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1.What is eigenvalue and eigenvector?

Let Linear transformation L:V->V be a linear transformation of an n-dimensional vector space V into itself. The number λ is called an eigenvalueof L if there exist a non zero vector x in V such that 

L(X) = λ*x Note that every non zero vector x satisfying this equation is then called an eigenvector of L associated with the eigenvalue λ.(Eigen means 'proper' in German).

                                                              -referenced from Elementary Linear Algebra with Applications and Labs

In another way,eigenvector can be referred as a square matrix which parallel to the original vector after multiplied to the vector.

2.How to calculate eigenvalue and eigenvector?

a.from the definition it can be derived that if A is the original vector, A*x=λ*x.
b.By subtracting both sides of the equation by λ*x, the equation will be : A*x-λ*x=0.
c.By the definition of identity matrix, it is fine to add I to the λ*x term; A*x-λ*I*x=0.(Note: A*I=A for every matrix A,I is a matrix with ones on the main diagonal and zeros elsewhere.)
d.By taking out the x matrix, the equaiton will be: (A-λ*I)*x=0.If there exists (A-λ*I)^-1 then both sides can be multiplied by it, to obtain x = 0.But if A − λI is not invertible,the determinant of the (A-λ*I) will be 0 and this λ can be calculated.
e.By changing λ to the calculated value in step d. to step a. the corresponding eigenvector x can be obtained.

Alternative way:

If a matlab software is available the steps stated above can be done by program.

a.first enter the matrix that you want to calculate: A=[a,b,c;d,e,f;g,h,i].

the screen will show: --referenced by Linear Algebra with Labs with matlab

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