Let A= ( 8 6 -2 9 3 9 0 18 9 -9 1 2 -4 1 3 9 5 3 9 1 ) i. Find a basis for the

Let A= ( 8 6 -2 9 3 9 0 18 9 -9 1 2 -4 1 3 9 5 3 9 1 ) i. Find a basis for the column space of A. ii. Expand your basis for the column space to a basis of the entire range of A. iii. Find a basis for the null space (or kernel) of A. iv. Find a basis for the domain of A like that given in Theorem 6.8. (Theorem 6.8: domain image and null spaces)( in applied linear algebra: page252 ) v. Write an explicit formula for all solutions to Ax = b where b = (4 9 -1 4) This is belongs to applied linear algebra 3rd edition book ben noble.