Monte Carlo methods: Difference between revisions
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100000 3,14712 0,1759409006731298209938938800
1000000 3,141364 0,0072782698142600895432451100</pre>
=={{header|PureBasic}}==
<lang PureBasic>OpenConsole()
Procedure.d MonteCarloPi(throws.d)
inCircle.d = 0
For i = 1 To throws.d
randX.d = (Random(2147483647)/2147483647)*2-1
randY.d = (Random(2147483647)/2147483647)*2-1
dist.d = Sqr(randX.d*randX.d + randY.d*randY.d)
If dist.d < 1
inCircle = inCircle + 1
EndIf
Next i
pi.d = (4 * inCircle / throws.d)
ProcedureReturn pi.d
EndProcedure
PrintN ("'built-in' #Pi = " + StrD(#PI,20))
PrintN ("MonteCarloPi(10000) = " + StrD(MonteCarloPi(10000),20))
PrintN ("MonteCarloPi(100000) = " + StrD(MonteCarloPi(100000),20))
PrintN ("MonteCarloPi(1000000) = " + StrD(MonteCarloPi(1000000),20))
PrintN ("MonteCarloPi(10000000) = " + StrD(MonteCarloPi(10000000),20))
PrintN("Press any key"): Repeat: Until Inkey() <> ""
</lang>Output:
<pre>'built-in' #PI = 3.14159265358979310000
MonteCarloPi(10000) = 3.17119999999999980000
MonteCarloPi(100000) = 3.14395999999999990000
MonteCarloPi(1000000) = 3.14349599999999980000
MonteCarloPi(10000000) = 3.14127720000000020000
Press any key</pre>
=={{header|Python}}==
|
Revision as of 10:06, 6 March 2010
You are encouraged to solve this task according to the task description, using any language you may know.
A Monte Carlo Simulation is a way of approximating the value of a function where calculating the actual value is difficult or impossible. It uses random sampling to define constraints on the value and then makes a sort of "best guess."
A simple Monte Carlo Simulation can be used to calculate the value for π. If you had a circle and a square where the length of a side of the square was the same as the diameter of the circle, the ratio of the area of the circle to the area of the square would be π/4. So, if you put this circle inside the square and select many random points inside the square, the number of points inside the circle divided by the number of points inside the square and the circle would be approximately π/4.
Write a function to run a simulation like this with a variable number of random points to select. Also, show the results of a few different sample sizes. For software where the number π is not built-in, we give π to a couple of digits: 3.141592653589793238462643383280
Ada
<lang ada>with Ada.Text_IO; use Ada.Text_IO; with Ada.Numerics.Float_Random; use Ada.Numerics.Float_Random;
procedure Test_Monte_Carlo is
Dice : Generator; function Pi (Throws : Positive) return Float is Inside : Natural := 0; begin for Throw in 1..Throws loop if Random (Dice) ** 2 + Random (Dice) ** 2 <= 1.0 then Inside := Inside + 1; end if; end loop; return 4.0 * Float (Inside) / Float (Throws); end Pi;
begin
Put_Line (" 10_000:" & Float'Image (Pi ( 10_000))); Put_Line (" 100_000:" & Float'Image (Pi ( 100_000))); Put_Line (" 1_000_000:" & Float'Image (Pi ( 1_000_000))); Put_Line (" 10_000_000:" & Float'Image (Pi ( 10_000_000))); Put_Line ("100_000_000:" & Float'Image (Pi (100_000_000)));
end Test_Monte_Carlo;</lang> The implementation uses built-in uniformly distributed on [0,1] random numbers. Note that the accuracy of the result depends on the quality of the pseudo random generator: its circle length and correlation to the function being simulated. Sample output:
10_000: 3.13920E+00 100_000: 3.14684E+00 1_000_000: 3.14197E+00 10_000_000: 3.14215E+00 100_000_000: 3.14151E+00
ALGOL 68
<lang algol68>PROC pi = (INT throws)REAL: BEGIN
INT inside := 0; TO throws DO IF random ** 2 + random ** 2 <= 1 THEN inside +:= 1 FI OD; 4 * inside / throws
END # pi #;
print ((" 10 000:",pi ( 10 000),new line)); print ((" 100 000:",pi ( 100 000),new line)); print ((" 1 000 000:",pi ( 1 000 000),new line)); print ((" 10 000 000:",pi ( 10 000 000),new line)); print (("100 000 000:",pi (100 000 000),new line))</lang> Sample output:
10 000:+3.15480000000000e +0 100 000:+3.12948000000000e +0 1 000 000:+3.14169200000000e +0 10 000 000:+3.14142040000000e +0 100 000 000:+3.14153276000000e +0
AutoHotkey
Search autohotkey.com: Carlo methods
Source: AutoHotkey forum by Laszlo
<lang autohotkey>
MsgBox % MontePi(10000) ; 3.154400
MsgBox % MontePi(100000) ; 3.142040
MsgBox % MontePi(1000000) ; 3.142096
MontePi(n) {
Loop %n% { Random x, -1, 1.0 Random y, -1, 1.0 p += x*x+y*y < 1 } Return 4*p/n
} </lang>
BASIC
<lang qbasic>DECLARE FUNCTION getPi! (throws!) CLS PRINT getPi(10000) PRINT getPi(100000) PRINT getPi(1000000) PRINT getPi(10000000)
FUNCTION getPi (throws) inCircle = 0 FOR i = 1 TO throws 'a square with a side of length 2 centered at 0 has 'x and y range of -1 to 1 randX = (RND * 2) - 1'range -1 to 1 randY = (RND * 2) - 1'range -1 to 1 'distance from (0,0) = sqrt((x-0)^2+(y-0)^2) dist = SQR(randX ^ 2 + randY ^ 2) IF dist < 1 THEN 'circle with diameter of 2 has radius of 1 inCircle = inCircle + 1 END IF NEXT i getPi = 4! * inCircle / throws END FUNCTION</lang> Output:
3.16 3.13648 3.142828 3.141679
C
<lang c>#include <stdio.h>
- include <stdlib.h>
- include <math.h>
double drand(int lim) {
/* there must be a better way (maybe) */ return ((double)lim * (double)rand() / (double)RAND_MAX );
}
double Pi(int samples) {
int i, in_circle; double coords[2], length; in_circle = 0; for(i=0; i<samples; i++) { coords[0] = drand(1); coords[1] = drand(1); coords[0] = coords[0]*2.0 - 1.0; coords[1] = coords[1]*2.0 - 1.0; length = sqrt(coords[0]*coords[0] + coords[1]*coords[1]); if ( length <= 1.0 ) in_circle++; } return 4. * (double)in_circle / (double)samples;
}
int main() {
int n = 10000; while (n <= 100000000 ) { printf("%d %lf\n", n, Pi(n)); n *= 10; }
}</lang>
Output:
10000 3.119600 100000 3.143400 1000000 3.143064 10000000 3.142193 100000000 3.141625
C#
<lang csharp>using System;
class Program {
static double MonteCarloPi(int n) { int inside = 0; Random r = new Random();
for (int i = 0; i < n; i++) { if (Math.Pow(r.NextDouble(), 2)+ Math.Pow(r.NextDouble(), 2) <= 1) { inside++; } }
return 4.0 * inside / n; }
static void Main(string[] args) { int value = 1000; for (int n = 0; n < 5; n++) { value *= 10; Console.WriteLine("{0}:{1}", value.ToString("#,###").PadLeft(11, ' '), MonteCarloPi(value)); } }
}</lang>
Output
10,000:3.1436 100,000:3.14632 1,000,000:3.139476 10,000,000:3.1424476 100,000,000:3.1413976
Clojure
<lang lisp>(defn calc-pi [iterations]
(loop [x (rand) y (rand) in 0 total 1] (if (< total iterations) (recur (rand) (rand) (if (<= (+ (* x x) (* y y)) 1) (inc in) in) (inc total)) (double (* (/ in total) 4)))))
(doseq [x (take 5 (iterate #(* 10 %) 10))] (println (str (format "% 8d" x) ": " (calc-pi x))))</lang>
output:
100: 3.2 1000: 3.124 10000: 3.1376 100000: 3.14104 1000000: 3.141064
Common Lisp
<lang lisp>(defun approximate-pi (n)
(/ (loop repeat n count (<= (abs (complex (random 1.0) (random 1.0))) 1.0)) n 0.25))
(dolist (n (loop repeat 5 for n = 1000 then (* n 10) collect n))
(format t "~%~8d -> ~f" n (approximate-pi n)))</lang>
Output:
1000 -> 3.132 10000 -> 3.1184 100000 -> 3.1352 1000000 -> 3.142072 10000000 -> 3.1420677
D
<lang d> import std.stdio: writefln; import std.random: rand;
double pi(int nthrows) {
int inside; for (int i; i < nthrows; i++) { double r1 = rand() / cast(double)uint.max; double r2 = rand() / cast(double)uint.max; if (r1*r1 + r2*r2 <= 1.0) inside++; } return 4.0 * inside / nthrows;
}
void main() {
for (int n = 10_000; n <= 100_000_000; n *= 10) writefln("%9d: %07f", n, pi(n));
} </lang>
Sample output:
100000: 3.137760 1000000: 3.143508 10000000: 3.140836 100000000: 3.141666
For much faster results you can use the pseudorandom generator of Tango, or another one like R250-521.
E
This computes a single quadrant of the described square and circle; the effect should be the same since the other three are symmetric.
<lang e>def pi(n) {
var inside := 0 for _ ? (entropy.nextFloat() ** 2 + entropy.nextFloat() ** 2 < 1) in 1..n { inside += 1 } return inside * 4 / n
}</lang>
Some sample runs:
? pi(10) # value: 2.8 ? pi(10) # value: 2.0 ? pi(100) # value: 2.96 ? pi(10000) # value: 3.1216 ? pi(100000) # value: 3.13088
? pi(100000) # value: 3.13848
Factor
Since Factor lets the user choose the range of the random generator, we use 2^32.
<lang factor>USING: kernel math math.functions random sequences ;
- limit ( -- n ) 2 32 ^ ; inline
- in-circle ( x y -- ? ) limit [ sq ] tri@ [ + ] [ <= ] bi* ;
- rand ( -- r ) limit random ;
- pi ( n -- pi ) [ [ drop rand rand in-circle ] count ] keep / 4 * >float ;</lang>
Example use:
<lang factor>10000 pi . 3.1412</lang>
Forth
include random.fs 10000 value r : hit? ( -- ? ) r random dup * r random dup * + r dup * < ; : sims ( n -- hits ) 0 swap 0 do hit? if 1+ then loop ;
1000 sims 4 * . 3232 ok 10000 sims 4 * . 31448 ok 100000 sims 4 * . 313704 ok 1000000 sims 4 * . 3141224 ok 10000000 sims 4 * . 31409400 ok
Fortran
<lang fortran>MODULE Simulation
IMPLICIT NONE CONTAINS FUNCTION Pi(samples) REAL :: Pi REAL :: coords(2), length INTEGER :: i, in_circle, samples in_circle = 0 DO i=1, samples CALL RANDOM_NUMBER(coords) coords = coords * 2 - 1 length = SQRT(coords(1)*coords(1) + coords(2)*coords(2)) IF (length <= 1) in_circle = in_circle + 1 END DO Pi = 4.0 * REAL(in_circle) / REAL(samples) END FUNCTION Pi END MODULE Simulation PROGRAM MONTE_CARLO USE Simulation INTEGER :: n = 10000 DO WHILE (n <= 100000000) WRITE (*,*) n, Pi(n) n = n * 10 END DO END PROGRAM MONTE_CARLO</lang>
Output:
10000 3.12120 100000 3.13772 1000000 3.13934 10000000 3.14114 100000000 3.14147
Haskell
<lang haskell> import System.Random import Control.Monad
get_pi throws = do results <- replicateM throws one_trial
return (4 * fromIntegral (foldl' (+) 0 results) / fromIntegral throws) where one_trial = do rand_x <- randomRIO (-1, 1) rand_y <- randomRIO (-1, 1) let dist :: Double dist = sqrt (rand_x*rand_x + rand_y*rand_y) return (if dist < 1 then 1 else 0)
</lang> Example:
Prelude System.Random Control.Monad> get_pi 10000 3.1352 Prelude System.Random Control.Monad> get_pi 100000 3.15184 Prelude System.Random Control.Monad> get_pi 1000000 3.145024
J
Explicit Solution: <lang j>piMC=: monad define "0
4* y%~ +/ 1>: %:+/*: <:+: (2,y) ?@$ 0
)</lang>
Tacit Solution: <lang j>piMCt=: (0.25&* %~ +/@(1 >: [: +/&.:*: _1 2 p. 0 ?@$~ 2&,))"0</lang>
Examples: <lang j> piMC 1e6 3.1426
piMC 10^i.7
4 2.8 3.24 3.168 3.1432 3.14256 3.14014</lang>
Java
<lang java>public class MC { public static void main(String[] args) { System.out.println(getPi(10000)); System.out.println(getPi(100000)); System.out.println(getPi(1000000)); System.out.println(getPi(10000000)); System.out.println(getPi(100000000));
} public static double getPi(int numThrows){ int inCircle= 0; for(int i= 0;i < numThrows;i++){ //a square with a side of length 2 centered at 0 has //x and y range of -1 to 1 double randX= (Math.random() * 2) - 1;//range -1 to 1 double randY= (Math.random() * 2) - 1;//range -1 to 1 //distance from (0,0) = sqrt((x-0)^2+(y-0)^2) double dist= Math.sqrt(randX * randX + randY * randY); if(dist < 1){//circle with diameter of 2 has radius of 1 inCircle++; } } return 4.0 * inCircle / numThrows; } }</lang> Output:
3.1396 3.14256 3.141516 3.1418692 3.14168604
Logo
<lang logo> to square :n
output :n * :n
end to trial :r
output less? sum square random :r square random :r square :r
end to sim :n :r
make "hits 0 repeat :n [if trial :r [make "hits :hits + 1]] output 4 * :hits / :n
end
show sim 1000 10000 ; 3.18 show sim 10000 10000 ; 3.1612 show sim 100000 10000 ; 3.145 show sim 1000000 10000 ; 3.140828 </lang>
Mathematica
We define a function with variable sample size: <lang Mathematica>
MonteCarloPi[samplesize_Integer] := N[4Mean[If[# > 1, 0, 1] & /@ Norm /@ RandomReal[1, {samplesize, 2}]]]
</lang> Example (samplesize=10,100,1000,....10000000): <lang Mathematica>
{#, MonteCarloPi[#]} & /@ (10^Range[1, 7]) // Grid
</lang> gives back: <lang Mathematica> 10 3.2 100 3.16 1000 3.152 10000 3.1228 100000 3.14872 1000000 3.1408 10000000 3.14134 </lang>
MAXScript
fn monteCarlo iterations = ( radius = 1.0 pointsInCircle = 0 for i in 1 to iterations do ( testPoint = [(random -radius radius), (random -radius radius)] if length testPoint <= radius then ( pointsInCircle += 1 ) ) 4.0 * pointsInCircle / iterations )
OCaml
<lang ocaml>let get_pi throws =
let rec helper i count = if i = throws then count else let rand_x = Random.float 2.0 -. 1.0 and rand_y = Random.float 2.0 -. 1.0 in let dist = sqrt (rand_x *. rand_x +. rand_y *. rand_y) in if dist < 1.0 then helper (i+1) (count+1) else helper (i+1) count in float (4 * helper 0 0) /. float throws</lang>
Example:
# get_pi 10000;; - : float = 3.15 # get_pi 100000;; - : float = 3.13272 # get_pi 1000000;; - : float = 3.143808 # get_pi 10000000;; - : float = 3.1421704 # get_pi 100000000;; - : float = 3.14153872
Octave
<lang octave>function p = montepi(samples)
in_circle = 0; for samp = 1:samples v = [ unifrnd(-1,1), unifrnd(-1,1) ]; if ( v*v.' <= 1.0 ) in_circle++; endif endfor p = 4*in_circle/samples;
endfunction
l = 1e4; while (l < 1e7)
disp(montepi(l)); l *= 10;
endwhile</lang>
Since it runs slow, I've stopped it at the second iteration, obtaining:
3.1560 3.1496
Perl
<lang perl>sub pi {
my $nthrows = shift; my $inside = 0; foreach (1 .. $nthrows) { my $x = rand * 2 - 1, $y = rand * 2 - 1; if (sqrt($x*$x + $y*$y) < 1) { $inside++; } } return 4 * $inside / $nthrows;
}
printf "%9d: %07f\n", $_, pi($_) foreach 10**4, 10**6;</lang>
Perl 6
<lang perl6>sub approximate_pi (Int $sample_size) {
my Int $in = 0; (rand - 1/2)**2 + (rand - 1/2)**2 < 1/4 and ++$in for ^$sample_size; return 4 * $in / $sample_size;
}
say 'n = 100: ', approximate_pi 100; say 'n = 1,000: ', approximate_pi 1_000; say 'n = 10,000: ', approximate_pi 10_000;</lang>
PowerShell
<lang powershell>function Get-Pi ($Iterations = 10000) {
$InCircle = 0 for ($i = 0; $i -lt $Iterations; $i++) { $x = Get-Random 1.0 $y = Get-Random 1.0 if ([Math]::Sqrt($x * $x + $y * $y) -le 1) { $InCircle++ } } $Pi = [decimal] $InCircle / $Iterations * 4 $RealPi = [decimal] "3.141592653589793238462643383280" $Diff = [Math]::Abs(($Pi - $RealPi) / $RealPi * 100) New-Object PSObject ` | Add-Member -PassThru NoteProperty Iterations $Iterations ` | Add-Member -PassThru NoteProperty Pi $Pi ` | Add-Member -PassThru NoteProperty "% Difference" $Diff
}</lang> This returns a custom object with appropriate properties which automatically enables a nice tabular display:
PS Home:\> 10,100,1e3,1e4,1e5,1e6 | ForEach-Object { Get-Pi $_ } Iterations Pi % Difference ---------- -- ------------ 10 3,6 14,591559026164641753596309630 100 3,40 8,225361302488828322840959090 1000 3,208 2,1138114877600474293158225800 10000 3,1444 0,0893606116311387583356211100 100000 3,14712 0,1759409006731298209938938800 1000000 3,141364 0,0072782698142600895432451100
PureBasic
<lang PureBasic>OpenConsole()
Procedure.d MonteCarloPi(throws.d) inCircle.d = 0 For i = 1 To throws.d randX.d = (Random(2147483647)/2147483647)*2-1 randY.d = (Random(2147483647)/2147483647)*2-1 dist.d = Sqr(randX.d*randX.d + randY.d*randY.d) If dist.d < 1 inCircle = inCircle + 1 EndIf Next i pi.d = (4 * inCircle / throws.d) ProcedureReturn pi.d
EndProcedure
PrintN ("'built-in' #Pi = " + StrD(#PI,20)) PrintN ("MonteCarloPi(10000) = " + StrD(MonteCarloPi(10000),20)) PrintN ("MonteCarloPi(100000) = " + StrD(MonteCarloPi(100000),20)) PrintN ("MonteCarloPi(1000000) = " + StrD(MonteCarloPi(1000000),20)) PrintN ("MonteCarloPi(10000000) = " + StrD(MonteCarloPi(10000000),20))
PrintN("Press any key"): Repeat: Until Inkey() <> "" </lang>Output:
'built-in' #PI = 3.14159265358979310000 MonteCarloPi(10000) = 3.17119999999999980000 MonteCarloPi(100000) = 3.14395999999999990000 MonteCarloPi(1000000) = 3.14349599999999980000 MonteCarloPi(10000000) = 3.14127720000000020000 Press any key
Python
At the interactive prompt
Python 2.6rc2 (r26rc2:66507, Sep 18 2008, 14:27:33) [MSC v.1500 32 bit (Intel)] on win32 IDLE 2.6rc2
One use of the "sum" function is to count how many times something is true (because True = 1, False = 0): <lang python>>>> import random, math >>> throws = 1000 >>> 4.0 * sum(math.hypot(*[random.random()*2-1 for q in [0,1]]) < 1
for p in xrange(throws)) / float(throws)
3.1520000000000001 >>> throws = 1000000 >>> 4.0 * sum(math.hypot(*[random.random()*2-1 for q in [0,1]]) < 1
for p in xrange(throws)) / float(throws)
3.1396359999999999 >>> throws = 100000000 >>> 4.0 * sum(math.hypot(*[random.random()*2-1 for q in [0,1]]) < 1
for p in xrange(throws)) / float(throws)
3.1415666400000002</lang>
As a program using a function
<lang python> from random import random from math import hypot try:
import psyco psyco.full()
except:
pass
def pi(nthrows):
inside = 0 for i in xrange(nthrows): if hypot(random(), random()) < 1: inside += 1 return 4.0 * inside / nthrows
for n in [10**4, 10**6, 10**7, 10**8]:
print "%9d: %07f" % (n, pi(n))
</lang>
R
<lang R># nice but not suitable for big samples! monteCarloPi <- function(samples) {
x <- runif(samples, -1, 1) # for big samples, you need a lot of memory! y <- runif(samples, -1, 1) l <- sqrt(x*x + y*y) return(4*sum(l<=1)/samples)
}
- this second function changes the samples number to be
- multiple of group parameter (default 100).
monteCarlo2Pi <- function(samples, group=100) {
lim <- ceiling(samples/group) olim <- lim c <- 0 while(lim > 0) { x <- runif(group, -1, 1) y <- runif(group, -1, 1) l <- sqrt(x*x + y*y) c <- c + sum(l <= 1) lim <- lim - 1 } return(4*c/(olim*group))
}
print(monteCarloPi(1e4)) print(monteCarloPi(1e5)) print(monteCarlo2Pi(1e7))</lang>
Ruby
<lang ruby>def approx_pi(throws)
inside = throws.times.select {Math.hypot(rand, rand) <= 1.0} 4.0 * inside.length / throws
end
[1000, 10_000, 100_000, 1_000_000, 10_000_000].each do |n|
puts "%8d samples: PI = %s" % [n, approx_pi(n)]
end</lang> Output:
1000 samples: PI = 3.2 10000 samples: PI = 3.14 100000 samples: PI = 3.13244 1000000 samples: PI = 3.145124 10000000 samples: PI = 3.1414788
Tcl
<lang tcl>proc pi {samples} {
set i 0 set inside 0 while {[incr i] <= $samples} { if {sqrt(rand()**2 + rand()**2) <= 1.0} { incr inside } } return [expr {4.0 * $inside / $samples}]
}
puts "PI is approx [expr {atan(1)*4}]\n" foreach runs {1e2 1e4 1e6 1e8} {
puts "$runs => [pi $runs]"
}</lang> result
PI is approx 3.141592653589793 1e2 => 2.92 1e4 => 3.1344 1e6 => 3.141924 1e8 => 3.14167724