This means, instead of devising with a 100, you multiply with 0.01 (1/100). Because some programs of mine have a lot of divisions in their core loops, I investigated the difference.
I created the following test program.
program DivVsMult;
{$APPTYPE CONSOLE}
uses
SysUtils,
Windows;
var
Start,Stop, Start2, Stop2, Freq:int64;
i : integer;
t : real;
CpuSpeed : integer;
begin
{ TODO -oUser -cConsole Main : Insert code here }
{ Cpu Speed fastes cpu = 1 slower => 10
it's just to determin the number of time to do the loop
Maxint div CpuSpeed is calculated }
if ParamCount = 1 then
CpuSpeed := StrToIntDef(ParamStr(1),1)
else
CpuSpeed := 10;
Writeln('Simple Number division:');
Writeln('Calculating');
QueryPerformanceFrequency(freq);
QueryPerformanceCounter(Start);
for i:=0 to MaxInt div CpuSpeed do
t := i * (1/100);
QueryPerformanceCounter(Stop);
Writeln(Format('First Pass Result: %f',[t]));
{ This is needed because the compiler would optimize,
and would notice the result of the loop isn't used at all,
so therefor the result is useless.. so depending on the compiler, it will
choose what to do with it, this disables that optimization }
QueryPerformanceCounter(Start2);
for i:=0 to MaxInt div CpuSpeed do
t := i * (1/100);
QueryPerformanceCounter(Stop2);
Writeln(Format('Second Pass Result: %15.6f',[t]));
{ This is needed because the compiler would optimize,
and would notice the result of the loop isn't used at all,
so therefor the result is useless.. so depending on the compiler, it will
choose what to do with it, this disables that optimization }
Writeln('Done, Results:');
Writeln(Format('/ 100 Time: %6.4f seconds'+#13#10+
'/ 100 Clock: %d ticks'+#13#10+
'* 0.01 Time: %6.4f seconds'+#13#10+
'* 0.01 Clock: %d ticks',[(Stop-Start) / freq, , (Stop2-Start2)]));
Writeln;
Writeln('Odd Number division:');
QueryPerformanceCounter(Start);
for i:=0 to high(i) div CpuSpeed do
t := i / 556;
QueryPerformanceCounter(Stop);
Writeln(Format('First Pass Result: %15.6f',[t]));
{ This is needed because the compiler would optimize,
and would notice the result of the loop isn't used at all,
so therefor the result is useless.. so depending on the compiler, it will
choose what to do with it, this disables that optimization }
QueryPerformanceCounter(Start2);
for i:=0 to high(i) div CpuSpeed do
t := i * (1/556);
QueryPerformanceCounter(Stop2);
Writeln(Format('Second Pass Result: %15.6f',[t]));
Writeln(Format('/ 556 Time: %6.4f seconds'+#13#10+
'/ 556 Clock: %d ticks'+#13#10+
'* (1/556) Time: %6.4f seconds'+#13#10+
'* (1/556) Clock: %d ticks',[(Stop-Start) / freq, (Stop-Start), (Stop2-Start2) / freq, (Stop2-Start2)]));
Writeln(Format(' (1/556) = %15.14f (approximate)',[1/556]));
// Readln;
end.
On an old P3 900Mhz:
Simple Number division:
Calculating
First Pass Result: 2147483,64
Second Pass Result: 2147483,64
Done, Results:
/ 100 Time: 10,3319 seconds
/ 100 Clock: 36983482 ticks
* 0.01 Time: 2,0378 seconds
* 0.01 Clock: 7294251 ticks
Odd Number division:
First Pass Result: 386238,0647482014610000
Second Pass Result: 386238,0647482014610000
Done, Results:
/ 556 Time: 10,0735 seconds
/ 556 Clock: 36058581 ticks
* (1/556) Time: 2,0446 seconds
* (1/556) Clock: 7318775 ticks
(1/556) = 0,0017985611510791 (approximate)
On a new P4 2.3 Ghz:
Simple Number division:
Calculating
First Pass Result: 2147483.64
Second Pass Result: 2147483.64
Done, Results:
/ 100 Time: 4.6227 seconds
/ 100 Clock: 16547055 ticks
* 0.01 Time: 1.0782 seconds
* 0.01 Clock: 3859508 ticks
Odd Number division:
First Pass Result: 386238.064748
Second Pass Result: 386238.064748
Done, Results:
/ 556 Time: 4.5820 seconds
/ 556 Clock: 16401425 ticks
* (1/556) Time: 12.1746 seconds
* (1/556) Clock: 43579366 ticks
(1/556) = 0.00179856115108 (approximate)
The results are variating, on simple numbers like 0.01 the speedup is allways working, but somehow the very complex numbers tend to be slower sometimes.
I use this tip allot when working with percentage.