Assignment
1) Use appropriate algorithmic way to justify if A is invertible. Find A-1 if that exists by using the algorithm.
Now answer the followings with explanation:
(i) Is AT invertible? If so write it's inverse without any elementary row operation.
(ii) Let B and C be any two invertible 4x4 matrix. How many solutions does the equation (ABC)TX = 0 have?
2) Does the columns of the following matrix span R6? [ DO NOT USE ROW OPERATION]
(Hint: Use some definition and some theorem)
3) Let A be the Matrix of the Linear Transformation T: R6 → R6 given by
T ((x1, x2, x3, x4, x5, x6) = (2x1 - x2, 3x1, 2x3 - x4, 3x3, 2x5 - x6, 3x6)
Is T invertible? If so find a formula for T-1 as in the form of T. [DO NOT USE ROW OPERATION]