118 lines
3.5 KiB
Scheme
118 lines
3.5 KiB
Scheme
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; Copyright (c) 1993-1999 by Richard Kelsey and Jonathan Rees. See file COPYING.
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; Rectangular complex arithmetic built on real arithmetic.
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(define-extended-number-type :recnum (:complex)
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(make-recnum real imag)
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recnum?
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(real recnum-real-part)
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(imag recnum-imag-part))
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(define (rectangulate x y) ; Assumes (eq? (exact? x) (exact? y))
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(if (= y 0)
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x
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(make-recnum x y)))
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(define (rectangular-real-part z)
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(if (recnum? z)
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(recnum-real-part z)
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(real-part z)))
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(define (rectangular-imag-part z)
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(if (recnum? z)
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(recnum-imag-part z)
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(imag-part z)))
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(define (rectangular+ a b)
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(rectangulate (+ (rectangular-real-part a) (rectangular-real-part b))
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(+ (rectangular-imag-part a) (rectangular-imag-part b))))
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(define (rectangular- a b)
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(rectangulate (- (rectangular-real-part a) (rectangular-real-part b))
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(- (rectangular-imag-part a) (rectangular-imag-part b))))
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(define (rectangular* a b)
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(let ((a1 (rectangular-real-part a))
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(a2 (rectangular-imag-part a))
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(b1 (rectangular-real-part b))
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(b2 (rectangular-imag-part b)))
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(rectangulate (- (* a1 b1) (* a2 b2))
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(+ (* a1 b2) (* a2 b1)))))
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(define (rectangular/ a b)
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(let ((a1 (rectangular-real-part a))
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(a2 (rectangular-imag-part a))
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(b1 (rectangular-real-part b))
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(b2 (rectangular-imag-part b)))
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(let ((d (+ (* b1 b1) (* b2 b2))))
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(rectangulate (/ (+ (* a1 b1) (* a2 b2)) d)
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(/ (- (* a2 b1) (* a1 b2)) d)))))
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(define (rectangular= a b)
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(let ((a1 (rectangular-real-part a))
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(a2 (rectangular-imag-part a))
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(b1 (rectangular-real-part b))
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(b2 (rectangular-imag-part b)))
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(and (= a1 b1) (= a2 b2))))
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; Methods
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(define-method &complex? ((z :recnum)) #t)
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(define-method &real-part ((z :recnum)) (recnum-real-part z))
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(define-method &imag-part ((z :recnum)) (recnum-imag-part z))
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; Methods on complexes in terms of real-part and imag-part
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(define-method &exact? ((z :recnum))
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(exact? (recnum-real-part z)))
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(define-method &inexact->exact ((z :recnum))
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(make-recnum (inexact->exact (recnum-real-part z))
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(inexact->exact (recnum-imag-part z))))
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(define-method &exact->inexact ((z :recnum))
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(make-recnum (exact->inexact (recnum-real-part z))
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(exact->inexact (recnum-imag-part z))))
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(define (define-recnum-method mtable proc)
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(define-method mtable ((m :recnum) (n :complex)) (proc m n))
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(define-method mtable ((m :complex) (n :recnum)) (proc m n)))
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(define-recnum-method &+ rectangular+)
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(define-recnum-method &- rectangular-)
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(define-recnum-method &* rectangular*)
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(define-recnum-method &/ rectangular/)
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(define-recnum-method &= rectangular=)
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(define-method &sqrt ((n :real))
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(if (< n 0)
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(make-rectangular 0 (sqrt (- 0 n)))
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(next-method))) ; not that we have to
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; Gleep! Can we do quotient and remainder on Gaussian integers?
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; Can we do numerator and denominator on complex rationals?
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(define-method &number->string ((z :recnum) radix)
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(let ((x (real-part z))
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(y (imag-part z)))
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(let ((r (number->string x radix))
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(i (number->string (abs y) radix))
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(& (if (< y 0) "-" "+")))
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(if (and (inexact? y) ;gross
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(char=? (string-ref i 0) #\#))
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(string-append (if (char=? (string-ref r 0) #\#)
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""
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"#i")
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r &
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(substring i 2 (string-length i))
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"i")
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(string-append r & i "i")))))
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(define-method &make-rectangular ((x :real) (y :real))
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(if (eq? (exact? x) (exact? y))
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(rectangulate x y)
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(rectangulate (if (exact? x) (exact->inexact x) x)
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(if (exact? y) (exact->inexact y) y))))
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