# How do I translate an while loop to clojure code

For example, the extended euclidean algorithm (quoted from wiki):

``````function extended_gcd(a, b)
x := 0    lastx := 1
y := 1    lasty := 0
while b ≠ 0
quotient := a div b
(a, b) := (b, a mod b)
(x, lastx) := (lastx - quotient*x, x)
(y, lasty) := (lasty - quotient*y, y)
return (lastx, lasty)
``````

which I tried and got:

`````` (defn extended-gcd
[a b]
(loop [a a b b x 0 y 1 lx 1 ly 0]
(if (zero? b)
[lx ly]
(recur b (mod a b)
(- lx (* (int (/ a b)) x))
(- ly (* (int (/ a b)) y))
x y))))
``````

I guess I could find a way to translate loops that deal with sequence. But how about this one? How do I write it in clojure way? something with map, reduce, etc. rather than loop recur.

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For the extended Euclidean algorithm you can use a simple recursion, which makes a function look quite elegant:

``````(defn extended-gcd [a b]
(if (zero? b) [1 0]
(let [[q r] [(quot a b) (rem a b)]
[s t] (extended-gcd b r)]
[t (- s (* q t))])))
``````

Let's try it:

``````user=> (extended-gcd 120 23)
[-9 47]
``````

Not all problems need to be solved by using map/reduce/sequence. I would argue that the above is just as Clojure way as a "`(reduce + [1 2 3 4 5])`" type of an answer you are looking for.

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For this kind of problem iterate is often a good alternative to using loop. In this case it leads to a fairly transparent translation of the source algorithm:

``````(defn extended-gcd [a b]
(->> {:a a, :b b, :x 0, :y 1, :lx 1, :ly 0}
(iterate
(fn [{keys [a b x y lx ly]}]
(let [q (quot a b)]
{:a b, :b (mod a b), :x (- lx (* q x)), :lx x, :y (- ly (* q y)), :ly y})))
(drop-while #(not= 0 (:b %)))
first
((juxt :lx :ly))))
``````

That said, using loop is a Clojure way too -- admonitions to avoid it, I believe, are meant to encourage use of higher-level constructs where they're more appropriate.

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