Question

L. Answer True or False. Justify your answer (a) Every linear system consisting of 2 equations in 3 unknowns has infinitely many solutions (b) If A. B are n × n nonsingular matrices and AB BA, then (e) If A is an n x n matrix, with ( +A) I-A, then A O (d) If A, B two 2 x 2 symmetric matrices, then AB is also symmetric. (e) If A. B are any square matrices, then (A+ B)(A-B)-A2-B2 2. Let 1 2 c (1) Find all values of c for which A is singular ii) For c 1, find A 3. Let 3-1 3 11-2 M=451 ·and N-1 -1 0-2 Find a 3 × 3 matrix P satisfying N M-1 P = 13. 4. Use Rows or Columns operations to show that 5. Prove that an inverse of a square matrix F. if it exists, is unique. 6. Find all values of λ for which the linear system has: (i) unique solution (ii) no solution infinitely many solutions. When possible, find the corresponding solutions 7. Show that

Answer 1

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