With 5. Consider the differential equation y, f(x,y) with initial condition y(zo) = yo. Show that...
///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...
(3) Consider the expressions (a) Write down the Runge-Kutta method for the numerical solution to a differential equation Oy (b) Show that if f is independent of y, i.e. f(x, y) g(x) for some g, then the Runge-Kutta method on the interval n n + h] becomes Simpson's Rule for the numerical approximation of the integral g(x) dr. In this case, what is the global error, in terms of O(hk) for some k>0? (3) Consider the expressions (a) Write down...
Consider the following Ordinary Differential Equation (ODE): dy = 0.3 * x2 + 0.04 * 26 – 4* y? dx with initial condition at point 20 = 0.6875: yo = 0.0325 Apply Runge-Kutta method of the second order with h = 0.125 and the set of parameters given below to approximate the solution of the ODE at the three points given in the table below. Fill in the blank spaces. Round up your answers to 4 decimals. Yi 0.0325 0.6875...
du Consider the following Ordinary Differential Equation (ODE): = 2.5 + + +0.5 210 - 2.y? with initial condition at point o = 0.375: 300.0037 Apply Runge-Kutta method of the second order with h = 0.25 and the set of parameters given below to approximate the solution of the ODE at the three points given in the table below. Fill in the blank spaces. Round up your answers to 4 decimals. M 0.375 0.0037 0.625 0.0497 0.875 1.125 1.375 Parameters...
3. (a) Express the following ordinary differential equation and initial conditions as an autonomous system of first order equations: 2"-223z = 2, '(0)= 1 z(0) 0, (b) Consider the following second order explicit Runge-Kutta scheme written in au- tonomous vector form (y' = f(y)): hf (ynk kihf (yn), k2 yn+1 ynk2. IT Use the second order explicit Runge-Kutta scheme with steplength h compute approximations to z(0.1) and z'(0.1) 0.1 to _ 3. (a) Express the following ordinary differential equation and...
Problem 4. The higher order differential equation and initial conditions are shown as follows: = dy dy +y?, y(0) = 1, y'(0) = -1, "(0) = 2 dt3 dt (a) [5pts. Transform the above initial value problem into an equivalent first order differential system, including initial conditions. (b) [2pts.] Express the system and the initial condition in (a) in vector form. (c) [4pts.] Using the second order Runge Kutta method as follows Ū* = Ūi + hĚ(ti, Ūi) h =...
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...
Question 4 Not yet answered Marked out of 1.5000 Flag question Consider the following Ordinary Differential Equation (ODE): dy dx = 4.0 * ** + 2.56* *10 - 4 * y? with initial condition at point Xo = 0.75: 3b = 0.1898 Apply Runge-Kutta method of the second order with h = 0.1 and the set of parameters given below to approximate the solution of the ODE at the three points given in the table below. Fill in the blank...
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
Please solve Q 7 & 8 7. 14+6 marks] Consider the initial value problem y_y2, 2,y(1) = 1 y'= 1-t (a) Assuming y(t) is bounded on [1, 2], Show that f(t,v)--satisfies Lipschitz condition with respect to y. (b) Use second order Taylor method with h 0.2 to approximate y(1.2), then use the Runge- Kutta method: to compute an approximation of y(1.4). 8. [4 marks) Assuming that a1, o2 are non negative constants, determine the parameters o and β1 of the...