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To Dani,
MathKnight 15:43, 5 Mar 2004 (UTC)
Singular solution not always tangent to general solution curves
editbc
The ODE
can be solved in several ways.
When one uses
as a general solution (only the right half of every curve satisfies the diff. eq., as only the right half has a negative derivative), it is easy to see that
is a singular solution. As this is an asymptote to the curves, it's not really a tangent.
One can also use
as a general solution (again, only the right half of every curve is okay). The singular solution we found above, , is part of this family of curves. But now, the curve
is a singular solution. It is not tangent to any of the general solution curves. But it is an 'asymptotic curve' for .
A singular solution as a tangent is apparently not a general rule. But I'm not an expert, so maybe I missed something.
Pedro