Advanced engineering mathematics / Erwin Kreyszig ; in collaboration with Herbert Kreyszig and Edward J. Norminton.
By: Kreyszig, Erwin
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Contributor(s): Kreyszig, Herbert | Norminton, E. J. (Edward J.).
Material type: 
BookPublisher: Hoboken, NJ : John Wiley, 2011Edition: 10th edition.Description: various pagings : ill. ; 27 cm.ISBN: 9780470646137.Subject(s): Mathematical physics | Engineering mathematicsDDC classification: 510.2462 | Item type | Current library | Call number | Copy number | Status | Date due | Barcode | Item holds |
|---|---|---|---|---|---|---|---|
| General Lending | MTU Bishopstown Library Lending | 510.2462 (Browse shelf(Opens below)) | 1 | Available | 00163158 | ||
| General Lending | MTU Bishopstown Library Lending | 510.2462 (Browse shelf(Opens below)) | 1 | Available | 00163157 |
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| 510.2462 Engineering mathematics / | 510.2462 Engineering mathematics / | 510.2462 Advanced engineering mathematics / | 510.2462 Advanced engineering mathematics / | 510.2462 Advanced engineering mathematics / | 510.2462 Basic engineering mathematics / | 510.2462 Basic engineering mathematics / |
Enhanced descriptions from Syndetics:
This market-leading text is known for its comprehensive coverage, careful and correct mathematics, outstanding exercises, and self contained subject matter parts for maximum flexibility. The new edition continues with the tradition of providing instructors and students with a comprehensive and up-to-date resource for teaching and learning engineering mathematics, that is, applied mathematics for engineers and physicists, mathematicians and computer scientists, as well as members of other disciplines.
This edition can be accompanied with WileyPLUS 5.0 , a powerful online teaching and learning environment that integrates the entire digital textbook with the most effective resources to fit every learning style.
Includes bibliographical references and index.
Part A: Ordinary differential equations (ODEs) -- First-order ODEs -- Second-order Linear ODEs -- Higher order linear ODEs -- Systems of ODEs. phase plane. qualitative methods -- Series solutions of ODEs. special functions -- Laplace transforms -- Part B: Linear algebra. Vector calculus -- Linear algebra: matrices, vectors, determinants. linear systems -- Linear Algebra: matrix eigenvalue problems -- Vector differential calculus. grad, div, curl -- Vector integral calculus. itegral theorems -- Part C: Fourier analysis. Partial differential equations (PDEs) -- Fourier analysis -- Partial differential equations (PDEs) -- Part D: Complex analysis -- Complex numbers and functions Complex differentiation -- Complex integration -- Power series, Taylor series -- Laurent series. Residue integration -- Conformal mapping -- Complex analysis and potential theory -- Part E: Numeric Analysis Software -- Numbers in general -- Numeric linear algebra -- Numerics for ODEs and PDEs -- Part F: Optimization, graphs -- Unconstrained optimization. linear programming -- Graphs, combinatorial optimization.
CIT Module STAT 8002 - Core reading.
CIT Module MATH 7005 - Core reading.
CIT Module MATH 8010 - Core reading
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CIT Module MATH 7010 - Supplementary reading
CIT Module MATH 8008 - Supplementary reading.
CIT Module MATH 8005 - Supplementary reading.
CIT Module MATH 8003 - Core reading.
CIT Module MATH 7013 - Supplementary reading