Is there a tool to know whether a value has an exact binary representation as a floating point variable?

My C API has a function that takes as input a `double`. Only 3 or 4 values are valid input, all other values are non valid input and rejected.

I'd like to check if all my valid input values can be represented exactly so that I could avoid the epsilon check to ease readability.

Is there a tool (preferably on command line) that could tell me whether a decimal value has an exact binary representation as a floating point value?

-
"s there a tool (preferably on command line) that could tell me whether a decimal value has an exact binary representation as a floating point value?" - that is a very unusual requirement. –  Mitch Wheat Dec 8 '11 at 9:35
Unusual, but actually I think its quite useful whenever you need to put a fractional constant into your source –  hirschhornsalz Dec 8 '11 at 9:38
with "decimal value" you mean integer? and what do you mean by "exact binary representation"? –  moooeeeep Dec 8 '11 at 9:40
I think he means a decimal value, like "0.1" –  hirschhornsalz Dec 8 '11 at 9:44
@Didier: Btw, could you just provide symbolic names for the 3 or 4 valid inputs, and have the caller use those? They could be `#define`, `extern const` globals, or just integers that you look up in a table. It solves this problem, and also the problem of the caller accidentally passing you a value that is very, very close to correct, but slightly off due to an inaccuracy in the calculation they used to produce it. For example, did they use `M_PI_2` or `M_PI/2`, since the two might not be equal. –  Steve Jessop Dec 8 '11 at 10:34

Here's a Python snippet that does exactly what you ask for; it needs Python 2.7 or Python 3.x. (Earlier versions of Python are less careful with floating-point conversions.)

``````import decimal, sys
input = sys.argv[1]
if decimal.Decimal(input) == float(input):
print("Exactly representable")
else:
print("Not exactly representable")
``````

Usage: after saving the script under the name 'exactly_representable.py',

``````mdickinson\$ python exactly_representable.py 1.25
Exactly representable
mdickinson\$ python exactly_representable.py 0.1
Not exactly representable
mdickinson\$ python exactly_representable.py 1e22
Exactly representable
mdickinson\$ python exactly_representable.py 1e23
Not exactly representable
``````
-
Mark, +1 for putting the new dtoa.c to good use! :) –  Rick Regan Dec 11 '11 at 16:01

I've written a decimal to float/double converter for fun and made it produce an extra output flag telling whether or not the resultant floating-point value represents the input decimal string exactly.

The main idea is very simple. Whenever truncation or rounding occurs during conversion, it's remembered.

The code is not the most efficient nor does it fully validate input for all possible problems (e.g. too large exponent), but it seems to do the job for well-formed decimal strings:

``````#include <stdio.h>
#include <string.h>
#include <stdlib.h>
#include <limits.h>

#define DEBUG_PRINT 0

#ifndef MIN
#define MIN(A,B) (((A) <= (B)) ? (A) : (B))
#endif

#ifndef MAX
#define MAX(A,B) (((A) >= (B)) ? (A) : (B))
#endif

static
int ParseDecimal(const char*  s,
int*         pSign,
const char** ppIntStart,
const char** ppIntEnd,
const char** ppFrcStart,
const char** ppFrcEnd,
int*         pExp)
{
int sign = 1;
const char* pIntStart = NULL;
const char* pIntEnd = NULL;
const char* pFrcStart = NULL;
const char* pFrcEnd = NULL;
int expSign = 1;
const char* pExpStart = NULL;
const char* pExpEnd = NULL;
const char* p;
int exp = 0;

if (s == NULL) return -1;

// Parse the sign and the integer part
if (*s == '-') sign = -1, s++;
else if (*s == '+') s++;
while (*s && *s != '.' && *s != 'e' && *s != 'E')
{
if (*s < '0' || *s > '9') return -1;
if (pIntStart == NULL) pIntStart = s;
pIntEnd = s++;
}

// Parse the fractional part
if (*s == '.')
{
s++;
while (*s && *s != 'e' && *s != 'E')
{
if (*s < '0' || *s > '9') return -1;
if (pFrcStart == NULL) pFrcStart = s;
pFrcEnd = s++;
}
}

if (pIntStart == NULL && pFrcStart == NULL) return -1;

// Parse the exponent
if (*s == 'e' || *s == 'E')
{
s++;

if (*s == '-') expSign = -1, s++;
else if (*s == '+') s++;

if (!*s) return -1;

while (*s)
{
if (*s < '0' || *s > '9') return -1;
if (pExpStart == NULL) pExpStart = s;
pExpEnd = s++;
}
}

// Calculate the exponent
for (p = pExpStart; p && p <= pExpEnd; p++)
exp = exp * 10 + *p - '0';
exp *= expSign;

// Skip any trailing and leading zeroes
// in the fractional and integer parts
if (pFrcStart != NULL)
{
exp -= pFrcEnd + 1 - pFrcStart;
if (pIntStart == NULL)
while (pFrcStart < pFrcEnd && *pFrcStart == '0') pFrcStart++;
while (pFrcEnd > pFrcStart && *pFrcEnd == '0') pFrcEnd--, exp++;
if (*pFrcEnd == '0' && pIntStart != NULL) pFrcStart = pFrcEnd = NULL, exp++;
}
if (pIntStart != NULL)
{
if (pFrcStart == NULL)
while (pIntEnd > pIntStart && *pIntEnd == '0') pIntEnd--, exp++;
while (pIntStart < pIntEnd && *pIntStart == '0') pIntStart++;
if (*pIntStart == '0' && pFrcStart != NULL)
{
pIntStart = pIntEnd = NULL;
while (pFrcStart < pFrcEnd && *pFrcStart == '0') pFrcStart++;
}
}
if ((pIntStart != NULL && *pIntStart == '0') ||
(pFrcEnd != NULL && *pFrcEnd == '0'))
{
exp = 0;
}

*pSign = sign;
*ppIntStart = pIntStart;
*ppIntEnd   = pIntEnd;
*ppFrcStart = pFrcStart;
*ppFrcEnd   = pFrcEnd;
*pExp = exp;

return 0;
}

static
size_t         ChainLen,
unsigned char  Multiplier,
{

while (ChainLen--)
{
carry += *pChain * Multiplier;
*pChain++ = (unsigned char)(carry & 0xFF);
carry >>= 8;
}
}

static
void ChainDivide(unsigned char* pChain,
size_t         ChainLen,
unsigned char  Divisor,
unsigned char* pRemainder)
{
unsigned remainder = 0;

while (ChainLen)
{
remainder += pChain[ChainLen - 1];
pChain[ChainLen - 1] = remainder / Divisor;
remainder = (remainder % Divisor) << 8;
ChainLen--;
}

if (pRemainder != NULL)
*pRemainder = (unsigned char)(remainder >> 8);
}

int DecimalToIeee754Binary(const char* s,
unsigned FractionBitCnt,
unsigned ExponentBitCnt,
int* pInexact,
unsigned long long* pFloat)
{
const char* pIntStart;
const char* pIntEnd;
const char* pFrcStart;
const char* pFrcEnd;
const char* p;
int sign;
int exp;
int tmp;
size_t numDecDigits;
size_t denDecDigits;
size_t numBinDigits;
size_t numBytes;
unsigned char* pNum = NULL;
unsigned char remainder;
int binExp = 0;
int inexact = 0;
int lastInexact = 0;

if (FractionBitCnt < 3 ||
ExponentBitCnt < 3 ||
FractionBitCnt >= CHAR_BIT * sizeof(*pFloat) ||
ExponentBitCnt >= CHAR_BIT * sizeof(*pFloat) ||
FractionBitCnt + ExponentBitCnt >= CHAR_BIT * sizeof(*pFloat))
{
return -1;
}

tmp = ParseDecimal(s,
&sign,
&pIntStart,
&pIntEnd,
&pFrcStart,
&pFrcEnd,
&exp);
if (tmp) return tmp;

numDecDigits = ((pIntStart != NULL) ? pIntEnd + 1 - pIntStart : 0) +
((pFrcStart != NULL) ? pFrcEnd + 1 - pFrcStart : 0) +
((exp >= 0) ? exp : 0);
denDecDigits = 1 + ((exp < 0) ? -exp : 0);

#if DEBUG_PRINT
printf("%s    ", s);

printf("%c", "- +"[1+sign]);
for (p = pIntStart; p && p <= pIntEnd; p++) printf("%c", *p);
for (p = pFrcStart; p && p <= pFrcEnd; p++) printf("%c", *p);
printf(" E %d", exp);
printf("    %zu/%zu    ", numDecDigits, denDecDigits);
//  fflush(stdout);
printf("\n");
#endif

// 10/3=3.3(3) > log2(10)~=3.32
if (exp >= 0)
numBinDigits = MAX((numDecDigits * 10 + 2) / 3,
FractionBitCnt + 1);
else
numBinDigits = MAX((numDecDigits * 10 + 2) / 3,
(denDecDigits * 10 + 2) / 3 + FractionBitCnt + 1 + 1);

numBytes = (numBinDigits + 7) / 8;

pNum = malloc(numBytes);
if (pNum == NULL) return -2;
memset(pNum, 0, numBytes);

// Convert the numerator to binary
for (p = pIntStart; p && p <= pIntEnd; p++)
ChainMultiplyAdd(pNum, numBytes, 10, *p - '0');
for (p = pFrcStart; p && p <= pFrcEnd; p++)
ChainMultiplyAdd(pNum, numBytes, 10, *p - '0');
for (tmp = exp; tmp > 0; tmp--)

#if DEBUG_PRINT
printf("num   : ");
for (p = pNum + numBytes - 1; p >= (char*)pNum; p--)
printf("%02X", (unsigned char)*p);
printf("\n");
#endif

// If the denominator isn't 1, divide the numerator by the denominator
// getting at least FractionBitCnt+2 significant bits of quotient
if (exp < 0)
{
binExp = -(int)(numBinDigits - (numDecDigits * 10 + 2) / 3);
for (tmp = binExp; tmp < 0; tmp++)
#if DEBUG_PRINT
printf("num <<: ");
for (p = pNum + numBytes - 1; p >= (char*)pNum; p--)
printf("%02X", (unsigned char)*p);
printf("\n");
#endif
for (tmp = exp; tmp < 0; tmp++)
ChainDivide(pNum, numBytes, 10, &remainder),
lastInexact = inexact, inexact |= !!remainder;
}

#if DEBUG_PRINT
for (p = pNum + numBytes - 1; p >= (char*)pNum; p--)
printf("%02X", (unsigned char)*p);
printf(" * 2^%d (%c)", binExp, "ei"[inexact]);
printf("\n");
#endif

// Find the most significant bit and normalize the mantissa
// by shifting it left
for (tmp = numBytes - 1; tmp >= 0 && !pNum[tmp]; tmp--);
if (tmp >= 0)
{
tmp = tmp * 8 + 7;
while (!(pNum[tmp / 8] & (1 << tmp % 8))) tmp--;
while (tmp < (int)FractionBitCnt)
ChainMultiplyAdd(pNum, numBytes, 2, 0), binExp--, tmp++;
}

// Find the most significant bit and normalize the mantissa
// by shifting it right
do
{
remainder = 0;
for (tmp = numBytes - 1; tmp >= 0 && !pNum[tmp]; tmp--);
if (tmp >= 0)
{
tmp = tmp * 8 + 7;
while (!(pNum[tmp / 8] & (1 << tmp % 8))) tmp--;
while (tmp > (int)FractionBitCnt)
ChainDivide(pNum, numBytes, 2, &remainder),
lastInexact = inexact, inexact |= !!remainder, binExp++, tmp--;
while (binExp < 2 - (1 << ((int)ExponentBitCnt - 1)) - (int)FractionBitCnt)
ChainDivide(pNum, numBytes, 2, &remainder),
lastInexact = inexact, inexact |= !!remainder, binExp++;
}
// Round to nearest even
remainder &= (lastInexact | (pNum[0] & 1));
if (remainder)
} while (remainder);

#if DEBUG_PRINT
for (p = pNum + numBytes - 1; p >= (char*)pNum; p--)
printf("%02X", (unsigned char)*p);
printf(" * 2^%d", binExp);
printf("\n");
#endif

// Collect the result's mantissa
*pFloat = 0;
while (tmp >= 0)
{
*pFloat <<= 8;
*pFloat |= pNum[tmp / 8];
tmp -= 8;
}

// Collect the result's exponent
binExp += (1 << ((int)ExponentBitCnt - 1)) - 1 + (int)FractionBitCnt;
if (!(*pFloat & (1ull << FractionBitCnt))) binExp = 0; // Subnormal or 0
*pFloat &= ~(1ull << FractionBitCnt);
if (binExp >= (1 << (int)ExponentBitCnt) - 1)
binExp = (1 << (int)ExponentBitCnt) - 1, *pFloat = 0, inexact |= 1; // Infinity
*pFloat |= (unsigned long long)binExp << FractionBitCnt;

// Collect the result's sign
*pFloat |= (unsigned long long)(sign < 0) <<
(ExponentBitCnt + FractionBitCnt);

free(pNum);

*pInexact = inexact;

return 0;
}

#define TEST_ENTRY(n)  { #n, n, n##f }
#define TEST_ENTRYI(n) { #n, n, n }

struct
{
const char* Decimal;
double Dbl;
float Flt;
} const testData[] =
{
TEST_ENTRYI(0),
TEST_ENTRYI(000),
TEST_ENTRY(00.),
TEST_ENTRY(.00),
TEST_ENTRY(00.00),
TEST_ENTRYI(1),
TEST_ENTRY(10e-1),
TEST_ENTRY(.1e1),
TEST_ENTRY(.01e2),
TEST_ENTRY(00.00100e3),
TEST_ENTRYI(12),
TEST_ENTRY(12.),
TEST_ENTRYI(+12),
TEST_ENTRYI(-12),
TEST_ENTRY(.12),
TEST_ENTRY(+.12),
TEST_ENTRY(-.12),
TEST_ENTRY(12.34),
TEST_ENTRY(+12.34),
TEST_ENTRY(-12.34),
TEST_ENTRY(00.100),
TEST_ENTRY(00100.),
TEST_ENTRY(00100.00100),
TEST_ENTRY(1e4),
TEST_ENTRY(0.5),
TEST_ENTRY(0.6),
TEST_ENTRY(0.25),
TEST_ENTRY(0.26),
TEST_ENTRY(0.125),
TEST_ENTRY(0.126),
TEST_ENTRY(0.0625),
TEST_ENTRY(0.0624),
TEST_ENTRY(0.03125),
TEST_ENTRY(0.03124),
TEST_ENTRY(1e23),
TEST_ENTRY(1E-23),
TEST_ENTRY(1e+23),
TEST_ENTRY(12.34E56),
TEST_ENTRY(+12.34E+56),
TEST_ENTRY(-12.34e-56),
TEST_ENTRY(+.12E+34),
TEST_ENTRY(-.12e-34),
TEST_ENTRY(3.4028234e38),
TEST_ENTRY(3.4028235e38),
TEST_ENTRY(3.4028236e38),
TEST_ENTRY(1.7976931348623158e308),
TEST_ENTRY(1.7976931348623159e308),
TEST_ENTRY(1e1000),
TEST_ENTRY(-1.7976931348623158e308),
TEST_ENTRY(-1.7976931348623159e308),
TEST_ENTRY(2.2250738585072014e-308),
TEST_ENTRY(2.2250738585072013e-308),
TEST_ENTRY(2.2250738585072012e-308),
TEST_ENTRY(2.2250738585072011e-308),
TEST_ENTRY(4.9406564584124654e-324),
TEST_ENTRY(2.4703282292062328e-324),
TEST_ENTRY(2.4703282292062327e-324),
TEST_ENTRY(-4.9406564584124654e-325),
TEST_ENTRY(1e-1000),

// Extra test data from Vern Paxson's paper
// "A Program for Testing IEEE Decimal–Binary Conversion"
TEST_ENTRY(5e-20                     ),
TEST_ENTRY(67e+14                    ),
TEST_ENTRY(985e+15                   ),
TEST_ENTRY(7693e-42                  ),
TEST_ENTRY(55895e-16                 ),
TEST_ENTRY(996622e-44                ),
TEST_ENTRY(7038531e-32               ),
TEST_ENTRY(60419369e-46              ),
TEST_ENTRY(702990899e-20             ),
TEST_ENTRY(6930161142e-48            ),
TEST_ENTRY(25933168707e+13           ),
TEST_ENTRY(596428896559e+20          ),
TEST_ENTRY(3e-23                     ),
TEST_ENTRY(57e+18                    ),
TEST_ENTRY(789e-35                   ),
TEST_ENTRY(2539e-18                  ),
TEST_ENTRY(76173e+28                 ),
TEST_ENTRY(887745e-11                ),
TEST_ENTRY(5382571e-37               ),
TEST_ENTRY(82381273e-35              ),
TEST_ENTRY(750486563e-38             ),
TEST_ENTRY(3752432815e-39            ),
TEST_ENTRY(75224575729e-45           ),
TEST_ENTRY(459926601011e+15          ),
TEST_ENTRY(7e-27                     ),
TEST_ENTRY(37e-29                    ),
TEST_ENTRY(743e-18                   ),
TEST_ENTRY(7861e-33                  ),
TEST_ENTRY(46073e-30                 ),
TEST_ENTRY(774497e-34                ),
TEST_ENTRY(8184513e-33               ),
TEST_ENTRY(89842219e-28              ),
TEST_ENTRY(449211095e-29             ),
TEST_ENTRY(8128913627e-40            ),
TEST_ENTRY(87365670181e-18           ),
TEST_ENTRY(436828350905e-19          ),
TEST_ENTRY(5569902441849e-49         ),
TEST_ENTRY(60101945175297e-32        ),
TEST_ENTRY(754205928904091e-51       ),
TEST_ENTRY(5930988018823113e-37      ),
TEST_ENTRY(51417459976130695e-27     ),
TEST_ENTRY(826224659167966417e-41    ),
TEST_ENTRY(9612793100620708287e-57   ),
TEST_ENTRY(93219542812847969081e-39  ),
TEST_ENTRY(544579064588249633923e-48 ),
TEST_ENTRY(4985301935905831716201e-48),
TEST_ENTRY(9e+26                     ),
TEST_ENTRY(79e-8                     ),
TEST_ENTRY(393e+26                   ),
TEST_ENTRY(9171e-40                  ),
TEST_ENTRY(56257e-16                 ),
TEST_ENTRY(281285e-17                ),
TEST_ENTRY(4691113e-43               ),
TEST_ENTRY(29994057e-15              ),
TEST_ENTRY(834548641e-46             ),
TEST_ENTRY(1058695771e-47            ),
TEST_ENTRY(87365670181e-18           ),
TEST_ENTRY(872580695561e-36          ),
TEST_ENTRY(6638060417081e-51         ),
TEST_ENTRY(88473759402752e-52        ),
TEST_ENTRY(412413848938563e-27       ),
TEST_ENTRY(5592117679628511e-48      ),
TEST_ENTRY(83881765194427665e-50     ),
TEST_ENTRY(638632866154697279e-35    ),
TEST_ENTRY(3624461315401357483e-53   ),
TEST_ENTRY(75831386216699428651e-30  ),
TEST_ENTRY(356645068918103229683e-42 ),
TEST_ENTRY(7022835002724438581513e-33),
};

int main(void)
{
int i;
int errors = 0;

for (i = 0; i < sizeof(testData) / sizeof(testData[0]); i++)
{
unsigned long long fd;
unsigned long long ff;
unsigned long long f = 0;
unsigned long long d = 0;
int inexactf = 1;
int inexactd = 1;
int resf;
int resd;
int cmpf;
int cmpd;

memcpy(&d, &testData[i].Dbl, MIN(sizeof(d), sizeof(testData[i].Dbl)));
memcpy(&f, &testData[i].Flt, MIN(sizeof(f), sizeof(testData[i].Flt)));

resd = DecimalToIeee754Binary(testData[i].Decimal, 52, 11, &inexactd, &fd);
resf = DecimalToIeee754Binary(testData[i].Decimal, 23,  8, &inexactf, &ff);

cmpd = !!memcmp(&d, &fd, MIN(sizeof(d), sizeof(testData[i].Dbl)));
cmpf = !!memcmp(&f, &ff, MIN(sizeof(f), sizeof(testData[i].Flt)));

errors += !!resd + !!resf + !!cmpd + !!cmpf;

printf("%26s %c= 0x%016llX %c= 0x%016llX\n",
testData[i].Decimal,
"!="[!inexactd],
"!="[!memcmp(&d, &fd, MIN(sizeof(d), sizeof(testData[i].Dbl)))],
d);

printf("%26s %c=         0x%08llX %c= 0x%08llX\n",
testData[i].Decimal,
"!="[!inexactf],
"!="[!memcmp(&f, &ff, MIN(sizeof(f), sizeof(testData[i].Flt)))],
f);
}

printf("errors: %d\n", errors);

return 0;
}
``````

Output (on x86 PC in 32-bit mode under Windows XP):

``````                         0 == 0x0000000000000000 == 0x0000000000000000
0 ==         0x00000000 == 0x00000000
000 == 0x0000000000000000 == 0x0000000000000000
000 ==         0x00000000 == 0x00000000
00. == 0x0000000000000000 == 0x0000000000000000
00. ==         0x00000000 == 0x00000000
.00 == 0x0000000000000000 == 0x0000000000000000
.00 ==         0x00000000 == 0x00000000
00.00 == 0x0000000000000000 == 0x0000000000000000
00.00 ==         0x00000000 == 0x00000000
1 == 0x3FF0000000000000 == 0x3FF0000000000000
1 ==         0x3F800000 == 0x3F800000
10e-1 == 0x3FF0000000000000 == 0x3FF0000000000000
10e-1 ==         0x3F800000 == 0x3F800000
.1e1 == 0x3FF0000000000000 == 0x3FF0000000000000
.1e1 ==         0x3F800000 == 0x3F800000
.01e2 == 0x3FF0000000000000 == 0x3FF0000000000000
.01e2 ==         0x3F800000 == 0x3F800000
00.00100e3 == 0x3FF0000000000000 == 0x3FF0000000000000
00.00100e3 ==         0x3F800000 == 0x3F800000
12 == 0x4028000000000000 == 0x4028000000000000
12 ==         0x41400000 == 0x41400000
12. == 0x4028000000000000 == 0x4028000000000000
12. ==         0x41400000 == 0x41400000
+12 == 0x4028000000000000 == 0x4028000000000000
+12 ==         0x41400000 == 0x41400000
-12 == 0xC028000000000000 == 0xC028000000000000
-12 ==         0xC1400000 == 0xC1400000
.12 != 0x3FBEB851EB851EB8 == 0x3FBEB851EB851EB8
.12 !=         0x3DF5C28F == 0x3DF5C28F
+.12 != 0x3FBEB851EB851EB8 == 0x3FBEB851EB851EB8
+.12 !=         0x3DF5C28F == 0x3DF5C28F
-.12 != 0xBFBEB851EB851EB8 == 0xBFBEB851EB851EB8
-.12 !=         0xBDF5C28F == 0xBDF5C28F
12.34 != 0x4028AE147AE147AE == 0x4028AE147AE147AE
12.34 !=         0x414570A4 == 0x414570A4
+12.34 != 0x4028AE147AE147AE == 0x4028AE147AE147AE
+12.34 !=         0x414570A4 == 0x414570A4
-12.34 != 0xC028AE147AE147AE == 0xC028AE147AE147AE
-12.34 !=         0xC14570A4 == 0xC14570A4
00.100 != 0x3FB999999999999A == 0x3FB999999999999A
00.100 !=         0x3DCCCCCD == 0x3DCCCCCD
00100. == 0x4059000000000000 == 0x4059000000000000
00100. ==         0x42C80000 == 0x42C80000
00100.00100 != 0x40590010624DD2F2 == 0x40590010624DD2F2
00100.00100 !=         0x42C80083 == 0x42C80083
1e4 == 0x40C3880000000000 == 0x40C3880000000000
1e4 ==         0x461C4000 == 0x461C4000
0.5 == 0x3FE0000000000000 == 0x3FE0000000000000
0.5 ==         0x3F000000 == 0x3F000000
0.6 != 0x3FE3333333333333 == 0x3FE3333333333333
0.6 !=         0x3F19999A == 0x3F19999A
0.25 == 0x3FD0000000000000 == 0x3FD0000000000000
0.25 ==         0x3E800000 == 0x3E800000
0.26 != 0x3FD0A3D70A3D70A4 == 0x3FD0A3D70A3D70A4
0.26 !=         0x3E851EB8 == 0x3E851EB8
0.125 == 0x3FC0000000000000 == 0x3FC0000000000000
0.125 ==         0x3E000000 == 0x3E000000
0.126 != 0x3FC020C49BA5E354 == 0x3FC020C49BA5E354
0.126 !=         0x3E010625 == 0x3E010625
0.0625 == 0x3FB0000000000000 == 0x3FB0000000000000
0.0625 ==         0x3D800000 == 0x3D800000
0.0624 != 0x3FAFF2E48E8A71DE == 0x3FAFF2E48E8A71DE
0.0624 !=         0x3D7F9724 == 0x3D7F9724
0.03125 == 0x3FA0000000000000 == 0x3FA0000000000000
0.03125 ==         0x3D000000 == 0x3D000000
0.03124 != 0x3F9FFD60E94EE393 == 0x3F9FFD60E94EE393
0.03124 !=         0x3CFFEB07 == 0x3CFFEB07
1e23 != 0x44B52D02C7E14AF6 == 0x44B52D02C7E14AF6
1e23 !=         0x65A96816 == 0x65A96816
1E-23 != 0x3B282DB34012B251 == 0x3B282DB34012B251
1E-23 !=         0x19416D9A == 0x19416D9A
1e+23 != 0x44B52D02C7E14AF6 == 0x44B52D02C7E14AF6
1e+23 !=         0x65A96816 == 0x65A96816
12.34E56 != 0x4BC929C7D37D0D30 == 0x4BC929C7D37D0D30
12.34E56 !=         0x7F800000 == 0x7F800000
+12.34E+56 != 0x4BC929C7D37D0D30 == 0x4BC929C7D37D0D30
+12.34E+56 !=         0x7F800000 == 0x7F800000
-12.34e-56 != 0xB48834C13CBF331D == 0xB48834C13CBF331D
-12.34e-56 !=         0x80000000 == 0x80000000
+.12E+34 != 0x46CD95108F882522 == 0x46CD95108F882522
+.12E+34 !=         0x766CA884 == 0x766CA884
-.12e-34 != 0xB8AFE6C6DCC3C5AC == 0xB8AFE6C6DCC3C5AC
-.12e-34 !=         0x857F3637 == 0x857F3637
3.4028234e38 != 0x47EFFFFFD586B834 == 0x47EFFFFFD586B834
3.4028234e38 !=         0x7F7FFFFF == 0x7F7FFFFF
3.4028235e38 != 0x47EFFFFFE54DAFF8 == 0x47EFFFFFE54DAFF8
3.4028235e38 !=         0x7F7FFFFF == 0x7F7FFFFF
3.4028236e38 != 0x47EFFFFFF514A7BC == 0x47EFFFFFF514A7BC
3.4028236e38 !=         0x7F800000 == 0x7F800000
1.7976931348623158e308 != 0x7FEFFFFFFFFFFFFF == 0x7FEFFFFFFFFFFFFF
1.7976931348623158e308 !=         0x7F800000 == 0x7F800000
1.7976931348623159e308 != 0x7FF0000000000000 == 0x7FF0000000000000
1.7976931348623159e308 !=         0x7F800000 == 0x7F800000
1e1000 != 0x7FF0000000000000 == 0x7FF0000000000000
1e1000 !=         0x7F800000 == 0x7F800000
-1.7976931348623158e308 != 0xFFEFFFFFFFFFFFFF == 0xFFEFFFFFFFFFFFFF
-1.7976931348623158e308 !=         0xFF800000 == 0xFF800000
-1.7976931348623159e308 != 0xFFF0000000000000 == 0xFFF0000000000000
-1.7976931348623159e308 !=         0xFF800000 == 0xFF800000
2.2250738585072014e-308 != 0x0010000000000000 == 0x0010000000000000
2.2250738585072014e-308 !=         0x00000000 == 0x00000000
2.2250738585072013e-308 != 0x0010000000000000 == 0x0010000000000000
2.2250738585072013e-308 !=         0x00000000 == 0x00000000
2.2250738585072012e-308 != 0x0010000000000000 == 0x0010000000000000
2.2250738585072012e-308 !=         0x00000000 == 0x00000000
2.2250738585072011e-308 != 0x000FFFFFFFFFFFFF == 0x000FFFFFFFFFFFFF
2.2250738585072011e-308 !=         0x00000000 == 0x00000000
4.9406564584124654e-324 != 0x0000000000000001 == 0x0000000000000001
4.9406564584124654e-324 !=         0x00000000 == 0x00000000
2.4703282292062328e-324 != 0x0000000000000001 == 0x0000000000000001
2.4703282292062328e-324 !=         0x00000000 == 0x00000000
2.4703282292062327e-324 != 0x0000000000000000 == 0x0000000000000000
2.4703282292062327e-324 !=         0x00000000 == 0x00000000
-4.9406564584124654e-325 != 0x8000000000000000 == 0x8000000000000000
-4.9406564584124654e-325 !=         0x80000000 == 0x80000000
1e-1000 != 0x0000000000000000 == 0x0000000000000000
1e-1000 !=         0x00000000 == 0x00000000
5e-20 != 0x3BED83C94FB6D2AC == 0x3BED83C94FB6D2AC
5e-20 !=         0x1F6C1E4A == 0x1F6C1E4A
67e+14 == 0x4337CD9D4FFEC000 == 0x4337CD9D4FFEC000
67e+14 !=         0x59BE6CEA == 0x59BE6CEA
985e+15 == 0x43AB56D88FFF8500 == 0x43AB56D88FFF8500
985e+15 !=         0x5D5AB6C4 == 0x5D5AB6C4
7693e-42 != 0x3804F13D0FFFE4A1 == 0x3804F13D0FFFE4A1
7693e-42 !=         0x0053C4F4 == 0x0053C4F4
55895e-16 != 0x3D989537AFFFFFE1 == 0x3D989537AFFFFFE1
55895e-16 !=         0x2CC4A9BD == 0x2CC4A9BD
996622e-44 != 0x380B21710FFFFFFB == 0x380B21710FFFFFFB
996622e-44 !=         0x006C85C4 == 0x006C85C4
7038531e-32 != 0x3AB5C87FB0000000 == 0x3AB5C87FB0000000
7038531e-32 !=         0x15AE43FD == 0x15AE43FD
60419369e-46 != 0x3800729D90000000 == 0x3800729D90000000
60419369e-46 !=         0x0041CA76 == 0x0041CA76
702990899e-20 != 0x3D9EEAF950000000 == 0x3D9EEAF950000000
702990899e-20 !=         0x2CF757CA == 0x2CF757CA
6930161142e-48 != 0x3802DD9E10000000 == 0x3802DD9E10000000
6930161142e-48 !=         0x004B7678 == 0x004B7678
25933168707e+13 != 0x44CB753310000000 == 0x44CB753310000000
25933168707e+13 !=         0x665BA998 == 0x665BA998
596428896559e+20 != 0x4687866490000000 == 0x4687866490000000
596428896559e+20 !=         0x743C3324 == 0x743C3324
3e-23 != 0x3B422246700E05BD == 0x3B422246700E05BD
3e-23 !=         0x1A111234 == 0x1A111234
57e+18 == 0x4408B84570022A20 == 0x4408B84570022A20
57e+18 !=         0x6045C22C == 0x6045C22C
789e-35 != 0x39447BCDF000340C == 0x39447BCDF000340C
789e-35 !=         0x0A23DE70 == 0x0A23DE70
...
errors: 0
``````

The first `==` or `!=` on each line of the output tells whether or not the obtained float/double represents the decimal input exactly.

The second `==` or `!=` tells whether or not the calculated float/double matches the one generated by the compiler. The first hex number is from `DecimalToIeee754Binary()` and the second is from the compiler.

UPD: The code was compiled with gcc 4.6.2 and Open Watcom C/C++ 1.9.

-

While this isn't exactly what you need, it's kind of close:

http://www.h-schmidt.net/FloatApplet/IEEE754.html

You'll need a bit of interpretation to figure out if your values can be represented exactly in binary floating point, but since you've only got three or four values, that should be OK.

As an example of how you might use this, enter "0.1" in the "decimal representation" field.

If we examine the binary representation, we see that the mantissa appears to be a repeating sequence, which is already a sign that we can't represent the value exactly:

``````0 0111101 110011001100110011001101
``````

(For better readability, I've put spaces here between the sign, exponent, and mantissa.)

Another indication is the "with double precision" field. What it does is to extend the single-precision binary floating point number to double precision by extending the mantissa with zeros, then converting back to decimal. If the number can be represented exactly, we would expect to see the number we originally input; in this case, though, we see 0.10000000149011612. This is an additional indication that 0.1 cannot be represented exactly using binary floating point.

-

It should be pretty simple to write such a tool:

``````input value as string
convert to double
convert back to string
compare with input
``````

Care would need to be taken to ensure that no rounding takes place in the conversions to/from double.

-
You are missing the rounding, which my implicitly take place in the conversion to string –  hirschhornsalz Dec 8 '11 at 9:43
@drhirsch: why would there be rounding if the number is exactly representable ? –  Paul R Dec 8 '11 at 9:50
@PaulR: The case of interest is when the number is not exactly representable. In this case, the conversion to string may still "round" the number to the "closest sensible" decimal number. For example, `float f=0.1; printf("%g", f);` will output "0.1" (which, in most cases, is what people actually want). –  Martin B Dec 8 '11 at 9:54
Consider 1/2^50, which is surely representable as double (which has 53 bits mantissa), but which read as 0,00000000000000088817841970012523233890533447265625 in decimal, which will be truncated to 19 or 20 significant digits. Or worse. And if the number is not representable rounding will take place too, just consider 0.1 which may be read in, converted to some approximation to 0.1, and printed as 0.1 because of rounding. –  hirschhornsalz Dec 8 '11 at 9:59
@Daniel: You omitted the third parameter, which should give the precision. I just wondered while a simple printf consumes 4G of memory and takes 10 seconds to execute, when I realized that some random (obviously huge) value was pulled from the stack. –  hirschhornsalz Dec 8 '11 at 11:00