ode:=(x+1)*diff(y(x),x)+y(x)^(1/2) = 0;
ic:=y(0) = 1;
Direct use of odetest does not give zero.
When asking Solve for possible values of x which makes the above zero, it only gave the upper bound
The actual range which makes res=0 is actually -1<x<exp(2)-1
res:=odetest(sol,ode) assuming -1<x,x<exp(2)-1
How could one using Maple obtain this range -1<x<exp(2)-1?
Mathematica gives the answer using Reduce:
Is it possible to obtain such result in Maple, since Solve did not give complete answer.