Abstract:
This is the first volume of an introductory calculus presentation intended for future scientists and engineers. Volume I contains five chapters emphasizing fundamental concepts from calculus and analytic geometry and the application of these concepts to selected areas of science and engineering. Chapter one is a review of fundamental background material needed for the development of differential and integral calculus together with an introduction to limits. Chapter two introduces the differential calculus and develops differentiation formulas and rules for finding the derivatives associated with a variety of basic functions. Chapter three intro duces the integral calculus and develops indefinite and definite integrals. Rules for integration and the construction of integral tables are developed throughout the chapter. Chapter four is an investigation of sequences and numerical sums and how these quantities are related to the functions, derivatives and integrals of the previous chapters. Chapter five investigates many selected applications of the differential and integral calculus. The selected applications come mainly from the
areas of economics, physics, biology, chemistry and engineering.The main purpose of these two volumes is to (i) Provide an introduction to calculus in its many forms (ii) Give some presentations to illustrate how powerful calculus is as a mathematical tool for solving a variety of scientific problems,
(iii) Present numerous examples to show how calculus can be extended to other
mathematical areas, (iv) Provide material detailed enough so that two volumes
of basic material can be used as reference books, (v) Introduce concepts from a
variety of application areas, such as biology, chemistry, economics, physics and engineering, to demonstrate applications of calculus (vi) Emphasize that definitions
are extremely important in the study of any mathematical subject (vii) Introduce
proofs of important results as an aid to the development of analytical and critical
reasoning skills (viii) Introduce mathematical terminology and symbols which can
be used to help model physical systems and (ix) Illustrate multiple approaches to
various calculus subjects.
If the main thrust of an introductory calculus course is the application of calculus to solve problems, then a student must quickly get to a point where he or she understands enough fundamentals so that calculus can be used as a tool for solving the problems of interest. If on the other hand a deeper understanding of calculus is required in order to develop the basics for more advanced mathematical iii efforts, then students need to be exposed to theorems and proofs. If the calculus course leans toward more applications, rather than theory, then the proofs pre sented throughout the text can be skimmed over. However, if the calculus course is for mathematics majors, then one would want to be sure to go into the proofs in greater detail, because these proofs are laying the groundwork and providing
background material for the study of more advanced concepts. If you are a beginner in calculus, then be sure that you have had the appro priate background material of algebra and trigonometry. If you don’t understand something then don’t be afraid to ask your instructor a question. Go to the library and check out some other calculus books to get a presentation of the subject from a different perspective. The internet is a place where one can find numerous help aids for calculus. Also on the internet one can find many illustrations of the applications of calculus. These additional study aids will show you that there are multiple approaches to various calculus subjects and should help you with the
development of your analytical and reasoning skills.