Question:
If one of the eigenvalues of an n x n matrix A is 0, then
Last updated: 8/14/2022
If one of the eigenvalues of an n x n matrix A is 0, then which of the following statements must be true? A is not diagonalisable. The determinant of A is 0. The column space of A is n-dimensional. The solution to Ax=b is unique for all bR".