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Advanced engineering mathematics / Erwin Kreyszig.

By: Publication details: Hoboken, NJ : John Wiley, c2007.Edition: 9th editionDescription: xvii, various pages : ill.(some col.) ; 26 cmISBN:
  • 0471488852 (cloth)
  • 0471728977 (hbk.)
  • 9780471728979
  • 0471726443 (pbk.)
  • 0471726451 (pbk.)
  • 047172646X (pbk.)
  • 9780471488859
Subject(s): DDC classification:
  • 510 22 KRE
Online resources:
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Holdings
Item type Current library Call number Copy number Status Date due Barcode Course reserves
Book Closed Access Book Closed Access Engineering Library 510 KRE 1 (Browse shelf(Opens below)) 1 Available BUML23070672

Electrical Technology SEMESTER II

Book Closed Access Book Closed Access Engineering Library 510 KRE 2 (Browse shelf(Opens below)) 2 Available BUML23070679

Engineering Mechanics SEMESTER I

Engineering Mathematics II SEMESTER II

Vocational Training SEMESTER III (RECESS)

Engineering Mathematics III SEMESTER I

Book Open Access Book Open Access Engineering Library 510 KRE 3 (Browse shelf(Opens below)) 3 Available 0000278

CONTENT

PART A: Ordinary differential equations
Chapter 1: First-order ODEs
Chapter 2: Second order linear ODEs
Chapter 3: Higher order linear ODEs
Chapter 4: Systems of ODEs. Phase plane. Qualitative methods
Chapter 5: Series solutions of ODEs. Special functions
Chapter 6: Laplace transforms

PART B: Linear algebra, vector calculus
Chapter 7: Linear algebra: Matrices, vectors, determinants. Linear systems.
Chapter 8: Linear algebra: Matrix eigenvalue problems
Chapter 9: Vector differential calculus. Grad, div, curl
Chapter 10: Vector integral calculus. Integral theorems

PART C: Fourier analysis. Partial differential equations
Chapter 11: Fourier series, integrals and transforms
Chapter 12: Partial differential equations

PART D: Complex analysis
Chapter 13: Complex numbers and functions
Chapter 14: Complex integration
Chapter 15: Power series, Taylor series
Chapter 16: Laurent series. Residue integration
Chapter 17: Conformal mapping
Chapter 18: Complex analysis and potential theory

PART E: Numeric analysis
Chapter 19: Numerics in general
Chapter 20: Numeric linear algebra
Chapter 21: Numerics for ODEs and PDEs

PART F: Optimization, graphs
Chapter 22: Unconstrained optimization. Linear programming
Chapter 23: Graphs. Combinatorial optimization

PART G: Probability and statistics
Chapter 24: Data analysis. Probability theory
Chapter 25: Mathematical statistics

Index : p. I1-I22

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