Help with Laplace transform method for 2nd order DE

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Nina
Nina am 23 Apr. 2023
Beantwortet: Star Strider am 23 Apr. 2023
I'm trying to solve the equation: y'' +2y' +y = g(t), with g(t) = { sin(t) if t < pi, 0 if t < pi }, and the intial conditons y(0) = 0 and y'(0) = 0.
Here's the code that I've tried:
syms s t y(t) Y
g = heaviside(t)*(sin(t)) + heaviside(t - pi)*(-sin(t));
eqn = diff(y,2) + 2*diff(y) + 2*(y) == g;
lteqn = laplace(eqn, t, s);
neweqn = subs(lteqn, [laplace(y(t), t, s), y(0), subs(diff(y(t), t, 0)), [Y, 0, 0]]);
ytrans = simplify(solve(neweqn, Y));
Warning: Unable to find explicit solution. For options, see help.
Invalid expression. Check for missing multiplication operator, missing or unbalanced delimiters, or other syntax error. To construct matrices, use brackets instead of parentheses.

Error in connector.internal.fevalMatlab

Error in connector.internal.fevalJSON
> In sym/solve (line 317)
>> y = ilaplace(ytrans, s, t)
y =
Empty sym: 0-by-1
I'm not sure why ytrans is not finding a solution. Can someone help me fix this/ find a different method?

Akzeptierte Antwort

Star Strider
Star Strider am 23 Apr. 2023
In the subs call, use curly braces {} instead of square brackets [].
Then, it works —
syms s t y(t) Y
g = heaviside(t)*(sin(t)) + heaviside(t - pi)*(-sin(t));
eqn = diff(y,2) + 2*diff(y) + 2*(y) == g;
lteqn = laplace(eqn, t, s);
neweqn = subs(lteqn, {laplace(y(t), t, s), y(0), subs(diff(y(t), t), t, 0)}, {Y, 0, 0})
neweqn = 
ytrans = simplify(solve(neweqn, Y));
y = ilaplace(ytrans, s, t)
y = 
figure
fplot(y, [0 10])
grid
.

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