Intensive Calculus 1 -- Exam 3

Mathematics 133 -- Intensive Calculus for Science 1

Exam 3 -- Things to Know

November 22, 2005

General Information

The third full-period exam of the semester will be given in class on Friday, December 2. There will be seven or eight questions (maybe grouped together as parts of larger questions). One of the departmental non-graphing calculators will be provided for your use if you need on.

We will review for the exam in class on Thursday, December 1. Rosie Arcuri will also be available for an evening ``last minute question'' session on Thursday.

Material To Know

The exam will cover the material from Sections 3.5, 3.6, 3.7, 4.1, 4.3, 4.5, and 4.6. However, as you have probably realized, this course is really cumulative. The material on the meaning of derivatives from Chapter 2 is the basis for what we did in Chapter 4. Also, the basic derivative rules from Sections 3.1-3.4 will come up frequently in computing derivatives. Many of the properties of linear, polynomial, and exponential functions you will need to have at your fingertips come from the material from Chapter 1. And the basic algebra review we did the first week of the course is always relevant -- you'll need to be able to factor, apply rules for exponents, manipulate fractions, etc. accurately, quickly, and without having to think about the steps too much. You might want to devote part of your review time to those topics if you feel like you need it.

The following are the new topics to be tested on this exam:

Derivatives of trigonometric functions: d/dx(sin(x)) = cos(x), d/dx(cos(x)) = -sin(x)
Derivatives of inverse functions via the chain rule; d/dx(ln(x)) = 1/x, d/dx(arcsin(x)) = 1/sqrt(1 - x²), d/dx(arctan(x)) = 1/(1 + x²)
Implicit differentiation
Know how to use these derivative rules singly and in combination. You should be able to find the derivative of any function such as those in problems 1-71 in the Review Exercises for Chapter 3 (see page 159-160 in text).
Critical points; the First Derivative Test for Local Maxima and Local Minima; The Second Derivative Test for Local Maxima and Local Minima. (Be able to give precise statements of what these say, in addition to knowing how to use them.) Good review problems: Review Exercises for Chapter 4 (page 230): 22-30.
Optimization: Finding the overall maximum and/or minimum of a continuous function on an interval a <= x <= b.
Applied Optimization (problems like Section 4.5/11-27).
Related Rates (problems like Section 4.6/13-25) Important Note: Because of the short time remaining in the semester, there will not be a problem set covering 4.6 due before the exam. Be sure you try enough of these to feel comfortable with them.

Suggestions on how to study

The goal of the homework problems is not to learn how do the particular problems assigned, but to practice using the ideas we have discussed in class and come to a full understanding of the ideas behind the problems by thinking through them. In addition to going over the quizzes and problem sets, make sure you look over the class notes and the discussions of why things are true in the text.
Along the same lines, spend some time with the ``Check Your Understanding'' Problems from Chapter 3 and Chapter 4
Try the sample exam last after you have done the rest of your review.