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LEADER: 03152cam a22003734a 4500
001 5089271
005 20221109214911.0
008 040804t20052005njua b 001 0 eng
010 $a 2004058042
015 $aGBA477009$2bnb
016 7 $a013023547$2Uk
020 $a0471697389 (cloth : acid-free paper)
035 $a(OCoLC)ocm56875937
035 $a(NNC)5089271
035 $a5089271
040 $aDLC$cDLC$dUKM$dC#P$dOrLoB-B
042 $apcc
050 00 $aQA371.5.D37$b.S78 2005
082 00 $a515/.352$222
100 1 $aStanoyevitch, Alexander.$0http://id.loc.gov/authorities/names/n2004010927
245 10 $aIntroduction to numerical ordinary and partial differential equations using MATLAB /$cAlexander Stanoyevitch.
260 $aHoboken, N.J. :$bWiley-Interscience,$c[2005], ©2005.
300 $axiv, 813 pages :$billustrations ;$c25 cm.
336 $atext$btxt$2rdacontent
337 $aunmediated$bn$2rdamedia
490 1 $aPure and applied mathematics
504 $aIncludes bibliographical references (p. 799-804) and indexes.
505 00 $gCh. 1.$tMATLAB basics -- $gCh. 2.$tBasic concepts of numerical analysis with Taylor's theorem -- $gCh. 3.$tIntroduction to m-files -- $gCh. 4.$tProgramming in MATLAB -- $gCh. 5.$tFloating point arithmetic and error analysis -- $gCh. 6.$tRootfinding -- $gCh. 7.$tMatrices and linear systems -- $gCh. 8.$tIntroduction to differential equations -- $gCh. 9.$tSystems of first-order differential equations and higher-order differential equations -- $gCh. 10.$tBoundary value problems for ordinary differential equations -- $gCh. 11.$tIntroduction to partial differential equations -- $gCh. 12.$tHyperbolic and parabolic partial differential equations -- $gCh. 13.$tThe finite element method -- $gApp. A.$tIntroduction to MATLAB's symbolic toolbox.
520 1 $a"Introduction to Numerical Ordinary and Partial Differential Equations Using MATLAB teaches readers how to numerically solve both ordinary and partial differential equations with ease. This publication brings together a skillful treatment of MATLAB and programming alongside theory and modeling. By presenting these topics in tandem, the author enables and encourages readers to perform their own computer experiments, leading them to a more profound understanding of differential equations." "This textbook can be tailored for courses in numerical differential equations and numerical analysis as well as traditional courses in ordinary and/or partial differential equations. All the material has been classroom-tested over the course of many years, with the result that any self-learner with an understanding of basic single-variable calculus can master this topic."--BOOK JACKET.
650 0 $aDifferential equations$xNumerical solutions$xData processing.$0http://id.loc.gov/authorities/subjects/sh2009123366
650 0 $aDifferential equations, Partial$xNumerical solutions$xData processing.
630 00 $aMATLAB.$0http://id.loc.gov/authorities/names/n92036881
830 0 $aPure and applied mathematics (John Wiley & Sons : Unnumbered)$0http://id.loc.gov/authorities/names/n42745140
852 00 $bmat$hQA371.5.D37$i.S78 2005