207 lines
4.9 KiB
Scheme
207 lines
4.9 KiB
Scheme
(load "shared/util.scm")
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(display "\nex-2.24\n")
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(define x (cons (list 1 2) (list 3 4)))
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(define (display-spaces n)
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(cond ((= n 0) ()) (else (display " ") (display-spaces (- n 1)))))
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; Procedure to print a tree (in an ugly way)
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(define (display-tree tree level)
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(cond
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((null? tree) ())
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((not (pair? tree)) (display-spaces level) (display tree) (newline))
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(else
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(display-spaces level) (display tree) (newline)
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(map (lambda (tree) (display-tree tree (+ level 1))) tree))))
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(define x (list 1 (list 2 (list 3 4))))
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(display-tree x 0)
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; (1 (2 (3 4))) ; result interpreter
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; [. .]->[. /]
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; | |
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; 1 [. .]->[. /]
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; | |
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; 2 [. .]->[. /]
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; | |
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; 3 4
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; /\
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; 1 \
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; /\
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; 2 \
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; \
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; /\
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; 3 4
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(display "\nex-2.25\n")
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(define x (list 1 3 (list 5 7) 9))
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(display x) (newline)
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; (1 3 (5 7) 9)
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(display (car (cdr (car (cdr (cdr x)))))) (newline)
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(define x (list (list 7)))
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(display x) (newline)
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; ((7))
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(display (car (car x))) (newline)
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(define x (list 1 (list 2 (list 3 (list 4 (list 5 (list 6 7)))))))
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(display x) (newline)
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; (1 (2 (3 (4 (5 (6 7))))))
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(display (car (cdr (car (cdr (car (cdr (car (cdr (car (cdr (car (cdr x))))))))))))) (newline)
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(display (cadr (cadr (cadr (cadr (cadr (cadr x)))))))
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(newline)
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(display "\nex-2.26\n")
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(define x (list 1 2 3))
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(define y (list 4 5 6))
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(display (append x y)) (newline)
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; (1 2 3 4 5 6)
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(display (cons x y)) (newline)
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; ((1 2 3) 4 5 6)
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(display (list x y)) (newline)
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; ((1 2 3) (4 5 6))
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(display "\nex-2.27 - deep reverse\n")
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(define x (list (list 1 2) (list 3 4)))
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; I didn't implement in this elegantly when I first did this exercise. I am
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; learning and growing!
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(define (deep-reverse xs)
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(if (pair? xs)
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(reverse (map deep-reverse xs))
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xs))
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(display x) (newline)
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(display (reverse x)) (newline)
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(display (deep-reverse x)) (newline)
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(display "\nex-2.28 - fringe aka flatten\n")
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(define (fringe xs)
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(cond
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((null? xs) xs)
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((pair? xs) (append (fringe (car xs)) (fringe (cdr xs))))
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(else (list xs))))
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(display (fringe x)) (newline)
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(display (fringe (list x x))) (newline)
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(display "\nex-2.29 - mobile balancing\n")
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(define (make-mobile left right)
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(list left right))
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(define (make-branch length structure)
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(list length structure))
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(define m1
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(make-mobile
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(make-branch 10 20)
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(make-branch 5 41)))
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(define m2
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(make-mobile
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(make-branch 1 70)
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(make-branch 2
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(make-mobile
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(make-branch 3 20)
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(make-branch 4 15)))))
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; 2.29 a)
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(define left-branch car)
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(define right-branch cadr)
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(define branch-length car)
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(define branch-structure cadr)
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(display (branch-length (right-branch m1))) (newline)
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; 2.29 b)
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(define (total-weight m)
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(if (pair? m)
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(+ (total-weight (branch-structure (left-branch m)))
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(total-weight (branch-structure (right-branch m))))
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m))
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(display (total-weight m1)) (newline)
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(display (total-weight m2)) (newline)
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; 2.29 c)
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(define (balanced? m)
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(define (torque b)
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(* (branch-length b) (total-weight (branch-structure b))))
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(if (pair? m)
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(let ((l (left-branch m))
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(r (right-branch m)))
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(and
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(balanced? (branch-structure l))
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(balanced? (branch-structure r))
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(= (torque l) (torque r))))
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#t)))
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(display (balanced? m1)) (newline)
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(display (balanced? m2)) (newline)
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; 2.29 d)
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; Only the selectors must be changed if we change the constructors.
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(define (make-mobile left right)
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(cons left right))
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(define (make-branch length structure)
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(cons length structure))
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(display "\nex-2.30 - tree square\n")
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; using tail recursion
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(define (square-tree t)
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(cond
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((null? t) nil)
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((not (pair? t)) (square t))
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(else (cons (square-tree (car t)) (square-tree (cdr t))))))
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(display x) (newline)
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(display (square-tree x)) (newline)
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; using map
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(define (square-tree t)
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(cond
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((null? t) nil)
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((not (pair? t)) (square t))
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(else (map square-tree t))))
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(display (square-tree x)) (newline)
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(display "\nex-2.31\n")
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(define (tree-map proc tree)
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(cond
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((null? tree) tree)
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((not (pair? tree)) (proc tree))
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(else (map (lambda (t) tree-map proc t) tree))))
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(define (square-tree tree) (tree-map square tree))
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(display (square-tree x)) (newline)
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(display "\nex-2.32\n")
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(define (subsets s)
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(if (null? s)
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(list nil)
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(let ((rest (subsets (cdr s))))
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(append rest (map (lambda (r) (cons (car s) r)) rest)))))
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; Assuming we have an oracle procedure subsets and we get a new list that we
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; split into car and cdr). If we use the oracle to compute the subsets for cdr
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; then we get a new list rest. To compute the new subsets from that list we
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; have to a) keep the rest as it is and b) add the current element (car) to all
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; the subsets (rest). The only other tricky part (that was already given) is
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; that when we get an empty list we want to return a list including that empty
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; list.
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(display (subsets (list 1 2 3)))
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