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Handbook of Writing for the Mathematical Sciences provides advice on all aspects of scientific writing, with a particular focus on writing mathematics. Its readable style and handy format, coupled with an extensive bibliography and comprehensive index, make it useful for everyone from undergraduates to seasoned professionals. This third edition revises, updates, and expands the best-selling second edition to reflect modern writing and publishing practices and builds on the author's extensive experience in writing and speaking about mathematics. Some of its key features include coverage of fundamentals of writing, including English usage, revising a draft, and writing when your first language is not English; thorough treatment of mathematical writing, including how to choose notation, how to choose between words and symbols, and how to format equations; and many tips for exploiting LaTeX and BibTeX. Higham also provides advice on how to write and publish a paper, covering the entire publication process, and includes anecdotes, quotes, and unusual facts that enliven the presentation. The new edition has been reorganized to make the book easier to use for reference; treats modern developments in publishing such as open access, DOIs, and ORCID; and contains more on poster design, including e-posters and the poster blitz. The new edition also includes five new chapters on the following topics: · workflow covering text editors, markup languages, version control, and much more; · the principles of indexing and how to prepare an index in LaTeX; · reviewing a paper, book proposal, or book; · writing a book, including advice on choosing a publisher and LaTeX tips particular to books; and · writing a blog post.
Nick Higham follows up his successful HWMS volume with this much-anticipated second edition.
Good writing conveys more than the author originally had in mind, while poor writing conveys less. Well written papers are more quickly accepted and put into print and more widely read and appreciated than poorly written ones—and for notes, monographs, and books the quality of writing is of more importance that it is for papers. In Writing Mathematics Well, Leonard Gillman tells his readers how to develop a clear and effective style. All aspects of mathematical writing are covered, from general organization and choice of title, to the presentation of results, to fine points on using words and symbols, to revision, and, finally, to the mechanics of putting your manuscript into print. No book can by itself make you a better writer, but this one will alert you to the opportunities for better and more forceful writing. It does this both by precept and by example. This is no bland collection of rules, but a lively guide in the style of Strunk and White or Fowler—a book to be read for its sharpness and wit as well as for enlightenment. Writing Mathematics Well should be on the shelf of anyone who writes or intends to write mathematics. It will amuse and delight the already careful writer and it will help reform and refine the sensibilities of those who may be somewhat careless about their writing.
Do you know precisely how your creativity happens? Can you coach other people to be more creative? This book is a how-to guide focused on helping you to generate great—or even greater—ideas by showing you “how to do it” and how to teach others how to do it, too. Written specifically for those working in the mathematical sciences, this book provides a proven process for idea generation and a wide range of mathematically oriented examples. Building on the authors’ many years of experience running creativity workshops, How to Be Creative: A Practical Guide for the Mathematical Sciences gives a six-step process for generating great ideas that can be used by individuals or groups, provides examples demonstrating how these concepts have been or might be used in practice in the mathematical sciences, presents seven tried and tested briefs that can be used at creativity workshops, and offers guidance on to how to evaluate ideas wisely and how to build a team culture in which creativity flourishes. This book is for anyone in the mathematical sciences who wants to be more creative or who wishes to train others in creativity.
The properties of materials provide key information regarding their appropriateness for a product and how they will function in service. The Third Edition provides a relevant discussion and vital examples of the fundamentals of materials science so that these details can be applied in real-world situations. Horath effectively combines principles and theory with practical applications used in today's machines, devices, structures, and consumer products. The basic premises of materials science and mechanical behavior are explored as they relate to all types of materials: ferrous and nonferrous metals; polymers and elastomers; wood and wood products; ceramics and glass; cement, concrete, and asphalt; composites; adhesives and coatings; fuels and lubricants; and smart materials. Valuable and insightful coverage of the destructive and nondestructive evaluation of material properties builds the groundwork for inspection processes and testing techniques, such as tensile, creep, compression, shear, bend or flexure, hardness, impact, and fatigue. Laboratory exercises and reference materials are included for hands-on learning in a supervised environment, which promotes a perceptive understanding of why we study and test materials and develop skills in industry-sanctioned testing procedures, data collection, reporting and graphing, and determining additional appropriate tests.
This book will help those wishing to teach a course in technical writing, or who wish to write themselves.
Convenient access to information from every area of mathematics: Fourier transforms, Z transforms, linear and nonlinear programming, calculus of variations, random-process theory, special functions, combinatorial analysis, game theory, much more.
If there is a formula to solve a given problem in mathematics, it can be found in Alan Jeffrey's Handbook of Mathematical Formulas and Integrals. Thanks to its unique thumb-tab indexing feature, answers are easy to find based upon the type of problem they solve. The handbook covers important formulas, functions, relations, and methods from algebra, trigonomic and exponential functions, combinatorics, probability, matrix theory, calculus and vector calculus, both ordinary and partial differential equations, Fourier series, orthogonal polynomials, and Laplace transforms. Equations are computer-validated with Scientific WorkPlace and Mathematica. -- Back cover