15. Given the following differential equation with forcing function and initial conditions: x" + 6x' +...
Solve the following initial value problem for r as a function of t. Differential equation: Initial conditions: dar -= 3e ti -2e - tj + 9e 3tk dt? r(0) = 71 + 2 + 4k dr = - +5j dt 0
(4) (a) Compute the Fourier series for the function f(x) interval [-π, π]. 1-z on the (b) Compute the solution u(t, z) for the partial differential equation on the interval [0, T): 16ut = uzz with u(t, 0)-u(t, 1) 0 for t>0 (boundary conditions) (0,) 3 sin(2a) 5 sin(5x) +sin(6x). for 0 K <1 (initial conditions) (20 points) Remember to show your work. Good luck. (4) (a) Compute the Fourier series for the function f(x) interval [-π, π]. 1-z on...
please write the code for the plot Solve the following second order differential equation analytically for x(t): - dx + 5x = 8 * 2 for the following two cases: Case 1: all initial conditions are zero. Case 2: given the initial conditions: x (0) = 1 (0) = 2 For both cases, also plot the solution obtained, for t = 0 to 10.
Problem 4 (Analytical and Computational-20 points) Given a second-order ordinary differential equation: d2f(t) df(t) with the following initial conditions: (O) 1 and ait 0 (Analytical-10 points) Express Equation (1) in state-space form. Cleary write down the A, B, C, and D matrices. Then find the state transition matrix and determine the solution for f(t) if the input function r(t) is a unit step function. a) b) (Computational-10 points) Write a MATLAB-Simulink program to find the computational solution for f(t) in...
Solve the initial value problem for r as a vector function of t. dr Differential equation: = -32k . = 21 + 2] Initial conditions: r(0) = 60k and r(t) = (i+1+OK
Solve the following differential equation with given initial conditions using the Laplace transform. y" + 5y' + 6y = ut - 1) - 5(t - 2) with y(0) -2 and y'(0) = 5. 1 AB I
Solve the following differential equation using the Laplace transform and assuming the given initial conditions. [Note: Laplace table is provided in the page 6] dt2 dt dix x(0) = 1 ; (0) = 1 dt
Solve the following differential equation by Laplace transforms. The function is subject to the given conditions. y'' +49y = 0, y(0) = 0, y'0)=1 Click the icon to view the table of Laplace transforms. y = (Type an expression using t as the variable. Type an exact answer.)
Exercise 3: Solve the following differential equation (with initial conditions) for the three cases below.. Solve the following differential equation (with initial conditions) for the three cases below (by hand!). You may use whatever method you find simplest. You may check your work in MATLAB or Python. 2ä + 3c – 2x = f(t), x(0) = 1, ¿(0) = 3. (a) For f(t) = 0. Note that this is just the homogeneous ODE, 2ä + 3i – 2x = 0....
Verify that the given function is a solution to the given differential equation (c1 and c2 are arbitrary constants) and state the maximum interval over which the solution is valid. For Problems 7-21, verify that the given function is a solu- tion to the given differential equation (cy and c2 are arbitrary constants), and state the maximum interval over which the solution is valid. ya Sx +42 25 WID#cigos x A Asin 2%, = 0 BAWK vel Hope 2y +10....