The potential energy of two protons in hydrogen molecule ion in a model is given below \begin{eqnarray}
V(x) &=& |E_1| f(x) \\
f(x) &=& - 1 + \frac{2}{x}\left[ \frac{(1-(2/3)x^2) e^{-x} + (1+x) e^{-2x}}
{1+(1+x+x^2/3) e^{-x} }\right], \qquad x=R/a
\end{eqnarray}
$E_1= 13.6 \text{ eV}$ is the ground state energy of H atom and $a$ is the Bohr radius $\hbar^2/me^2$. The graph of this function $f(x)$ is reproduced below. Find numerical values of the bond length in ${A^o}$, the zero point energy and spacing of vibrational spectrum, both energies in electron volts.
NoteThe expression for $V(x)$ is taken from an approximate variational calculation of energy of the H molecule ion in Born Oppenheimer approximation.
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4727:Diamond Point