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Linear Differential Equations and Oscillators / Edition 1
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Barnes and Noble
Linear Differential Equations and Oscillators / Edition 1
Current price: $140.00
Barnes and Noble
Linear Differential Equations and Oscillators / Edition 1
Current price: $140.00
Loading Inventory...
Size: OS
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Linear Differential Equations and Oscillators is the first book within
Ordinary Differential Equations with Applications to Trajectories and Vibrations, Six-volume Set.
As a set, they are the fourth volume in the series
Mathematics and Physics Applied to Science and Technology
. This first book consists of chapters 1 and 2 of the fourth volume.
The first chapter covers linear differential equations of any order whose unforced solution can be obtained from the roots of a characteristic polynomial, namely those: (i) with constant coefficients; (ii) with homogeneous power coefficients with the exponent equal to the order of derivation. The method of characteristic polynomials is also applied to (iii) linear finite difference equations of any order with constant coefficients. The unforced and forced solutions of (i,ii,iii) are examples of some general properties of ordinary differential equations.
The second chapter applies the theory of the first chapter to linear second-order oscillators with one degree-of-freedom, such as the mechanical mass-damper-spring-force system and the electrical self-resistor-capacitor-battery circuit. In both cases are treated free undamped, damped, and amplified oscillations; also forced oscillations including beats, resonance, discrete and continuous spectra, and impulsive inputs.
Describes general properties of differential and finite difference equations, with focus on linear equations and constant and some power coefficients
Presents particular and general solutions for all cases of differential and finite difference equations
Provides complete solutions for many cases of forcing including resonant cases
Discusses applications to linear second-order mechanical and electrical oscillators with damping
Provides solutions with forcing including resonance using the characteristic polynomial, Green's functions, trigonometrical series, Fourier integrals and Laplace transforms