# Someone tells me how the floating number 1.002 * 10 ^3 is represented in the computer? [closed]

The question is in the title. Say, for a 64-bit machine.

I want to know how the floating number is represented because I would like to know the result of

``````1.002 * 10^3 - 1.000 * 10 ^3
``````

in machine representation. Thanks for your ideas.

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## closed as unclear what you're asking by Ken White, Raedwald, Pascal Cuoq, Sneftel, tmyklebuJun 26 '14 at 22:33

Please clarify your specific problem or add additional details to highlight exactly what you need. As it's currently written, it’s hard to tell exactly what you're asking. See the How to Ask page for help clarifying this question. If this question can be reworded to fit the rules in the help center, please edit the question.

The result of the above operation is 2. Are you looking for the `float` representation of 2? –  barak manos May 22 '14 at 16:13
Result is `2`. As whole numbers with fewer than ~7 (float) or ~16 (double) decimal digits of precision, these can be represented exactly. –  Jeff May 22 '14 at 16:14
@barakmanos `1.002E3` is clearly `1002`, but `1.002 * 1E3` might not be, because 1.002 is just about a power of two and 1002 just below. It depends how the expression is interpreted (and see stackoverflow.com/questions/18031221/… for a quick study of the result of multiplying an exact floating-point number by an inexact one in order to produce a product that would, if carried mathematically, arrived to a number representable exactly as a floating-point number). –  Pascal Cuoq May 22 '14 at 16:54
@barakmanos If `1.002 * 1E3` is not `1002`, then clearly `1.002 * 1E3 - 1000.0` is not 2, since this subtraction is exact. –  Pascal Cuoq May 22 '14 at 16:57
Are you looking for the binary (64 bit) representation of a floating point number? That can be found here: kipirvine.com/asm/workbook/floating_tut.htm "1 bit for the sign, 11 bits for the exponent, and 52 bits for the mantissa". –  Hans Then May 22 '14 at 17:16

If you are you looking for the representation of a `float` value in memory, then you can write down a small C program to reveal the answer. Taking the value specified in your question, for example:

``````float f = (float)(1.002*1000-1.000*1000);
char* p = (char*)&f;
int   i;

// Little Endian
for (i=0; i<sizeof(f); i++)
printf("%.2X",p[i]);

// Big Endian
for (i=sizeof(f)-1; i>=0; i--)
printf("%.2X",p[i]);
``````

Please note that the `"%.2X"` string is correspondent with `CHAR_BIT` being equal to `8`, and should generally be set as `"%.NX"`, with `N` being equal to `CHAR_BIT/4`.

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The `%a` format specifier gives a slightly more readable representation. –  tmyklebu May 22 '14 at 17:12
@tmyklebu: Thanks for the tip (as I wasn't really aware of this particular specifier). –  barak manos May 22 '14 at 17:25
This answer is wrong as the operation is NOT necessarily 2: 1.002 * 10 ^3 cannot be exactly represented in bits. See the comments earlier from Pascal Cuoq. Therefore, I vote up but do NOT accept this answer. Thanks anyway. –  zell May 26 '14 at 13:54
@zell: The answer tells you how to get the representation of any `float` value. In your question, the value is 2 or very close to it, so I used 2 as an example. Since you insist, I changed it to be the precised value specified in your question. –  barak manos May 26 '14 at 13:59