7. Find a Trial Solution for the following System of DE. You must have solved the corresponding homogeneous system in problem number 4.] +2e2t +1 x' = +6x2 x1 7. Find a Trial Solution fo...
7. (10 points) Find the general solution to the homogeneous system of DE: -1 x' = Ax where A -2 = [ 21
Find the general solution to the non-homogeneous system of DE: -4 X+
7. (10 points) Find the general solution to the homogeneous system of DE: x' = Ax where A = [-2 21
Find the general solution to the non-homogeneous system of DE: -4 51 3t X + -4 0 x'
1 -2 Find the general solution to the homogeneous system of DE: 3 2 6 x' = Ax where A = -2 1 -2
2 8. (10 points) Find the general solution to the homogeneous system of DE: | 3 x' = Ax where A = -2 1 - 1 -2 -4.
Problem #4 Given the following system of linear equations: 2 x1 6x2 X3 = -38 -3 xI - X27 x3 = -34 -8 xix2 2x3 = -20 Use Gauss-Jordan method to solve for the x's
Roger wrote and solved a system of equations to find the number of nickels (x), dimes (y), and quarters (z) that were in a bank. He found that the general solution was (x,y,z) = ((2x - 4), (8 - z), z). List all of the solutions to Roger's problem. please show how you reached your answer.
Solve the problem. 7). 7) Find the general solution of the simple homogeneous "system" below, which consists of a single linear equation. Give your answer as a linear combination of vectors. Let x2 and x3 be free variables. -2x1 - 12x2 + 16x3 =0
Problem 1: State Transition Matrix, Homogeneous Solution * Find Ф(t-t")-CA(1-1) fr each of the following LTI system by diagonalizing A, (if it is diagonalizable) using the Laplace tranform Compute the solution for ◆ Plotz,(t) and r2(t) vs. time Plot (t) v0) We were unable to transcribe this image Problem 1: State Transition Matrix, Homogeneous Solution * Find Ф(t-t")-CA(1-1) fr each of the following LTI system by diagonalizing A, (if it is diagonalizable) using the Laplace tranform Compute the solution for...