taylor series expansion with initial condition

1 回表示 (過去 30 日間)
MINATI
MINATI 2020 年 1 月 4 日
コメント済み: MINATI 2020 年 1 月 5 日
syms x f(x) p
f1=taylor(f(x),x,'order',3)
(D(D(f))(0)=p; D(f)(0)=1; f(0)=0;
%%% I want to put initial conditios (D(D(f))(0)=p; D(f)(0)=1; f(0)=0; in f1 to
find f1=x+p*x^2/2 in symbolic form. Guide me please

サインインしてこの質問に回答する。

採用された回答

John D'Errico
John D'Errico 2020 年 1 月 5 日
編集済み: John D'Errico 2020 年 1 月 5 日
Why not try it! ??? Make an effort. For example, this seems the obvious thing to try. So what does this do?
syms x f(x) p
f1=taylor(f(x),x,'order',3)
f1 =
(D(D(f))(0)*x^2)/2 + D(f)(0)*x + f(0)
subs(f1,f(0),0)
ans =
(D(D(f))(0)*x^2)/2 + D(f)(0)*x
Can you finish the next two steps on your own?
  5 件のコメント
3 件の古いコメントを表示
John D'Errico
John D'Errico 2020 年 1 月 5 日
Yes, but you cannot do what you want.
syms x f(x) p g(x) a q h(x) r
f1 = taylor([f(x) g(x) h(x)],x,'order',[3 3 2]);
Error using sym/taylor (line 99)
The value of 'Order' is invalid. It must satisfy the function: isPositiveInteger.
The taylor function appears not to be vectorized in the sense that you can expand each term ot the vector of functions to a different order.
So this next is valid:
f1 = taylor([f(x) g(x) h(x)],x,'order',3);
And then you should be able to proceed further.
MINATI
MINATI 2020 年 1 月 5 日
Now everything is OK
but can it be possible to bring
[ f(1) g(1) h(1) ] = [ x+p*x^2/2 a*x+q*x^2/2 1+r*x]
as I have to incorporate this in another code

サインインしてコメントする。

その他の回答 (0 件)

カテゴリ

Help Center および File ExchangeCalculus についてさらに検索

タグ

Community Treasure Hunt

Find the treasures in MATLAB Central and discover how the community can help you!

Start Hunting!

Translated by