Chapter 3, Section 3.3, Question 02 Consider the given system of equation. 2 -4 X 6 -8 (a) Find the general solution of...
Problem 6 (3 points) The general solution of the system of the linear system * = AY, Y)= ((0),y(t)), is given below. (1) Sketch the strait- line solutions and the phase portrait. DO NOT forget to use ARROWS. Make sure that your sketch shows ABSOLUTELY CLEAR slopes of Tangent line as t oot -oo. (2) Is the solution stable? Y(t) = kV1 + kye" V2; V. =(2,-1), V, = (1,3)
Here is the phase portrait of a homogeneous linear system of differential tions. 4. equa- (a) Classify the equilibrium (b) If λί is the eigenvalue with corresponding eigenvector (1,1) and A2 is the eigenvalue with corresponding eigenvector (-1,3), place the three numbers 0, λ, and λ2 in order frorn least to greatest. (c) If ((t), y(t) is the solution satisfying the initial condition (x(0),y(0)- (-2,2). Find i. lim r(t) i. lim rlt) ii. lim y(t) iv. lim y(t) Here is...
16 Please help me solve the following Differential Equations problem Consider the following. (A computer algebra system is recommended.) x-(-1か 1 -4 (a) Find the general solution to the given system of equations x(t) = Describe the behavior of the solution as t O The solution diverges to infinity for all initial conditions. The solution tends to the origin along or asymptotic to 4 --) or asymptotic to ( O The solution tends to the origin along O The solution...
Chapter 6, Section 6.5, Question 07 Chapter 6, Section 6.5, Question 07 Consider the given system of equations. 10-1 (a) Find a fundamental matrix. V21 Express X (1) as a 2x2 matrix of the form ei, Vi A. with the eigen values 시 and in increasing order. x(t) = ) and v2 = V12 ) are the eigen vectors associated where v- v e :,v, her (b) Find the fundamental matrix e Ar et Click here to enter or edit...
Chapter 6, Section 6.5, Question 06 Consider the given system of equations. (a) Find a fundamental matrix Express X (t) as a 2x2 matrix of the form x(t) = where vi-Ci ) s the eigen vector associated with the complex eigen value λί V11 Re (eht vi lm (e,%) Click here to enter or edit your answer (b) Find the fundamental matrix eAr (b) Find the fundamental matrix eAr Click here to enter or edit your answer Click if you...
Chapter 4, Section 4.7, Question 19 Find the general solution of the given differential equation. y" – 2y + y = 5e 1 + 12 (Use constants C1 and C2 in the solution. Write the coefficients of the terms as fractions in its lowest form.) The general solution is y(t) = Click here to enter or edit your answer
X [-1 -4). 2.) Find the general solution to the system x' = Create a phase portrait with at least one solution in the phase plane (Screenshot Desmos okay).
Consider the plane autonomous system 4) 2 X'=AX with A (a) Find two linearly independent real solutions of the system (b) Classify the stability (stable or unstable) and the type (center, node, saddle, or spiral) of the critical point (0,0). (c) Plot the phase portrait of the system containing a trajectory with direction as t-oo whose initial value is X(0) (0,6)7 and any other trajectory with direc- tion. (You do not need to draw solution curves explicitly.) Consider the plane...
2. Differential equations and direction fields (a) Find the general solution to the differential equation y' = 20e3+ + + (b) Find the particular solution to the initial value problem y' = 64 – 102, y(0) = 11. (e) List the equilibrium solutions of the differential equation V = (y2 - 1) arctan() (d) List all equilibrium solutions of the differential equation, and classify the stability of each: V = y(y - 6)(n-10) (e) Use equilibrium solutions and stability analysis...
A9.5.36 Question Help Find a general solution to the system below. -2 x(t) x'(t) = This system has a repeated eigenvalue and one linearly independent eigenvector. To find a general solution, first obtain a nontrivial solution x, (t). Then, to obtain a second linearly independent solution, try x2 (t) = te"u, + e"u2, where r is the eigenvalue of the matrix and u, is a corresponding eigenvector. Use the equation (A - rl)u, = u, to find the vector u,....