5. Left and Right Inverses: We have only talked about inverses of square matrices. This problem will explore the notion of a left and right inverse for a matrix that is not square. Let −1 (3) 0 A - a. Compute AAT, (AAT)−¹ and AT (AAT)-¹. You may use inv() function and matrix multplication in MATLAB or the Python equivalents (such as numpy.linalg.inv()). b. Show that the matrix B = AT (AAT)-¹ is a right inverse for A, i.e., verify that AB= I. Is BA = I? Let A be a m × n matrix with m > n, and suppose that the n x n matrix AT A C.

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5. Left and Right Inverses: We have only talked about inverses of square matrices. This problem will explore the notion of a left and right inverse for a matrix that is not square. Let To -1 A 1 0 = 1 a. Compute AAT, (AAT)−¹ and AT (AAT)-¹. You may use inv() function and matrix multplication in MATLAB or the Python equivalents (such as numpy.linalg.inv()). b. Show that the matrix B = AT (AAT)-¹ is a right inverse for A, i.e., verify that AB= I. Is BA = I? C. Let A be a m × n matrix with m > n, and suppose that the n x n matrix AT A is invertible. Suggest a formula of a left inverse C, i.e., find a matrix C such that CA = I. Your expression for C should be in terms of A. d. Test formula of the left inverse from part (c) for the 2 x 1 matrix A = your 2 [3].