xref: /freebsd/usr.bin/sed/tests/math.sed (revision fd45b686f9d92f583366c75b22c04c7ee49709c0)
1# This is ksb's infamous sed calculator.		(ksb@sa.fedex.com)
2#
3#
4# $Id: math.sed,v 2.5 1998/08/02 13:23:34 ksb Exp ksb $
5# expr ::= (expr) | expr! |
6#	expr ^ expr |
7#	-expr | expr * expr | expr / expr | expr % expr |
8#	expr + expr | expr - expr |
9#	[0-9][0-9]* ;
10# Bugs: some sign combinations don't work, and I got sick of added cases
11# for unary +.  Don't depend on signed math working all the time. -- ksb
12#
13# $Compile: echo "4+7*3+2^7/3" | sed -f %f
14
15# make sure the expression is well formed
16s/[ 	]//g
17/[*\/^%+-]$/{
18	a\
19	poorly formed expression, dyadic operator on the end
20	q
21}
22/^[*\/^%]/{
23	a\
24	poorly formed expression, leading dyadic operator
25	q
26}
27
28# fill hold space with done token
29x
30s/^.*/done/
31x
32
33# main loop, process operators ((), !, *, /, %, +, and -)
34: loop
35# uncomment the print below to follow the "logic" -- ksb
36#p
37/^[+]/{
38	s///
39	b loop
40}
41/^--/{
42	s///
43	b loop
44}
45# eval parenthesised sub expressions first
46/^\(.*\)(\([^)]*\))\(.*\)$/{
47	H
48	s//\2/
49	x
50	s/^\(.*\)\n\(.*\)(\([^()]*\))\(.*\)$/()\2@\4@\1/
51	x
52	b loop
53}
54# reduce a^b^c -> a^(b^c)
55/\([0-9][0-9]*^\)\([0-9][0-9]*^[0-9][0-9^]*\)/{
56	s//\1(\2)/
57	b loop
58}
59# pull any buried exponents
60/^\(.*[^0-9]\)\([0-9][0-9]*^[0-9][0-9]*\)$/{
61	s//\1(\2)/
62	b loop
63}
64/^\(.*[^0-9]\)\([0-9][0-9]*^[0-9][0-9]*\)\([^0-9].*\)$/{
65	s//\1(\2)\3/
66	b loop
67}
68/^\([0-9][0-9]*^[0-9][0-9]*\)\([^0-9].*\)$/{
69	s//(\1)\2/
70	b loop
71}
72/^\([-]*[0-9]*\)^0*$/{
73	s//1/
74	b loop
75}
76/^\([-]*[0-9]*\)^0*1$/{
77	s//\1/
78	b loop
79}
80/^\([-]*[0-9]*\)^-[0-9]*$/{
81	s//0/
82	b loop
83}
84/^\([-]*\)\([0-9]*\)^\([0-9][0-9]*[13579]\)$/{
85	s//\1\2*((\2*\2)^(\3\/2))/
86	b loop
87}
88/^[-]*\([0-9]*\)^\([0-9][0-9]*[02468]\)$/{
89	s//(\1*\1)^(\2\/2)/
90	b loop
91}
92# single digit powers (2  3,9  4,6,8   5,7
93/^[-]*\([0-9]*\)^0*2$/{
94	s//(\1*\1)/
95	b loop
96}
97/^\([-]*\)\([0-9]*\)^0*\([39]\)$/{
98	s//\1(\2*(\2*\2))^(\3\/3)/
99	b loop
100}
101/^[-]*\([0-9]*\)^0*\([468]\)$/{
102	s//(\1*\1)^(\2\/2)/
103	b loop
104}
105# 5 7
106/^\([-]*[0-9]*\)^\([0-9]*\)$/{
107	s//\1*(\1^(\2-1))/
108	b loop
109}
110# reduce all number factorials
111/^0*[01]!/{
112	s//1/
113	b loop
114}
115/\([*+-/%^]\)0*[01]!/{
116	s//\11/
117	b loop
118}
119/\([0-9]*\)!/{
120	s//(\1-1)!*\1/
121	b loop
122}
123# sign simplifications
124/^-\([0-9]*\)\([*/%]\)-\([0-9]*\)$/{
125	s//\1\2\3/
126	b loop
127}
128/^\([0-9]*\)\([*/%]\)-\([0-9]*\)$/{
129	s//-\1\2\3/
130	b loop
131}
132/^-\([0-9][0-9]*\)[+]*-\([0-9][0-9]*\)$/{
133	s//\1+\2/
134	x
135	s/\(.*\)/()-@@\1/
136	x
137	b loop
138}
139/^-\([0-9]*\)[+]\([0-9]\)*$/{
140	s//\2-\1/
141	b loop
142}
143/^-.*[-+*/%].*/{
144	H
145	s/^-//
146	x
147	s/^\(.*\)\n-.*$/()-@@\1/
148	x
149	b loop
150}
151# can we simplify multiplications
152/^\([0-9]*\)\([*][0-9]*[1-9]\)00*$/{
153	H
154	s//\1\2/
155	x
156	s/^\(.*\)\n[0-9]*[*][0-9]*[1-9]\(00*\)$/()@\2@\1/
157	x
158	b loop
159}
160/^\([0-9][1-9]*\)00*\([*][0-9]*\)$/{
161	H
162	s//\1\2/
163	x
164	s/^\(.*\)\n[0-9][1-9]*\(00*\)[*][0-9]*$/()@\2@\1/
165	x
166	b loop
167}
168# can we simplify division (20/30 -> 2/3)
169/^\([0-9][0-9]*\)0\([/%]\)\([0-9][0-9]*\)0$/{
170	s//\1\2\3/
171	b loop
172}
173# n/1 -> n
174/^0*\([0-9][0-9]*\)0[/]0*1$/{
175	s//\1/
176	b loop
177}
178# n%2 -> last_digit(n)%2 (same for 1, BTW) N.B. NO LOOP
179/^[0-9]*\([0-9]\)%0*\([12]\)$/{
180	s//\1%\2/
181}
182# move any mul/divs to the front via parans
183/^\([0-9+]*\)\([-+]\)\([0-9]*[*/][0-9*/]*\)/{
184	s//\1\2(\3)/
185	b loop
186}
187# can we div or mul
188/^[0-9]*[*][0-9]*$/{
189	b mul
190}
191/^[0-9]*[/%]0*$/{
192	i\
193divide by zero
194	d
195}
196/^[0-9]*[/%][0-9]*$/{
197	H
198	s/\([0-9]\).*[/%]/\1-/
199	x
200	s/^\(.*\)\n\([0-9]\)\([0-9]*\)\([/%]\)\([0-9]*\).*$/.\4\3q0r\2-\5@\1/
201	x
202	b loop
203}
204/^\([0-9]*[*/%][0-9]*\)\(.*\)/{
205	H
206	s//\1/
207	x
208	s/^\(.*\)\n\([0-9]*[*/][0-9]*\)\(.*\)$/()@\3@\1/
209	x
210	b loop
211}
212# can we add or subtract -- note subtract hold expression for underflow
213/^[0-9]*[+][0-9]*$/{
214	s/$/=/
215	b add
216}
217/^[0-9][0-9]*-[0-9]*$/{
218	H
219	s/$/=/
220	b sub
221}
222/^\([0-9][0-9]*[-+][0-9]*\)\(.*\)/{
223	H
224	s//\1/
225	x
226	s/^\(.*\)\n\([0-9]*[-+][0-9]*\)\(.*\)$/()@\3@\1/
227	x
228	b loop
229}
230# look in hold space for stack to reduce
231x
232/^done$/{
233	x
234	s/^0*\([0-9][0-9]*\)/\1/
235	p
236	d
237}
238# .[/%] numerator q quotient r remainder-divisor @stack
239/^\./{
240	x
241	/^[^-]/{
242		H
243		x
244		s/.\(.\)\([0-9]*\)q\([^r]*\)r\([0-9]*\)-\([0-9]*\)@\(.*\)\n\(.*\)/.\1\2q\3+1r\7-\5@\6/
245		h
246		s/..[0-9]*q[^r]*r\([0-9]*-[0-9]*\)@.*/\1/
247		b loop
248	}
249	/^-/{
250		g
251		/.\(.\)\([0-9]\)\([0-9]*\)q\([^r]*\)r0*\([0-9]*\)-\([^@]*\)@.*/{
252			s//\5\2-\6/
253			x
254			s/.\(.\)\([0-9]\)\([0-9]*\)q\([^r]*\)r0*\([0-9]*\)-\([0-9]*\)@\(.*\)/.\1\3q(\4)*10r\5\2-\6@\7/
255			x
256			b loop
257		}
258# no digits to shift on
259		s/^\.[/]q\([^r]*\)r[^@]*@.*/\1/
260		s/^\.[%]q[^r]*r0*\([0-9][0-9]*\)-[^@]*@.*/\1/
261		/^\./{
262			i\
263divide error
264			q
265		}
266		x
267		s/^\.[/%]q[^r]*r[^@]*@\(.*\)/\1/
268		x
269		b loop
270	}
271}
272/^()/{
273	s///
274	x
275	G
276	s/\(.*\)\n\([^@]*\)@\([^@]*\)@\(.*\)/\2\1\3/
277	x
278	s/[^@]*@[^@]*@\(.*\)/\1/
279	x
280	b loop
281}
282i\
283help, stack problem - the hold space
284p
285x
286i\
287and the pat space
288p
289i\
290quit
291q
292
293# turn mul into add until 1*x -> x, 0*x -> 0
294: mul
295/^00*\*.*/{
296	s//0/
297	b loop
298}
299/^0*1\*/{
300	s///
301: leading
302	s/^0*\([0-9][0-9]*\)/\1/
303	b loop
304}
305s/^\([0-9]*\)0\*\([0-9]*\)/\1*\20/
306s/^\([0-9]*\)1\*\([0-9]*\)/\1*\20+\2/
307s/^\([0-9]*\)2\*\([0-9]*\)/\1*\20+(\2+\2)/
308s/^\([0-9]*\)3\*\([0-9]*\)/\1*\20+(\2+\2+\2)/
309s/^\([0-9]*\)4\*\([0-9]*\)/\1*\20+(\2+\2+\2+\2)/
310s/^\([0-9]*\)5\*\([0-9]*\)/\1*\20+(\2+\2+\2+\2+\2)/
311s/^\([0-9]*\)6\*\([0-9]*\)/\1*\20+(\2+\2+\2+\2+\2+\2)/
312s/^\([0-9]*\)7\*\([0-9]*\)/\1*\20+(\2+\2+\2+\2+\2+\2+\2)/
313s/^\([0-9]*\)8\*\([0-9]*\)/\1*\20+(\2+\2+\2+\2+\2+\2+\2+\2)/
314s/^\([0-9]*\)9\*\([0-9]*\)/\1*\20+(\2+\2+\2+\2+\2+\2+\2+\2+\2)/
315/^0*\*[0-9]*[+]*\(.*\)/{
316	s//\1/
317	b loop
318}
319b mul
320
321# get rid of a plus term until 0+x -> x
322: add
323/^[+]\([0-9+*]*\)=/{
324	s//\1/
325	b leading
326}
327/^\([0-9*]*\)[+]=/{
328	s//\1/
329	b loop
330}
331/^\([0-9]*\)0[+]\([0-9]*\)\([0-9]\)=/{
332	s//\1+\2=\3/
333	b add
334}
335/^\([0-9]*\)\([0-9]\)[+]\([0-9]*\)0=/{
336	s//\1+\3=\2/
337	b add
338}
339s/^\([0-9]*\)1[+]/\10+/
340s/^\([0-9]*\)2[+]/\11+/
341s/^\([0-9]*\)3[+]/\12+/
342s/^\([0-9]*\)4[+]/\13+/
343s/^\([0-9]*\)5[+]/\14+/
344s/^\([0-9]*\)6[+]/\15+/
345s/^\([0-9]*\)7[+]/\16+/
346s/^\([0-9]*\)8[+]/\17+/
347s/^\([0-9]*\)9[+]/\18+/
348
349s/9=\([0-9]*\)$/_=\1/
350s/8=\([0-9]*\)$/9=\1/
351s/7=\([0-9]*\)$/8=\1/
352s/6=\([0-9]*\)$/7=\1/
353s/5=\([0-9]*\)$/6=\1/
354s/4=\([0-9]*\)$/5=\1/
355s/3=\([0-9]*\)$/4=\1/
356s/2=\([0-9]*\)$/3=\1/
357s/1=\([0-9]*\)$/2=\1/
358/_/{
359	s//_0/
360	: inc
361	s/9_/_0/
362	s/8_/9/
363	s/7_/8/
364	s/6_/7/
365	s/5_/6/
366	s/4_/5/
367	s/3_/4/
368	s/2_/3/
369	s/1_/2/
370	s/0_/1/
371	s/[+]_/+1/
372	/_/b inc
373}
374b add
375
376# get rid of a sub term until /-0*=/ or underflow
377: sub
378/^\([0-9]*\)-0*=/{
379	s//\1/
380	x
381	s/\(.*\)\n.*$/\1/
382	x
383	b leading
384}
385/^-\([0-9].*\)=/{
386: under
387	g
388	s/.*\n\([0-9]*\)-\([0-9]*\).*/-(\2-\1)/
389	x
390	s/\(.*\)\n.*/\1/
391	x
392	b loop
393}
394/^\([0-9]*\)\([0-9]\)-\([0-9]*\)0=/{
395	s//\1-\3=\2/
396	b sub
397}
398s/1=/0=/
399s/2=/1=/
400s/3=/2=/
401s/4=/3=/
402s/5=/4=/
403s/6=/5=/
404s/7=/6=/
405s/8=/7=/
406s/9=/8=/
407
408s/^\([0-9]*\)1-/\1_-/
409s/^\([0-9]*\)2-/\11-/
410s/^\([0-9]*\)3-/\12-/
411s/^\([0-9]*\)4-/\13-/
412s/^\([0-9]*\)5-/\14-/
413s/^\([0-9]*\)6-/\15-/
414s/^\([0-9]*\)7-/\16-/
415s/^\([0-9]*\)8-/\17-/
416s/^\([0-9]*\)9-/\18-/
417s/^\([0-9]*\)0-/\1'9-/
418s/_/0/
419
420: scarry
421/0'/{
422	s//'9/
423	b scarry
424}
425/^'/{
426	b under
427}
428s/1'/0/
429s/2'/1/
430s/3'/2/
431s/4'/3/
432s/5'/4/
433s/6'/5/
434s/7'/6/
435s/8'/7/
436s/9'/8/
437
438b sub
439