One approach to get fast bignum computation is to use high values for the base.

As an example consider the sum

```
12301922342343 +
39234932348823
--------------
51536854691166
```

When doing this computation by hand you start from rightmost digit and sum them keeping a "carry" in mind if the result gets past 9. From right to left 3+3=6, 4+2=6, 3+8=1+carry 1, 2+8+1=1+carry 1 and so on.

What you can do is however do the computation in multiple digits chunks... for example

```
012 301 922 342 343 +
039 234 932 348 823
-------------------
051 536 854 691 166
```

This is the same computation as before but now I'm using base 1000 instead of base 9 (digits go from 000 to 999) and I can use the same approach. Rightmost digit is 343+823=166 carry 001, 342 + 384 + 001 = 691, 922 + 932 = 854 carry 001 and so on.

To be able to easily do multiplications (needed also for the division algorithm) a reasonable choice for the base with 32-bit integers is 9999 because 9999*9999 is still less than 2**32 and so can be computed directly without overflows.

Using a base in the form of 10**n makes it easy to print out results in decimal one digit at a time.