If `I_(3)` is identity matrix of order 3, then `I_(3)^(-1)=`

Select the correct options from the given alternatives:If A=[[1,2,2],[2,1,-2],[a,2,b]] is a matrix satisfying the equation A.A^T=9I ,where I is the identity matrix of order 3,then the paired (a,b) is equal to

If k is a scalar and I is a unit matrix of order 3 then adj(kI) is equal to (a) k^(3)I (b) k^(2)I (c) -k^(3)I (d) -k^(2)I

If A is a matrix of order 3, such that A(adj A)=10I, then |adj A|= a)1 b)10 c)100 d)101

If A and B are square matrices of the same order and AB = 3I , then A^-1 = i] 3 B ii] frac{1}{3}B iii] 3B^-1 iv] frac{1}{3}B^-1

If A=[[1,-2],[5,3]],B=[[1,-3],[4,-7]] ,then find the matrix A-2B+6I , where I is the unit matrix of order 2.

If A=[[5,4],[-2,3]] and B=[[-1,3],[4,-1]] ,then find C^T such that 3A-2B+C=I ,where I is the unit matrix of order 2.