Question 11 (2 marks) Special Attempt 2 I value problem: y'4y+3 Consider the initial value problem: y'-43 Using TWO(2) steps of the following explict third order Runge-Kutta scheme 1hyn 2 obt...
674%, y():1 nge- Consider the initial value problem: l- Using TWO(2) steps of the following explict third order Runge-Kutta scheme k1二hj(sn.yn). obtain an approximate solution to the initial value problem at x 0.04. Maintain at least eight decimal digit accuracy throughout all your calculations. You may express your answer as a single five decimal digit number, for example 17.18263. YOU DO NOT HAVE TO ROUND YOUR FINAL ESTIMATE y(0.04)* Skipped 674%, y():1 nge- Consider the initial value problem: l- Using...
Please have a clear hand writing :) Question Question 11 (2 marks) Special Attempt 1 (r+5 Consider the initial value problem: u'ー(EN) e-2x· y(0)=5. Using TWO(2) steps of the following explict third order Runge-Kutta scheme k3), 7t obtain an approximate solution to the initial value problem at x 0.2 Maintain at least eight decimal digit accuracy throughout all your calculations You may express your answer as a single five decimal digit number, for example 17.18263. YOU DO NOT HAVE TO...
Question 5 (1 mark) Attempt 1 Consider the initial value problem: y'= 4.0(1+42), y(1 Using one step of the following explict third order Runge-Kutta scheme ki = hf (Toniyn), k2 = hf(son+zh,yn+şkı), k3 = hf(antih,yn+şka), Yn+1 = yn+(k1+3kz), obtain an approximate solution to the initial value problem at x = 1.03. Maintain at least eight decimal digit accuracy throughout all your calculations. You may express your answer as a single five decimal digit number, for example 17.18263. YOU DO NOT...
the answer should be as computer answer Consider the initial value problem: y' = 842+ y(0)=5. (y+5) Using TWO(2) steps of the following explict third order Runge-Kutta scheme ki = hf(nyn), k2 = hf(n+ihgyn+şkı), k3 = hf(en+h,yn+şk2), Yn+1 = yn +4(k1+3k3), obtain an approximate solution to the initial value problem at x = 0.6 Maintain at least eight decimal digit accuracy throughout all your calculations. You may express your answer as a single five decimal digit number, for example 17.18263....
Question 12 (3 marks) Special Attempt 2 A system of two first order differential equations can be written as 0 dr A second order explicit Runge-Kutta scheme for the system of two first order equations is 1hg(n,un,vn), un+1 Consider the following second order differential equation d2 0cy-6, with v(1)-1 and y'()-o Use the Runge-kutta scheme to find an approximate solution of the second order differential equation, at x = 1.2, if the step size h Maintain at least eight decimal...
Please find y(1.4) Question Question 12 (3 marks) Special Attempt 1 A system of two first order differential equations can be written as A second order explicit Runge-Kutta scheme for the system of two first order equations is k1hn,un,vn), un+1 Consider the following second order differential equation d-y + 2 y-9y with y(1) and y'(1) 4 1. , Use the Runge-kutta scheme to find an approximate solution of the second order differential equation, at x-1.4, if the step size h...
Please have a clear hand writing :) Question Question 12 (3 marks) Special Attempt 1 A system of two first order differential equations can be written as A second order explicit Runge-Kutta scheme for the system of two first order equations is n+l Vn +12 Consider the following second order differential equation 4 d9-' with y(1)-4 and y'(1)-1 a.n Use the Runge-kutta scheme to find an approximate solution of the second order differential equation, at x = 1.4, if the...
Please have a clear hand writing :) Question Question 9 (2 marks) Special Attempt 1 y(0) 3. Consider the initial value problem: l Using Euler's method: yn+1ynthy n+1tn+h, with step-size h 0.05, obtain an approximate solution to the initial value problem at x- 0.1 Maintain at least eight decimal digit accuracy throughout all calculations You may express your answer as a five decimal digit number; for example 6.27181. YOU DO NOT HAVE TO ROUND YOUR FINAL ESTIMATE Estimate at x0.1...
Question Question 9 (2 marks) Attempt 1 Consider the initial value problem: v=2x2+5 y(1) = 3. Using Euler's method: yn+1 =y, thyn n+1 = In th, with step-size h = 0.5, obtain an approximate solution to the initial value problem at x = 2. Maintain at least eight decimal digit accuracy throughout all calculations. You may express your answer as a five decimal digit number, for example 6.27181 YOU DO NOT HAVE TO ROUND YOUR FINAL ESTIMATE. Estimate at x...
Please have a clear hand writing :) Question Question 9 (2 marks) Special Attempt 1 y(0) 3. Consider the initial value problem: l Using Euler's method: yn+1ynthy n+1tn+h, with step-size h 0.05, obtain an approximate solution to the initial value problem at x- 0.1 Maintain at least eight decimal digit accuracy throughout all calculations You may express your answer as a five decimal digit number; for example 6.27181. YOU DO NOT HAVE TO ROUND YOUR FINAL ESTIMATE Estimate at x0.1...