You don't have to use divide/modulo. Instead, iterate over the input digits, from low to high. For each digit position, first calculate what `1000....000`

would be in the output representation (it's 10x the previous power of 10). Then multiply that result by the digit, and accumulate into the output representation.

You will need routines that perform multiplication and addition in the output representation. The multiplication routine can be written in terms of the addition routine.

**Example:**

Convert 246 (base-10) to base-3.

Start by initialising output "accumulator" `a = "0"`

.

Initialise "multiplier" `m = "1"`

.

Note also that 10 is `"101"`

in the output representation.

**First digit is 6**, which is `d = "20"`

.

- Multiply:
`t = d * m = "20" * "1" = "20"`

.
- Accumulate:
`a = a + t = "0" + "20" = "20"`

.
- Update multiplier:
`m = m * "101" = "1" * "101" = "101"`

.

**Second digit is 4**, which is `d = "11"`

.

- Multiply:
`t = d * m = "11" * "101" = "1111"`

.
- Accumulate:
`a = a + t = "20" + "1111" = "1201"`

.
- Update multiplier:
`m = m * "101" = "101" * "101" = "10201"`

.

**Third digit is 2**, which is `d = "2"`

.

- Multiply:
`t = d * m = "2" * "10201" = "21102"`

.
- Accumulate:
`a = a + t = "1201" + "21102" = "100010"`

.

So the answer is `"100010"`

.