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1 point) Solve the system 5 -1 dx lc dt 2 with x (0) = Give your solution in real form. An ellipse with clockwise orientation 1. Describe the trajectory. 1 point) Solve the system 5 -1 dx lc dt 2 with x (0) = Give your solution in real form. An ellipse with clockwise orientation 1. Describe the trajectory.
(1 point) Solve the system 2 1 dx dt х -5 -2 N with x(0) = 3 Give your solution in real form. X= X2 = An ellipse with clockwise orientation ✓ 1. Describe the trajectory.
(1 point) Solve the system 6 -2 dc dt 20 -6 C -3 with r(0) = -2 Give your solution in real form. 21 = 3cos(21)+8sin(2t) C2= 1. Describe the An ellipse with counterclockwise orientation trajectory
(1 point) Solve the system -3 -3 dx = х dt :: 1:) with x(0) = Give your solution in real form. Xi = X2 = An ellipse with counterclockwise orientation 1. Describe the trajectory.
Solve the system. (1 pt) Solve the system with x(0) = Give your solution in real form. Xi = 1. Describe the trajectory An ellipse with clockwise orientation
(1 point) Solve the system 4 -2 dx II dt 10 -4 -3 with x(0) = -2 Give your solution in real form. Xı = -3cos(21)+(27sin(2t))/5 x2 = -2cos(2t)-11 sin(2t) An ellipse with counterclockwise orientation 1. Describe the trajectory.
At least one of the answers above is NOT correct. (1 point) Solve the system -6 -2 dc dt T 20 6 -3 with c(0) T: 1 Give your solution in real form. x1 = e^(t)-3cos (2t)- 10 sin(2t)) X2 = e^(1)(-33sin(2t)+cos(2t)) An ellipse with counterclockwise orientation 1. Describe the trajectory
(1 point) Solve the system 3 9 da dt 2 -1 -3 2 with x(0) 4 Give your solution in real form. 21 = 22 =
solve the system then its asking to give the solution in real form and i am stuck. ELLIPSE COUNTERCLOCKWISE ELLIPSE COUNTERCLOCKWISE (10 points) Solve the system 6 -3 with x(0) = Give your solution in real form. 2 = 3 22 = 3 An ellipse with counterclockwise orientation 1. Describe the trajectory. Note: You can earn partial credit on this problem.
7.6(3) (1 point) Consider the Initial Value Problem -L* 4)*, x0=[!] (a) Find the eigenvalues and eigenvectors for the coefficient matrix. 1 ,01 = , and 12 = (b) Find the solution to the initial value problem. Give your solution in real form. x(t) = Use the phase plotter pplane9.m in MATLAB to help you describe the trajectory An ellipse with clockwise orientation 1. Describe the trajectory.