Find the general solution to the homogeneous differential equation dạy dt2 229 dy dt + 117y = 0 The solution can be written in the form y = Cjepit + Czert with ri < r2 Using this form, r1 = and r2 = BE SURE TO WRITE THE SMALLER r FIRST!
(1 point) Find the solution to initial value problem dạy dt2 dy 169 + 64y = 0, y(0) dt = 10, y'(0) = 4 The solution is
Required information Consider the following equation: dạy dt2 +9y=0 Given the initial conditions, 10) = 1 and y(0) = 0 and a step size = 0.1. Solve the given initial-value problem from t= 0 to 4 using Euler's method. (Round the final answers to four decimal places.) The solutions are as follows: t y z 0.1 1.2 2.3 4
Solve the following differential equation using variation of parameters. d yt) 2 dy() +7- + 10y() u(t) dt dt2 y(0) 0, y'(0) = 3 d yt) 2 dy() +7- + 10y() u(t) dt dt2 y(0) 0, y'(0) = 3
d1 dy 2. Solve the system dt dt2 da dt =t = 2 dy (25pts) + 3x + + 3y = dt
(1 point) Consider the initial value problem d2y dy 8 +41y8 cos(2t), dt dy (0) y(0) = -2 -6 dt dt2 Write down the Laplace transform of the left-hand side of the equation given the initial conditions (sA2-8s+41)Y+2s-18 Your answer should be a function of s and Y with Y denoting the Laplace transform of the solution y. Write down the Laplace transform of the right-hand side of the equation (-8s+32)/(sA2-8s+20) Your answer should be a function of s only...
Suppose you have to solve the following system by elimination d²x dy j? y dy 9y+672 + + 8y = 82 + 5 sint dt2 dt dc + + 3х dt dt2 dt The standard form of the system is O (2D - 8)x+ (D+ 8)y = 5 sint (D - 3)2 + (2D+D+9)y= 6t2 (D2 – 8)x+ (D+8)y= 5 sint (D-3)x +(D2 +D+9)y+ 6+2 = 0 (D2 - 8)2 + (D+ 8)y - 5 sint = 0 (D –...
help with matlab 2. Consider the undamped oscillator equation dy + 9y = cos(wt) dt2 y(0) = 0 v(0) = 0 What is the steady state frequency of this system? Use your solver to solve this ODE for w=4, w= 3.1, w = 3.01 and w 3. Comment on what the solutions look like as you change w. What happened with the last solution? I
Solve for y(t). dy/dt + 2x = et dx/dt-2y= 1 +t when x(0) = 1, y(0) = 2
For the system described by the following differential equation d3y(t) d2y(t) d2x(t) dy(t) 3 dt dx(t) 9 dt y(t) 5x(t) 7 2 6 dt3 dt2 dt2 Express the system transfer function using the pole-zero plot technique a) b) What can be said about the stability of this stem? For the system described by the following differential equation d3y(t) d2y(t) d2x(t) dy(t) 3 dt dx(t) 9 dt y(t) 5x(t) 7 2 6 dt3 dt2 dt2 Express the system transfer function using...