I've written the following Haskell code to produce a list where the nth element is the number of 1s in writing 1..n as binary numbers (it's related to euler 391, incidentally):
buildList :: a -> (a -> a) -> [a] buildList start f = start : buildList (f start) f differences :: [[Int]] differences = buildList  (\x -> x ++ map (+1) x) sequenceK' :: Int -> [Int] sequenceK' n = tail $ scanl (+) 0 (last $ take n differences)
which results in
sequenceK' n giving a list of 2^(n-1) elements.
This question has two parts:
a) Why does the time taken to compute
head $ sequenceK' n increase with n? -- due to ghc's laziness, I would expect the time to remain more or less constant.
b) Is it possible to define an infinite version of this list so that I can do things like
takeWhile without having to worry about the value of the parameter passed to