Welcome! You have found the homepage of the Summer 2024 manifestation of Math 218.
To check if a vector v is in the null space of a
matrix A, we need only check that A*v is equal to
the zero vector.
More efficiently, we can directly verify if v is in the null
space of A with the syntax A*v ==
zero_vector(A.nrows()).
To check if v is an eigenvector of A corresponding
to an eigenvalue l, we need to check if v is in the
null space of l*identity_matrix(A.nrows())-A.
More efficiently, we can check if A*v == l*v.
For a 2x2 matrix, we can visualize the "input" vector v and the
"output" vector A*v. The vector v is an eigenvector
of A if input is parallel to the output.