Simple Linear Algebra problem that's confusing me.
Show older comments
I'm stuck for the longest time on this problem: Find a row vector l such that lA = l, with A = [.2 .8; .7 .3]. This is somehow related to eigenvalues, is there such thing as a row eigenvector? thanks - Yingquan
1 Comment
Richard Brown
on 26 Apr 2012
a "row" eigenvector is usually called a left eigenvector
Answers (1)
Wayne King
on 25 Apr 2012
0 votes
I don't want to just give you the answer, but think of it this way
1.) Think of the typical eigenvalue problem, I'll use B as the matrix
Bx = \lambda x
2.) if 1 were an eigenvalue of B with some corresponding eigenvector x, then
Bx = x
3.) Now what if you transposed both sides of the above equation and let B'=A (where ' is the transpose)
Now do you see?
2 Comments
Antony Chung
on 26 Apr 2012
Are you saying to do B'*x'=x'?
3.) confused me a little bit.
Richard Brown
on 26 Apr 2012
don't forget the rule about transposing products ...
Categories
Find more on Linear Algebra in Help Center and File Exchange
on 25 Apr 2012
Community Treasure Hunt
Find the treasures in MATLAB Central and discover how the community can help you!
Start Hunting!
