# How to write unzip using map?

I'm reading The Scheme Programming Language book. I'm trying to do exercise 2.8.7:

Use map to define a procedure, transpose, that takes a list of pairs and returns a pair of lists as follows.

(transpose '((a . 1) (b . 2) (c . 3))) ;;=> ((a b c) 1 2 3)

[Hint: ((a b c) 1 2 3) is the same as ((a b c) . (1 2 3)).]

I found out that `(map list '(a 1) '(b 2) '(c 3))` gives me `'((a b c) (1 2 3))`. I guess I could solve the exercise by writing a lot of boiler plate for turning `'((a . 1) (b . 2) (c . 3))` into `(map list '(a 1) '(b 2) '(c 3))` and `'((a b c) (1 2 3))` into `((a b c) 1 2 3)`. However, I'm sure that's not the point of the exercise.

Can anyone help me out here? Is there an obvious way to do it using map that I'm missing?

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## 1 Answer

Yes. The obvious solution involves calling `map` twice and then `cons`ing together the two results.

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I get it! `(define (transpose ziped) (cons (map car ziped) (map cdr ziped)))`. I guess it's not the most efficient way to do it, but it's probably what was intended. Thanks! – Rafael Almeida Aug 3 '12 at 3:51