Can we construct two sets $E$ and $F$ meeting the following criteria

1) $\dim_H(E) = \dim_H(F) = \dim_H(E ∩ F)$

2) $\dim_P(E), \dim_P(F)$, and  $\dim_P(E ∩ F)$ are distinct?

Here $\dim_H$ denotes the Hausdorff dimension and $\dim_P$ denotes the packing dimension.