Application of matrices and determinants
1. If A is a matrix of order 3,then det (kA)
(1) K3det(A) (2) k2det(A) (3) k det(A) (4) det(A)
2. If I is a unit matrix of order n,where k≠0 is a constant, then adj(kI)=
(1) Kn (adj I) (2) k (adj I) (3) k2 (adj (I)) (4) kn-1 (adj I)
3.If the equation -2x+y+z = l; x-2y+z = m; x+y-2z = n such that l + m + n = 0 , then the system has
(1) A non-zero unique solution (2) trivial solution
( 3) Infinitely many solution (4) no solution
4. If A and B are any two matrices such that AB=0 and A is non-singular, then
(1)B=0 (2)B is singular (3)B is non singular (4) B=A
5. If A is a square matrix of order 3, then det(kA)
(1) k3 det(A) (2) k2 det(A) (3) k det(A) (4) det(A)
6. Cramer's rule is applicable, when
(1) ∆ = 0 (2) ∆ ≠ 0 (3) ∆=1 (4) ∆ ≠ 1
7. (AT)-1 is equal to
(1) A-1 (2) AT (3) A (4) (A-1)T
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