My Account Log in

1 option

Calculus I / by Jerrold Marsden, Alan Weinstein.

Springer Nature - Complete eBooks Available online

View online
Format:
Book
Author/Creator:
Marsden, Jerrold, author.
Weinstein, Alan, author.
Contributor:
SpringerLink (Online service)
Series:
Undergraduate texts in mathematics 0172-6056
Undergraduate Texts in Mathematics, 0172-6056
Language:
English
Subjects (All):
Functions of real variables.
Real Functions.
Local Subjects:
Real Functions.
Physical Description:
1 online resource.
Edition:
Second edition 1985.
Contained In:
Springer Nature eBook
Place of Publication:
New York, NY : Springer New York : Imprint: Springer, 1985.
System Details:
text file PDF
Summary:
The goal of this text is to help students learn to use calculus intelligently for solving a wide variety of mathematical and physical problems. This book is an outgrowth of our teaching of calculus at Berkeley, and the present edition incorporates many improvements based on our use of the first edition. We list below some of the key features of the book. Examples and Exercises The exercise sets have been carefully constructed to be of maximum use to the students. With few exceptions we adhere to the following policies. · The section exercises are graded into three consecutive groups: (a) The first exercises are routine, modelled almost exactly on the exam- ples; these are intended to give students confidence. (b) Next come exercises that are still based directly on the examples and text but which may have variations of wording or which combine different ideas; these are intended to train students to think for themselves. (c) The last exercises in each set are difficult. These are marked with a star (*) and some will challenge even the best students. Difficult does not necessarily mean theoretical; often a starred problem is an interesting application that requires insight into what calculus is really about. · The exercises come in groups of two and often four similar ones.
Contents:
Orientation Quizzes
R Review of Fundamentals
R.1 Basic Algebra: Real Numbers and Inequalities
R.2 Intervals and Absolute Values
R.3 Laws of Exponents
R.4 Straight Lines
R.5 Circles and Parabolas
R.6 Functions and Graphs
1 Derivatives and Limits
1.1 Introduction to the Derivative
1.2 Limits
1.3 The Derivative as a Limit and the Leibniz Notation
1.4 Differentiating Polynomials
1.5 Products and Quotients
1.6 The Linear Approximation and Tangent Lines
2 Rates of Change and the Chain Rule
2.1 Rates of Change and the Second Derivative
2.2 The Chain Rule
2.3 Fractional Powers and Implicit Differentiation
2.4 Related Rates and Parametric Curves
2.5 Antiderivatives
3 Graphing and Maximum-Minimum Problems
3.1 Continuity and the Intermediate Value Theorem
3.2 Increasing and Decreasing Functions
3.3 The Second Derivative and Concavity
3.4 Drawing Graphs
3.5 Maximum-Minimum Problems
3.6 The Mean Value Theorem
4 The Integral
4.1 Summation
4.2 Sums and Areas
4.3 The Definition of the Integral
4.4 The Fundamental Theorem of Calculus
4.5 Definite and Indefinite Integrals
4.6 Applications of the Integral
5 Trigonometric Functions
5.1 Polar Coordinates and Trigonometry
5.2 Differentiation of the Trigonometric Functions
5.3 Inverse Functions
5.4 The Inverse Trigonometric Functions
5.5 Graphing and Word Problems
5.6 Graphing in Polar Coordinates
6 Exponentials and Logarithms
6.1 Exponential Functions
6.2 Logarithms
6.3 Differentiation of the Exponential and Logarithmic Functions
6.4 Graphing and Word Problems
Answers A.1
Index I.1. .
Other Format:
Printed edition:
ISBN:
9781461250241
Access Restriction:
Restricted for use by site license.

The Penn Libraries is committed to describing library materials using current, accurate, and responsible language. If you discover outdated or inaccurate language, please fill out this feedback form to report it and suggest alternative language.

Find

Home Release notes

My Account

Shelf Request an item Bookmarks Fines and fees Settings

Guides

Using the Find catalog Using Articles+ Using your account