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The DE y**-9y = 0, has two solutions: y1=e^3x and y2=e^(-3x).

 

No, it has an infinite number of solutions!  y = C₁ * e^3x + C₂*e^-3x    and Prime is able to come up with it

or

or using hyperbolic functions

To get particular solution you have to provide initial values. For example to get the two solutions which you mentioned you would use

and

or even

etc.

Not sure what exactly you mean by  "define the solution interval" ?

In case you have using  odesolve(vf, b, [intvls])  in mind: the lower limit is defined by the initial condition. If you use y(0)=.... then the lower limit is 0.

The upper limit is the second function argument b of odesolve.

And if you have the 'interval of validity' or "interval of definition' in mind - that may also depend on the initial condition and Prime will not provide it.

Lets take for example the ODE y'=y^2 with y(0)=1. The solution is y=1/(1-x) and Prime can provide it

The function is defined in R\{0} but that's not an INTERVAL - so the interval of definition is just (-infinity; 1) because the value 0 of the IC lies within this interval. Prime will be of no help to come up with this interval.