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6. The differential equation: y 4y 2x y(0) 1/16 has the exact solution given by the...
Problem Thre: 125 points) Consider the following initial value problem: dy-2y+ t The y(0) -1 ea dt ical solution of the differential equation is: y(O)(2-2t+3e-2+1)y fr exoc the differential equation numerically over the interval 0 s i s 2.0 and a step size h At 0.5.A Apply the following Runge-Kutta methods for each of the step. (show your calculations) i. [0.0 0.5: Euler method ii. [0.5 1.0]: Heun method. ii. [1.0 1.5): Midpoint method. iv. [1.5 2.0): 4h RK method...
MATLAB HELP 3. Consider the equation y′ = y2 − 3x, where y(0) = 1. USE THE EULER AND RUNGE-KUTTA APPROXIMATION SCRIPTS PROVIDED IN THE PICTURES a. Use a Euler approximation with a step size of 0.25 to approximate y(2). b. Use a Runge-Kutta approximation with a step size of 0.25 to approximate y(2). c. Graph both approximation functions in the same window as a slope field for the differential equation. d. Find a formula for the actual solution (not...
The differential equation : dy/dx = 2x -3y , has the initial conditions that y = 2 , at x = 0 Obtain a numerical solution for the differential equation, correct to 6 decimal place , using , The Euler-Cauchy method The Runge-Kutta method in the range x = 0 (0.2) 1.0
The Program for the code should be matlab 5. [25 pointsl Given the initial value problem with the initial conditions y(0) 2 and y'(0)10, (a) Solve analytically to obtain the exact solution y(x) (b) Solve numerically using the forward Euler, backward Euler, and fourth-order Runge Kutta methods. Please implement all three methods yourselves do not use any built- in integrators (i.e., ode45)). Integrate over 0 3 r < 4, and compare the methods with the exact solution. (For example, using...
1 st s2, y(1)1 The exact solution is given by yo) - = . 1+Int Write a MATLAB code to approximate the solution of the IVP using Midpoint (RK2) and Modified Euler methods when h [0.5 0.1 0.0s 0.01 0.005 0.001]. A) Find the vector w mid and w mod that approximates the solution of the IVP for different values of h. B) Plot the step-size h versus the relative error of both in the same figure using the LOGLOG...
///MATLAB/// Consider the differential equation over the interval [0,4] with initial condition y(0)=0. 3. Consider the differential equation n y' = (t3 - t2 -7t - 5)e over the interval [0,4 with initial condition y(0) = 0. (a) Plot the approximate solutions obtained using the methods of Euler, midpoint and the classic fourth order Runge Kutta with n 40 superimposed over the exact solution in the same figure. To plot multiple curves in the same figure, make use of the...
Help with these questions please. A mathematical model has been described by an engineer into the following differential equation: dy dx y(0) 2.5 Demonstrate an Euler method simulation of y versus x with a tabular algorithm using Ax 0.5 and 0.0 X 3.0. Demonstrate a 4th-order Runge Kutta method simulation of y versus x with a tabular algorithm using What can you say about y(x) and the methods used? a. b. Ax 0.5 and 0.0 3.0 x c. A mathematical...
Matlab & Differential Equations Help Needed I need help with this Matlab project for differential equations. I've got 0 experience with Matlab other than a much easier project I did in another class a few semesters ago. All we've been given is this piece of paper and some sample code. I don't even know how to begin to approach this. I don't know how to use Matlab at all and I barely can do this material. Here's the handout: Here's...
a. Find a particular solution to the nonhomogeneous differential equation y" + 4y = cos(2x) + sin(2x) b. Find the most general solution to the associated homogeneous differential equation. Use cand in your answer to denote arbitrary constants. c. Find the solution to the original nonhomogeneous differential equation satisfying the initial conditions y(0) = 8 and y'(0) = 4
Question 4 A mathematical model has been described by an engineer into the following differential equation: dy 0.5x0 dx y(0) 2.5 Demonstrate an Euler method simulation of y versus x with a tabular algorithm using a. 0.5 and 0.0 3.0. x Demonstrate a 4th-order Runge Kutta method simulation of y versus x with a tabular b. algorithm using дх-0.5 and 0.0 XS 3.0. What can you say about y(x) and the methods used? c. Question 4 A mathematical model has...