epheterson
Jun19-08, 10:46 PM
I hope somebody's up tonight, this is due in the morning and I'm so close.
So I was assigned to solve this differential equation using laplace transforms and although I (think I) can solve it, I'm not getting the same answer that Maple spits out.
The DE is:
x'' + 2x' + 5x = 3e^{-t}cos(2t); x(0) = x'(0) = 1
Let L(x) = Laplace(x)
So here's my work:
Take the Laplace of everything
L(x'')+2L(x')+5L(x) = 3L(e^{-t}cos(2t))
Becomes:
s^2L(x)-s(1)-(1)+2sL(x)+2(1)+5L(x)=3L(e^{-t}cos(2t))
Let L(x) = X
X(s^2+2s+5)-s+1=\frac{3(s+1)}{(s+1)^2+4}
I solved for X, simplified and broke it into partial fractions to figure out the Inverse Laplase but got the wrong answer. Is there anywhere I messed up in what you can see?
So I was assigned to solve this differential equation using laplace transforms and although I (think I) can solve it, I'm not getting the same answer that Maple spits out.
The DE is:
x'' + 2x' + 5x = 3e^{-t}cos(2t); x(0) = x'(0) = 1
Let L(x) = Laplace(x)
So here's my work:
Take the Laplace of everything
L(x'')+2L(x')+5L(x) = 3L(e^{-t}cos(2t))
Becomes:
s^2L(x)-s(1)-(1)+2sL(x)+2(1)+5L(x)=3L(e^{-t}cos(2t))
Let L(x) = X
X(s^2+2s+5)-s+1=\frac{3(s+1)}{(s+1)^2+4}
I solved for X, simplified and broke it into partial fractions to figure out the Inverse Laplase but got the wrong answer. Is there anywhere I messed up in what you can see?