# Incorrect EigenValues/Vectors withNumpy

I am trying to find the eigenvalues/vectors for the following matrix:

1 0 0

0 1 0

1 1 0

using the code:

``````e_vals, e_vecs = la.eig(A)
print "eigenvector of A = ", e_vals
print "eigenvalue of A = \n", e_vecs
``````

I'm getting this as the answer:

0 , 0.7071... , 0

0 , 0 , 0.7071...

1 , 0.7071... , 0.7071...

and EigenValues: [0, 1, 1]

However, I believe the following should be the answer.

``````[1] Real Eigenvalue = 0.00000
[1] Real Eigenvector:
0.00000
0.00000
1.00000

[2] Real Eigenvalue = 1.00000
[2] Real Eigenvector:
1.00000
0.00000
1.00000

[3] Real Eigenvalue = 1.00000
[3] Real Eigenvector:
0.00000
1.00000
1.00000
``````

Any help would be appreciated!

-

You have to take the transpose of `e_vecs`:

``````import numpy as np
import numpy.linalg as linalg
A = np.array([[1,0,0],[0,1,0],[1,1,0]])
e_vals, e_vecs = linalg.eig(A)
e_vecs = e_vecs.T

print(e_vals)
# [ 0.  1.  1.]
print(e_vecs)
# [[ 0.          0.          1.        ]
#  [ 0.70710678  0.          0.70710678]
#  [ 0.          0.70710678  0.70710678]]

for val, vec in zip(e_vals, e_vecs):
assert np.allclose(np.dot(A, vec), val * vec)
``````
-
Hi unutbu, however isn't there still an issue? If you multiplied A by the first vector result [0, 0.70710678, 0] you would get [0, 0.70710678, 0.70710678] which can't be scaled back into the eigenvector? – Giri Sep 12 '13 at 18:52
After transposing `e_vecs`, the eigenvectors are the rows of `e_vecs`. I transposed `e_vecs` to make it easier to iterate over the eigenvectors using `zip(e_vals, e_vecs)`. – unutbu Sep 12 '13 at 19:02
Ah got it. Thank you! – Giri Sep 12 '13 at 19:09