i
For the system: a. Write the general solution b. State if the origin is a spiral sink, source, or center and explain why. c. Write the natural period and natural frequency of the solutions. d. Do the solutions go clockwise or anticlockwise around the origin? Explain your reasoning. e. Write the particular solution that corresponds to Please write clearly and explain your steps. Thank you! Do not just copy someone else's answer.
plesse show work 11. For the system dr 1 1 -3 -5 31 Y , initial condition Y, - (4,0) Write the solution and sketch the x(i) and y(1) graphs of the particular solution If the eigenvalues are of the form a + ib, b0 then determine if the origin is a spiral sink, a spiral source, or a center determine the natural period and natural frequency of of the oscillations determine the directions of the oscillations in the phase...
Problem 3. For the following system, (a) compute the eigenvalues, (b) compute the associated eigenvectors, (c) if the eigenvalues are complex, determine if the origin is a spiral sink, a spiral source, or a center; determine the natural period and natural frequency of the oscillations, and determine the direction of the oscillations in the phase plane, (d) sketch the phase portrait for the system; and (e) compute the general solution. ar dY (1 -3 dt Y, Problem 3. For the...
(3 points) Given the system 1. -2 0 2i and for the eigenvalue λ-2, the vector V-(1) is an eigenvector. we know that λ- (a) find the general solution; (b) determine if the origin is a spiral sink, a spiral source, or a center; (e) determine the direction of the oscillation in the phase plane (do the solutions go clockwise or countercdlocdkwise around the origin?); or counterclockwise (3 points) Given the system 1. -2 0 2i and for the eigenvalue...
Problem 2. For the following system, (a) compute the eigenvalues, (b) compute the associated eigenvectors, (c) if the eigenvalues are complex, determine if the origin is a spiral sink, a spiral source, or a center; determine the natural period and natural frequency of the oscillations, and determine the direction of the oscillations in the phase plane, (d) sketch the phase portrait for the system; and (e) compute the general solution dY (1 -2
5: For the following system, (a) provide the general solution, (b) provide a sketch showing the qualitative properties of the system, (c) specify what type ((spiral) source/sink, center, saddle) of equilibrium point the origin is. You should include any straight-line solutions as well as indicate more general types of solution curves. Be sure to indicate the direction of motion along any solution curve dY (1 -1 5: For the following system, (a) provide the general solution, (b) provide a sketch...
1. (20 marks) This question is about the system of differential equations Y. dt=(k 1 (a) Consider the case k = 0. i. Determine the type of equilibrium at (0,0) (e.g., sink, spiral source). ii. Write down the general solution. iii. Sketch a phase portrait for the system. (b) Now consider the case k3 In this case, the matrix has an eigenvalue 2+V/2 with eigenvector i. -1+iv2 and an eigenvalue 2 iv2 with eigenvector . Determine the type of equilibrium...
(1 point) Consider the system of differential equations dx dt = -1.6x + 0.5y, dy dt = 2.5x – 3.6y. For this system, the smaller eigenvalue is -41/10 and the larger eigenvalue is -11/10 [Note-- you may want to view a phase plane plot (right click to open in a new window).] If y' Ay is a differential equation, how would the solution curves behave? All of the solutions curves would converge towards 0. (Stable node) All of the solution...
Find the general solution to the system of differential equations: dx/dt = 2x - y dy/dt = 3x - 2y please write legible
dr Consider the system: = 4x – 2y dy = x + y dt (a) Determine the type of the equilibrium point at the origin. (35 points) (b) Find all straight-line solutions and draw the phase portrait for the system. (35 points) (c) What is the general solution to the system? (15 points) (d) Find the solution of the system with initial conditions: x(0) = 1 and y(0) = -1. (15 points)