If A is a non zero square matrix of orde...

If A is a non zero square matrix of order n with `det(I+A)!=0` and `A^3=0`, where `I,O` are unit and null matrices of order `nxxn` respectively then `(I+A)^(-1)=`

Similar Questions

Explore conceptually related problems

If A is a nonzero square matrix of order n with det(I+A)!=0 and A^(3)=O where I, O are unit and null matrices of order nxxn respectively then (I+A)^(-1)=

If A and B are non zero square matrices of order 3, then

If I is unit matrix of order n, then 3I will be

Suppose l+A is non-singular.Let B=(I+A)^(-1) and C=I-A, then .... (where I,A,O are identity square and null matrices of order n respectively)

Let A and B be two square matrices of order 3 and AB = O_(3) , where O_(3) denotes the null matrix of order 3. then

Let A and B be two square matrices of order 3 and AB=O_3 , wher O_3 denotes the null matrix of order 3. Then,

If A is a square matrix of order 3 such that A^2 + A + 4I =0 , where 0 is the zero matrix and I is the unit matrix of order 3, then

If M and N are square matrices of order 3 where det(M) =2 and det (N) = 3, then det(3MN) is

IF A and B are squre matrices of order 3, then the true statement is/are (where I is unit matrix).

If A is a non zero square matrix of order n with `det(I+A)!=0` and `A^3=0`, where `I,O` are unit and null matrices of order `nxxn` respectively then `(I+A)^(-1)=`

Similar Questions

Recommended Questions