A $ n \times n $ matrix $A$ is a tridiagonal symmetric marix such that its diagonal entries are all 2 except the final $n \times n$ element which is 1 and its superdiagonal and subdiagonal elements are all -1.
Is there any analytic method to find its eigenvalues?
I know how to find the eigenvalues of this type matrix when the last element is alos 2 by solving corresponding linear recurrence euation as in
http://www.cems.uvm.edu/~tlakoba/math337/proof_eigensystem_tridiagonal.pdf
But the same method seems to be fail in my case.
Thank you in advance.