educe from the result of Problem 31 that, for ev- y square matrix A, the matrix eA is nonsingular with Show that eAt = I cos 2t + A sin 2t. Apply this fact to find a general solution of x' = Ax, and verify that it is equivalent to the solution found by the eigenvalue method. e-A uppose that Apply Theorem 3 to calculate the matrix exponential eAt each of the matrices in Problems 35 through 40. for -[: :] A = 1 2 3 how that A²" = I and that A²n+1 = A if n is a positive teger. Conclude that 3 4 0 1 4 0 0 35. А — 36. А — 3 1 eAt = I cosh t + A sinh t, 3 5 20 30 37. A = 1 3 38. А — O 10 20 nd apply this fact to find a general solution of x' = Ax. erify that it is equivalent to the general solution found by Le eigenvalue method. uppose that 1 1 3 3 3 0 1 0 0 2 2 4 4 4 3 3 2 4 4 39. А — 40. А — 0 0 2 0 0 0 3 3 4 A = -2 0 0 0 2

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5.6 Matrix Exponentials and Linear Systems 361 Show that eAt find a general solution of x' = equivalent to the solution found by the eigenvalue method. = I cos 2t + A sin 2t. Apply this fact to Ax, and verify that it is 32. Deduce from the result of Problem 31 that, for ev- ery square matrix A, the matrix ea is nonsingular with (A) 33. Suppose that -[: :] Apply Theorem 3 to calculate the matrix exponential eAt for each of the matrices in Problems 35 through 40. A 1 2 3 Show that A2n = I and that A²n+1 integer. Conclude that = A if n is a positive 3 35. А — 4 36. А — 1 4 3 1 eAt = I cosh t + A sinh t, 3 4 5 20 30 37. A = 1 3 38. А — 10 20 and apply this fact to find a general solution of x' = Ax. Verify that it is equivalent to the general solution found by the eigenvalue method. 34. Suppose that 1 5 1 3 3 4 4 4 3 3 2 4 39. А — 40. А — 2 3 2 4 A -2 2 3 N O O O