Calling Euler Method to solve Shooting Method
이전 댓글 표시
Hi, I am trying to solve a BVP:
y''(x) +5y'(x)+4y(x) = 1 with boundary conditions y(0) = 0 and y(1)=1
using shooting method.
I found many examples by solving such BVP using ode45 but I want to solve it by euler method (not allowed to use built-in command), but I got stuck in doing so.
I need help to do so...
Thanks,
채택된 답변
Alan Stevens
2021년 5월 9일
0 개 추천
You need to express your 2nd order ode as two 1st order odes
y``(x) + 5y`(x) + 4y(x) = 1
v = dy/dx
dv/dx = y``(x)
So you have
y`(x) = v(x)
v`(x) = 1 - 4*y(x) - 5*v(x)
Now your Euer expressions become
t(i) = t(i-1) + h;
y(i) = y(i-1) + h*v(i-1);
v(i) = v(i-1) + h*(1 - 4*y(i-1) - 5*v(i-1));
and you must supply initial values for both y and v.
댓글 수: 4
Muhammad Usman
2021년 5월 11일
Hira Nur Yesiloglu
2022년 6월 7일
mr.usman do you have the complete code using euler?
Fareeha
2024년 11월 24일
how will we use built in command to solve this problem?
Use "bvp4c" or - for simple problems as the one given - "dsolve".
If you are forced to use the shooting method, combine "ode45" and "fsolve".
syms y(x)
ysol = dsolve(diff(y,2)+5*diff(y,x)+4*y(x)==1,[y(0)==0,y(1)==1])
추가 답변 (0개)
카테고리
도움말 센터 및 File Exchange에서 Ordinary Differential Equations에 대해 자세히 알아보기
Community Treasure Hunt
Find the treasures in MATLAB Central and discover how the community can help you!
Start Hunting!
Translated by 
