The coefficient of $z^n$ in $_2F_0(\alpha,\beta;z)\; {}_2F_0(\alpha,\beta;-z)$
is 
$$\begin{aligned}
\sum_{k=0}^n (-1)^{n-k}&\frac{(\alpha)_k(\beta)_k (\alpha)_{n-k}(\beta)_{n-k}}{k! (n-k)!}\hfill\\
&=(-1)^n \frac{(\alpha)_n(\beta)_n}{n!} 
  {}_3F_2\left({-n,\atop}\!{\alpha,\atop 1-\alpha -n,}\,
  {\beta\atop1-\beta-n}\biggm | 1\right).
\end{aligned}
$$ 
The right side can be evaluated by Dixon's theorem to give the identity cited by Johannes Trost.