Respuesta :
Answer:
It is proved that [tex]V_h[/tex] is a solution of Ax=b.
Step-by-step explanation:
As given let w and p be a solution of Ax=b. Then,
[tex]Aw=0[/tex] and [tex]Ap=0[/tex]
Defining,
[tex]V_h=w-p[/tex]
To show [tex]V_h[/tex] is a solution of Ax=b, we have to show [tex]A(V_h)= 0[/tex]. Then,
[tex]A(V_h)[/tex]
[tex]=A(w-p)[/tex] (By putting value of [tex]V_h[/tex])
[tex]=Aw-Ap[/tex] (By distributive law)
[tex]=0[/tex] (Since w and p are solution of Ax=b)
Hence [tex]V_h[/tex] become a solution of the homogenous system Ax=b.
Since w and p are solution of Ax=b, and any linear combination of the solutions again a solution of Ax=b, this shows that every solution of Ax=b is of the form [tex]w=p+V_h[/tex] where [tex]V_h[/tex] is a solution of Ax=0.
The proofing of the theorem illustrates that Vh = solution of Ax = 0 and p = particular solution of Ax = b.
Proving the theorem.
Let w be the solution of Ax = b.
- Aw = b ........ equation i
p is a particular solution of Ax = b.
- Ap = b ....... equation ii
Subtract equation ii from i
Aw - Ap = 0
A(w - p) = 0
(w - p) is a solution of Ax = 0
Let vh = w - p
This is a homogeneous equation Ax = 0. A
Any solution w of system Ax = b can be written into form Vh = w - p; w = Vh + p.
where,
Vh = solution of Ax = 0.
p = particular solution of Ax = b.
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