Properties of 12,345,679

Theorem
$12 \, 345 \, 679$ has the following properties:

In each product, the sequence $1$ to $9$, with the one given digit missing, can be read in order by cycling round it, skipping a fixed number of digits (counting an extra one when going from start to end), for example:


 * $2 \ (4691) \ 3 \ (58?2) \ 4 \ (6913) \ 5 \ (8?24) \ 6 \ (9135) \ 8 (?246) \ 9$

Also see

 * Penholodigital Properties of 123,456,789