Let A be a square matrix all of whose entries are integers. If det `A=+-1` then Prove `A^(-1)` exists and all its entries.

Let A be a square matrix all of whose entries are integers. Then which one of the following is true?

Let A be a square matrix all of whose entries are integers. Then which one of the following is true? (1) If d e t A""=+-1,""t h e n""A^(1) exists but all its entries are not necessarily integers (2) If d e t A!=""+-1,""t h e n""A^(1) exists and all its entries are non-integers (3) If d e t A""=+-1,""t h e n""A^(1) exists and all its entries are integers (4) If d e t A""=+-1,""t h e n""A^(1) need not exist

Let A be a square matrix of order 3 such that det. (A)=1/3 , then the value of det. ("adj. "A^(-1)) is

Let A be a square matrix of order 3 whose all entries are 1 and let I_(3) be the indentiy matrix of order 3. then the matrix A - 3I_(3) is

Let A be the set of all 3 xx 3 symmetric matrices all of whose entries are either 0 or 1. Five of these entries are 1 and four of them are 0. The number of matrices in A is

Let A be the set of all 3xx3 matrices of whose entries are either 0 or 1. The number of elements is set A, is

If A is a square matrix of order 3 and det A = 5, then what is det [(2A)^(-1)] equal to ?