<?xml version="1.0" encoding="UTF-8"?>
<collection xmlns="http://www.loc.gov/MARC21/slim">
 <record>
  <leader>02593nam a2200385 a 4500</leader>
  <controlfield tag="001">TVCDKTCT9356</controlfield>
  <controlfield tag="003">Thư viện trường Cao đẳng Kỹ thuật Cao Thắng</controlfield>
  <controlfield tag="005">20170524102237.3</controlfield>
  <controlfield tag="008">080508</controlfield>
  <datafield tag="980" ind1="\" ind2="\">
   <subfield code="a">Thư viện Trường CĐ Kỹ Thuật Cao Thắng</subfield>
  </datafield>
  <datafield tag="024" ind1=" " ind2=" ">
   <subfield code="a">RG_1 #1 eb0 i1</subfield>
  </datafield>
  <datafield tag="020" ind1="#" ind2="#">
   <subfield code="a">1842653644</subfield>
  </datafield>
  <datafield tag="041" ind1="0" ind2="#">
   <subfield code="a">vie</subfield>
  </datafield>
  <datafield tag="082" ind1="#" ind2="#">
   <subfield code="a">005.131 / </subfield>
   <subfield code="b">N511E-m</subfield>
  </datafield>
  <datafield tag="100" ind1="1" ind2="#">
   <subfield code="a">Pal Madhumangal</subfield>
  </datafield>
  <datafield tag="245" ind1="0" ind2="0">
   <subfield code="a">Numerical Analysis for Scientists and Engineers : Theory and C Programs ( Sách photocoppy) / </subfield>
   <subfield code="c">Pal Madhumangal</subfield>
  </datafield>
  <datafield tag="250" ind1="#" ind2="#">
   <subfield code="a">In lần thứ 1</subfield>
  </datafield>
  <datafield tag="260" ind1="#" ind2="#">
   <subfield code="a">England : </subfield>
   <subfield code="b">Alpha Science International , </subfield>
   <subfield code="c">2007</subfield>
  </datafield>
  <datafield tag="300" ind1="#" ind2="#">
   <subfield code="a">654tr. ; </subfield>
   <subfield code="c">29cm.</subfield>
  </datafield>
  <datafield tag="520" ind1="#" ind2="#">
   <subfield code="a">1. Erros in Numerical Computations</subfield>
  </datafield>
  <datafield tag="520" ind1="#" ind2="#">
   <subfield code="a">10. Least Squares Approximation</subfield>
  </datafield>
  <datafield tag="520" ind1="#" ind2="#">
   <subfield code="a">2 . Calculus of Finite Differences Equations</subfield>
  </datafield>
  <datafield tag="520" ind1="#" ind2="#">
   <subfield code="a">3. Interpolation</subfield>
  </datafield>
  <datafield tag="520" ind1="#" ind2="#">
   <subfield code="a">4. Solution of Algebraic and Transcendental Equations</subfield>
  </datafield>
  <datafield tag="520" ind1="#" ind2="#">
   <subfield code="a">5. Solution of System of Linear Equations</subfield>
  </datafield>
  <datafield tag="520" ind1="#" ind2="#">
   <subfield code="a">6. Eigenvalues and Eigenvectors of a Matrix</subfield>
  </datafield>
  <datafield tag="520" ind1="#" ind2="#">
   <subfield code="a">7. Differentiation and Integration</subfield>
  </datafield>
  <datafield tag="520" ind1="#" ind2="#">
   <subfield code="a">8. Ordinary Differential Equations</subfield>
  </datafield>
  <datafield tag="520" ind1="#" ind2="#">
   <subfield code="a">9. Partial Differential Equations</subfield>
  </datafield>
  <datafield tag="520" ind1="#" ind2="#">
   <subfield code="a">Contens :</subfield>
  </datafield>
  <datafield tag="520" ind1="#" ind2="#">
   <subfield code="a">Numerical Analysis for Scientists and Engineers develops the subject gradually by illustrating several examples for both the beginners and the advanced readers using very simple language. The classical and recently developed numerical methods are derived from mathematical and computational points of view. Different aspects of errors in computation are discussed in detailed. Some finite difference operators and different techniques to solve difference equations are presented here. Various types of interpolation, including cubic-spline, methods and their applications are introduced. Direct and iterative methods for solving algebraic and transcendental equations, linear system of equations, evaluation of determinant and matrix inversion, computation of eigenvalues and eigenvectors of a matrix are well discussed in this book. Detailed concept of curve fitting and function approximation, differentiation and integration (including Monte Carlo method) are given. Many numerical methods to solve ordinary and partial differential equations with their stability and analysis are also presented. The algorithms and programs in C are designed for most of the numerical methods.</subfield>
  </datafield>
  <datafield tag="650" ind1="#" ind2="4">
   <subfield code="a">C Programs</subfield>
  </datafield>
  <datafield tag="650" ind1="#" ind2="4">
   <subfield code="a">Numerical Analysis</subfield>
  </datafield>
  <datafield tag="721" ind1="#" ind2="#">
   <subfield code="a">Công nghệ thông tin</subfield>
  </datafield>
  <datafield tag="841" ind1="#" ind2="#">
   <subfield code="b">Kho Sách </subfield>
   <subfield code="j">100025079, 100025540, 100025550</subfield>
  </datafield>
 </record>
</collection>
