xref: /freebsd/lib/msun/man/ieee.3 (revision ebacd8013fe5f7fdf9f6a5b286f6680dd2891036)
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28.\"     from: @(#)ieee.3	6.4 (Berkeley) 5/6/91
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31.Dd January 26, 2005
32.Dt IEEE 3
33.Os
34.Sh NAME
35.Nm ieee
36.Nd IEEE standard 754 for floating-point arithmetic
37.Sh DESCRIPTION
38The IEEE Standard 754 for Binary Floating-Point Arithmetic
39defines representations of floating-point numbers and abstract
40properties of arithmetic operations relating to precision,
41rounding, and exceptional cases, as described below.
42.Ss IEEE STANDARD 754 Floating-Point Arithmetic
43Radix: Binary.
44.Pp
45Overflow and underflow:
46.Bd -ragged -offset indent -compact
47Overflow goes by default to a signed \*(If.
48Underflow is
49.Em gradual .
50.Ed
51.Pp
52Zero is represented ambiguously as +0 or \-0.
53.Bd -ragged -offset indent -compact
54Its sign transforms correctly through multiplication or
55division, and is preserved by addition of zeros
56with like signs; but x\-x yields +0 for every
57finite x.
58The only operations that reveal zero's
59sign are division by zero and
60.Fn copysign x \(+-0 .
61In particular, comparison (x > y, x \(>= y, etc.)\&
62cannot be affected by the sign of zero; but if
63finite x = y then \*(If = 1/(x\-y) \(!= \-1/(y\-x) = \-\*(If.
64.Ed
65.Pp
66Infinity is signed.
67.Bd -ragged -offset indent -compact
68It persists when added to itself
69or to any finite number.
70Its sign transforms
71correctly through multiplication and division, and
72(finite)/\(+-\*(If\0=\0\(+-0
73(nonzero)/0 = \(+-\*(If.
74But
75\*(If\-\*(If, \*(If\(**0 and \*(If/\*(If
76are, like 0/0 and sqrt(\-3),
77invalid operations that produce \*(Na. ...
78.Ed
79.Pp
80Reserved operands (\*(Nas):
81.Bd -ragged -offset indent -compact
82An \*(Na is
83.Em ( N Ns ot Em a N Ns umber ) .
84Some \*(Nas, called Signaling \*(Nas, trap any floating-point operation
85performed upon them; they are used to mark missing
86or uninitialized values, or nonexistent elements
87of arrays.
88The rest are Quiet \*(Nas; they are
89the default results of Invalid Operations, and
90propagate through subsequent arithmetic operations.
91If x \(!= x then x is \*(Na; every other predicate
92(x > y, x = y, x < y, ...) is FALSE if \*(Na is involved.
93.Ed
94.Pp
95Rounding:
96.Bd -ragged -offset indent -compact
97Every algebraic operation (+, \-, \(**, /,
98\(sr)
99is rounded by default to within half an
100.Em ulp ,
101and when the rounding error is exactly half an
102.Em ulp
103then
104the rounded value's least significant bit is zero.
105(An
106.Em ulp
107is one
108.Em U Ns nit
109in the
110.Em L Ns ast
111.Em P Ns lace . )
112This kind of rounding is usually the best kind,
113sometimes provably so; for instance, for every
114x = 1.0, 2.0, 3.0, 4.0, ..., 2.0**52, we find
115(x/3.0)\(**3.0 == x and (x/10.0)\(**10.0 == x and ...
116despite that both the quotients and the products
117have been rounded.
118Only rounding like IEEE 754 can do that.
119But no single kind of rounding can be
120proved best for every circumstance, so IEEE 754
121provides rounding towards zero or towards
122+\*(If or towards \-\*(If
123at the programmer's option.
124.Ed
125.Pp
126Exceptions:
127.Bd -ragged -offset indent -compact
128IEEE 754 recognizes five kinds of floating-point exceptions,
129listed below in declining order of probable importance.
130.Bl -column -offset indent "Invalid Operation" "Gradual Underflow"
131.Em "Exception	Default Result"
132Invalid Operation	\*(Na, or FALSE
133Overflow	\(+-\*(If
134Divide by Zero	\(+-\*(If
135Underflow	Gradual Underflow
136Inexact	Rounded value
137.El
138.Pp
139NOTE: An Exception is not an Error unless handled
140badly.
141What makes a class of exceptions exceptional
142is that no single default response can be satisfactory
143in every instance.
144On the other hand, if a default
145response will serve most instances satisfactorily,
146the unsatisfactory instances cannot justify aborting
147computation every time the exception occurs.
148.Ed
149.Ss Data Formats
150Single-precision:
151.Bd -ragged -offset indent -compact
152Type name:
153.Vt float
154.Pp
155Wordsize: 32 bits.
156.Pp
157Precision: 24 significant bits,
158roughly like 7 significant decimals.
159.Pp
160If x and x' are consecutive positive single-precision
161numbers (they differ by 1
162.Em ulp ) ,
163then
164.Bl -column "XXX" -compact
1655.9e\-08 < 0.5**24 < (x'\-x)/x \(<= 0.5**23 < 1.2e\-07.
166.El
167.Pp
168.Bl -column "XXX" -compact
169Range:	Overflow threshold  = 2.0**128 = 3.4e38
170	Underflow threshold = 0.5**126 = 1.2e\-38
171.El
172.Pp
173Underflowed results round to the nearest
174integer multiple of
175.Bl -column "XXX" -compact
1760.5**149 = 1.4e\-45.
177.El
178.Ed
179.Pp
180Double-precision:
181.Bd -ragged -offset indent -compact
182Type name:
183.Vt double
184.Po On some architectures,
185.Vt long double
186is the same as
187.Vt double
188.Pc
189.Pp
190Wordsize: 64 bits.
191.Pp
192Precision: 53 significant bits,
193roughly like 16 significant decimals.
194.Pp
195If x and x' are consecutive positive double-precision
196numbers (they differ by 1
197.Em ulp ) ,
198then
199.Bl -column "XXX" -compact
2001.1e\-16 < 0.5**53 < (x'\-x)/x \(<= 0.5**52 < 2.3e\-16.
201.El
202.Pp
203.Bl -column "XXX" -compact
204Range:	Overflow threshold  = 2.0**1024 = 1.8e308
205	Underflow threshold = 0.5**1022 = 2.2e\-308
206.El
207.Pp
208Underflowed results round to the nearest
209integer multiple of
210.Bl -column "XXX" -compact
2110.5**1074 = 4.9e\-324.
212.El
213.Ed
214.Pp
215Extended-precision:
216.Bd -ragged -offset indent -compact
217Type name:
218.Vt long double
219(when supported by the hardware)
220.Pp
221Wordsize: 96 bits.
222.Pp
223Precision: 64 significant bits,
224roughly like 19 significant decimals.
225.Pp
226If x and x' are consecutive positive extended-precision
227numbers (they differ by 1
228.Em ulp ) ,
229then
230.Bl -column "XXX" -compact
2311.0e\-19 < 0.5**63 < (x'\-x)/x \(<= 0.5**62 < 2.2e\-19.
232.El
233.Pp
234.Bl -column "XXX" -compact
235Range:	Overflow threshold  = 2.0**16384 = 1.2e4932
236	Underflow threshold = 0.5**16382 = 3.4e\-4932
237.El
238.Pp
239Underflowed results round to the nearest
240integer multiple of
241.Bl -column "XXX" -compact
2420.5**16445 = 5.7e\-4953.
243.El
244.Ed
245.Pp
246Quad-extended-precision:
247.Bd -ragged -offset indent -compact
248Type name:
249.Vt long double
250(when supported by the hardware)
251.Pp
252Wordsize: 128 bits.
253.Pp
254Precision: 113 significant bits,
255roughly like 34 significant decimals.
256.Pp
257If x and x' are consecutive positive quad-extended-precision
258numbers (they differ by 1
259.Em ulp ) ,
260then
261.Bl -column "XXX" -compact
2629.6e\-35 < 0.5**113 < (x'\-x)/x \(<= 0.5**112 < 2.0e\-34.
263.El
264.Pp
265.Bl -column "XXX" -compact
266Range:	Overflow threshold  = 2.0**16384 = 1.2e4932
267	Underflow threshold = 0.5**16382 = 3.4e\-4932
268.El
269.Pp
270Underflowed results round to the nearest
271integer multiple of
272.Bl -column "XXX" -compact
2730.5**16494 = 6.5e\-4966.
274.El
275.Ed
276.Ss Additional Information Regarding Exceptions
277For each kind of floating-point exception, IEEE 754
278provides a Flag that is raised each time its exception
279is signaled, and stays raised until the program resets
280it.
281Programs may also test, save and restore a flag.
282Thus, IEEE 754 provides three ways by which programs
283may cope with exceptions for which the default result
284might be unsatisfactory:
285.Bl -enum
286.It
287Test for a condition that might cause an exception
288later, and branch to avoid the exception.
289.It
290Test a flag to see whether an exception has occurred
291since the program last reset its flag.
292.It
293Test a result to see whether it is a value that only
294an exception could have produced.
295.Pp
296CAUTION: The only reliable ways to discover
297whether Underflow has occurred are to test whether
298products or quotients lie closer to zero than the
299underflow threshold, or to test the Underflow
300flag.
301(Sums and differences cannot underflow in
302IEEE 754; if x \(!= y then x\-y is correct to
303full precision and certainly nonzero regardless of
304how tiny it may be.)
305Products and quotients that
306underflow gradually can lose accuracy gradually
307without vanishing, so comparing them with zero
308(as one might on a VAX) will not reveal the loss.
309Fortunately, if a gradually underflowed value is
310destined to be added to something bigger than the
311underflow threshold, as is almost always the case,
312digits lost to gradual underflow will not be missed
313because they would have been rounded off anyway.
314So gradual underflows are usually
315.Em provably
316ignorable.
317The same cannot be said of underflows flushed to 0.
318.El
319.Pp
320At the option of an implementor conforming to IEEE 754,
321other ways to cope with exceptions may be provided:
322.Bl -enum
323.It
324ABORT.
325This mechanism classifies an exception in
326advance as an incident to be handled by means
327traditionally associated with error-handling
328statements like "ON ERROR GO TO ...".
329Different
330languages offer different forms of this statement,
331but most share the following characteristics:
332.Bl -dash
333.It
334No means is provided to substitute a value for
335the offending operation's result and resume
336computation from what may be the middle of an
337expression.
338An exceptional result is abandoned.
339.It
340In a subprogram that lacks an error-handling
341statement, an exception causes the subprogram to
342abort within whatever program called it, and so
343on back up the chain of calling subprograms until
344an error-handling statement is encountered or the
345whole task is aborted and memory is dumped.
346.El
347.It
348STOP.
349This mechanism, requiring an interactive
350debugging environment, is more for the programmer
351than the program.
352It classifies an exception in
353advance as a symptom of a programmer's error; the
354exception suspends execution as near as it can to
355the offending operation so that the programmer can
356look around to see how it happened.
357Quite often
358the first several exceptions turn out to be quite
359unexceptionable, so the programmer ought ideally
360to be able to resume execution after each one as if
361execution had not been stopped.
362.It
363\&... Other ways lie beyond the scope of this document.
364.El
365.Pp
366Ideally, each
367elementary function should act as if it were indivisible, or
368atomic, in the sense that ...
369.Bl -enum
370.It
371No exception should be signaled that is not deserved by
372the data supplied to that function.
373.It
374Any exception signaled should be identified with that
375function rather than with one of its subroutines.
376.It
377The internal behavior of an atomic function should not
378be disrupted when a calling program changes from
379one to another of the five or so ways of handling
380exceptions listed above, although the definition
381of the function may be correlated intentionally
382with exception handling.
383.El
384.Pp
385The functions in
386.Nm libm
387are only approximately atomic.
388They signal no inappropriate exception except possibly ...
389.Bl -tag -width indent -offset indent -compact
390.It Xo
391Over/Underflow
392.Xc
393when a result, if properly computed, might have lain barely within range, and
394.It Xo
395Inexact in
396.Fn cabs ,
397.Fn cbrt ,
398.Fn hypot ,
399.Fn log10
400and
401.Fn pow
402.Xc
403when it happens to be exact, thanks to fortuitous cancellation of errors.
404.El
405Otherwise, ...
406.Bl -tag -width indent -offset indent -compact
407.It Xo
408Invalid Operation is signaled only when
409.Xc
410any result but \*(Na would probably be misleading.
411.It Xo
412Overflow is signaled only when
413.Xc
414the exact result would be finite but beyond the overflow threshold.
415.It Xo
416Divide-by-Zero is signaled only when
417.Xc
418a function takes exactly infinite values at finite operands.
419.It Xo
420Underflow is signaled only when
421.Xc
422the exact result would be nonzero but tinier than the underflow threshold.
423.It Xo
424Inexact is signaled only when
425.Xc
426greater range or precision would be needed to represent the exact result.
427.El
428.Sh SEE ALSO
429.Xr fenv 3 ,
430.Xr ieee_test 3 ,
431.Xr math 3
432.Pp
433An explanation of IEEE 754 and its proposed extension p854
434was published in the IEEE magazine MICRO in August 1984 under
435the title "A Proposed Radix- and Word-length-independent
436Standard for Floating-point Arithmetic" by
437.An "W. J. Cody"
438et al.
439The manuals for Pascal, C and BASIC on the Apple Macintosh
440document the features of IEEE 754 pretty well.
441Articles in the IEEE magazine COMPUTER vol.\& 14 no.\& 3 (Mar.\&
4421981), and in the ACM SIGNUM Newsletter Special Issue of
443Oct.\& 1979, may be helpful although they pertain to
444superseded drafts of the standard.
445.Sh STANDARDS
446.St -ieee754
447