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I'm trying to write good round_double function which will round double in specified precision:

1.

double round_double(double num, int prec)
{
    for (int i = 0; i < abs(prec); ++i)
        if(prec > 0)
            num *= 10.0;
        else
            num /= 10.0;
    double result = (long long)floor(num + 0.5);
    for (int i = 0; i < abs(prec); ++i)
        if(prec > 0)
            result /= 10.0;
        else
            result *= 10.0;
    return result;
}

2.

double round_double(double num, int prec)
{
    double tmp = pow(10.0, prec);
    double result = (long long)floor(num * tmp + 0.5);
    result /= tmp;
    return result;
}

This functions do what I wan't but they are, in my opinion, not good enough. Because starting from precision = 13 - 14, they returning bad results.

The cause I'm sure that there is possible to write good double_round is that just printing the number via cout in specified precision (say 18) is prints better result than result of my function.

For example this part of code:

int prec = 18;
double num = 10.123456789987654321;
cout << setiosflags(ios::showpoint | ios::fixed)
<< setprecision(prec) << "round_double(" << num << ", " 
<< prec << ") = " << round_double(num, prec) << endl;

Will print round_double(10.123456789987655000, 18) = -9.223372036854776500 for first round_double and round_double(10.123456789987655000, 18) = -9.223372036854776500for second one.

How write good round_double function in c++? Or there is already exists?

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1  
double has a decimal precision of 15 digits. you cannot get precise values beyond that –  Marius Bancila Apr 14 '11 at 7:43

3 Answers 3

up vote 2 down vote accepted

Don't cast to long long that is forcing a conversion to an integer with limited range, beyond what 10^13 requires (well 19 for 64-bit with no whole number part). Just calling floor should be enough.

double round_double(double num, int prec)
{
    double tmp = pow(10.0, prec);
    double result = floor(num * tmp + 0.5);
    result /= tmp;
    return result;
}

Note that Mike is also correct, you have a limited range you can represent just in double itself. It isn't so great if you need clean decimal responses. But the long long is the cause of your totally wacky numbers.

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Thank you for pointing on this. But in this case also starting from 18 - 19 results are different. –  Mihran Hovsepyan Apr 14 '11 at 7:15
    
You have to consider the whole number part of the number you are rounding. If all 10^19 is used for the fractional rounding there is no space to store the whole number. So 10.123 probably starts failing at around 17 precision. –  edA-qa mort-ora-y Apr 14 '11 at 7:17
    
But again, as what Mike says, double doesn't even have this high of precision, so even fixing the long long won't help at this point. If you have a long double it might help. –  edA-qa mort-ora-y Apr 14 '11 at 7:18

The problem is the floating-point representation. A binary representation cannot represent all decimal numbers exactly, and only has a finite precision.

double usually means a 64-bit binary representation as specified by IEEE754, with a 52-bit fractional part. This gives a precision of approximately 16 decimal digits.

If you need more precision than that, then the best option is probably to use an arbitrary-precision arithmetic library such as GMP. Your compiler may or may not offer a long double type with a higher precision than double.

EDIT: sorry, I didn't notice that you're getting completely incorrect results. As another answer says, this is due to the conversion to long long overflowing.

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I don't wan't use GMP or other libraries that works with big decimals. I just wan't that result of precisioned cout and result of my function was the same. –  Mihran Hovsepyan Apr 14 '11 at 7:16
    
Sorry, I misread the question and thought you were asking why you don't get 18 digits of precision. –  Mike Seymour Apr 14 '11 at 7:24

Another approach is to round based on binary-digits of precision. Sample implementation below - not sure if it's useful to you, but since you got me playing I thought I'd throw it out there.

Notes:

  • this uses the ieee754.h header common on Linux systems: it could easily be ported to Windows, but this is undeniably bit hackery and whether it's appropriate in any given production code is a case-by-case call.
  • you could approximate some decimal near-equivalent, e.g. multiply the desired decimal precision by 10 and divide by 3 (based on 2^10 ~= 10^3).

The input number (10.1234...) with 1 bit of precision is 8; with 2 it's 10 etc..

Separately, IMHO decimal rounding is best done at output time, or when using a decimal-capable representation (e.g. storing an int mantissa and power-of-10 exponent).

#include <ieee754.h>
#include <iostream>
#include <iomanip>

double round_double(double d, int precision)
{
    ieee754_double* p = reinterpret_cast<ieee754_double*>(&d);
    std::cout << "mantissa  0:" << std::hex << p->ieee.mantissa0
        << ", 1:" << p->ieee.mantissa1 << '\n';
    unsigned mask0 = precision < 20 ? 0x000FFFFF << (20 - precision) :
                                      0x000FFFFF;
    unsigned mask1 = precision <  20 ? 0 :
                     precision == 53 ? 0xFFFFFFFF :
                                       0xFFFFFFFE << (32 + 20 - precision);
    std::cout << "masks     0:" << mask0 << ", 1: " << mask1 << '\n';
    p->ieee.mantissa0 &= mask0;
    p->ieee.mantissa1 &= mask1;
    std::cout << "mantissa' 0:" << p->ieee.mantissa0
        << ", 1:" << p->ieee.mantissa1 << '\n';
    return d;
}

int main()
{
    double num = 10.123456789987654321;

    for (int prec = 1; prec <= 53; ++prec)
        std::cout << std::setiosflags(std::ios::showpoint | std::ios::fixed)
            << std::setprecision(60)
            << "round_double(" << num << ", "  << prec << ") = "
            << round_double(num, prec) << std::endl;
}

Output...

mantissa  0:43f35, 1:ba76eea7
masks     0:fff80000, 1: 0
mantissa' 0:0, 1:0
round_double(10.123456789987654858009591407608240842819213867187500000000000, 1) = 8.000000000000000000000000000000000000000000000000000000000000
mantissa  0:43f35, 1:ba76eea7
masks     0:fffc0000, 1: 0
mantissa' 0:40000, 1:0
round_double(10.123456789987654858009591407608240842819213867187500000000000, 2) = 10.000000000000000000000000000000000000000000000000000000000000
mantissa  0:43f35, 1:ba76eea7
masks     0:fffe0000, 1: 0
mantissa' 0:40000, 1:0
round_double(10.123456789987654858009591407608240842819213867187500000000000, 3) = 10.000000000000000000000000000000000000000000000000000000000000
mantissa  0:43f35, 1:ba76eea7
masks     0:ffff0000, 1: 0
mantissa' 0:40000, 1:0
round_double(10.123456789987654858009591407608240842819213867187500000000000, 4) = 10.000000000000000000000000000000000000000000000000000000000000
mantissa  0:43f35, 1:ba76eea7
masks     0:ffff8000, 1: 0
mantissa' 0:40000, 1:0
round_double(10.123456789987654858009591407608240842819213867187500000000000, 5) = 10.000000000000000000000000000000000000000000000000000000000000
mantissa  0:43f35, 1:ba76eea7
masks     0:ffffc000, 1: 0
mantissa' 0:40000, 1:0
round_double(10.123456789987654858009591407608240842819213867187500000000000, 6) = 10.000000000000000000000000000000000000000000000000000000000000
mantissa  0:43f35, 1:ba76eea7
masks     0:ffffe000, 1: 0
mantissa' 0:42000, 1:0
round_double(10.123456789987654858009591407608240842819213867187500000000000, 7) = 10.062500000000000000000000000000000000000000000000000000000000
mantissa  0:43f35, 1:ba76eea7
masks     0:fffff000, 1: 0
mantissa' 0:43000, 1:0
round_double(10.123456789987654858009591407608240842819213867187500000000000, 8) = 10.093750000000000000000000000000000000000000000000000000000000
mantissa  0:43f35, 1:ba76eea7
masks     0:7ffff800, 1: 0
mantissa' 0:43800, 1:0
round_double(10.123456789987654858009591407608240842819213867187500000000000, 9) = 10.109375000000000000000000000000000000000000000000000000000000
mantissa  0:43f35, 1:ba76eea7
masks     0:3ffffc00, 1: 0
mantissa' 0:43c00, 1:0
round_double(10.123456789987654858009591407608240842819213867187500000000000, a) = 10.117187500000000000000000000000000000000000000000000000000000
mantissa  0:43f35, 1:ba76eea7
masks     0:1ffffe00, 1: 0
mantissa' 0:43e00, 1:0
round_double(10.123456789987654858009591407608240842819213867187500000000000, b) = 10.121093750000000000000000000000000000000000000000000000000000
mantissa  0:43f35, 1:ba76eea7
masks     0:fffff00, 1: 0
mantissa' 0:43f00, 1:0
round_double(10.123456789987654858009591407608240842819213867187500000000000, c) = 10.123046875000000000000000000000000000000000000000000000000000

etc....
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