![]() The author does a fantastic job explaining every concept covered. ⭐Possibly one of the best I’ve ever read. Of course, the book is just a step in the path so you stillneed all of those other books as a practicing professional. The different approach helps teach the underlying concepts instead of routinely copying material. Thus her approach is not exactly the same as you will see in the physical sciences. The author is not a physicist though she introduces many topicsof interest from the applied fields. ![]() Thus, whenI found this book as a reference on the fundamentals I was delighted. that all suffer due to the inability to clearly communicate the topic of Vector Calculus with their readers. I have seen many books on Classical Mechanics, Linear Algebra, Differential Geometry,Analytics, etc. The book is written in a clear manner with the goal of examining and explainingthe subject both for students and professionals. ⭐This is an excellent book on Vector Calculus. Colley needs to start a text on linear algebra, topology, tensors and so on. It does a good job of explaining the solutions to the odd numbered problems.In summary, I recommend this book without reservation. If you are self-studying, buy the solutions manual. Indeed, this insistence on assuming very little knowledge on the part of the student is one of the books greatest strengths.There are numerous exercises and the do a good job of reinforcing the text. Indeed, one doesn’t see the word derivative until about page 120.The book has an attempt at rigor in places, but never lets that get in the way of clarity for someone getting their first taste of the subject. Necessary concepts from linear algebra and other mathematical disciplines necessary to understand the text are also covered. The concepts of vector algebra are covered in the first 100+ pages in great clarity. ⭐This is a great vector calculus book for the undergraduate. Sadly, though, it doesn’t seem like this will happen. So, I recommend that anyone who wants to really learn calculus, and not just learn to memorize formulas for applications, take the initiative and buy Colley’s book even if their college does not assign it.I also wish colleges would start assigning this book as the standard book in their curriculums since every student would be better off if they learned the material from this book and not any of the others listed above. 1 takes care of this issue well, and continues to show how linear algebra can be used for things like constraints and optimization problems, of course mentioning the obvious uses in economics, but also, in general, learning theory is more than just something economics majors should want to know, it’s something everyone ought to know, and everyone deserves to know.In this way, Stewart is not the end all be all calculus book, and Hughes-Hallet isn’t the only viable alternative, and, Hubbard and Hubbard and Theodore Shiffren’s quirky books are not the only books that integrate this material in this way, and Marsden and Tromba seems to fall short in comparison with Colley’s book. This book is by far the best multivariable calculus book for integrating linear algebra with calculus in arbitrary dimensions, and in particular, makes especially good work of explaining the linear relationship of coordinate systems and basis vectors, with non-linear analytical functions, and explains exactly how to express things like curves in terms of basis vectors, as linear combinations, which I personally believe is what confuses many lectures that teach these intro calculus classes, and since they themselves do not understand the material in this way, they do not teach their students the material with a theoretical emphasis. ⭐This book is awesome! Out of all the multivariable calculus and vector calculus books out there that claim to truly integrate calculus with linear algebra, none do it like Susan Colley does it. Reviews from Amazon users which were colected at the time this book was published on the website: Professor Colley is a member of several professional and honorary societies, including the American Mathematical Society, the Mathematical Association of America, Phi Beta Kappa, and Sigma Xi. ![]() She has lectured internationally on her research and has taught a wide range of subjects in undergraduate mathematics. Professor Colley has published papers on algebraic geometry and commutative algebra, as well as articles on other mathematical subjects. Her research focuses on enumerative problems in algebraic geometry, particularly concerning multiple-point singularities and higher-order contact of plane curves. degrees in mathematics from the Massachusetts Institute of Technology prior to joining the faculty at Oberlin in 1983. Editorial Reviews: About the Author Susan Colley is the Andrew and Pauline Delaney Professor of Mathematics at Oberlin College and currently Chair of the Department, having also previously served as Chair.
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