Let's take things apart, working from the inside out. Starting from this:
last $ filter (<100) $ [2..] >>= (\a -> if 0 == (length $ filter (== 0) $ map (mod a) $ [2..a-1]) then (return a) else )
map (mod a) [2..a-1]. This is just a transformation of a finite list, so no problems here, and we'll ignore it from here on, putting
[..] in its place. Since we only care about termination, any finite list as good as another.
Same goes for
filter (== 0) [...]. This can only make the list shorter, so we may end up with an empty list instead, but definitely finite. So ignore this as well. Now consider
length [..]--we know the list is finite, so this will terminate just fine, giving some answer of 0 or more. We'll ignore the specific answer and put
? in its place. Still fine so far.
\a -> if 0 == ? then return a else  is using
return in the list monad, so this replaces
a with either
, which is incidentally equivalent to
Maybe, but that's another matter. Again, we know this much will work, so we ignore the details and use
\a -> [a?].
The monadic bind
[2..] >>= \a -> [a?] is more interesting.
(>>=) here is
concatMap, and the first argument is an infinite list. Mapping each element to a singleton list and concatenating obviously changes nothing, while mapping to the empty list removes an element, so this is essentially just
filter. Things are not as simple here, however, because we're filtering an infinite list with no obvious assurance that anything will pass the filter. If you do
filter (const False) [0..] the "result" will have no elements, but the computation will never finish; the
 in the output of
filter comes from finding the end of the input list, and this has none, and since it will never find a first element, the result is just
So things are problematic already. The next part,
filter (<100), makes things worse--we're filtering elements out of a strictly-increasing list, then filtering it based on being under some value, so by the above argument if we go past
100 in the result the computation will hang.
And the final insult is
last--the list in question is still infinite, but will diverge at some point rather than produce more elements, so when we ask for the last element we can see that it will fail to terminate for multiple reasons!
What you want to do here is, first, apply your knowledge that the list is strictly increasing, and rather than filtering the list, simply take a prefix of it up to the desired point--e.g.,
takeWhile (<100) rather than
filter (< 100). Note that this would still diverge if there are no elements greater than 100 in the result, since
takeWhile won't know when to stop.