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To find the solution for the differention equation y' = 2ty + 3 with initial value...
I. Use Euler's method with step size h = 0.1 to numerically solve the initial value problem y,--2ty+y2, y(0) 1 on the interval 0 < t 2. Compare your approximations with the exact solution.
I. Use Euler's method with step size h = 0.1 to numerically solve the initial value problem y,--2ty+y2, y(0) 1 on the interval 0
Consider the initial-value problem yl =0.3y y(3) = 0.2 (a) Use Euler's method to estimate y (-2with step size h 0.5 Give your approximation for y (-2)with a precision of ±0.01 y(2) Number (b) Use Euler's method to estimate y (-2)with step size h = 0.25 Give your approximation for y (-2)with a precision of ±0.01 y (-2) Number
Consider the initial-value problem yl =0.3y y(3) = 0.2 (a) Use Euler's method to estimate y (-2with step size h 0.5...
Consider the initial value problem below to answer to following. a) Find the approximations to y(0.2) and y(0.4) using Euler's method with time steps of At 0.2, 0.1, 0.05, and 0.025 b) Using the exact solution given, compute the errors in the Euler approximations at t 0.2 and t 0.4. c) Which time step results in the more accurate approximation? Explain your observations. d) In general, how does halving the time step affect the error at t 0.2 and t...
a use Euler's method with each of the following step sizes to estimate the value of y 0.4 where y is the solution of the initial value problem y -y, y 0 3 カー0.4 0.4) (i) y10.4) (in) h= 0.1 b we know that the exact solution of the initial value problem n part a s yー3e ra , as accurately as you can the graph of y e r 4 together with the Euler approximations using the step sizes...
Problem 3. Given the initial conditions, y(0) from t- 0 to 4: and y (0 0, solve the following initial-value problem d2 dt Obtain your solution with (a) Euler's method and (b) the fourth-order RK method. In both cases, use a step size of 0.1. Plot both solutions on the same graph along with the exact solution y- cos(3t). Note: show the hand calculations for t-0.1 and 0.2, for remaining work use the MATLAB files provided in the lectures
Problem...
Find the value of x(0.5) for the initial value problem at = thx(0)=1 using Euler's method with step size h 0.05 Find the value of x(0.4) for the coupled first order differential equations together with initial conditions with step size 0.1: 2. dt t+x 3. dx dt = y, dy dt x(0) = 1.2 and --ty +xt2 + y(o) 0.8
Find the value of x(0.5) for the initial value problem at = thx(0)=1 using Euler's method with step size h...
Consider the initial value problem below to answer to following. a) Find the approximations to y(0.3) and y(0.6) using Euler's method with time steps of At 0.3, 0.15, 0.075, and 0.0375 b) Using the exact solution given, compute the errors in the Euler approximations at t 0.3 and t 0.6. c) Which time step results in the more accurate approximation? Explain your observations. d) In general, how does halving the time step affect the error at t 0.3 and t...
Use a 2 step Euler's method to approximate y(1.2), of the solution of the initial-value problem y' = 1 – 2x2 – 2y, y(1) = 4. If you use a formula, as part of your work you MUST indicate what formula you are using and what values your variables have. y(1.2) =
Complete using MatLab
1. Consider the following initial value problem 3t2-y, y(0) = 1 Using Euler's Method and the second order Runge-Kutta method, for t E [0, 1] with a step size of h 0.05, approximate the solution to the initial value problem. Plot the true solution and the approximate solutions on the same figure. Be sure to label your axis and include an a. appropriate legend b. Verify that the analytic solution to the differential equation is given by...
Please help with all the parts to the question
Consider the initial value problem y (t)-(o)-2. a. Use Euler's method with At-0.1 to compute approximations to y(0.1) and y(0.2) b. Use Euler's method with Δ-0.05 to compute approximations to y(0.1) and y(02) 4 C. The exact solution of this initial value problem is y·71+4, for t>--Compute the errors on the approximations to y(0.2) found in parts (a) and (b). Which approximation gives the smaller error? a. y(0.1)s (Type an integer...