Consider the following imperative code which finds the largest palindrome among products of 3-digit numbers (yes, it's the one of the first tasks from "Project of [outstanding mathematician of 18th century]" site):

```
curmax = 0
for i in range(999,100):
for j in range(999,100):
if ((i*j) < curmax): break
if (pal(i*j)):
curmax = i*j
break
print curmax
```

As I'm learning Haskell currently, my question is, how do you translate this (**and basically any imperative construct that contains something more complex than just plain iteration**, e.g. breaks, continues, temporary variables and all this) to Haskell?

My version is

```
maxpal i curmax
| i < 100 = curmax
| otherwise = maxpal (i-1) (innerloop 999)
where
innerloop j
| (j < 100) || (p < curmax) = curmax
| pal p = p
| otherwise = innerloop (j-1)
where p = i*j
main = print $ maxpal 999 0
```

but this looks like we're still in imperative uglytown.

So what could you advise, what are the approaches of dealing with such cases FP-style?

ifyou try to translate an imperative control flow into Haskell, then youwillbe in imperative uglytown, pretty much by definition. – Alexey Romanov Dec 22 '10 at 18:59