Polydivisible Number/Examples/3,608,528,850,368,400,786,036,725

Theorem
The largest polydivisible number has $25$ digits:
 * $3 \, 608 \, 528 \, 850 \, 368 \, 400 \, 786 \, 036 \, 725$

Proof
From No Polydivisible Number with 26 Digits Exists, there are no polydivisible numbers with more digits.

Also see

 * Pandigital Polydivisible Number: $381 \, 654 \, 729$