We can rotate the square by 360/7 degrees and have a net effect of zero since the heptagon is rotationally symmetric at 360/7 degrees.  What this rotation actually accomplishes is situating the square on a different set of vertices of the heptagon.

So then lets apply this rotation 6 times.  Then the square is oriented 45/7 + 6*260/7 = 315 degrees = -45 degrees. This confirms what I suspected from the beginning - the optimal placement has the heptagon lined up with a diagonal of the square (one of the altitudes of the heptagon coincides with a diagonal of the square).