Solution to inhomogenous linear equation

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whyayeman
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How do I show the difference of two solutions of an inhomogenous linear equation Lu=g with the same g is a solution of the homogenous equation Lu=0.

Your help is much appreciated.

thanks a lot.
 
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Can you please clarify what you mean. What two solutions ?

Are you saying you have a system where Lu=g and Lu = 0 ?
 
Hi thanks for the response.

Yes, there are two systems Lu= 0 and Lu=g. I read in a book that the consequence of linearity is that if you add a homogenous solution to and inhomogenous solution , you get an inhomogeneous solution, you get an inhomogenous solution. They have not explained why?
 
whyayeman said:
How do I show the difference of two solutions of an inhomogenous linear equation Lu=g with the same g is a solution of the homogenous equation Lu=0.
This is pretty straightforward. Assume that u1 and u2 are solutions to to the nonhomogeneous linear differential equation Lu = g.

What can you say about L(u1 - u2)?
 
Mark44,

beautifully explained.

so L(u1 - u2) = L(u1) - L(u2) = 0 ? Am I right?
 
whyayeman said:
Mark44,

beautifully explained.

so L(u1 - u2) = L(u1) - L(u2) = 0 ? Am I right?
Yes. Make sure that you add what this says about u1 - u2.
 
The solution to inhomogeneous equation of
L[tex]\underline{u}[/tex]=[tex]\underline{g}[/tex]
is the parametric solution of L[tex]\underline{u}[/tex]=[tex]\underline{0}[/tex] + [tex]\underline{g}[/tex]