What is assigned to variables in floating point calculations?

I am having some trouble with calculations in Perl (v5.10.1) due to floating point numbers:

#!/usr/bin/perl
use strict;
use warnings;
use POSIX;

my \$x1 = 1500;
my \$x0 = 1000;
my \$dx = 100/3;

print "(\$x1-\$x0)/\$dx \n";                                   #(1500-1000)/33.3333333333333
print my \$a=((\$x1-\$x0)/\$dx), "\n";                          #15
print my \$b=floor((\$x1-\$x0)/\$dx), "\n";                     #14
print my \$c=floor(\$a), "\n";                                #14
print floor(15), "\n";                                      #15
print my \$d=floor(sprintf("%.0f", (\$x1-\$x0)/\$dx)), "\n";    #15

Why is the output 14 sometimes? Isn't the value 15 saved as it shows in \$a and therefore used floor on the value 15? The comparison of \$a and \$c leaves me really puzzled...

I read this but can't figure it out. I also found the workaround with sprintf which isn't very handy in my opinion.

Try:

printf "%.18g\n", my \$a=((\$x1-\$x0)/\$dx);

What you see as 15 isn't exactly 15; it may be a little less or a little more. Most floating point numbers can only be represented imprecisely; when used in operations, the effect is, err, multiplied.

Classic reference: http://docs.oracle.com/cd/E19957-01/806-3568/ncg_goldberg.html

The workaround with sprintf is often not so good to use, since it only deals with a very small amount of imprecision. Better to examine your calculations and decide what tolerance you should use and add it before flooring.

• Can you explain the last part more in detail please? What do you mean by "only deals with a very small amount of imprecision"? And can you please give an example of your suggested FP calculation style? The last line of my code uses sprintf to adjust a tolerance and uses floor afterwards. This is what you suggested?! Just found this which leaves me even more confused. – EverythingRightPlace Nov 4 '13 at 20:53

In double-precision, the value of \$dx is exactly

33.33333333333333570180911920033395290374755859375

The value of (\$x1-\$x0)/\$dx is exactly

14.9999999999999982236431605997495353221893310546875

floor(\$x1-\$x0)/\$dx is thus 14.

You get 15 from the print/sprintf because printing rounds the decimal value (unless you ask for more digits, like "%.17g").