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190304  eng 
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a 9783319764061

100 
1 

a TahirKheli, Raza

245 
0 
0 
a Ordinary Differential Equations
h Elektronische Ressource
b Mathematical Tools for Physicists
c by Raza TahirKheli

250 


a 1st ed. 2018

260 


a Cham
b Springer International Publishing
c 2018, 2018

300 


a XXII, 408 p. 65 illus., 1 illus. in color
b online resource

505 
0 

a Preface  Differential Operator  Some Definitions  Linear Ordinary Differential Equations with Known Constant Coefficients (linODECC)  Linear Ordinary Differential Equations with Known Variable Coefficients (linODEVC)  Special Types of Differential Equations  Special Situations  OM  RLC  FROBSOL  NUMSOL  Answers to Problems from Various Chapters

653 


a Mechanics, Applied

653 


a Engineering Mechanics

653 


a Mathematical Physics

653 


a Mathematical physics

653 


a Differential Equations

653 


a Differential equations

653 


a Mathematical Methods in Physics

041 
0 
7 
a eng
2 ISO 6392

989 


b Springer
a Springer eBooks 2005

028 
5 
0 
a 10.1007/9783319764061

856 
4 
0 
u https://doi.org/10.1007/9783319764061?nosfx=y
x Verlag
3 Volltext

082 
0 

a 530.15

520 


a This textbook describes rules and procedures for the use of Differential Operators (DO) in Ordinary Differential Equations (ODE ). The book provides a detailed theoretical and numerical description of ODE. It presents a large variety of ODE and the chosen groups are used to solve a host of physical problems. Solving these problems is of interest primarily to students of science, such as physics, engineering, biology and chemistry. Scientists are greatly assisted by using the DO obeying several simple algebraic rules. The book describes these rules and, to help the reader, the vocabulary and the definitions used throughout the text are provided. A thorough description of the relatively straightforward methodology for solving ODE is given. The book provides solutions to a large number of associated problems. ODE that are integrable, or those that have one of the two variables missing in any explicit form are also treated with solved problems. The physics and applicable mathematics are explained and many associated problems are analyzed and solved in detail. Numerical solutions are analyzed and the level of exactness obtained under various approximations is discussed in detail.
