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Let A be a 3 × 3 matrix. Suppose that the eigenvalues of A are –1, 0, 1 with respective eigenvectors (1, –1, 0)t, (1, 1, -2)t & (1, 1, 1)t. Then 6A equals :
Let M = . Then M is diagonalisable, if & only if
Let M be the real 5 × 5 matrix having all of its equal to 1. Then
Let M = . Then
Let M = , then
Let be a linear operator having distinct eigenvalues. Then
A matrix M has eigenvalues 1 & 4 with corresponding eigenvectors (1, –1)T & (2, 1)T respectively. Then M is :
Consider the following statements about B =
P : B has 2 eigenvalues, 4 with multiplicity 2
Q : B is diagonalisable
Then which of the statement is correct?
Consider the matrix A = . Then
Let A = a real symmetric matrix.
Then, which of the