03221nmm a2200421 u 4500001001200000003002700012005001700039007002400056008004100080020001800121100002300139245009700162250001700259260004800276300004300324505030400367653002200671653001800693653002500711653002600736653001800762653002600780653001300806653002200819653002600841653001300867653002700880653002500907653001600932653001300948710003400961041001900995989003601014490006301050856007201113082001101185520160301196EB000355872EBX0100000000000000020892400000000000000.0cr|||||||||||||||||||||130626 ||| eng a97803877127891 aRovenski, Vladimir00aModeling of Curves and Surfaces with MATLAB®hElektronische Ressourcecby Vladimir Rovenski a1st ed. 2010 aNew York, NYbSpringer New Yorkc2010, 2010 aXVI, 452 p. 156 illusbonline resource0 aFunctions and Transformations -- Functions and Graphs -- Rigid Motions (Isometries) -- Affine and Projective Transformations -- Möbius Transformations -- Curves and Surfaces -- Examples of Curves -- Geometry of Curves -- Geometry of Surfaces -- Examples of Surfaces -- Piecewise Curves and Surfaces aComputer graphics aVisualization aDiscrete Mathematics aDifferential geometry aVisualization aMathematical analysis aAnalysis aComputer Graphics aDifferential Geometry aGeometry aAnalysis (Mathematics) aDiscrete mathematics aMathematics aGeometry2 aSpringerLink (Online service)07aeng2ISO 639-2 bSpringeraSpringer eBooks 2005-0 aSpringer Undergraduate Texts in Mathematics and Technology uhttps://doi.org/10.1007/978-0-387-71278-9?nosfx=yxVerlag3Volltext0 a516.36 aThis text on geometry is devoted to various central geometrical topics including: graphs of functions, transformations, (non-)Euclidean geometries, curves and surfaces as well as their applications in a variety of disciplines. This book presents elementary methods for analytical modeling and demonstrates the potential for symbolic computational tools to support the development of analytical solutions. The author systematically examines several powerful tools of MATLAB® including 2D and 3D animation of geometric images with shadows and colors, transformations using matrices, and then studies more complex geometrical modeling problems related to analysis of curves and surfaces. With over 150 stimulating exercises and problems, this text integrates traditional differential and non-Euclidean geometries with more current computer systems in a practical and user-friendly format. This text greatly extends the author’s previous title, Geometry of Curves and Surfaces with Maple (Birkhäuser, © 2000), and has a different focus. In addition to being applications driven and motivated by numerous examples and exercises from real-world fields, the book also contains over 60 percent new material, including new sections with complex numbers, quaternions, matrices and transformations, hyperbolic geometry, fractals, and surface-splines and over 300 figures reproducible using MATLAB® programs. This text is an excellent classroom resource or self-study reference for undergraduate students in a variety of disciplines, engineers, computer scientists, and instructors of applied mathematics