – BC  7.4 # 3,5 
Exam#9  CH 7 Review # 1,22,33  
56  Basic integration Rules  8.1 # 15,19,25,69 
57  Integration by parts  8.2 # 13,23,27,35,61 
58  Partial fractions  8.5 # 7,9,17,25 
59  L’hopital’s Rule and indeterminate forms AB  8.7 # 5,7,9,33,35,75 
60  Improper Integrals  8.8 # 5,7,9,15,67 
Exam#10  CH 8 Review # 1,5,13,33,75  
61  Sequences – Definition and Limit  9.1 # 3,1520,47,51,103 
62  Series and Convergence  9.2 # 7,13,23,35,63 
63  Integral Test and Pseries  9.3 # 1,17,21,25,35,59 
64  Comparison of Series  9.4 # 2936 
65  Alternating Series  9.5 # 11,15,43,47,49 
66  Conditional and absolute convergence  9.6 # 13,29,33,37,61 
67  Taylor Polynomials and Approximations  9.7 # 13,17,26,49 
68  Power Series  9.8 # 3,7,9,11,19 
69  Geometric power series  9.9 # 3,9,13,15 
70  Taylor and Maclauren Series  9.10 # 1,5,15,23,37 
Exam#11  CH 9 Review # 9,23,27,49,57,65  
71  Parametric Equations 
10.2 # 3,9
10.3 # 1,5,15

72  Polar Equations  10.4 # 27,29,37,41,43 
73  Derivatives and integrals of polar graphs 
10.4 # 59,65
10.5 # 3,9,13,31

Exam#12  
74  AP Calculus Review  Click the lesson link for review resources. Currently includes flashcards. More will be added soon. 