Laplace transform of a function squared, help with this system

Locoism
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Homework Statement



Use Laplace transform to the system:

[itex]\frac{dy}{dt} + 6y = \frac{dx}{dt}3x - \frac{dx}{dt} = 2\frac{dy}{dt}[/itex]

[itex]x(0) = 2 ; y(0) = 3[/itex]

The Attempt at a Solution



I've tried everything on this one. I first solved [itex]\frac{dy}{dt} + 6y = 2\frac{dy}{dt}[/itex] and I got [itex]y = 3e^{6t}[/itex].

Next I tried writing it:

[itex]36e^{6t} = 3 \frac{d}{dt}(\frac{x^2}{2}) - \frac{dx}{dt}[/itex] so that I could use the identity of the laplace transform of derivatives. That still leaves me with trying to find the transform of x2(t)...

So then I tried

[itex]36e^{6t} dt = 3x - 1 dx[/itex]

and integrating, but this brings me to the same problem.

I can't either figure out how to solve it without using laplace transform, so I'm really stuck. What am I doing wrong?
 
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Locoism said:

Homework Statement



Use Laplace transform to the system:

[itex]\frac{dy}{dt} + 6y = \frac{dx}{dt}3x - \frac{dx}{dt} = 2\frac{dy}{dt}[/itex]

[itex]x(0) = 2 ; y(0) = 3[/itex]

The Attempt at a Solution



I've tried everything on this one.

Everything except what you were asked to do. Start by taking the Laplace transforms of the original equations to get equations involving ##X(s)## and ##Y(s)##.
 
Ok, I'm still not sure how that changes anything...

[itex](s+6)Y(s) - 3 = 3L(\frac{dx}{dt}x) - sX(s) +2 = 2sY(s) -6[/itex]

I could solve for that middle transform, but replacing it into another equation will just give me 0=0...

What now?
 
You have the "system" as$$
\frac{dy}{dt} + 6y = \frac{dx}{dt}3x - \frac{dx}{dt} = 2\frac{dy}{dt}$$
I apparently don't know what "system" you are thinking of because that isn't how you normally write one.

I read that to mean this pair of equations:$$
\frac{dy}{dt} + 6y = \frac{dx}{dt}$$ $$
3x - \frac{dx}{dt} = 2\frac{dy}{dt}$$
 
Ok well that would be much easier to solve. I guess I'll assume there's a typo in the question because I was asking myself the same thing.
Glad to know I'm not insane after all.
 

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