3. Look for the particular solution to be of the form where vi and y2 are...
I need it in the Jordan Canonical Form. The solution should look like: (8 points) Solve the system of differential equations x'(t) = [-2 0 1 2 -3 2 -37 1 -4 x(t), x(0) = The only eigenvalue of this matrix is -3, a triple root. You must explicitly find any matrix involved, with the exception of any matrix inverses (in the same way that the solutions were done in class). Also, your answer cannot involve the imaginary number i....
3. Determine the correct form of particular solution of y" - 2y' + y = 3e*. (Do Not solve) (5 Pts.)
Determine the form of a particular solution for the differential equation. Do not solve. y" - 4y' + 5y = e 7 + t sin 6t - cos 6t The form of a particular solution is yp(t)- (Do not use d, D, e, E, I, or I as arbitrary constants since these letters already have defined meanings.)
Write the expression for the particular solution in integral form and solve it where possible. y''+4y=f(x)
Determine the form of a particular solution for the differential equation. Do not solve. y"-y=4e2 +772e2 The form of a particular solution is yp(t) = 0 (Do not use d, D, e, E, I, or I as arbitrary constants since these letters already have defined meanings.)
we did in Block I, you will develop a system of equations to help solve for unknown b. Given: As currents and voltages. In this block, the unknown variables will be complex numbers. Therefore, you need to be able to solve a system of equations where the unknowns are complex. You have the following equations. Note Vi and V2 represent complex numbers. You are welcome and encouraged to use Matlab to help you solve these equations. VI-V2 -j1,500 V1 +...
Determine the form of a particular solution for the differential equation. Do not solve. y" - 18y' + 82y = et + tsin 2t - cos 2t The form of a particular solution is yp(t)= (Do not use d D. e. Ei or las arbitrary constants since these letters already have defined meanings.)
Show the work to find T following the 3 steps please Vi = Voe-tı/7 and at the second point you measured, the voltage and time would be: V2 = Voe-t2/7 T = You can combine these two equations and show that the time constant is: ta-ti In(Vi) - In(V2) Solve for the above equation of t using the two equations for (t1V) and (+2V2). In order to solve there are three things you need to do: 1. Divide the first...
I need help solving this problem. Vi V2 Problem 1) Show steps below to solve V1 and V2 using Nodal Analysis i) Write equation for controlling current I, in terms of node voltage V2 [2] 21 2 ΚΩk 8 kΩΣ 4 ΚΩΣ ii) Write KVL equation for Supernode source [1] iii) Write Node equation for V, and simplify in terms of V, and V2 [2] iv) Write Node equation for V2 and simplify in terms of V, and V2 [2]...
Find the general solution of the dierential equation where y = x^2 is a particular solution 2. Find the general solution of the differential equation where y = x2 is a particular solution (1 – xº)y' – 2x + x²y + y2 = 0