`|A^(-1)|!=|A+^(-1)`, where `A` is a non singular matrix.

|A^(-1)| ne |A|^(-1) , where A is non-singular matrix.

If A is a non - singular matrix then

If A is a non - singular matrix then

If A is a non - singular matrix then

If A is a non-singular matrix, then

|A^(-1)|ne|A|^(-1) , where is non-singular matrix

If A is a non-singular matrix, then A (adj.A)=

If A is a non-singular matrix then |A^(-1)| =

[" If "B" is adjoint of matrix "A" and "B^(TT)B^(-1)=A" then "(" where "B" is non singular matrix) "],[[" (a) "B" is symmetric matrix "," (b) det."(B)=1],[" (c) "A" is skew symmetric matrix "," (d) "adj.B=A]]

"If "B" is adjoint of matrix "A" and "B^(TT)B^(-1)=A" then "(" where "B" is non singular matrix)" (a) "B" is symmetric matrix (b) det."(B)=1 (c) "A" is skew symmetric matrix (d) "adj.B=A