# How can I factor this Haskell expression to avoid repeated computation?

I have this function (produces the fibonacci sequence):

``````unfoldr (\(p1, p2) -> Just (p1+p2, (p1+p2, p1)) ) (0, 1)
``````

In here, I notice a repeated expression, `p1+p2`, which I would like to factor so that it is only calculated once. Addition itself isn't an expensive calculation, but for a more general version:

``````unfoldr (\(p1, p2) -> Just (f p1 p2, (f p1 p2, p1)) ) (0, 1)
where f = arbitrary, possibly time-consuming function
``````

In the above situation, `f p1 p2` is calculated twice (unless there's some magic compiler optimisation I don't know about), which could create a performance bottleneck if `f` required a lot of computation. I can't factor `f p1 p2` into a `where` because `p1` and `p2` are not in scope. What is the best way to factor this expression so that `f` is only calculated once?

-

``````unfoldr (\(p1, p2) -> let x = f p1 p2 in Just (x, (x, p1)) ) (0, 1)
where f = arbitrary, possibly time-consuming function
``````
-
thankyou! thanks for taking the time on beginner questions like this (: – guhou Jul 10 '10 at 13:34

in `Control.Arrow` there is `(&&&)` which can be used in something like this:

``````unfoldr (\(p1,p2) -> (Just . (id &&& flip (,) p1)) (p1+p2)) (0,1)
``````

or even:

``````unfoldr (Just . (fst &&& id) . (uncurry (+) &&& fst)) (0,1)
``````

As well in your example `p1+p2` is actually next `p1` so you can rewrite it like

``````tail (unfoldr (\(p1, p2) -> Just (p1, (p1+p2, p1)) ) (0, 1))
``````
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