Divisor 3989

To determine if any number is divisible by 3989, apply the "KARLOS KAZINAKIS Test":

1. If your number ("X") has 9 digits or more, separate the last (smallest) 8 digits from the rest. This makes two smaller numbers, call them L^eft and R^ight (note: don't add in trailing zeros to L). If there are fewer than 9 digits, L = 0 and therefore R = X.
2. Multiply L by 241 and subtract this from R.
3. Take that result and cross off its final digit (units). Take this new number and add 399 times the digit you just crossed off. Call this final result "Y".
4. Y will be much smaller than X, but we have preserved divisibility by 3989. That is, your original number is divisible by 3989 if (and only if) Y is. Now that it's much smaller, with basic knowledge of your 3989-times tables, it should be easy to visually see if Y is divisible by 3989. If the Y is still much larger than 3989, the above process can be repeated until it does reduce to within small multiples of 3989.

Easy!