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I'm not sure if I explain my question clearly in title, basically I need a floor/ceil function like this:

sub ceil($num)

ceil(120) = 200
ceil(12) = 20
ceil(1.2) = 2
ceil(0.12) = 0.2
ceil(0.012) = 0.02
ceil(0.00000012) = 0.0000002

same apply to negative number (negative sign on both input and output)

thanks!

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1  
What about Math::SigFigs? –  nwellnhof Dec 12 '13 at 15:51
    
thanks a lot. it seems like this is what i need. let me try it –  Ryan You Dec 12 '13 at 19:24

2 Answers 2

up vote 3 down vote accepted
sub floor {
    my $a = shift;
    $a =~ s/([1-9])(\d*)(?:\.\d*)?/$1.("0"x length($2))/e;
    0 + $a;
}

sub ceil {
    my $a = shift;
    my $f = floor($a);
    $f =~ s/([1-9])/1+$1/e if abs($a) > abs($f);
    0 + $f;
}

And test:

$ perl -E'sub floor {my $a = shift; $a=~s/([1-9])(\d*)(?:\.\d*)?/$1.("0"x length($2))/e; 0+$a} sub ceil {my $a = shift;my $f = floor($a); $f=~s/([1-9])/1+$1/e if abs($a) > abs($f); 0+$f} printf "%10g %10g %10g\n", $_, floor($_), ceil($_) for (120, 12, 1.2, 0.12, 0.012, 200, 20, 0.2, -120, -12, -0.12, -0.2,0, 1.2e12, -1.2e-12)'
       120        100        200
        12         10         20
       1.2          1          2
      0.12        0.1        0.2
     0.012       0.01       0.02
       200        200        200
        20         20         20
       0.2        0.2        0.2
      -120       -100       -200
       -12        -10        -20
     -0.12       -0.1       -0.2
      -0.2       -0.2       -0.2
         0          0          0
   1.2e+12      1e+12      2e+12
  -1.2e-12     -1e-12     -2e-12
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Hynek, this is really cool. I never thought about using regex to deal this kind of problem since i always think in math term for numerical issue. Thanks a lot. –  Ryan You Dec 12 '13 at 18:54
    
If you would like 2^N rounding you can go with bits but if you need 10^N, there is not such presentation of number except decimal presentation i.e. string. So it seems obvious for me. BTW if you will need 2^N ceil: static __inline unsigned clp2(unsigned x) { return x>1?(unsigned)INT32_MIN >> (__builtin_clz(x-1)-1):x; } and floor static __inline unsigned flp2(unsigned x) { return 1 << (sizeof(x)*8-1 - __builtin_clz(x)); } for unsigned numbers in C. –  Hynek -Pichi- Vychodil Dec 12 '13 at 19:44

This might work? I haven't tested it, but I think the logic is there.

Step 1 we find the nearest power of 10 (assign that to "$base")

Step 2 we determine if $num is a cleanly divisble by this base

Step 2.1 if it is, return that

Step 2.2 if it is not, subtract the modulo and add 1

$base = 10*floor(log($num,10));
return ($num % $base)?($num - ($num%$base) + 1):$num;

Math isn't my strongest thing so there could be a better way to go

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I just realized this wont work for values less than 1 (IE: decimals), but it's a start. I'll think on a way to fit those as well. –  isick Dec 12 '13 at 15:44
    
thx. I also thought about taking log but stuck at decimal as well –  Ryan You Dec 12 '13 at 19:01

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