Transforming Order of ODE System

Mr.Brown
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Hi
i got a question trying to solve some problems from my schools webpage and encountered a problem where I am given 2 RLC-Circuits and the corresponding dgls for the oscillation ( no problem so for all the standart basic E/M stuff)

But then I am asked to transform this system of 2 dgl´s of second order to a system of first order ode´s ( think i´ll need 4 of them)

It ´s kind of the same thing like transforming from lagrange to hamilton mechanics ( in a waage sense at least :) )

Could you just test me which technique to use no need for a extensive explanetion of how to do don´t want to steals one´s time ;) Can look that up in a book.
bye and thanks so far :)
 
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Usually you can transform a second order ode to first order ode by using a Laplace transformation.
 
I not up on the EE jargon (dgl?) but, if you have a second-order diff. equation, you can turn it into a system of first order diff eq's (say y is a function of x) by replacing u=y and v=y' (so the second-order term y" is replaced by v').
This leads to a matrix form of the problem.
(Try the ode book by Boyce and DiPrima)
 
thx so far you really helped me out :)
 
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