Simplicial manifold associated to Lie groupoid

Let $$\Gamma=(\Gamma_1\rightrightarrows \Gamma_0), \Gamma’=(\Gamma’_1\rightrightarrows \Gamma’_0)$$ be Lie groupoids and $$\Gamma_{\bullet} ,\Gamma’_{\bullet}$$ be the simplicial manifolds associated to $$\Gamma,\Gamma’$$ respectively.

Question : If the simplicial manifolds $$\Gamma_{\bullet}$$ and $$\Gamma’_{\bullet}$$ are isomorphic, then, does it imply that $$\Gamma=(\Gamma_1\rightrightarrows \Gamma_0)$$ and $$\Gamma’=(\Gamma’_1\rightrightarrows \Gamma’_0)$$ are Morita equivalent?

Has this been mentioned anywhere?