You may have originally had a stack overflow because of a typo: you switched between `min`

and `minn`

in the middle of `repeatRecurse`

(you would have caught that if `repeatRecurse`

hadn’t been defined in the outer function). With that fixed, `repeatRecurse(1,13,13)`

returns 156.

The obvious answer to avoiding a stack overflow is to turn a recursive function into a non-recursive function. You can accomplish that by doing:

```
function repeatRecurse(min, max, scm) {
while ( min < max ) {
while ( scm % min !== 0 ) {
scm += max;
}
min++;
}
}
```

But perhaps you can see the mistake at this point: you’re not ensuring that `scm`

is still divisible by the elements that came before `min`

. For example, `repeatRecurse(3,5,5)=repeatRecurse(4,5,15)=20`

. Instead of adding `max`

, you want to replace `scm`

with its least common multiple with `min`

. You can use rgbchris’s gcd (for integers, `!b`

is the same thing as `b===0`

). If you want to keep the tail optimization (although I don’t think any javascript engine has tail optimization), you’d end up with:

```
function repeatRecurse(min, max, scm) {
if ( min < max ) {
return repeatRecurse(min+1, max, lcm(scm,min));
}
return scm;
}
```

Or without the recursion:

```
function repeatRecurse(min,max,scm) {
while ( min < max ) {
scm = lcm(scm,min);
min++;
}
return scm;
}
```

This is essentially equivalent to rgbchris’s solution. A more elegant method may be divide and conquer:

```
function repeatRecurse(min,max) {
if ( min === max ) {
return min;
}
var middle = Math.floor((min+max)/2);
return lcm(repeatRecurse(min,middle),repeatRecurse(middle+1,max));
}
```

I would recommend moving away from the original argument being an array of two numbers. For one thing, it ends up causing you to talk about two different arrays: `[min,max]`

and the range array. For another thing, it would be very easy to pass a longer array and never realize you’ve done something wrong. It’s also requiring several lines of code to determine the min and max, when those should have been determined by the caller.

Finally, if you’ll be working with truly large numbers, it may be better to find the least common multiple using the prime factorization of the numbers.

`divide and conquer`

algorithm approach instead of`recursion`

– vinayakj Jul 8 '15 at 19:49`divide and conquer`

recursion doesnt have to happen with whole data, you do it on subsets so you wont have stack overflow – vinayakj Jul 8 '15 at 20:15