Please answer questions 1 and 2 on page 1 and questions 3 an…
Please answer questions 1 and 2 on page 1 and questions 3 and 4 on page 2. Let A= . 1. Find all the eigenvalues of A. (7 points) 2. Find the corresponding eigen vectors. (7 points) 3. Can A be diagonalized? (2 points) 4. If the answer to 3 is yes, find a matrix X and a diagonal matrix D so that X^{-1}*A*X is a diagonal matrix D. (4 points) Old Quiz 6: ————- 1. Use Cramer’s rule to find the solutions of the system of equations: x1+ 3×2+ x3=1 2×1+x2+x3 =5 -2×1+2×2 – x3= -8 This can broken into the following subproblems: (i) Compute the determinant of the coefficient matrix for the system of equations above. (5 points) (ii) Compute the determinant of the three matrices obtained by replacing one column of the coefficient matrix by the vector on the right hand side. (4 points each) (iii) Write the solutions for each of the variables x1, x2 and x3. (3 points)