Section 
Topic 
Exercises 
Date Due 
1.1 
Four Ways to Represent a Function 
16, 1113, 1926, 3839, 4850 
1/16 
1.2 
Math Models 
14 
1/16 
1.3 
New Functions from Old Functions 
2n+1, n=0,..., 24 and 2,4,6 
1/21 
1.4 
Graphing Calculators and Computers 
4n+1, n=0,..., 5 and 24,26 
1/23 
1.5 
Exponential Functions 
13, 1416, 2123 
1/23 
1.6 
Inverse Functions and Logarithms 
19, 1521, 2730, 4852 
1/30 
1.7 
Parametric Curves 
4n+1, n=0,..., 7 and 31 
1/30 
Chapter 1 
review problems 
14,78, 1011, pages 923 
1/30 
Test 1 
Chapter 1 

January 30 
2.1 
Tangents 
1, 34 
2/2 
2.2 
Limits 
14, 7, 9, 15 
2/6 
2.3 
Calculating Limits 
18, 1016, 29, 3132 
2/6 
2.4 
Continuity 
13, 1316, 2226, 3536 
2/11 
2.5 
Infinity 
13, 2026, 30, 33 
2/15 
2.6 
Velocities 
13, 78, 13, 22 
2/15 
2.7 
Derivatives 
14, 1319, 3132 
2/18 
2.8 
The derivative as a function 
112, 1923 
2/20 
2.9 
Linear Approximations 
Removed from syllabus 

2.10 
What does f’ say about f? 
14, 11, 15, 2122 
2/25 
Chapter 2 
review problems 
17, 1015, 21, page 182 
2/27 
Test 2 
Chapter 2 

February 27 
3.1 
Derivatives of Polynomials, etc 
2123, 37, 41, 44, 48 
3/3 
3.2 
The Product and Quotient Rule 
14, 2730, 38 
3/5 
3.3 
Rates of Change 
1, 5, 7, 21 
3/5 
3.4 
Trig Functions 
3, 5, 7, 9, 13, 15, 35, 40 
3/17 
3.5 
The CHAIN Rule 
2n+1, n=0,...,15; 4346, 7072 
3/19 
3.6 
Implicit Differentiation 
15, 1316, 22, 4749 
3/19 
3.7 
Logarithmic Functions 
2530 
3/22 
3.8 
Removed from syllabus 


Charter 3 
review problems 
15; 111; 17, 34, 4951 
3/24 
Test 3 
Chapter 3 

March 26 
4.1 
Related Rates 
19, 2628 
4/2 
4.2 
Maximum and Min’m Values 
110, 1722, 47 
4/2 
4.3 
Derivatives and Shape 
17, 13, 21, 27 
4/7 
4.4 
Graphing with Calculators 
13 
4/12 
4.5 
Indeterminant Forms 
111 
4/12 
4.6 
Optimization Problems 
12, 78, 10, 17 
4/16 
4.8 

14, 11 
4/21 
4.9 
Antiderivatives 
110, 1315, 2627, 3639, &Chap Review 
4/26 

Fall 2002 final 
4/28 


Spring 2002 final 
4/30 


Spring 2003 final 
5/3 

Common 
Final Exam, Fretwell 128 
Thursday, May 6 
8am11am 