Find the Steady-state Solution of
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How to find the steady state solution
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dy/dx = y(y-1)(y+1)
We can separate the variables, break the integrand into partial fractions, and integrate the fractions easily.
Solving gives y = the square root of 1 / (1 - e^(2t)).
as t goes to infinity, y goes to zero which the steady state solution.
But, the actual wording of the problem goes like this.
Find the steady state solution of the differential equation WITHOUT determining the exact solution and taking t to infinity.
How can that be done? Please help. Thanks.
Answers and Replies
dy/dx=y(y-1)(y+1)
So, y=0, y=1 or y=-1.
The book says the only answer is y=0. Why are y=-1 and y=+1 rejected as steady state solutions?
Quite often when students give us answers we are able to work out what the questions were but generally we find it easier the other way round. 
Steady state may be - guessing - dy/dt = 0, and dx/dt = 0? Maybe your other solutions do not work for that? Like dy/dx = 0 , when dy/dt = 0 but dx/dt ≠ = 0, which is possible but not a steady state. ?
Nor really checked but doubtful about the solution you have given.
It should be given in terms of x NOT t. sorry about that.
ie, y = the square root of 1/(1-e^(2x))
Back to my issue.
By setting dy/dx = 0, we should get three steady state solutions. y=0, y=1 or y=-1
Is there a way to verify that ONLY y=0 is correct which is the book's answer? Thanks.
I trust you have redifferentiated your solution to check it is correct. I did and agree it is - but it is only one solution, not the general solution. You have forgotten to put in a constant of integration. I think the solution is
y = (1 - Ke^2x)^-(1/2)
with K arbitrary constant.
Then you can get solutions through any point in the x,y plane.
Including through those y values you mentioned. I will put up a plot of the solutions if I can and you will see they are just what you can expect qualitatively directly from the d.e.
Just from the language used, "steady state" really suggests x represents time. In that case I see nothing wrong with what you say and all three y's correspond to steady states. Just that y = 0 is a stable steady state to which anything starting between y = -1 and y = 1 converges, while the other two are unstable steady states from which anything off those lines however slightly goes away from them as time goes on. But they are called steady states nonetheless.
I don't know what trick Mute has in mind. Are you sure you reproduced the question verbatim?
Worry about the fact that some values of K in the solution, as also in your original solution, seem to give you infinite y.
What I mean. x → , y ↑
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Find the Steady-state Solution of
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