let *n* be an integer and *A* = {2,3,...,10} and I want to do as follows:

- divide
*n*to 2, so there is a reminder*r*_{2}and a quotient*q*_{2}. - divide
*q*_{2}to 3, so there is a reminder*r*_{3}and a quotient*q*_{3}. - we repeat this until the quotient is less than the next number.
- write together the last quotient with the previous reminders.

For example n=45

```
45/2 ....... r_2=1, q_2=22
22/3 ....... r_3=1, q_3=7
7/4 ....... r_4=3, q_4=1
```

since *q*_{4} = 1 is less than the next number i.e. 5, we break.

the result is *q*_{4}*r*_{4}*r*_{3}*r*_{2} where it is equal to 1311.

Thank you for your help.

I did this but it does not work

```
n = 45;
i = 2;
list = {Mod[n, i]};
While[Quotient[n, i] >= i + 1, n == Quotient[n, i]; i++;
AppendTo[list, Mod[n, i]];
If[Quotient[n, i] < i + 1, Break[]]; AppendTo[list, Quotient[n, i]]];
list
Row[Reverse[list]]
```

which gives

```
{1, 0, 15, 1, 11, 0, 9, 3, 7, 3}
Row[{3, 7, 3, 9, 0, 11, 1, 15, 0, 1}]
```

where it is not my desired result.

mixed-radix arithmeticthis SO question -- stackoverflow.com/questions/759296/… -- provides some useful guidance. – High Performance Mark Oct 24 '12 at 11:59