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2 X with x(0) = 27 4. Consider the linear system of initial value problems: X'...
Consider the linear system of initial value problems: 0 = Consider the linear system of initial value problems: X Then (1) is: [ 2 3 -1 X with x(0) 41 (a) 2e? - 25 -e? +6e -2e2 + 2e - e² - 6e (b) 5 (c) 2e? - 2e -e? + 6e -2c2 +2e -e? - 6e (d)
HELLO I AM CURRENTLY IN DIFFERENTIAL EQUATIONS PLEASE EXPLAIN EACH STEP SO I CAN LEARN FROM YOU (I KNOW SOME PEOPLE ONLY CARE ABOUT TEH ANSWER, BUT WILL REALLY APPRECIATE IT) TO SAVE TIME FEEL FREE TO JUST SAY A LAW, THEOREM, OR CONCEPT FOR AN EXPLANATION AND I CAN GO AHEAD AND STUDY IT ON MY OWN. i REALLY DO READ THESE VERY CAREFULLY AND USE THE COMMENTS OFTEN, SO JUST A LITTLE HEADS UP. I FIND IT DIFFICULT...
Consider the initial value problem s' (t) = Ayt), y(0) = 13): where A is a 2 x 2 matrix and y= Yi , 1. You are given that the eigenvalues and eigenvectors of A are Ly2 11 = -1, 41 = and 12 = -4, 92 = 0,21 The solution of the initial value problem is y1 = -5e-t+6e-4t y2 = 3e-t - 3e-4t yy = -5e-4t +6e-t y2 = 3e-4t - 3e-t = -3et+4e-4t = 2e-t – 2e-4t...
(1 point) Solving a system of linear ODEs with constant coefficients: Consider the system of equations x' = 3x – 2y y = 4x – 3y = -5x + 4y + 2z, with initial conditions x(0) = 1, y(0) = 2, 2(0) = 0. The matrix of the system is 13 -20 A= | 4 -3 0 1-5 4 2) and defining the column vector r(t) X(t) = y(t) z(t) we get that X' = AX, where X(0 = 2...
6. Solve the initial value problem y" + y = 0, y(0)=0, y'0=1 (a) -COS X (b) -sin x (c) -sin x + cos x (d) -sin x COS X (e) COS X (f) sin x (g) sin x-COS X (h) sin x + cos x 7. Find a particular solution yn of the differential equation (using the method of undetermined coefficients): y + y =p2 (a) 2e (b) 3e (c) 4e: (d) 6e (e) 2/2 (f) e2/3 (g) e2/4...
Exercise 5.5. Consider the linear system 2 as in (5.44) with A-4 0 C [1 0 -1 4 1 a. Show that the system is not (internally) asymptotically stable b. Show that the system is both controllable and observable. c. Find matrices F e R1x2 and GE R2x1 such that o(A+ BF) C C_ and o (A GC) C C_ d. Find matrices (K, L, M, N) such that the feedback controller w(t) Kw(t) Ly(t) u(t) Mw(t)Ny(t) is internally stabilizing...
Problem 5 Consider the linear system [1 2 0 2 -4 7x(t) 1 -4 6 y(t) [1 -2 2] (t). (4) a(t = (a) Is the system (4) observable? (b) Give a basis for the unobservable subspace of the system (4). In the remainder of this problem, consider the linear system а — 3 8— 2а 0 1 2a u(t) (t) (5) x(t) = with a a real parameter. (c) Determine all values of a for which the system (5)...
(1 point) Consider the initial value problem -51เซี. -4 มี(0) 0 -5 a Find the eigenvalue λ, an eigenvector ul and a generalized eigenvector u2 for the coefficient matrix of this linear system -5 u2 = b. Find the most general real-valued solution to the linear system of differential equations. Use t as the independent variable in your answers c2 c. Solve the original initial value problem m(t) = 2(t)- (1 point) Consider the initial value problem -51เซี. -4 มี(0)...
2 + 3s +2 (2s + 9)e-38 20. If F(s) = ? (S-2)(2+4)52+45 + 13 then L-'[F(s) = 2e2+ i sin 2x, OSI<3 (a) f(x) = { 2e2(-3) cos 3.- 3) + 2(1-3) sin 3(2x - 3), 1 3 2e22 + 3 cos 21, 0<x<3 2e2+ + 3 cos 2x + 2e-22 cos 3.0 + e -2- sin 3r, r>3 2e2+ + 2 sin 21, 05x<3 2e2+ sin 2r +2e-2(-3) cos 3(x - 3) + e -2(2-3) sin 3(-3), 1...
just 1,2,4 Problem 1 Consider the linear system of equations Ax = b, where x € R4X1, and A= 120 b = and h= 0.1. [2+d -1 0 0 1 1 -1 2+d -1 0 h2 0 -1 2 + 1 Lo 0 -1 2+d] 1. Is the above matrix diagonally dominant? Why 2. Use hand calculations to solve the linear system Ax = b with d=1 with the following methods: (a) Gaussian elimination. (b) LU decomposition. Use MATLAB (L,...