show that `[(1,1,3),(5,2,6),(-2,-1,-3)]=A` is nilpotent matrix of order 3.

If A=[(1,1,2),(5,2,6),(-2,-1,-3)] then A is (A) nilpotent (B) idempotent (C) symmetric (D) none of these

If A= [(1,1,3),(5,2,6),(-2,-1,-3)] then find A^(14)+3A-2I

The matrix {:A=[(1,-3,-4),(-1,3,4),(1,-3,-4)]:} is nilpotent of index

The matrix A=[(-5,-8,0),(3,5,0),(1,2,-1)] is (A) idempotent matrix (B) involutory matrix (C) nilpotent matrix (D) none of these

show that the matrix A=[(2,-2,-4),(-1,3,4),(1,-2,-3)] is idempotent.

(i) Show that the matrix A=[{:(1,-1,5),(-1,2,1),(5,1,3):}] is a symmetric matrix. (ii) Show that the matrix A-[{:(0 ,1,-1),(-1, 2, 1),( 1,-1, 0):}] is a skew symmetric matrix.

The matrix [(5 ,1 ,0), (3 ,-2 ,-4 ), (6 ,-1 ,-2b)] is a singular matrix, if the value of b is ?

show that the matrix A=[(-5,-8,0),(3,5,0),(1,2,-1)] is involutory.

If M=[{:(,1,2),(,2,1):}] and I is a unit matrix of the same order as that of M, show that M^2=2M+3I

Express the matrix A=[(2,4,-6),(7,3,5),(1,-2,4)] is the sum of a symmetric and skew symmetric matrix.