Show that any non-trivial solution of the differential equation $y''+(1/4)(2-x^2)y=0$ has at most $1$ zero in $\mathbb R$.
I have shown that $y_{1}=e^{-x^2/4} $ is a solution of the ODE.
2026-03-28 14:05:30.1774706730
Show that any non-trivial solution has at most 1 zero in R
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