Prove:
(A) Every matrix is row equivalent to itself.
(B) If B is row equivalent to A ,then A is row equivalent toB.
(C)If C is row equivalent to B and B is row equivalent to A, then Cis row equivalent to A

Describe all solutions of Ax = o in parametric vector form, where A is row equivalent to the given matrix. 10 3 2-27 0 01 0 0 9 noon-18 Type an integer or fraction for each matrix element.)

Describe all solutions of Ax =0 in parametric vector form, where A is row equivalent to the given matrix 1 0-2-54 8 00 1 0 02 x=x Type an integer or fraction for each matrix element.)

In Exercises 11-16: Find a matrix B in reduced echelon form such that B is row equivalent to the given matrix A. Find a basis for the null space of A. As in Example 6. find a basis for the range of A that consists of columns of A. For each column. Aj, of A that does not appear in the basis, express Aj as a linear combination of the basis vectors. Exhibit a basis for the row space of A. A =[1 2 3 -1 3 5 8 -2 1 1 2 0]