how to numerical solve d2y/dx2+f(x)dy/dx+y=0 in matlab. if f(x)=x^2+2x+1

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Md Mesbahus Saleheen
Md Mesbahus Saleheen 2015년 12월 31일
댓글: Walter Roberson 2016년 1월 3일
solving ODE for boundary condition y(0)=1,y(2)=10

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Triveni
Triveni 2016년 1월 2일
편집: Triveni 2016년 1월 2일
syms x y;
f=x^2+2*x+1;
df= diff(f);
d2f = diff(df);
solution = d2f + f *(df) + y;
i don't know whya re are you using isequalto 0 in "d2y/dx2+f(x)dy/dx+y=0"
or
syms x y;
f=x^2+2*x+1;
dy = diff(y);
d2y = diff(dy);
solution = d2y + f* dy + y;
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Walter Roberson
Walter Roberson 2016년 1월 3일
Well the symbolic solution is
HeunT(3^(2/3), -3, 0, (1/3)*3^(2/3)*(x+1)) * (exp(-26/3) * HeunT(3^(2/3), -3, 0, 3^(2/3)) * (int(exp((1/3)* z1 * (z1^2 + 3*z1+3)) / HeunT(3^(2/3), -3, 0, (1/3)*3^(2/3) * (z1+1))^2, z1, 0, 2)) - (int(exp((1/3) * z1*(z1^2+3*z1+3)) / HeunT(3^(2/3), -3, 0, (1/3)*3^(2/3)*(z1+1))^2, z1, 0, x)) * (exp(-26/3) * HeunT(3^(2/3), -3, 0, 3^(2/3)) - 10 * HeunT(3^(2/3), -3, 0, (1/3)*3^(2/3)))) * exp(-(1/3) *x * (x^2 + 3*x + 3)) / (exp(-26/3) * HeunT(3^(2/3), -3, 0, 3^(2/3)) * (int(exp((1/3)*z1 * (z1^2 + 3*z1+3)) / HeunT(3^(2/3), -3, 0, (1/3)*3^(2/3) * (z1+1))^2, z1, 0, 2)) * HeunT(3^(2/3), -3, 0, (1/3)*3^(2/3)))
where z1 is a temporary variable of integration.
Notice the three unresolved integrals for which there is no known closed form solution. The symbolic solution might tell you what you need to calculate but it is not a numeric solution at all, and the original poster specifically asked for a numeric solution.

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