The coefficient matrix for a system of linear differential equations of the form y′=Ay has the given eigenvalues and eigenspace bases. Find the genera

Nann

Nann

Answered question

2021-06-17

The coefficient matrix for a system of linear differential equations of the form y′=Ay has the given eigenvalues and eigenspace bases. Find the general solution for the system.
λ1=1{[21]},λ2=3{[31]}

Answer & Explanation

liingliing8

liingliing8

Skilled2021-06-18Added 95 answers

By theorem, we know that the solution is

y=c1(eλ1t)u1++cn(eλnt)un

with λi the eigenvalues of the matrix A and ui, the eigenvalues. Thus for this case we then obtain the general solution:

[y1y2]=y=c1et[21]+c2e3t[31] 

Thus we obtain: y1=2c1et+3c2e3t

y2=c1et+c2e3t

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