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Advanced engineering mathematics / Dennis G. Zill [and] Michael R. Cullen.

By: Zill, Dennis G, 1940-.
Contributor(s): Cullen, Michael R.
Publisher: Sudbury, MA : Jones and Bartlett Publishers, c2005Edition: 3rd ed.Subject(s): Engineering mathematicsDDC classification: 620.00151
Contents:
xxxiii, 929, [86] p. :
Preface. - Pt. 1. Ordinary differential equations. Ch. 1. Introduction to differential equations. Ch. 2. First-order differential equations. Ch. 3. Higher-order differential equations. Ch. 4. The laplace transform. Ch. 5. Series solutions of linear differential equations. Ch. 6. Numerical solutions of ordinary differential equations. - Pt. 2. Vectors, matrices, and vector calculus. Ch. 7. Vectors. Ch. 8. Matrices. Ch. 9. Vector calculus. - Pt. 3. Systems of differential equations. Ch. 10. Systems of linear differential equations. Ch. 11. Systems of nonlinear differential equations. - Pt. 4. Fourier deries and partial differential equations. Ch. 12. orthogonal functions and fourier series. Ch. 13. Boundary-value problems in rectangular coordinates. Ch. 14. Boundary-value problems in other coordinate systems. Ch. 15. Integral transform method. Ch. 16. Numerical solutions of partial differential equations. - Pt. 5. Complex analysis. Ch. 17. Functions of a complex variable. Ch. 18., Integration in the complex plane. Ch. 19. Series and residues. Ch. 20. Conformal mappings. - Appendices. - Answers for delected odd-numbered problems. - Index.
Item type Current location Call number Copy number Status Notes Date due Barcode Remark
Main Collection TU External Storage-LCS
620.00151 ZIL (Browse shelf) 1 Available SOExx,07015,03,GR 5000064597 Please fill up online form at https://taylorslibrary.taylors.edu.my/services/external_storage1

Includes index.

xxxiii, 929, [86] p. : ill. ; 29 cm.

Preface. - Pt. 1. Ordinary differential equations. Ch. 1. Introduction to differential equations. Ch. 2. First-order differential equations. Ch. 3. Higher-order differential equations. Ch. 4. The laplace transform. Ch. 5. Series solutions of linear differential equations. Ch. 6. Numerical solutions of ordinary differential equations. - Pt. 2. Vectors, matrices, and vector calculus. Ch. 7. Vectors. Ch. 8. Matrices. Ch. 9. Vector calculus. - Pt. 3. Systems of differential equations. Ch. 10. Systems of linear differential equations. Ch. 11. Systems of nonlinear differential equations. - Pt. 4. Fourier deries and partial differential equations. Ch. 12. orthogonal functions and fourier series. Ch. 13. Boundary-value problems in rectangular coordinates. Ch. 14. Boundary-value problems in other coordinate systems. Ch. 15. Integral transform method. Ch. 16. Numerical solutions of partial differential equations. - Pt. 5. Complex analysis. Ch. 17. Functions of a complex variable. Ch. 18., Integration in the complex plane. Ch. 19. Series and residues. Ch. 20. Conformal mappings. - Appendices. - Answers for delected odd-numbered problems. - Index.