I am doing problem 61 at project Euler and came up with the following code (to test the case they give):

```
p3 n = n*(n+1) `div` 2
p4 n = n*n
p5 n = n*(3*n -1) `div` 2
p6 n = n*(2*n -1)
p7 n = n*(5*n -3) `div` 2
p8 n = n*(3*n -2)
x n = take 2 $ show n
x2 n = reverse $ take 2 $ reverse $ show n
pX p = dropWhile (< 999) $ takeWhile (< 10000) [p n|n<-[1..]]
isCyclic2 (a,b,c) = x2 b == x c && x2 c == x a && x2 a == x b
ns2 = [(a,b,c)|a <- pX p3 , b <- pX p4 , c <- pX p5 , isCyclic2 (a,b,c)]
```

And all `ns2`

does is return an empty list, yet `cyclic2`

with the arguments given as the example in the question, yet the series doesn't come up in the solution. The problem must lie in the list comprehension `ns2`

but I can't see where, what have I done wrong?

Also, how can I make it so that the `pX`

only gets the `pX (n)`

up to the pX used in the previous `pX`

?

PS: in case you thought I completely missed the problem, I will get my final solution with this:

```
isCyclic (a,b,c,d,e,f) = x2 a == x b && x2 b == x c && x2 c == x d && x2 d == x e && x2 e == x f && x2 f == x a
ns = [[a,b,c,d,e,f]|a <- pX p3 , b <- pX p4 , c <- pX p5 , d <- pX p6 , e <- pX p7 , f <- pX p8 ,isCyclic (a,b,c,d,e,f)]
answer = sum $ head ns
```

`takeWhile (< 9999)`

, so as not to exclude the number 9999. – Stephan202 Nov 15 '09 at 13:15`sum`

is of type`Num a => [a] -> a`

, i.e. it takes a list. Yet`head ns`

will yield a six-tuple. That does not compile. So how can that code give you the correct result? – Stephan202 Nov 15 '09 at 13:16`ns`

a list of a..f . And I don't think 9999 will have an affect, but I'll change it. The problem is in the`ns2`

function but I don't know what it is. – Jonno_FTW Nov 15 '09 at 14:41