Tomas B. Co
Methods of Applied Mathematics for Engineers and Scientists
Tomas B. Co
Methods of Applied Mathematics for Engineers and Scientists
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This engineering mathematics textbook is rich with examples, applications and exercises, and emphasises applying matrices.
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This engineering mathematics textbook is rich with examples, applications and exercises, and emphasises applying matrices.
Produktdetails
- Produktdetails
- Verlag: Cambridge University Press
- Seitenzahl: 586
- Erscheinungstermin: 15. August 2013
- Englisch
- Abmessung: 260mm x 183mm x 36mm
- Gewicht: 1284g
- ISBN-13: 9781107004122
- ISBN-10: 1107004128
- Artikelnr.: 37801080
- Verlag: Cambridge University Press
- Seitenzahl: 586
- Erscheinungstermin: 15. August 2013
- Englisch
- Abmessung: 260mm x 183mm x 36mm
- Gewicht: 1284g
- ISBN-13: 9781107004122
- ISBN-10: 1107004128
- Artikelnr.: 37801080
Tomas Co is a professor of chemical engineering at Michigan Technological University. After completing his PhD in chemical engineering at the University of Massachusetts, Amherst he was a postdoctoral researcher at Lehigh University, a visiting researcher at Honeywell Corp., and a visiting professor at Korea University. He has been teaching applied mathematics to graduate and advanced undergraduate students at Michigan Tech for more than twenty years. His research areas include advanced process control including plant-wide control, nonlinear control and fuzzy logic. His journal publications span broad areas in such journals as IEEE Transactions in Automatic Control, Automatica, the AIChE Journal, Computers in Chemical Engineering, and Chemical Engineering Progress. He is a regular nominee for the Distinguished Teaching Awards at Michigan Tech and is a member of the Michigan Technological University Academy of Teaching Excellence.
1. Matrix algebra
2. Solution of multiple equations
3. Matrix analysis
4. Vectors and tensors
5. Integral theorems
6. Ordinary differential equations: analytical solutions
7. Numerical solution of initial and boundary value problems
8. Qualitative analysis of ordinary differential equations
9. Series solutions of linear ordinary differential equations
10. First order partial differential equations and the method of characteristics
11. Linear partial differential equations
12. Integral transform methods
13. Finite difference methods
14. Method of finite elements.
2. Solution of multiple equations
3. Matrix analysis
4. Vectors and tensors
5. Integral theorems
6. Ordinary differential equations: analytical solutions
7. Numerical solution of initial and boundary value problems
8. Qualitative analysis of ordinary differential equations
9. Series solutions of linear ordinary differential equations
10. First order partial differential equations and the method of characteristics
11. Linear partial differential equations
12. Integral transform methods
13. Finite difference methods
14. Method of finite elements.
1. Matrix algebra
2. Solution of multiple equations
3. Matrix analysis
4. Vectors and tensors
5. Integral theorems
6. Ordinary differential equations: analytical solutions
7. Numerical solution of initial and boundary value problems
8. Qualitative analysis of ordinary differential equations
9. Series solutions of linear ordinary differential equations
10. First order partial differential equations and the method of characteristics
11. Linear partial differential equations
12. Integral transform methods
13. Finite difference methods
14. Method of finite elements.
2. Solution of multiple equations
3. Matrix analysis
4. Vectors and tensors
5. Integral theorems
6. Ordinary differential equations: analytical solutions
7. Numerical solution of initial and boundary value problems
8. Qualitative analysis of ordinary differential equations
9. Series solutions of linear ordinary differential equations
10. First order partial differential equations and the method of characteristics
11. Linear partial differential equations
12. Integral transform methods
13. Finite difference methods
14. Method of finite elements.