Error using sym>convertChar (line 1537) when solving an ODE using laplace transform. How to fix the problem?
이전 댓글 표시
%%CODE
%% Solving 2nd order ODE using laplace transform
clc, clear , close all
syms x t s X F
F = laplace('diff(x(t),t,t)+7*diff(x(t),t)+10*x(t)= 20',s); % solving using laplace transform
F = subs(F,{'x(0)','D(x)(0)'},{5,3}); % initial values
F = subs(F,{'laplace(x(t),t,s)'},{X}); % substituting the initial values then solve Laplace
X = solve(F,'X');
X = ilaplace(X);
X = simplify(X); pretty(X);
disp(X)
%% ERROR BELOW
Error using sym>convertChar (line 1537)
Character vectors and strings in the first argument can only
specify a variable or number. To evaluate character vectors and
strings representing symbolic expressions, use 'str2sym'.
Error in sym>tomupad (line 1253)
S = convertChar(x);
Error in sym (line 220)
S.s = tomupad(x);
Error in transform (line 22)
if ~isa(f, 'sym'), f = sym(f); end
Error in sym/laplace (line 28)
L = transform('symobj::laplace', 't', 's', 'z', F, varargin{:});
Error in HW_1_3_2_4070H300 (line 4)
F = laplace('diff(x(t),t,t)+7*diff(x(t),t)+10*x(t)= 20',s); %
solving using laplace transform
댓글 수: 2
Naveed Naqvi
2021년 5월 15일
Having the same exact problem unfortunately :/
Walter Roberson
2021년 5월 15일
Since R2017b (I think it is) you cannot pass character vectors to laplace() . You need to construct the symbolic equation and pass that instead.
채택된 답변
Eliminate the single quotes, use double equal signs in the symbolic expression, express ‘x’ as ‘x(t)’ in the syms declaration (otherwise, ‘x’ is assumed to be a constant), and it works —
syms x(t) t s X F
Dx = diff(x);
D2x = diff(Dx);
F = laplace(D2x+7*Dx+10*x(t) == 20,s); % solving using laplace transform
F = subs(F,{x(0),Dx(0)},{5,3}); % initial values
F = subs(F,{laplace(x(t),t,s)},{X}); % substituting the initial values then solve Laplace
X = solve(F,X);
X = ilaplace(X);
X = simplify(X); pretty(X);
disp(X)
Character arrays have not been allowed for the last few releases. (The one exception that remains is in the sym funciton.)
댓글 수: 4
Konard Adams
2021년 5월 17일
편집: Walter Roberson
2021년 5월 17일
Star Strider
2021년 5월 17일
As always, my pleasure!
Declaring ‘t’ specifically is not absolutely required (in this instance), since it is implied in declaring ‘x(t)’. It is needed in that declaration because ‘x(t)’ needs to be defined as a function in the syms declaration in order for the code using it to work (specifically with respect to defining and calculating the detrivatives of ‘x(t)’).
Konard Adams
2021년 5월 17일
Star Strider
2021년 5월 17일
Cheers!
추가 답변 (1개)
Walter Roberson
2021년 5월 15일
편집: Walter Roberson
2021년 5월 15일
%%CODE
%% Solving 2nd order ODE using laplace transform
syms x(t) s X F
Dx = diff(x,t);
D2x = diff(Dx,t);
eqn = D2x + 7*Dx + 10*x(t) == 20
F = laplace(eqn,s) % solving using laplace transform
F = subs(F,{x(0), Dx(0)},{5,3}) % initial values
F = subs(F, {laplace(x(t),t,s)},{X}) % substituting the initial values then solve Laplace
X = solve(F, X)
X = ilaplace(X)
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