
This crossdisciplinary field utilizes the strange effects of quantum mechanics to enable information processing and computing that would be impossible on traditional 'classical' computers. The field has developed rapidly over the last few years due in part to its tremendous technological potential. The theoretical foundations of the subject are clearly established and good textbooks are...




Discusses efficient use of automatic differentiation to solve real problems, especially multidimensional zerofinding and optimization in the MATLAB environment.




For social scientists, it is often confusing how to determine when missing data is a problem in analyses and how to handle it. This book presents a comprehensive overview of the available methods, focusing on which method should be used for specific problems. It features numerous real and simulated data examples to illustrate how the methods can be applied once the appropriate technique has...




This book covers the elementary school mathematics curriculum common in most parts of the world. Its aim is to serve educators (teachers and parents) as a guide for teaching mathematics at elementary school level. The book focuses both on content knowledge and on pedagogical content knowledge. It bridges the gap between fundamental mathematical principles and good teaching practices. It also...




Designed for researchers and data analysts, this book presents rigorous statistical methods without burdening readers with mathematical theory. Readers see how linear regression and ANOVA can be used in biology, agriculture, health science, environmental science, fisheries, forestry, as well as the physical, social, and behavioral sciences. Each statistical topic is illustrated using detailed...




Originally published in 1921, this book by renowned British mathematician E. H. Neville attempts to develop geometrical methods in fourdimensional space.




Offering a detailed and careful explanation of the methods, this book delineates Bayesian non parametric techniques to be used in health care and the statistical evaluation of diagnostic tests to determine accuracy before mass use in practice. Unique to these methods is the incorporation of prior information and elimination of subjective beliefs and asymptotic results. It includes examples...




Technology plays a crucial role in contemporary mathematics education. Teaching Secondary Mathematics covers major contemporary issues in mathematics education, as well as how to teach key mathematics concepts from the Australian Curriculum: Mathematics. It integrates digital resources via Cambridge HOTmaths (www.hotmaths.com.au), a popular, awardwinning online tool with engaging multimedia that...




Originally published in 1962, as the second edition of a 1930 original, 'the main purpose of the book is to give a logical connected account of the subject, by starting with the definition of 'Number' and proceeding in what appears ... to be a natural sequence of steps'. The chapters cover all of the cornerstones of complex mathematical analyses; chapters include, 'Bounds and limits of...




This book summarises the state of the art in computer visionbased driver and road monitoring, focussing on monocular vision technology in particular, with the aim to address challenges of driver assistance and autonomous driving systems. While the systems designed for the assistance of drivers of onroad vehicles are currently converging to the design of autonomous vehicles, the...




This book provides an introduction to the basics and recent developments of commutative algebra. A glance at the contents of the first five chapters shows that the topics covered are ones that usually are included in any commutative algebra text. However, the contents of this book differ significantly from most commutative algebra texts: namely, its treatment of the DedekindMertens formula, the...





This book gives an excellent and uptodate overview on the convergence and joint progress in the fields of Generalized Functions and Fourier Analysis, notably in the core disciplines of pseudodifferential operators, microlocal analysis and timefrequency analysis. The volume is a collection of chapters addressing these fields, their interaction, their unifying concepts and their applications...




This book presents a series of lectures on three of the best known examples of free discontinuity problems: the MumfordShah model for image segmentation, a variational model for the epitaxial growth of thin films, and the sharp interface limit of the OhtaKawasaki model for pattern formation in dyblock copolymers.




Acquisition of Complex Arithmetic Skills and HigherOrder Mathematics Concepts focuses on typical and atypical learning of complex arithmetic skills and higherorder math concepts. As part of the series Mathematical Cognition and Learning, this volume covers recent advances in the understanding of children's developing competencies with wholenumber arithmetic, fractions, and...




Formelsamlingen er spesielt skrevet for matte 2 faget ved UiA Grimstad. Den er utvidet med matte 3 innhold og en del grunnleggende formler. Den er ogsa full av nyttige tabeller. Temaer i heftet inkluderer: Lineaer algebra: Lineaere likningssystemer, vektorer, matriser, transformasjoner, determinant, egenverdier, egenvektorer. Differensiallikninger: Grunnleggende modellering. Losning ved...




This book includes new functions and new numbers not immagenary and not real.




Get Better Results with high quality content, exercise sets, and stepbystep pedagogy The Miller/O'Neill/Hyde author team continues to offer an enlightened approach grounded in the fundamentals of classroom experience in Intermediate Algebra 4e. The text reflects the compassion and insight of its experienced author team with features developed to address the specific needs of developmental...





In this book I started from the definition of derivative of a map into Banach algebra. I considered properties of derivative and derivatives of higher order. I considered differential forms in Banach Algebra and solving of differential equations. If differential form is integrable, we may consider its definite and indefinite integrals.


