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The base $ABCD$ of a square pyramid $ABCDV$ has an edge of $6\mathrm{cm}$. The height of the pyramid is $4\mathrm{cm}$. Find the distance between the line $S_{VB}{S}_{VC}$ and the line $BC$. The points $S_{VB}$ and $S_{VC}$ are the midpoints of $VB$ and $VC$, respectively.