From 1200c12754fb2b57a0bd3008c1fa785016f1bb82 Mon Sep 17 00:00:00 2001
From: jim
Date: Tue, 24 Feb 2015 18:38:27 -0500
Subject: [PATCH] third solution for left_head
---
exercises/assignment3_answers.mdwn | 4 ++++
1 file changed, 4 insertions(+)
diff --git a/exercises/assignment3_answers.mdwn b/exercises/assignment3_answers.mdwn
index 08375b69..92da0884 100644
--- a/exercises/assignment3_answers.mdwn
+++ b/exercises/assignment3_answers.mdwn
@@ -57,7 +57,11 @@
> I'm not sure which of the two solutions presented here is better. The one given in the hint traverses the list only once; whereas the one gotten by reversing the list and getting the last member of the result traverses the list twice. But the former strategy does more complicated stuff at each step of the traversal (both conceptually and more applications), so in the end it might be computationally "cheaper" to use the latter strategy.
+ > Here is yet a third solution:
+ > let box = \a. \v. v a in
+ > let left_head = \xs. xs (\b x. (K (b (K x)))) (box err) I in
+ > ...
8. Suppose you have two lists of integers, `left` and `right`. You want to determine whether those lists are equal, that is, whether they have all the same members in the same order. How would you implement such a list comparison? You can write it in Scheme or Kapulet using `letrec`, or if you want more of a challenge, in the Lambda Calculus using your preferred encoding for lists. If you write it in Scheme, don't rely on applying the built-in comparison operator `equal?` to the lists themselves. (Nor on the operator `eqv?`, which might not do what you expect.) You can however rely on the comparison operator `=` which accepts only number arguments. If you write it in the Lambda Calculus, you can use your implementation of `leq?`, requested below, to write an equality operator for Church-encoded numbers. [[Here is a hint|assignment3 hint3]], if you need it.
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2.11.0