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AuthorHilton, P. J. author
TitlePartial Derivatives [electronic resource] / by P. J. Hilton
ImprintDordrecht : Springer Netherlands, 1960
Connect tohttp://dx.doi.org/10.1007/978-94-011-6089-6
Descript VIII, 57 p. online resource

SUMMARY

THIS book, like its predecessors in the same series, is inยญ tended primarily to serve the needs of the university student in the physical sciences. However, it begins where a really elementary treatment of the differential calculus (e. g. , Difยญ ferential Calculus,t in this series) leaves off. The study of physical phenomena inevitably leads to the consideration of functions of more than one variable and their rates of change; the same is also true of the study of statistics, economics, and sociology. The mathematical ideas involved are desยญ cribed in this book, and only the student familiar with the corresponding ideas for functions of a single variable should attempt to understand the extension of the method of the differential calculus to several variables. The reader should also be warned that, with the deeper penetration into the subject which is required in studying functions of more than one variable, the mathematical arguยญ ments involved also take on a more sophisticated aspect. It should be emphasized that the basic ideas do not differ at all from those described in DC, but they are manipulated with greater dexterity in situations in which they are, perhaps, intuitively not so obvious. This remark may not console the reader bogged down in a difficult proof; but it may well happen (as so often in studying mathematics) that the reader will be given insight into the structure of a proof by followยญ ing the examples provided and attempting the exercises


CONTENT

1. Partial Derivatives and Partial Differentiation -- Exercises -- 2. Differentiability and Change of Variables -- 1. Differentiability -- 2. Change of Variables in Partial Differentiation -- 3. Differentials -- Exercises -- 3. Implicit Functions -- 1. Fundamental Theorem -- 2. Derivatives involving Implicit Functions -- 3. Jacobians, Inverse Functions, and Functional Dependence -- Exercises -- 4. Maxima and Minima -- 1. Mean Value Theorem and Taylorโ{128}{153}s Theorem -- 2. Maxima and Minima -- 3. Maxima and Minima for Functions with Restraints -- Exercises -- 5. Appendix -- Exercise -- Answers to Exercises


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