Numerical integration: Difference between revisions
SqrtNegInf (talk | contribs) Added Perl example |
m →{{header|REXX}}: elided an extra blank line. |
||
Line 4,170: | Line 4,170: | ||
$=f(a+h/2) |
$=f(a+h/2) |
||
@=0; do x=1 for n-1; $=$+f(a+h*x+h*.5); @=@+f(a+x*h); end /*x*/ |
@=0; do x=1 for n-1; $=$+f(a+h*x+h*.5); @=@+f(a+x*h); end /*x*/ |
||
return h*(f(a) + f(b) + 4*$ + 2*@) / 6 |
return h*(f(a) + f(b) + 4*$ + 2*@) / 6 |
||
/*──────────────────────────────────────────────────────────────────────────────────────*/ |
/*──────────────────────────────────────────────────────────────────────────────────────*/ |
Revision as of 19:48, 8 October 2018
You are encouraged to solve this task according to the task description, using any language you may know.
Write functions to calculate the definite integral of a function ƒ(x) using all five of the following methods:
- rectangular
- left
- right
- midpoint
- trapezium
- Simpson's
- composite
- rectangular
Your functions should take in the upper and lower bounds (a and b), and the number of approximations to make in that range (n).
Assume that your example already has a function that gives values for ƒ(x) .
Simpson's method is defined by the following pseudo-code:
procedure quad_simpson_composite(f, a, b, n) h := (b - a) / n sum1 := f(a + h/2) sum2 := 0 loop on i from 1 to (n - 1) sum1 := sum1 + f(a + h * i + h/2) sum2 := sum2 + f(a + h * i) answer := (h / 6) * (f(a) + f(b) + 4*sum1 + 2*sum2) |
Demonstrate your function by showing the results for:
- ƒ(x) = x3, where x is [0,1], with 100 approximations. The exact result is 1/4, or 0.25.
- ƒ(x) = 1/x, where x is [1,100], with 1,000 approximations. The exact result is the natural log of 100, or about 4.605170
- ƒ(x) = x, where x is [0,5000], with 5,000,000 approximations. The exact result is 12,500,000.
- ƒ(x) = x, where x is [0,6000], with 6,000,000 approximations. The exact result is 18,000,000.
See also
- Active object for integrating a function of real time.
- Special:PrefixIndex/Numerical integration for other integration methods.
ActionScript
Integration functions: <lang ActionScript>function leftRect(f:Function, a:Number, b:Number, n:uint):Number { var sum:Number = 0; var dx:Number = (b-a)/n; for (var x:Number = a; n > 0; n--, x += dx) sum += f(x); return sum * dx; }
function rightRect(f:Function, a:Number, b:Number, n:uint):Number { var sum:Number = 0; var dx:Number = (b-a)/n; for (var x:Number = a + dx; n > 0; n--, x += dx) sum += f(x); return sum * dx; }
function midRect(f:Function, a:Number, b:Number, n:uint):Number { var sum:Number = 0; var dx:Number = (b-a)/n; for (var x:Number = a + (dx / 2); n > 0; n--, x += dx) sum += f(x); return sum * dx; } function trapezium(f:Function, a:Number, b:Number, n:uint):Number { var dx:Number = (b-a)/n; var x:Number = a; var sum:Number = f(a); for(var i:uint = 1; i < n; i++) { a += dx; sum += f(a)*2; } sum += f(b); return 0.5 * dx * sum; } function simpson(f:Function, a:Number, b:Number, n:uint):Number { var dx:Number = (b-a)/n; var sum1:Number = f(a + dx/2); var sum2:Number = 0; for(var i:uint = 1; i < n; i++) { sum1 += f(a + dx*i + dx/2); sum2 += f(a + dx*i); } return (dx/6) * (f(a) + f(b) + 4*sum1 + 2*sum2); }</lang> Usage: <lang ActionScript>function f1(n:Number):Number { return (2/(1+ 4*(n*n))); } trace(leftRect(f1, -1, 2, 4)); trace(rightRect(f1, -1, 2, 4)); trace(midRect(f1, -1, 2, 4)); trace(trapezium(f1, -1, 2 ,4 )); trace(simpson(f1, -1, 2 ,4 )); </lang>
Ada
Specification of a generic package implementing the five specified kinds of numerical integration: <lang ada>generic
type Scalar is digits <>; with function F (X : Scalar) return Scalar;
package Integrate is
function Left_Rectangular (A, B : Scalar; N : Positive) return Scalar; function Right_Rectangular (A, B : Scalar; N : Positive) return Scalar; function Midpoint_Rectangular (A, B : Scalar; N : Positive) return Scalar; function Trapezium (A, B : Scalar; N : Positive) return Scalar; function Simpsons (A, B : Scalar; N : Positive) return Scalar;
end Integrate;</lang> An alternative solution is to pass a function reference to the integration function. This solution is probably slightly faster, and works even with Ada83. One could also make each integration function generic, instead of making the whole package generic.
Body of the package implementing numerical integration: <lang ada>package body Integrate is
function Left_Rectangular (A, B : Scalar; N : Positive) return Scalar is H : constant Scalar := (B - A) / Scalar (N); Sum : Scalar := 0.0; X : Scalar; begin for I in 0 .. N - 1 loop X := A + Scalar (I) * H; Sum := Sum + H * F (X); end loop; return Sum; end Left_Rectangular;
function Right_Rectangular (A, B : Scalar; N : Positive) return Scalar is H : constant Scalar := (B - A) / Scalar (N); Sum : Scalar := 0.0; X : Scalar; begin for I in 1 .. N loop X := A + Scalar (I) * H; Sum := Sum + H * F (X); end loop; return Sum; end Right_Rectangular;
function Midpoint_Rectangular (A, B : Scalar; N : Positive) return Scalar is H : constant Scalar := (B - A) / Scalar (N); Sum : Scalar := 0.0; X : Scalar; begin for I in 1 .. N loop X := A + Scalar (I) * H - 0.5 * H; Sum := Sum + H * F (X); end loop; return Sum; end Midpoint_Rectangular;
function Trapezium (A, B : Scalar; N : Positive) return Scalar is H : constant Scalar := (B - A) / Scalar (N); Sum : Scalar := F(A) + F(B); X : Scalar := 1.0; begin while X <= Scalar (N) - 1.0 loop Sum := Sum + 2.0 * F (A + X * (B - A) / Scalar (N)); X := X + 1.0; end loop; return (B - A) / (2.0 * Scalar (N)) * Sum; end Trapezium;
function Simpsons (A, B : Scalar; N : Positive) return Scalar is H : constant Scalar := (B - A) / Scalar (N); Sum_1 : Scalar := 0.0; Sum_2 : Scalar := 0.0; begin for I in 0 .. N - 1 loop Sum_1 := Sum_1 + F (A + H * Scalar (I) + 0.5 * H); Sum_2 := Sum_2 + F (A + H * Scalar (I)); end loop; return H / 6.0 * (F (A) + F (B) + 4.0 * Sum_1 + 2.0 * Sum_2); end Simpsons;
end Integrate;</lang>
Test driver: <lang ada>with Ada.Text_IO, Ada.Integer_Text_IO; with Integrate;
procedure Numerical_Integration is
type Scalar is digits 18; package Scalar_Text_IO is new Ada.Text_IO.Float_IO (Scalar);
generic with function F (X : Scalar) return Scalar; Name : String; From, To : Scalar; Steps : Positive; procedure Test;
procedure Test is package Integrate_Scalar_F is new Integrate (Scalar, F); use Ada.Text_IO, Ada.Integer_Text_IO, Integrate_Scalar_F, Scalar_Text_IO; begin Put (Name & " integrated from "); Put (From); Put (" to "); Put (To); Put (" in "); Put (Steps); Put_Line (" steps:");
Put ("Rectangular (left): "); Put (Left_Rectangular (From, To, Steps)); New_Line;
Put ("Rectangular (right): "); Put (Right_Rectangular (From, To, Steps)); New_Line;
Put ("Rectangular (midpoint): "); Put (Midpoint_Rectangular (From, To, Steps)); New_Line;
Put ("Trapezium: "); Put (Trapezium (From, To, Steps)); New_Line;
Put ("Simpson's: "); Put (Simpsons (From, To, Steps)); New_Line;
New_Line; end Test;
begin
Ada.Integer_Text_IO.Default_Width := 0; Scalar_Text_IO.Default_Fore := 0; Scalar_Text_IO.Default_Exp := 0;
Cubed:
declare function F (X : Scalar) return Scalar is begin return X ** 3; end F; procedure Run is new Test (F => F, Name => "x^3", From => 0.0, To => 1.0, Steps => 100); begin Run; end Cubed;
One_Over_X:
declare function F (X : Scalar) return Scalar is begin return 1.0 / X; end F; procedure Run is new Test (F => F, Name => "1/x", From => 1.0, To => 100.0, Steps => 1_000); begin Run; end One_Over_X;
X:
declare function F (X : Scalar) return Scalar is begin return X; end F; procedure Run_1 is new Test (F => F, Name => "x", From => 0.0, To => 5_000.0, Steps => 5_000_000); procedure Run_2 is new Test (F => F, Name => "x", From => 0.0, To => 6_000.0, Steps => 6_000_000); begin Run_1; Run_2; end X;
end Numerical_Integration; </lang>
ALGOL 68
<lang algol68>MODE F = PROC(LONG REAL)LONG REAL;
- left rect ##
PROC left rect = (F f, LONG REAL a, b, INT n) LONG REAL: BEGIN
LONG REAL h= (b - a) / n; LONG REAL sum:= 0; LONG REAL x:= a; WHILE x <= b - h DO sum := sum + (h * f(x)); x +:= h OD; sum
END # left rect #;
- right rect ##
PROC right rect = (F f, LONG REAL a, b, INT n) LONG REAL: BEGIN
LONG REAL h= (b - a) / n; LONG REAL sum:= 0; LONG REAL x:= a + h; WHILE x <= b DO sum := sum + (h * f(x)); x +:= h OD; sum
END # right rect #;
- mid rect ##
PROC mid rect = (F f, LONG REAL a, b, INT n) LONG REAL: BEGIN
LONG REAL h= (b - a) / n; LONG REAL sum:= 0; LONG REAL x:= a; WHILE x <= b - h DO sum := sum + h * f(x + h / 2); x +:= h OD; sum
END # mid rect #;
- trapezium ##
PROC trapezium = (F f, LONG REAL a, b, INT n) LONG REAL: BEGIN
LONG REAL h= (b - a) / n; LONG REAL sum:= f(a) + f(b); LONG REAL x:= 1; WHILE x <= n - 1 DO sum := sum + 2 * f(a + x * h ); x +:= 1 OD; (b - a) / (2 * n) * sum
END # trapezium #;
- simpson ##
PROC simpson = (F f, LONG REAL a, b, INT n) LONG REAL: BEGIN
LONG REAL h= (b - a) / n; LONG REAL sum1:= 0; LONG REAL sum2:= 0; INT limit:= n - 1; FOR i FROM 0 TO limit DO sum1 := sum1 + f(a + h * LONG REAL(i) + h / 2) OD; FOR i FROM 1 TO limit DO sum2 +:= f(a + h * LONG REAL(i)) OD; h / 6 * (f(a) + f(b) + 4 * sum1 + 2 * sum2)
END # simpson #;
- test the above procedures #
PROC test integrators = ( STRING legend
, F function , LONG REAL lower limit , LONG REAL upper limit , INT iterations ) VOID:
BEGIN
print( ( legend , fixed( left rect( function, lower limit, upper limit, iterations ), -20, 6 ) , fixed( right rect( function, lower limit, upper limit, iterations ), -20, 6 ) , fixed( mid rect( function, lower limit, upper limit, iterations ), -20, 6 ) , fixed( trapezium( function, lower limit, upper limit, iterations ), -20, 6 ) , fixed( simpson( function, lower limit, upper limit, iterations ), -20, 6 ) , newline ) )
END; # test integrators # print( ( " "
, " left rect" , " right rect" , " mid rect" , " trapezium" , " simpson" , newline ) );
test integrators( "x^3", ( LONG REAL x )LONG REAL: x * x * x, 0, 1, 100 ); test integrators( "1/x", ( LONG REAL x )LONG REAL: 1 / x, 1, 100, 1 000 ); test integrators( "x ", ( LONG REAL x )LONG REAL: x, 0, 5 000, 5 000 000 ); test integrators( "x ", ( LONG REAL x )LONG REAL: x, 0, 6 000, 6 000 000 );
SKIP</lang>
- Output:
left rect right rect mid rect trapezium simpson x^3 0.245025 0.255025 0.249988 0.250025 0.250000 1/x 4.654991 4.556981 4.604763 4.605986 4.605170 x 12499997.500000 12500002.500000 12500000.000000 12500000.000000 12500000.000000 x 17999997.000000 18000003.000000 18000000.000000 18000000.000000 18000000.000000
AutoHotkey
ahk discussion <lang autohotkey>MsgBox % Rect("fun", 0, 1, 10,-1) ; 0.45 left MsgBox % Rect("fun", 0, 1, 10) ; 0.50 mid MsgBox % Rect("fun", 0, 1, 10, 1) ; 0.55 right MsgBox % Trapez("fun", 0, 1, 10) ; 0.50 MsgBox % Simpson("fun", 0, 1, 10) ; 0.50
Rect(f,a,b,n,side=0) { ; side: -1=left, 0=midpoint, 1=right
h := (b - a) / n sum := 0, a += (side-1)*h/2 Loop %n% sum += %f%(a + h*A_Index) Return h*sum
}
Trapez(f,a,b,n) {
h := (b - a) / n sum := 0 Loop % n-1 sum += %f%(a + h*A_Index) Return h/2 * (%f%(a) + %f%(b) + 2*sum)
}
Simpson(f,a,b,n) {
h := (b - a) / n sum1 := sum2 := 0, ah := a - h/2 Loop %n% sum1 += %f%(ah + h*A_Index) Loop % n-1 sum2 += %f%(a + h*A_Index) Return h/6 * (%f%(a) + %f%(b) + 4*sum1 + 2*sum2)
}
fun(x) { ; linear test function
Return x
}</lang>
BASIC
<lang qbasic>FUNCTION leftRect(a, b, n)
h = (b - a) / n sum = 0 FOR x = a TO b - h STEP h sum = sum + h * (f(x)) NEXT x leftRect = sum
END FUNCTION
FUNCTION rightRect(a, b, n)
h = (b - a) / n sum = 0 FOR x = a + h TO b STEP h sum = sum + h * (f(x)) NEXT x rightRect = sum
END FUNCTION
FUNCTION midRect(a, b, n)
h = (b - a) / n sum = 0 FOR x = a + h / 2 TO b - h / 2 STEP h sum = sum + h * (f(x)) NEXT x midRect = sum
END FUNCTION
FUNCTION trap(a, b, n)
h = (b - a) / n sum = f(a) + f(b) FOR i = 1 TO n-1 sum = sum + 2 * f((a + i * h)) NEXT i trap = h / 2 * sum
END FUNCTION
FUNCTION simpson(a, b, n)
h = (b - a) / n sum1 = 0 sum2 = 0
FOR i = 0 TO n-1 sum1 = sum1 + f(a + h * i + h / 2) NEXT i
FOR i = 1 TO n - 1 sum2 = sum2 + f(a + h * i) NEXT i
simpson = h / 6 * (f(a) + f(b) + 4 * sum1 + 2 * sum2)
END FUNCTION</lang>
BBC BASIC
<lang bbcbasic> *FLOAT64
@% = 12 : REM Column width PRINT "Function Range L-Rect R-Rect M-Rect Trapeze Simpson" FOR func% = 1 TO 4 READ x$, l, h, s% PRINT x$, ; l " - " ; h, FNlrect(x$, l, h, s%) FNrrect(x$, l, h, s%) ; PRINT FNmrect(x$, l, h, s%) FNtrapeze(x$, l, h, s%) FNsimpson(x$, l, h, s%) NEXT END DATA "x^3", 0, 1, 100 DATA "1/x", 1, 100, 1000 DATA "x", 0, 5000, 5000000 DATA "x", 0, 6000, 6000000 DEF FNlrect(x$, a, b, n%) LOCAL i%, d, s, x d = (b - a) / n% x = a FOR i% = 1 TO n% s += d * EVAL(x$) x += d NEXT = s DEF FNrrect(x$, a, b, n%) LOCAL i%, d, s, x d = (b - a) / n% x = a FOR i% = 1 TO n% x += d s += d * EVAL(x$) NEXT = s DEF FNmrect(x$, a, b, n%) LOCAL i%, d, s, x d = (b - a) / n% x = a FOR i% = 1 TO n% x += d/2 s += d * EVAL(x$) x += d/2 NEXT = s DEF FNtrapeze(x$, a, b, n%) LOCAL i%, d, f, s, x d = (b - a) / n% x = b : f = EVAL(x$) x = a : s = d * (f + EVAL(x$)) / 2 FOR i% = 1 TO n%-1 x += d s += d * EVAL(x$) NEXT = s DEF FNsimpson(x$, a, b, n%) LOCAL i%, d, f, s1, s2, x d = (b - a) / n% x = b : f = EVAL(x$) x = a + d/2 : s1 = EVAL(x$) FOR i% = 1 TO n%-1 x += d/2 s2 += EVAL(x$) x += d/2 s1 += EVAL(x$) NEXT x = a = (d / 6) * (f + EVAL(x$) + 4 * s1 + 2 * s2)</lang>
Output:
Function Range L-Rect R-Rect M-Rect Trapeze Simpson x^3 0 - 1 0.245025 0.255025 0.2499875 0.250025 0.25 1/x 1 - 100 4.65499106 4.55698106 4.60476255 4.60598606 4.60517038 x 0 - 5000 12499997.5 12500002.5 12500000 12500000 12500000 x 0 - 6000 17999997 18000003 18000000 18000000 18000000
C
<lang c>#include <stdio.h>
- include <stdlib.h>
- include <math.h>
double int_leftrect(double from, double to, double n, double (*func)()) {
double h = (to-from)/n; double sum = 0.0, x; for(x=from; x <= (to-h); x += h) sum += func(x); return h*sum;
}
double int_rightrect(double from, double to, double n, double (*func)()) {
double h = (to-from)/n; double sum = 0.0, x; for(x=from; x <= (to-h); x += h) sum += func(x+h); return h*sum;
}
double int_midrect(double from, double to, double n, double (*func)()) {
double h = (to-from)/n; double sum = 0.0, x; for(x=from; x <= (to-h); x += h) sum += func(x+h/2.0); return h*sum;
}
double int_trapezium(double from, double to, double n, double (*func)()) {
double h = (to - from) / n; double sum = func(from) + func(to); int i; for(i = 1;i < n;i++) sum += 2.0*func(from + i * h); return h * sum / 2.0;
}
double int_simpson(double from, double to, double n, double (*func)()) {
double h = (to - from) / n; double sum1 = 0.0; double sum2 = 0.0; int i;
double x; for(i = 0;i < n;i++) sum1 += func(from + h * i + h / 2.0);
for(i = 1;i < n;i++) sum2 += func(from + h * i);
return h / 6.0 * (func(from) + func(to) + 4.0 * sum1 + 2.0 * sum2);
}</lang>
<lang c>/* test */ double f3(double x) {
return x;
}
double f3a(double x) {
return x*x/2.0;
}
double f2(double x) {
return 1.0/x;
}
double f2a(double x) {
return log(x);
}
double f1(double x) {
return x*x*x;
}
double f1a(double x) {
return x*x*x*x/4.0;
}
typedef double (*pfunc)(double, double, double, double (*)()); typedef double (*rfunc)(double);
- define INTG(F,A,B) (F((B))-F((A)))
int main() {
int i, j; double ic; pfunc f[5] = { int_leftrect, int_rightrect, int_midrect, int_trapezium, int_simpson }; const char *names[5] = { "leftrect", "rightrect", "midrect", "trapezium", "simpson" }; rfunc rf[] = { f1, f2, f3, f3 }; rfunc If[] = { f1a, f2a, f3a, f3a }; double ivals[] = { 0.0, 1.0, 1.0, 100.0, 0.0, 5000.0, 0.0, 6000.0 }; double approx[] = { 100.0, 1000.0, 5000000.0, 6000000.0 }; for(j=0; j < (sizeof(rf) / sizeof(rfunc)); j++) { for(i=0; i < 5 ; i++) { ic = (*f[i])(ivals[2*j], ivals[2*j+1], approx[j], rf[j]); printf("%10s [ 0,1] num: %+lf, an: %lf\n", names[i], ic, INTG((*If[j]), ivals[2*j], ivals[2*j+1])); } printf("\n"); }
}</lang>
C#
<lang csharp>using System; using System.Collections.Generic; using System.Linq;
public class Interval {
public Interval(double leftEndpoint, double size) { LeftEndpoint = leftEndpoint; RightEndpoint = leftEndpoint + size; }
public double LeftEndpoint { get; set; }
public double RightEndpoint { get; set; }
public double Size { get { return RightEndpoint - LeftEndpoint; } }
public double Center { get { return (LeftEndpoint + RightEndpoint) / 2; } }
public IEnumerable<Interval> Subdivide(int subintervalCount) { double subintervalSize = Size / subintervalCount; return Enumerable.Range(0, subintervalCount).Select(index => new Interval(LeftEndpoint + index * subintervalSize, subintervalSize)); }
}
public class DefiniteIntegral {
public DefiniteIntegral(Func<double, double> integrand, Interval domain) { Integrand = integrand; Domain = domain; }
public Func<double, double> Integrand { get; set; }
public Interval Domain { get; set; }
public double SampleIntegrand(ApproximationMethod approximationMethod, Interval subdomain) { switch (approximationMethod) { case ApproximationMethod.RectangleLeft: return Integrand(subdomain.LeftEndpoint); case ApproximationMethod.RectangleMidpoint: return Integrand(subdomain.Center); case ApproximationMethod.RectangleRight: return Integrand(subdomain.RightEndpoint); case ApproximationMethod.Trapezium: return (Integrand(subdomain.LeftEndpoint) + Integrand(subdomain.RightEndpoint)) / 2; case ApproximationMethod.Simpson: return (Integrand(subdomain.LeftEndpoint) + 4 * Integrand(subdomain.Center) + Integrand(subdomain.RightEndpoint)) / 6; default: throw new NotImplementedException(); } }
public double Approximate(ApproximationMethod approximationMethod, int subdomainCount) { return Domain.Size * Domain.Subdivide(subdomainCount).Sum(subdomain => SampleIntegrand(approximationMethod, subdomain)) / subdomainCount; }
public enum ApproximationMethod { RectangleLeft, RectangleMidpoint, RectangleRight, Trapezium, Simpson }
}
public class Program {
private static void TestApproximationMethods(DefiniteIntegral integral, int subdomainCount) { foreach (DefiniteIntegral.ApproximationMethod approximationMethod in Enum.GetValues(typeof(DefiniteIntegral.ApproximationMethod))) { Console.WriteLine(integral.Approximate(approximationMethod, subdomainCount)); } }
public static void Main() { TestApproximationMethods(new DefiniteIntegral(x => x * x * x, new Interval(0, 1)), 10000); TestApproximationMethods(new DefiniteIntegral(x => 1 / x, new Interval(1, 99)), 1000); TestApproximationMethods(new DefiniteIntegral(x => x, new Interval(0, 5000)), 500000); TestApproximationMethods(new DefiniteIntegral(x => x, new Interval(0, 6000)), 6000000); }
}</lang> Output: <lang>0.2499500025 0.24999999875 0.2500500025 0.250000002499999 0.25 4.65499105751468 4.60476254867838 4.55698105751468 4.60598605751468 4.60517038495713 12499975 12500000 12500025 12500000 12500000 17999997 18000000 18000003 18000000 18000000</lang>
C++
Due to their similarity, it makes sense to make the integration method a policy. <lang cpp>// the integration routine template<typename Method, typename F, typename Float>
double integrate(F f, Float a, Float b, int steps, Method m)
{
double s = 0; double h = (b-a)/steps; for (int i = 0; i < steps; ++i) s += m(f, a + h*i, h); return h*s;
}
// methods class rectangular { public:
enum position_type { left, middle, right }; rectangular(position_type pos): position(pos) {} template<typename F, typename Float> double operator()(F f, Float x, Float h) const { switch(position) { case left: return f(x); case middle: return f(x+h/2); case right: return f(x+h); } }
private:
const position_type position;
};
class trapezium { public:
template<typename F, typename Float> double operator()(F f, Float x, Float h) const { return (f(x) + f(x+h))/2; }
};
class simpson { public:
template<typename F, typename Float> double operator()(F f, Float x, Float h) const { return (f(x) + 4*f(x+h/2) + f(x+h))/6; }
};
// sample usage double f(double x) { return x*x; }
// inside a function somewhere: double rl = integrate(f, 0.0, 1.0, 10, rectangular(rectangular::left)); double rm = integrate(f, 0.0, 1.0, 10, rectangular(rectangular::middle)); double rr = integrate(f, 0.0, 1.0, 10, rectangular(rectangular::right)); double t = integrate(f, 0.0, 1.0, 10, trapezium()); double s = integrate(f, 0.0, 1.0, 10, simpson());</lang>
Chapel
<lang chapel> proc f1(x:real):real {
return x**3;
}
proc f2(x:real):real {
return 1/x;
}
proc f3(x:real):real {
return x;
}
proc leftRectangleIntegration(a: real, b: real, N: int, f): real{
var h: real = (b - a)/N; var sum: real = 0.0; var x_n: real; for n in 0..N-1 { x_n = a + n * h; sum = sum + f(x_n); } return h * sum;
}
proc rightRectangleIntegration(a: real, b: real, N: int, f): real{
var h: real = (b - a)/N; var sum: real = 0.0; var x_n: real; for n in 0..N-1 { x_n = a + (n + 1) * h; sum = sum + f(x_n); } return h * sum;
}
proc midpointRectangleIntegration(a: real, b: real, N: int, f): real{
var h: real = (b - a)/N; var sum: real = 0.0; var x_n: real; for n in 0..N-1 { x_n = a + (n + 0.5) * h; sum = sum + f(x_n); } return h * sum;
}
proc trapezoidIntegration(a: real(64), b: real(64), N: int(64), f): real{
var h: real(64) = (b - a)/N; var sum: real(64) = f(a) + f(b); var x_n: real(64); for n in 1..N-1 { x_n = a + n * h; sum = sum + 2.0 * f(x_n); } return (h/2.0) * sum;
}
proc simpsonsIntegration(a: real(64), b: real(64), N: int(64), f): real{
var h: real(64) = (b - a)/N; var sum: real(64) = f(a) + f(b); var x_n: real(64); for n in 1..N-1 by 2 { x_n = a + n * h; sum = sum + 4.0 * f(x_n); } for n in 2..N-2 by 2 { x_n = a + n * h; sum = sum + 2.0 * f(x_n); } return (h/3.0) * sum;
}
var exact:real; var calculated:real;
writeln("f(x) = x**3 with 100 steps from 0 to 1"); exact = 0.25; calculated = leftRectangleIntegration(a = 0.0, b = 1.0, N = 100, f = f1); writeln("leftRectangleIntegration: calculated = ", calculated, "; exact = ", exact, "; difference = ", abs(calculated - exact)); calculated = rightRectangleIntegration(a = 0.0, b = 1.0, N = 100, f = f1); writeln("rightRectangleIntegration: calculated = ", calculated, "; exact = ", exact, "; difference = ", abs(calculated - exact)); calculated = midpointRectangleIntegration(a = 0.0, b = 1.0, N = 100, f = f1); writeln("midpointRectangleIntegration: calculated = ", calculated, "; exact = ", exact, "; difference = ", abs(calculated - exact)); calculated = trapezoidIntegration(a = 0.0, b = 1.0, N = 100, f = f1); writeln("trapezoidIntegration: calculated = ", calculated, "; exact = ", exact, "; difference = ", abs(calculated - exact)); calculated = simpsonsIntegration(a = 0.0, b = 1.0, N = 100, f = f1); writeln("simpsonsIntegration: calculated = ", calculated, "; exact = ", exact, "; difference = ", abs(calculated - exact)); writeln();
writeln("f(x) = 1/x with 1000 steps from 1 to 100"); exact = 4.605170; calculated = leftRectangleIntegration(a = 1.0, b = 100.0, N = 1000, f = f2); writeln("leftRectangleIntegration: calculated = ", calculated, "; exact = ", exact, "; difference = ", abs(calculated - exact)); calculated = rightRectangleIntegration(a = 1.0, b = 100.0, N = 1000, f = f2); writeln("rightRectangleIntegration: calculated = ", calculated, "; exact = ", exact, "; difference = ", abs(calculated - exact)); calculated = midpointRectangleIntegration(a = 1.0, b = 100.0, N = 1000, f = f2); writeln("midpointRectangleIntegration: calculated = ", calculated, "; exact = ", exact, "; difference = ", abs(calculated - exact)); calculated = trapezoidIntegration(a = 1.0, b = 100.0, N = 1000, f = f2); writeln("trapezoidIntegration: calculated = ", calculated, "; exact = ", exact, "; difference = ", abs(calculated - exact)); calculated = simpsonsIntegration(a = 1.0, b = 100.0, N = 1000, f = f2); writeln("simpsonsIntegration: calculated = ", calculated, "; exact = ", exact, "; difference = ", abs(calculated - exact)); writeln();
writeln("f(x) = x with 5000000 steps from 0 to 5000"); exact = 12500000; calculated = leftRectangleIntegration(a = 0.0, b = 5000.0, N = 5000000, f = f3); writeln("leftRectangleIntegration: calculated = ", calculated, "; exact = ", exact, "; difference = ", abs(calculated - exact)); calculated = rightRectangleIntegration(a = 0.0, b = 5000.0, N = 5000000, f = f3); writeln("rightRectangleIntegration: calculated = ", calculated, "; exact = ", exact, "; difference = ", abs(calculated - exact)); calculated = midpointRectangleIntegration(a = 0.0, b = 5000.0, N = 5000000, f = f3); writeln("midpointRectangleIntegration: calculated = ", calculated, "; exact = ", exact, "; difference = ", abs(calculated - exact)); calculated = trapezoidIntegration(a = 0.0, b = 5000.0, N = 5000000, f = f3); writeln("trapezoidIntegration: calculated = ", calculated, "; exact = ", exact, "; difference = ", abs(calculated - exact)); calculated = simpsonsIntegration(a = 0.0, b = 5000.0, N = 5000000, f = f3); writeln("simpsonsIntegration: calculated = ", calculated, "; exact = ", exact, "; difference = ", abs(calculated - exact)); writeln();
writeln("f(x) = x with 6000000 steps from 0 to 6000"); exact = 18000000; calculated = leftRectangleIntegration(a = 0.0, b = 6000.0, N = 6000000, f = f3); writeln("leftRectangleIntegration: calculated = ", calculated, "; exact = ", exact, "; difference = ", abs(calculated - exact)); calculated = rightRectangleIntegration(a = 0.0, b = 6000.0, N = 6000000, f = f3); writeln("rightRectangleIntegration: calculated = ", calculated, "; exact = ", exact, "; difference = ", abs(calculated - exact)); calculated = midpointRectangleIntegration(a = 0.0, b = 6000.0, N = 6000000, f = f3); writeln("midpointRectangleIntegration: calculated = ", calculated, "; exact = ", exact, "; difference = ", abs(calculated - exact)); calculated = trapezoidIntegration(a = 0.0, b = 6000.0, N = 6000000, f = f3); writeln("trapezoidIntegration: calculated = ", calculated, "; exact = ", exact, "; difference = ", abs(calculated - exact)); calculated = simpsonsIntegration(a = 0.0, b = 6000.0, N = 6000000, f = f3); writeln("simpsonsIntegration: calculated = ", calculated, "; exact = ", exact, "; difference = ", abs(calculated - exact)); writeln(); </lang> output <lang> f(x) = x**3 with 100 steps from 0 to 1 leftRectangleIntegration: calculated = 0.245025; exact = 0.25; difference = 0.004975 rightRectangleIntegration: calculated = 0.255025; exact = 0.25; difference = 0.005025 midpointRectangleIntegration: calculated = 0.249988; exact = 0.25; difference = 1.25e-05 trapezoidIntegration: calculated = 0.250025; exact = 0.25; difference = 2.5e-05 simpsonsIntegration: calculated = 0.25; exact = 0.25; difference = 5.55112e-17
f(x) = 1/x with 1000 steps from 1 to 100 leftRectangleIntegration: calculated = 4.65499; exact = 4.60517; difference = 0.0498211 rightRectangleIntegration: calculated = 4.55698; exact = 4.60517; difference = 0.0481889 midpointRectangleIntegration: calculated = 4.60476; exact = 4.60517; difference = 0.000407451 trapezoidIntegration: calculated = 4.60599; exact = 4.60517; difference = 0.000816058 simpsonsIntegration: calculated = 4.60517; exact = 4.60517; difference = 3.31627e-06
f(x) = x with 5000000 steps from 0 to 5000 leftRectangleIntegration: calculated = 1.25e+07; exact = 1.25e+07; difference = 2.5 rightRectangleIntegration: calculated = 1.25e+07; exact = 1.25e+07; difference = 2.5 midpointRectangleIntegration: calculated = 1.25e+07; exact = 1.25e+07; difference = 0.0 trapezoidIntegration: calculated = 1.25e+07; exact = 1.25e+07; difference = 1.86265e-09 simpsonsIntegration: calculated = 1.25e+07; exact = 1.25e+07; difference = 3.72529e-09
f(x) = x with 6000000 steps from 0 to 6000 leftRectangleIntegration: calculated = 1.8e+07; exact = 1.8e+07; difference = 3.0 rightRectangleIntegration: calculated = 1.8e+07; exact = 1.8e+07; difference = 3.0 midpointRectangleIntegration: calculated = 1.8e+07; exact = 1.8e+07; difference = 7.45058e-09 trapezoidIntegration: calculated = 1.8e+07; exact = 1.8e+07; difference = 3.72529e-09 simpsonsIntegration: calculated = 1.8e+07; exact = 1.8e+07; difference = 0.0 </lang>
CoffeeScript
<lang coffeescript> rules =
left_rect: (f, x, h) -> f(x) mid_rect: (f, x, h) -> f(x+h/2) right_rect: (f, x, h) -> f(x+h) trapezium: (f, x, h) -> (f(x) + f(x+h)) / 2 simpson: (f, x, h) -> (f(x) + 4 * f(x + h/2) + f(x+h)) / 6
functions =
cube: (x) -> x*x*x reciprocal: (x) -> 1/x identity: (x) -> x
sum = (list) -> list.reduce ((a, b) -> a+b), 0
integrate = (f, a, b, steps, meth) ->
h = (b-a) / steps h * sum(meth(f, a+i*h, h) for i in [0...steps])
- Tests
tests = [
[0, 1, 100, 'cube'] [1, 100, 1000, 'reciprocal'] [0, 5000, 5000000, 'identity'] [0, 6000, 6000000, 'identity']
]
for test in tests
[a, b, steps, func_name] = test func = functions[func_name] console.log "-- tests for #{func_name} with #{steps} steps from #{a} to #{b}" for rule_name, rule of rules result = integrate func, a, b, steps, rule console.log rule_name, result
</lang> output <lang> > coffee numerical_integration.coffee -- tests for cube with 100 steps from 0 to 1 left_rect 0.24502500000000005 mid_rect 0.24998750000000006 right_rect 0.25502500000000006 trapezium 0.250025 simpson 0.25 -- tests for reciprocal with 1000 steps from 1 to 100 left_rect 4.65499105751468 mid_rect 4.604762548678376 right_rect 4.55698105751468 trapezium 4.605986057514676 simpson 4.605170384957133 -- tests for identity with 5000000 steps from 0 to 5000 left_rect 12499997.5 mid_rect 12500000 right_rect 12500002.5 trapezium 12500000 simpson 12500000 -- tests for identity with 6000000 steps from 0 to 6000 left_rect 17999997.000000004 mid_rect 17999999.999999993 right_rect 18000003.000000004 trapezium 17999999.999999993 simpson 17999999.999999993 </lang>
Common Lisp
<lang lisp>(defun left-rectangle (f a b n &aux (d (/ (- b a) n)))
(* d (loop for x from a below b by d summing (funcall f x))))
(defun right-rectangle (f a b n &aux (d (/ (- b a) n)))
(* d (loop for x from b above a by d summing (funcall f x))))
(defun midpoint-rectangle (f a b n &aux (d (/ (- b a) n)))
(* d (loop for x from (+ a (/ d 2)) below b by d summing (funcall f x))))
(defun trapezium (f a b n &aux (d (/ (- b a) n)))
(* (/ d 2) (+ (funcall f a) (* 2 (loop for x from (+ a d) below b by d summing (funcall f x))) (funcall f b))))
(defun simpson (f a b n)
(loop with h = (/ (- b a) n) with sum1 = (funcall f (+ a (/ h 2))) with sum2 = 0 for i from 1 below n do (incf sum1 (funcall f (+ a (* h i) (/ h 2)))) do (incf sum2 (funcall f (+ a (* h i)))) finally (return (* (/ h 6) (+ (funcall f a) (funcall f b) (* 4 sum1) (* 2 sum2))))))</lang>
D
<lang d>import std.stdio, std.typecons, std.typetuple;
template integrate(alias method) {
double integrate(F, Float)(in F f, in Float a, in Float b, in int steps) { double s = 0.0; immutable double h = (b - a) / steps; foreach (i; 0 .. steps) s += method(f, a + h * i, h); return h * s; }
}
double rectangularLeft(F, Float)(in F f, in Float x, in Float h) pure nothrow {
return f(x);
}
double rectangularMiddle(F, Float)(in F f, in Float x, in Float h) pure nothrow {
return f(x + h / 2);
}
double rectangularRight(F, Float)(in F f, in Float x, in Float h) pure nothrow {
return f(x + h);
}
double trapezium(F, Float)(in F f, in Float x, in Float h) pure nothrow {
return (f(x) + f(x + h)) / 2;
}
double simpson(F, Float)(in F f, in Float x, in Float h) pure nothrow {
return (f(x) + 4 * f(x + h / 2) + f(x + h)) / 6;
}
void main() {
immutable args = [ tuple((double x) => x ^^ 3, 0.0, 1.0, 10), tuple((double x) => 1 / x, 1.0, 100.0, 1000), tuple((double x) => x, 0.0, 5_000.0, 5_000_000), tuple((double x) => x, 0.0, 6_000.0, 6_000_000)];
alias TypeTuple!(integrate!rectangularLeft, integrate!rectangularMiddle, integrate!rectangularRight, integrate!trapezium, integrate!simpson) ints;
alias TypeTuple!("rectangular left: ", "rectangular middle: ", "rectangular right: ", "trapezium: ", "simpson: ") names;
foreach (a; args) { foreach (i, n; names) writefln("%s %f", n, ints[i](a.tupleof)); writeln(); }
}</lang> Output:
rectangular left: 0.202500 rectangular middle: 0.248750 rectangular right: 0.302500 trapezium: 0.252500 simpson: 0.250000 rectangular left: 4.654991 rectangular middle: 4.604763 rectangular right: 4.556981 trapezium: 4.605986 simpson: 4.605170 rectangular left: 12499997.500000 rectangular middle: 12500000.000000 rectangular right: 12500002.500000 trapezium: 12500000.000000 simpson: 12500000.000000 rectangular left: 17999997.000000 rectangular middle: 18000000.000000 rectangular right: 18000003.000000 trapezium: 18000000.000000 simpson: 18000000.000000
A faster version
This version avoids function pointers and delegates, same output: <lang d>import std.stdio, std.typecons, std.typetuple;
template integrate(alias method) {
template integrate(alias f) { double integrate(Float)(in Float a, in Float b, in int steps) pure nothrow { Float s = 0.0; immutable Float h = (b - a) / steps; foreach (i; 0 .. steps) s += method!(f, Float)(a + h * i, h); return h * s; } }
}
double rectangularLeft(alias f, Float)(in Float x, in Float h) pure nothrow {
return f(x);
}
double rectangularMiddle(alias f, Float)(in Float x, in Float h) pure nothrow {
return f(x + h / 2);
}
double rectangularRight(alias f, Float)(in Float x, in Float h) pure nothrow {
return f(x + h);
}
double trapezium(alias f, Float)(in Float x, in Float h) pure nothrow {
return (f(x) + f(x + h)) / 2;
}
double simpson(alias f, Float)(in Float x, in Float h) pure nothrow {
return (f(x) + 4 * f(x + h / 2) + f(x + h)) / 6;
}
void main() {
static double f1(in double x) pure nothrow { return x ^^ 3; } static double f2(in double x) pure nothrow { return 1 / x; } static double f3(in double x) pure nothrow { return x; } alias TypeTuple!(f1, f2, f3, f3) funcs;
alias TypeTuple!("rectangular left: ", "rectangular middle: ", "rectangular right: ", "trapezium: ", "simpson: ") names;
alias TypeTuple!(integrate!rectangularLeft, integrate!rectangularMiddle, integrate!rectangularRight, integrate!trapezium, integrate!simpson) ints;
immutable args = [tuple(0.0, 1.0, 10), tuple(1.0, 100.0, 1_000), tuple(0.0, 5_000.0, 5_000_000), tuple(0.0, 6_000.0, 6_000_000)];
foreach (i, f; funcs) { foreach (j, n; names) { alias ints[j] integ; writefln("%s %f", n, integ!f(args[i].tupleof)); } writeln(); }
}</lang>
E
<lang e>pragma.enable("accumulator")
def leftRect(f, x, h) {
return f(x)
}
def midRect(f, x, h) {
return f(x + h/2)
}
def rightRect(f, x, h) {
return f(x + h)
}
def trapezium(f, x, h) {
return (f(x) + f(x+h)) / 2
}
def simpson(f, x, h) {
return (f(x) + 4 * f(x + h / 2) + f(x+h)) / 6
}
def integrate(f, a, b, steps, meth) {
def h := (b-a) / steps return h * accum 0 for i in 0..!steps { _ + meth(f, a+i*h, h) }
}</lang>
<lang e>? integrate(fn x { x ** 2 }, 3.0, 7.0, 30, simpson)
- value: 105.33333333333334
? integrate(fn x { x ** 9 }, 0, 1, 300, simpson)
- value: 0.10000000002160479</lang>
Elixir
<lang elixir>defmodule Numerical do
@funs ~w(leftrect midrect rightrect trapezium simpson)a def leftrect(f, left,_right), do: f.(left) def midrect(f, left, right), do: f.((left+right)/2) def rightrect(f,_left, right), do: f.(right) def trapezium(f, left, right), do: (f.(left)+f.(right))/2 def simpson(f, left, right), do: (f.(left) + 4*f.((left+right)/2.0) + f.(right)) / 6.0 def integrate(f, a, b, steps) when is_integer(steps) do delta = (b - a) / steps Enum.each(@funs, fn fun -> total = Enum.reduce(0..steps-1, 0, fn i, acc -> left = a + delta * i acc + apply(Numerical, fun, [f, left, left+delta]) end) :io.format "~10s : ~.6f~n", [fun, total * delta] end) end
end
f1 = fn x -> x * x * x end IO.puts "f(x) = x^3, where x is [0,1], with 100 approximations." Numerical.integrate(f1, 0, 1, 100)
f2 = fn x -> 1 / x end IO.puts "\nf(x) = 1/x, where x is [1,100], with 1,000 approximations. " Numerical.integrate(f2, 1, 100, 1000)
f3 = fn x -> x end IO.puts "\nf(x) = x, where x is [0,5000], with 5,000,000 approximations." Numerical.integrate(f3, 0, 5000, 5_000_000)
f4 = fn x -> x end IO.puts "\nf(x) = x, where x is [0,6000], with 6,000,000 approximations." Numerical.integrate(f4, 0, 6000, 6_000_000)</lang>
- Output:
f(x) = x^3, where x is [0,1], with 100 approximations. leftrect : 0.245025 midrect : 0.249988 rightrect : 0.255025 trapezium : 0.250025 simpson : 0.250000 f(x) = 1/x, where x is [1,100], with 1,000 approximations. leftrect : 4.654991 midrect : 4.604763 rightrect : 4.556981 trapezium : 4.605986 simpson : 4.605170 f(x) = x, where x is [0,5000], with 5,000,000 approximations. leftrect : 12499997.500000 midrect : 12500000.000000 rightrect : 12500002.500000 trapezium : 12500000.000000 simpson : 12500000.000000 f(x) = x, where x is [0,6000], with 6,000,000 approximations. leftrect : 17999997.000000 midrect : 18000000.000000 rightrect : 18000003.000000 trapezium : 18000000.000000 simpson : 18000000.000000
Euphoria
<lang euphoria>function int_leftrect(sequence bounds, integer n, integer func_id)
atom h, sum h = (bounds[2]-bounds[1])/n sum = 0 for x = bounds[1] to bounds[2]-h by h do sum += call_func(func_id, {x}) end for return h*sum
end function
function int_rightrect(sequence bounds, integer n, integer func_id)
atom h, sum h = (bounds[2]-bounds[1])/n sum = 0 for x = bounds[1] to bounds[2]-h by h do sum += call_func(func_id, {x+h}) end for return h*sum
end function
function int_midrect(sequence bounds, integer n, integer func_id)
atom h, sum h = (bounds[2]-bounds[1])/n sum = 0 for x = bounds[1] to bounds[2]-h by h do sum += call_func(func_id, {x+h/2}) end for return h*sum
end function
function int_trapezium(sequence bounds, integer n, integer func_id)
atom h, sum h = (bounds[2]-bounds[1])/n sum = call_func(func_id, {bounds[1]}) + call_func(func_id, {bounds[2]}) for x = bounds[1] to bounds[2]-h by h do sum += 2*call_func(func_id, {x}) end for return h * sum / 2
end function
function int_simpson(sequence bounds, integer n, integer func_id)
atom h, sum1, sum2 h = (bounds[2]-bounds[1])/n sum1 = call_func(func_id, {bounds[1] + h/2}) sum2 = 0 for i = 1 to n-1 do sum1 += call_func(func_id, {bounds[1] + h * i + h / 2}) sum2 += call_func(func_id, {bounds[1] + h * i}) end for return h/6 * (call_func(func_id, {bounds[1]}) + call_func(func_id, {bounds[2]}) + 4*sum1 + 2*sum2)
end function
function xp2d2(atom x)
return x*x/2
end function
function logx(atom x)
return log(x)
end function
function x(atom x)
return x
end function
? int_leftrect({-1,1},1000,routine_id("xp2d2")) ? int_rightrect({-1,1},1000,routine_id("xp2d2")) ? int_midrect({-1,1},1000,routine_id("xp2d2")) ? int_simpson({-1,1},1000,routine_id("xp2d2")) puts(1,'\n') ? int_leftrect({1,2},1000,routine_id("logx")) ? int_rightrect({1,2},1000,routine_id("logx")) ? int_midrect({1,2},1000,routine_id("logx")) ? int_simpson({1,2},1000,routine_id("logx")) puts(1,'\n') ? int_leftrect({0,10},1000,routine_id("x")) ? int_rightrect({0,10},1000,routine_id("x")) ? int_midrect({0,10},1000,routine_id("x")) ? int_simpson({0,10},1000,routine_id("x"))</lang>
Output:
0.332337996 0.332334 0.332334999 0.3333333333 0.3859477459 0.386640893 0.386294382 0.3862943611 49.95 50.05 50 50
Factor
<lang factor> USE: math.functions IN: scratchpad 0 1 [ 3 ^ ] integrate-simpson . 1/4 IN: scratchpad 1000 num-steps set-global IN: scratchpad 1.0 100 [ -1 ^ ] integrate-simpson . 4.605173316272971 IN: scratchpad 5000000 num-steps set-global IN: scratchpad 0 5000 [ ] integrate-simpson . 12500000 IN: scratchpad 6000000 num-steps set-global IN: scratchpad 0 6000 [ ] integrate-simpson . 18000000</lang>
Forth
<lang forth>fvariable step
defer method ( fn F: x -- fn[x] )
- left execute ;
- right step f@ f+ execute ;
- mid step f@ 2e f/ f+ execute ;
- trap
dup fdup left fswap right f+ 2e f/ ;
- simpson
dup fdup left dup fover mid 4e f* f+ fswap right f+ 6e f/ ;
- set-step ( n F: a b -- n F: a )
fover f- dup 0 d>f f/ step f! ;
- integrate ( xt n F: a b -- F: sigma )
set-step 0e 0 do dup fover method f+ fswap step f@ f+ fswap loop drop fnip step f@ f* ; \ testing similar to the D example
- test
' is method ' 4 -1e 2e integrate f. ;
- fn1 fsincos f+ ;
- fn2 fdup f* 4e f* 1e f+ 2e fswap f/ ;
7 set-precision test left fn2 \ 2.456897 test right fn2 \ 2.245132 test mid fn2 \ 2.496091 test trap fn2 \ 2.351014 test simpson fn2 \ 2.447732</lang>
Fortran
In ISO Fortran 95 and later if function f() is not already defined to be "elemental", define an elemental wrapper function around it to allow for array-based initialization: <lang fortran>elemental function elemf(x)
real :: elemf, x elemf = f(x)
end function elemf</lang>
Use Array Initializers, Pointers, Array invocation of Elemental functions, Elemental array-array and array-scalar arithmetic, and the SUM intrinsic function. Methods are collected into a single function in a module. <lang fortran>module Integration
implicit none
contains
! function, lower limit, upper limit, steps, method function integrate(f, a, b, in, method) real :: integrate real, intent(in) :: a, b integer, optional, intent(in) :: in character(len=*), intent(in), optional :: method interface elemental function f(ra) real :: f real, intent(in) :: ra end function f end interface
integer :: n, i, m real :: h real, dimension(:), allocatable :: xpoints real, dimension(:), target, allocatable :: fpoints real, dimension(:), pointer :: fleft, fmid, fright
if ( present(in) ) then n = in else n = 20 end if
if ( present(method) ) then select case (method) case ('leftrect') m = 1 case ('midrect') m = 2 case ('rightrect') m = 3 case ( 'trapezoid' ) m = 4 case default m = 0 end select else m = 0 end if
h = (b - a) / n
allocate(xpoints(0:2*n), fpoints(0:2*n))
xpoints = (/ (a + h*i/2, i = 0,2*n) /)
fpoints = f(xpoints) fleft => fpoints(0 : 2*n-2 : 2) fmid => fpoints(1 : 2*n-1 : 2) fright => fpoints(2 : 2*n : 2)
select case (m) case (0) ! simpson integrate = h / 6.0 * sum(fleft + fright + 4.0*fmid) case (1) ! leftrect integrate = h * sum(fleft) case (2) ! midrect integrate = h * sum(fmid) case (3) ! rightrect integrate = h * sum(fright) case (4) ! trapezoid integrate = h * sum(fleft + fright) / 2 end select
deallocate(xpoints, fpoints) end function integrate
end module Integration</lang>
Usage example: <lang fortran>program IntegrationTest
use Integration use FunctionHolder implicit none
print *, integrate(afun, 0., 3**(1/3.), method='simpson') print *, integrate(afun, 0., 3**(1/3.), method='leftrect') print *, integrate(afun, 0., 3**(1/3.), method='midrect') print *, integrate(afun, 0., 3**(1/3.), method='rightrect') print *, integrate(afun, 0., 3**(1/3.), method='trapezoid')
end program IntegrationTest</lang>
The FunctionHolder module:
<lang fortran>module FunctionHolder
implicit none
contains
pure function afun(x) real :: afun real, intent(in) :: x
afun = x**2 end function afun
end module FunctionHolder</lang>
FreeBASIC
Based on the BASIC entry and the BBC BASIC entry <lang freebasic>' version 17-09-2015 ' compile with: fbc -s console
- Define screen_width 1024
- Define screen_height 256
ScreenRes screen_width, screen_height, 8 Width screen_width\8, screen_height\16
Function f1(x As Double) As Double
Return x^3
End Function
Function f2(x As Double) As Double
Return 1/x
End Function
Function f3(x As Double) As Double
Return x
End Function
Function leftrect(a As Double, b As Double, n As Double, _ ByVal f As Function (ByVal As Double) As Double) As Double
Dim As Double sum, x = a, h = (b - a) / n
For i As UInteger = 1 To n sum = sum + h * f(x) x = x + h Next
leftrect = sum
End Function
Function rightrect(a As Double, b As Double, n As Double, _ ByVal f As Function (ByVal As Double) As Double) As Double
Dim As Double sum, x = a, h = (b - a) / n
For i As UInteger = 1 To n x = x + h sum = sum + h * f(x) Next
rightrect = sum
End Function
Function midrect(a As Double, b As Double, n As Double, _ ByVal f As Function (ByVal As Double) As Double) As Double
Dim As Double sum, h = (b - a) / n, x = a + h / 2
For i As UInteger = 1 To n sum = sum + h * f(x) x = x + h Next
midrect = sum
End Function
Function trap(a As Double, b As Double, n As Double, _ ByVal f As Function (ByVal As Double) As Double) As Double
Dim As Double x = a, h = (b - a) / n Dim As Double sum = h * (f(a) + f(b)) / 2
For i As UInteger = 1 To n -1 x = x + h sum = sum + h * f(x) Next
trap = sum
End Function
Function simpson(a As Double, b As Double, n As Double, _ ByVal f As Function (ByVal As Double) As Double) As Double
Dim As UInteger i Dim As Double sum1, sum2 Dim As Double h = (b - a) / n
For i = 0 To n -1 sum1 = sum1 + f(a + h * i + h / 2) Next i
For i = 1 To n -1 sum2 = sum2 + f(a + h * i) Next i
simpson = h / 6 * (f(a) + f(b) + 4 * sum1 + 2 * sum2)
End Function
' ------=< main >=------
Dim As Double y Dim As String frmt = " ##.##########"
Print Print "function range steps leftrect midrect " + _
"rightrect trap simpson "
Print "f(x) = x^3 0 - 1 100"; Print Using frmt; leftrect(0, 1, 100, @f1); midrect(0, 1, 100, @f1); _ rightrect(0, 1, 100, @f1); trap(0, 1, 100, @f1); simpson(0, 1, 100, @f1)
Print "f(x) = 1/x 1 - 100 1000"; Print Using frmt; leftrect(1, 100, 1000, @f2); midrect(1, 100, 1000, @f2); _
rightrect(1, 100, 1000, @f2); trap(1, 100, 1000, @f2); _ simpson(1, 100, 1000, @f2)
frmt = " #########.###" Print "f(x) = x 0 - 5000 5000000"; Print Using frmt; leftrect(0, 5000, 5000000, @f3); midrect(0, 5000, 5000000, @f3); _
rightrect(0, 5000, 5000000, @f3); trap(0, 5000, 5000000, @f3); _ simpson(0, 5000, 5000000, @f3)
Print "f(x) = x 0 - 6000 6000000"; Print Using frmt; leftrect(0, 6000, 6000000, @f3); midrect(0, 6000, 6000000, @f3); _
rightrect(0, 6000, 6000000, @f3); trap(0, 6000, 6000000, @f3); _ simpson(0, 6000, 6000000, @f3)
' empty keyboard buffer While InKey <> "" : Wend Print : Print "hit any key to end program" Sleep End</lang>
- Output:
function range steps leftrect midrect rightrect trap simpson f(x) = x^3 0 - 1 100 0.2450250000 0.2499875000 0.2550250000 0.2500250000 0.2500000000 f(x) = 1/x 1 - 100 1000 4.6549910575 4.6047625487 4.5569810575 4.6059860575 4.6051703850 f(x) = x 0 - 5000 5000000 12499997.501 12500000.001 12500002.501 12500000.001 12500000.000 f(x) = x 0 - 6000 6000000 17999997.001 18000000.001 18000003.001 18000000.001 18000000.000
Go
<lang go>package main
import (
"fmt" "math"
)
// specification for an integration type spec struct {
lower, upper float64 // bounds for integration n int // number of parts exact float64 // expected answer fs string // mathematical description of function f func(float64) float64 // function to integrate
}
// test cases per task description var data = []spec{
spec{0, 1, 100, .25, "x^3", func(x float64) float64 { return x * x * x }}, spec{1, 100, 1000, float64(math.Log(100)), "1/x", func(x float64) float64 { return 1 / x }}, spec{0, 5000, 5e5, 12.5e6, "x", func(x float64) float64 { return x }}, spec{0, 6000, 6e6, 18e6, "x", func(x float64) float64 { return x }},
}
// object for associating a printable function name with an integration method type method struct {
name string integrate func(spec) float64
}
// integration methods implemented per task description var methods = []method{
method{"Rectangular (left) ", rectLeft}, method{"Rectangular (right) ", rectRight}, method{"Rectangular (midpoint)", rectMid}, method{"Trapezium ", trap}, method{"Simpson's ", simpson},
}
func rectLeft(t spec) float64 {
var a adder r := t.upper - t.lower nf := float64(t.n) x0 := t.lower for i := 0; i < t.n; i++ { x1 := t.lower + float64(i+1)*r/nf // x1-x0 better than r/nf. // (with r/nf, the represenation error accumulates) a.add(t.f(x0) * (x1 - x0)) x0 = x1 } return a.total()
}
func rectRight(t spec) float64 {
var a adder r := t.upper - t.lower nf := float64(t.n) x0 := t.lower for i := 0; i < t.n; i++ { x1 := t.lower + float64(i+1)*r/nf a.add(t.f(x1) * (x1 - x0)) x0 = x1 } return a.total()
}
func rectMid(t spec) float64 {
var a adder r := t.upper - t.lower nf := float64(t.n) // there's a tiny gloss in the x1-x0 trick here. the correct way // would be to compute x's at division boundaries, but we don't need // those x's for anything else. (the function is evaluated on x's // at division midpoints rather than division boundaries.) so, we // reuse the midpoint x's, knowing that they will average out just // as well. we just need one extra point, so we use lower-.5. x0 := t.lower - .5*r/nf for i := 0; i < t.n; i++ { x1 := t.lower + (float64(i)+.5)*r/nf a.add(t.f(x1) * (x1 - x0)) x0 = x1 } return a.total()
}
func trap(t spec) float64 {
var a adder r := t.upper - t.lower nf := float64(t.n) x0 := t.lower f0 := t.f(x0) for i := 0; i < t.n; i++ { x1 := t.lower + float64(i+1)*r/nf f1 := t.f(x1) a.add((f0 + f1) * .5 * (x1 - x0)) x0, f0 = x1, f1 } return a.total()
}
func simpson(t spec) float64 {
var a adder r := t.upper - t.lower nf := float64(t.n) // similar to the rectangle midpoint logic explained above, // we play a little loose with the values used for dx and dx0. dx0 := r / nf a.add(t.f(t.lower) * dx0) a.add(t.f(t.lower+dx0*.5) * dx0 * 4) x0 := t.lower + dx0 for i := 1; i < t.n; i++ { x1 := t.lower + float64(i+1)*r/nf xmid := (x0 + x1) * .5 dx := x1 - x0 a.add(t.f(x0) * dx * 2) a.add(t.f(xmid) * dx * 4) x0 = x1 } a.add(t.f(t.upper) * dx0) return a.total() / 6
}
func sum(v []float64) float64 {
var a adder for _, e := range v { a.add(e) } return a.total()
}
type adder struct {
sum, e float64
}
func (a *adder) total() float64 {
return a.sum + a.e
}
func (a *adder) add(x float64) {
sum := a.sum + x e := sum - a.sum a.e += a.sum - (sum - e) + (x - e) a.sum = sum
}
func main() {
for _, t := range data { fmt.Println("Test case: f(x) =", t.fs) fmt.Println("Integration from", t.lower, "to", t.upper, "in", t.n, "parts") fmt.Printf("Exact result %.7e Error\n", t.exact) for _, m := range methods { a := m.integrate(t) e := a - t.exact if e < 0 { e = -e } fmt.Printf("%s %.7e %.7e\n", m.name, a, e) } fmt.Println("") }
}</lang>
- Output:
Integration from 0 to 1 in 100 parts Exact result 2.5000000e-01 Error Rectangular (left) 2.4502500e-01 4.9750000e-03 Rectangular (right) 2.5502500e-01 5.0250000e-03 Rectangular (midpoint) 2.4998750e-01 1.2500000e-05 Trapezium 2.5002500e-01 2.5000000e-05 Simpson's 2.5000000e-01 0.0000000e+00 Test case: f(x) = 1/x Integration from 1 to 100 in 1000 parts Exact result 4.6051702e+00 Error Rectangular (left) 4.6549911e+00 4.9820872e-02 Rectangular (right) 4.5569811e+00 4.8189128e-02 Rectangular (midpoint) 4.6047625e+00 4.0763731e-04 Trapezium 4.6059861e+00 8.1587153e-04 Simpson's 4.6051704e+00 1.9896905e-07 Test case: f(x) = x Integration from 0 to 5000 in 500000 parts Exact result 1.2500000e+07 Error Rectangular (left) 1.2499975e+07 2.5000000e+01 Rectangular (right) 1.2500025e+07 2.5000000e+01 Rectangular (midpoint) 1.2500000e+07 0.0000000e+00 Trapezium 1.2500000e+07 0.0000000e+00 Simpson's 1.2500000e+07 0.0000000e+00 Test case: f(x) = x Integration from 0 to 6000 in 6000000 parts Exact result 1.8000000e+07 Error Rectangular (left) 1.7999997e+07 3.0000000e+00 Rectangular (right) 1.8000003e+07 3.0000000e+00 Rectangular (midpoint) 1.8000000e+07 0.0000000e+00 Trapezium 1.8000000e+07 0.0000000e+00 Simpson's 1.8000000e+07 0.0000000e+00
Groovy
Solution: <lang groovy>def assertBounds = { List bounds, int nRect ->
assert (bounds.size() == 2) && (bounds[0] instanceof Double) && (bounds[1] instanceof Double) && (nRect > 0)
}
def integral = { List bounds, int nRectangles, Closure f, List pointGuide, Closure integralCalculator->
double a = bounds[0], b = bounds[1], h = (b - a)/nRectangles def xPoints = pointGuide.collect { double it -> a + it*h } def fPoints = xPoints.collect { x -> f(x) } integralCalculator(h, fPoints)
}
def leftRectIntegral = { List bounds, int nRect, Closure f ->
assertBounds(bounds, nRect) integral(bounds, nRect, f, (0..<nRect)) { h, fPoints -> h*fPoints.sum() }
}
def rightRectIntegral = { List bounds, int nRect, Closure f ->
assertBounds(bounds, nRect) integral(bounds, nRect, f, (1..nRect)) { h, fPoints -> h*fPoints.sum() }
}
def midRectIntegral = { List bounds, int nRect, Closure f ->
assertBounds(bounds, nRect) integral(bounds, nRect, f, ((0.5d)..nRect)) { h, fPoints -> h*fPoints.sum() }
}
def trapezoidIntegral = { List bounds, int nRect, Closure f ->
assertBounds(bounds, nRect) integral(bounds, nRect, f, (0..nRect)) { h, fPoints -> def fLeft = fPoints[0..<nRect] def fRight = fPoints[1..nRect] h/2*(fLeft + fRight).sum() }
}
def simpsonsIntegral = { List bounds, int nSimpRect, Closure f ->
assertBounds(bounds, nSimpRect) integral(bounds, nSimpRect*2, f, (0..(nSimpRect*2))) { h, fPoints -> def fLeft = fPoints[(0..<nSimpRect*2).step(2)] def fMid = fPoints[(1..<nSimpRect*2).step(2)] def fRight = fPoints[(2..nSimpRect*2).step(2)] h/3*((fLeft + fRight).sum() + 4*(fMid.sum())) }
}</lang>
Test:
Each "nRect" (number of rectangles) value given below is the minimum value that meets the tolerance condition for the given circumstances (function-to-integrate, integral-type and integral-bounds). <lang groovy>double tolerance = 0.0001 // allowable "wrongness", ensures accuracy to 1 in 10,000
double sinIntegralCalculated = -(Math.cos(Math.PI) - Math.cos(0d)) assert (leftRectIntegral([0d, Math.PI], 129, Math.&sin) - sinIntegralCalculated).abs() < tolerance assert (rightRectIntegral([0d, Math.PI], 129, Math.&sin) - sinIntegralCalculated).abs() < tolerance assert (midRectIntegral([0d, Math.PI], 91, Math.&sin) - sinIntegralCalculated).abs() < tolerance assert (trapezoidIntegral([0d, Math.PI], 129, Math.&sin) - sinIntegralCalculated).abs() < tolerance assert (simpsonsIntegral([0d, Math.PI], 6, Math.&sin) - sinIntegralCalculated).abs() < tolerance
double cubeIntegralCalculated = 1d/4d *(10d**4 - 0d**4) assert ((leftRectIntegral([0d, 10d], 20000) { it**3 } - cubeIntegralCalculated)/cubeIntegralCalculated).abs() < tolerance assert ((rightRectIntegral([0d, 10d], 20001) { it**3 } - cubeIntegralCalculated)/cubeIntegralCalculated).abs() < tolerance assert ((midRectIntegral([0d, 10d], 71) { it**3 } - cubeIntegralCalculated)/cubeIntegralCalculated).abs() < tolerance assert ((trapezoidIntegral([0d, 10d], 101) { it**3 } - cubeIntegralCalculated)/cubeIntegralCalculated).abs() < tolerance // I can name that tune in one note! assert (simpsonsIntegral([0d, 10d], 1) { it**3 } == cubeIntegralCalculated) assert (simpsonsIntegral([0d, Math.PI], 1) { it**3 } == (1d/4d *(Math.PI**4 - 0d**4))) assert (simpsonsIntegral([-7.23d, Math.PI], 1) { it**3 } == (1d/4d *(Math.PI**4 - (-7.23d)**4)))
double quarticIntegralCalculated = 1d/5d *(10d**5 - 0d**5) assert ((leftRectIntegral([0d, 10d], 25000) { it**4 } - quarticIntegralCalculated)/quarticIntegralCalculated).abs() < tolerance assert ((rightRectIntegral([0d, 10d], 25001) { it**4 } - quarticIntegralCalculated)/quarticIntegralCalculated).abs() < tolerance assert ((midRectIntegral([0d, 10d], 92) { it**4 } - quarticIntegralCalculated)/quarticIntegralCalculated).abs() < tolerance assert ((trapezoidIntegral([0d, 10d], 130) { it**4 } - quarticIntegralCalculated)/quarticIntegralCalculated).abs() < tolerance assert ((simpsonsIntegral([0d, 10d], 5) { it**4 } - quarticIntegralCalculated)/quarticIntegralCalculated).abs() < tolerance
def cubicPoly = { it**3 + 2*it**2 + 7*it + 12d } def cubicPolyAntiDeriv = { 1/4*it**4 + 2/3*it**3 + 7/2*it**2 + 12*it } double cubicPolyIntegralCalculated = (cubicPolyAntiDeriv(10d) - cubicPolyAntiDeriv(0d)) assert ((leftRectIntegral([0d, 10d], 20000, cubicPoly) - cubicPolyIntegralCalculated)/cubicPolyIntegralCalculated).abs() < tolerance assert ((rightRectIntegral([0d, 10d], 20001, cubicPoly) - cubicPolyIntegralCalculated)/cubicPolyIntegralCalculated).abs() < tolerance assert ((midRectIntegral([0d, 10d], 71, cubicPoly) - cubicPolyIntegralCalculated)/cubicPolyIntegralCalculated).abs() < tolerance assert ((trapezoidIntegral([0d, 10d], 101, cubicPoly) - cubicPolyIntegralCalculated)/cubicPolyIntegralCalculated).abs() < tolerance // I can name that tune in one note! assert ((simpsonsIntegral([0d, 10d], 1, cubicPoly) - cubicPolyIntegralCalculated)/cubicPolyIntegralCalculated).abs() < tolerance**2.75 // 1 in 100 billion
double cpIntegralCalc0ToPI = (cubicPolyAntiDeriv(Math.PI) - cubicPolyAntiDeriv(0d)) assert ((simpsonsIntegral([0d, Math.PI], 1, cubicPoly) - cpIntegralCalc0ToPI)/ cpIntegralCalc0ToPI).abs() < tolerance**2.75 // 1 in 100 billion double cpIntegralCalcMinusEToPI = (cubicPolyAntiDeriv(Math.PI) - cubicPolyAntiDeriv(-Math.E)) assert ((simpsonsIntegral([-Math.E, Math.PI], 1, cubicPoly) - cpIntegralCalcMinusEToPI)/ cpIntegralCalcMinusEToPI).abs() < tolerance**2.5 // 1 in 10 billion</lang>
Requested Demonstrations: <lang groovy>println "f(x) = x**3, where x is [0,1], with 100 approximations. The exact result is 1/4, or 0.25." println ([" LeftRect": leftRectIntegral([0d, 1d], 100) { it**3 }]) println (["RightRect": rightRectIntegral([0d, 1d], 100) { it**3 }]) println ([" MidRect": midRectIntegral([0d, 1d], 100) { it**3 }]) println (["Trapezoid": trapezoidIntegral([0d, 1d], 100) { it**3 }]) println ([" Simpsons": simpsonsIntegral([0d, 1d], 100) { it**3 }]) println ()
println "f(x) = 1/x, where x is [1, 100], with 1,000 approximations. The exact result is the natural log of 100, or about 4.605170." println ([" LeftRect": leftRectIntegral([1d, 100d], 1000) { 1/it }]) println (["RightRect": rightRectIntegral([1d, 100d], 1000) { 1/it }]) println ([" MidRect": midRectIntegral([1d, 100d], 1000) { 1/it }]) println (["Trapezoid": trapezoidIntegral([1d, 100d], 1000) { 1/it }]) println ([" Simpsons": simpsonsIntegral([1d, 100d], 1000) { 1/it }]) println ()
println "f(x) = x, where x is [0,5000], with 5,000,000 approximations. The exact result is 12,500,000." println ([" LeftRect": leftRectIntegral([0d, 5000d], 5000000) { it }]) println (["RightRect": rightRectIntegral([0d, 5000d], 5000000) { it }]) println ([" MidRect": midRectIntegral([0d, 5000d], 5000000) { it }]) println (["Trapezoid": trapezoidIntegral([0d, 5000d], 5000000) { it }]) println ([" Simpsons": simpsonsIntegral([0d, 5000d], 5000000) { it }]) println ()
println "f(x) = x, where x is [0,6000], with 6,000,000 approximations. The exact result is 18,000,000." println ([" LeftRect": leftRectIntegral([0d, 6000d], 6000000) { it }]) println (["RightRect": rightRectIntegral([0d, 6000d], 6000000) { it }]) println ([" MidRect": midRectIntegral([0d, 6000d], 6000000) { it }]) println (["Trapezoid": trapezoidIntegral([0d, 6000d], 6000000) { it }]) println ([" Simpsons": simpsonsIntegral([0d, 6000d], 6000000) { it }]) println ()</lang>
Output:
f(x) = x**3, where x is [0,1], with 100 approximations. The exact result is 1/4, or 0.25. [ LeftRect:0.24502500000000002] [RightRect:0.255025] [ MidRect:0.24998750000000008] [Trapezoid:0.250025] [ Simpsons:0.25000000000000006] f(x) = 1/x, where x is [1, 100], with 1,000 approximations. The exact result is the natural log of 100, or about 4.605170. [ LeftRect:4.65499105751468] [RightRect:4.55698105751468] [ MidRect:4.604762548678376] [Trapezoid:4.605986057514673] [ Simpsons:4.605170384957142] f(x) = x, where x is [0,5000], with 5,000,000 approximations. The exact result is 12,500,000. [ LeftRect:1.24999975E7] [RightRect:1.25000025E7] [ MidRect:1.25E7] [Trapezoid:1.25E7] [ Simpsons:1.25E7] f(x) = x, where x is [0,6000], with 6,000,000 approximations. The exact result is 18,000,000. [ LeftRect:1.7999997000000004E7] [RightRect:1.8000003000000004E7] [ MidRect:1.7999999999999993E7] [Trapezoid:1.7999999999999996E7] [ Simpsons:1.7999999999999993E7]
Haskell
Different approach from most of the other examples: First, the function f might be expensive to calculate, and so it should not be evaluated several times. So, ideally, we want to have positions x and weights w for each method and then just calculate the approximation of the integral by
<lang haskell>approx f xs ws = sum [w * f x | (x,w) <- zip xs ws]</lang>
Second, let's to generalize all integration methods into one scheme. The methods can all be characterized by the coefficients vs they use in a particular interval. These will be fractions, and for terseness, we extract the denominator as an extra argument v.
Now there are the closed formulas (which include the endpoints) and the open formulas (which exclude them). Let's do the open formulas first, because then the coefficients don't overlap:
<lang haskell>integrateOpen :: Fractional a => a -> [a] -> (a -> a) -> a -> a -> Int -> a integrateOpen v vs f a b n = approx f xs ws * h / v where
m = fromIntegral (length vs) * n h = (b-a) / fromIntegral m ws = concat $ replicate n vs c = a + h/2 xs = [c + h * fromIntegral i | i <- [0..m-1]]</lang>
Similarly for the closed formulas, but we need an additional function overlap which sums the coefficients overlapping at the interior interval boundaries:
<lang haskell>integrateClosed :: Fractional a => a -> [a] -> (a -> a) -> a -> a -> Int -> a integrateClosed v vs f a b n = approx f xs ws * h / v where
m = fromIntegral (length vs - 1) * n h = (b-a) / fromIntegral m ws = overlap n vs xs = [a + h * fromIntegral i | i <- [0..m]]
overlap :: Num a => Int -> [a] -> [a] overlap n [] = [] overlap n (x:xs) = x : inter n xs where
inter 1 ys = ys inter n [] = x : inter (n-1) xs inter n [y] = (x+y) : inter (n-1) xs inter n (y:ys) = y : inter n ys</lang>
And now we can just define
<lang haskell>intLeftRect = integrateClosed 1 [1,0] intRightRect = integrateClosed 1 [0,1] intMidRect = integrateOpen 1 [1] intTrapezium = integrateClosed 2 [1,1] intSimpson = integrateClosed 3 [1,4,1]</lang>
or, as easily, some additional schemes:
<lang haskell>intMilne = integrateClosed 45 [14,64,24,64,14] intOpen1 = integrateOpen 2 [3,3] intOpen2 = integrateOpen 3 [8,-4,8]</lang>
Some examples:
*Main> intLeftRect (\x -> x*x) 0 1 10 0.2850000000000001 *Main> intRightRect (\x -> x*x) 0 1 10 0.38500000000000006 *Main> intMidRect (\x -> x*x) 0 1 10 0.3325 *Main> intTrapezium (\x -> x*x) 0 1 10 0.3350000000000001 *Main> intSimpson (\x -> x*x) 0 1 10 0.3333333333333334
The whole program:
<lang haskell>approx
:: Fractional a => (a1 -> a) -> [a1] -> [a] -> a
approx f xs ws =
sum [ w * f x | (x, w) <- zip xs ws ]
integrateOpen
:: Fractional a => a -> [a] -> (a -> a) -> a -> a -> Int -> a
integrateOpen v vs f a b n = approx f xs ws * h / v
where m = fromIntegral (length vs) * n h = (b - a) / fromIntegral m ws = concat $ replicate n vs c = a + h / 2 xs = [ c + h * fromIntegral i | i <- [0 .. m - 1] ]
integrateClosed
:: Fractional a => a -> [a] -> (a -> a) -> a -> a -> Int -> a
integrateClosed v vs f a b n = approx f xs ws * h / v
where m = fromIntegral (length vs - 1) * n h = (b - a) / fromIntegral m ws = overlap n vs xs = [ a + h * fromIntegral i | i <- [0 .. m] ]
overlap
:: Num a => Int -> [a] -> [a]
overlap n [] = [] overlap n (x:xs) = x : inter n xs
where inter 1 ys = ys inter n [] = x : inter (n - 1) xs inter n [y] = (x + y) : inter (n - 1) xs inter n (y:ys) = y : inter n ys
uncurry4 :: (t1 -> t2 -> t3 -> t4 -> t) -> (t1, t2, t3, t4) -> t uncurry4 f ~(a, b, c, d) = f a b c d
-- TEST ---------------------------------------------------------------------- ms
:: Fractional a => [(String, (a -> a) -> a -> a -> Int -> a)]
ms =
[ ("rectangular left", integrateClosed 1 [1, 0]) , ("rectangular middle", integrateOpen 1 [1]) , ("rectangular right", integrateClosed 1 [0, 1]) , ("trapezium", integrateClosed 2 [1, 1]) , ("simpson", integrateClosed 3 [1, 4, 1]) ]
integrations
:: (Fractional a, Num t, Num t1, Num t2) => [(String, (a -> a, t, t1, t2))]
integrations =
[ ("x^3", ((^ 3), 0, 1, 100)) , ("1/x", ((1 /), 1, 100, 1000)) , ("x", (id, 0, 5000, 500000)) , ("x", (id, 0, 6000, 600000)) ]
main :: IO () main =
mapM_ (\(s, e@(_, a, b, n)) -> do putStrLn (concat [ indent 20 ("f(x) = " ++ s) , show [a, b] , " (" , show n , " approximations)" ]) mapM_ (\(s, integration) -> putStrLn (indent 20 (s ++ ":") ++ show (uncurry4 integration e))) ms putStrLn []) integrations where indent n = take n . (++ replicate n ' ')</lang>
- Output:
f(x) = x^3 [0.0,1.0] (100 approximations) rectangular left: 0.24502500000000005 rectangular middle: 0.24998750000000006 rectangular right: 0.25502500000000006 trapezium: 0.25002500000000005 simpson: 0.25000000000000006 f(x) = 1/x [1.0,100.0] (1000 approximations) rectangular left: 4.65499105751468 rectangular middle: 4.604762548678376 rectangular right: 4.55698105751468 trapezium: 4.605986057514681 simpson: 4.605170384957135 f(x) = x [0.0,5000.0] (500000 approximations) rectangular left: 1.2499975000000006e7 rectangular middle: 1.2499999999999993e7 rectangular right: 1.2500025000000006e7 trapezium: 1.2500000000000006e7 simpson: 1.2499999999999998e7 f(x) = x [0.0,6000.0] (600000 approximations) rectangular left: 1.7999970000000004e7 rectangular middle: 1.7999999999999993e7 rectangular right: 1.8000030000000004e7 trapezium: 1.8000000000000004e7 simpson: 1.7999999999999996e7
Runtime: about 7 seconds.
J
Solution:
<lang j>integrate=: adverb define
'a b steps'=. 3{.y,128 size=. (b - a)%steps size * +/ u |: 2 ]\ a + size * i.>:steps
)
rectangle=: adverb def 'u -: +/ y'
trapezium=: adverb def '-: +/ u y'
simpson =: adverb def '6 %~ +/ 1 1 4 * u y, -:+/y'</lang>
Example usage
Required Examples
<lang j> Ir=: rectangle integrate
It=: trapezium integrate Is=: simpson integrate ^&3 Ir 0 1 100
0.249987
^&3 It 0 1 100
0.250025
^&3 Is 0 1 100
0.25
% Ir 1 100 1000
4.60476
% It 1 100 1000
4.60599
% Is 1 100 1000
4.60517
] Ir 0 5000 5e6
1.25e7
] It 0 5000 5e6
1.25e7
] Is 0 5000 5e6
1.25e7
] Ir 0 6000 6e6
1.8e7
] It 0 6000 6e6
1.8e7
] Is 0 6000 6e6
1.8e7</lang>
Older Examples
Integrate square
(*:
) from 0 to π in 10 steps using various methods.
<lang j> *: rectangle integrate 0 1p1 10
10.3095869962
*: trapezium integrate 0 1p1 10
10.3871026879
*: simpson integrate 0 1p1 10
10.3354255601</lang>
Integrate sin
from 0 to π in 10 steps using various methods.
<lang j> sin=: 1&o.
sin rectangle integrate 0 1p1 10
2.00824840791
sin trapezium integrate 0 1p1 10
1.98352353751
sin simpson integrate 0 1p1 10
2.00000678444</lang>
Aside
Note that J has a primitive verb p..
for integrating polynomials. For example the integral of (which can be described in terms of its coefficients as 0 0 1
) is:
<lang j> 0 p.. 0 0 1
0 0 0 0.333333333333
0 p.. 0 0 1x NB. or using rationals
0 0 0 1r3</lang>
That is:
So to integrate from 0 to π :
<lang j> 0 0 1 (0&p..@[ -~/@:p. ]) 0 1p1
10.3354255601</lang>
That said, J also has d.
which can integrate suitable functions.
<lang j> *:d._1]1p1 10.3354</lang>
Java
<lang java5>class NumericalIntegration {
interface FPFunction { double eval(double n); } public static double rectangularLeft(double a, double b, int n, FPFunction f) { return rectangular(a, b, n, f, 0); } public static double rectangularMidpoint(double a, double b, int n, FPFunction f) { return rectangular(a, b, n, f, 1); } public static double rectangularRight(double a, double b, int n, FPFunction f) { return rectangular(a, b, n, f, 2); } public static double trapezium(double a, double b, int n, FPFunction f) { double range = checkParamsGetRange(a, b, n); double nFloat = (double)n; double sum = 0.0; for (int i = 1; i < n; i++) { double x = a + range * (double)i / nFloat; sum += f.eval(x); } sum += (f.eval(a) + f.eval(b)) / 2.0; return sum * range / nFloat; } public static double simpsons(double a, double b, int n, FPFunction f) { double range = checkParamsGetRange(a, b, n); double nFloat = (double)n; double sum1 = f.eval(a + range / (nFloat * 2.0)); double sum2 = 0.0; for (int i = 1; i < n; i++) { double x1 = a + range * ((double)i + 0.5) / nFloat; sum1 += f.eval(x1); double x2 = a + range * (double)i / nFloat; sum2 += f.eval(x2); } return (f.eval(a) + f.eval(b) + sum1 * 4.0 + sum2 * 2.0) * range / (nFloat * 6.0); } private static double rectangular(double a, double b, int n, FPFunction f, int mode) { double range = checkParamsGetRange(a, b, n); double modeOffset = (double)mode / 2.0; double nFloat = (double)n; double sum = 0.0; for (int i = 0; i < n; i++) { double x = a + range * ((double)i + modeOffset) / nFloat; sum += f.eval(x); } return sum * range / nFloat; } private static double checkParamsGetRange(double a, double b, int n) { if (n <= 0) throw new IllegalArgumentException("Invalid value of n"); double range = b - a; if (range <= 0) throw new IllegalArgumentException("Invalid range"); return range; } private static void testFunction(String fname, double a, double b, int n, FPFunction f) { System.out.println("Testing function \"" + fname + "\", a=" + a + ", b=" + b + ", n=" + n); System.out.println("rectangularLeft: " + rectangularLeft(a, b, n, f)); System.out.println("rectangularMidpoint: " + rectangularMidpoint(a, b, n, f)); System.out.println("rectangularRight: " + rectangularRight(a, b, n, f)); System.out.println("trapezium: " + trapezium(a, b, n, f)); System.out.println("simpsons: " + simpsons(a, b, n, f)); System.out.println(); return; } public static void main(String[] args) { testFunction("x^3", 0.0, 1.0, 100, new FPFunction() { public double eval(double n) { return n * n * n; } } ); testFunction("1/x", 1.0, 100.0, 1000, new FPFunction() { public double eval(double n) { return 1.0 / n; } } ); testFunction("x", 0.0, 5000.0, 5000000, new FPFunction() { public double eval(double n) { return n; } } ); testFunction("x", 0.0, 6000.0, 6000000, new FPFunction() { public double eval(double n) { return n; } } ); return; }
} </lang>
Julia
<lang julia>function simpson(f::Function, a::Number, b::Number, n::Integer)
h = (b - a) / n s = f(a + h / 2) for i in 1:(n-1) s += f(a + h * i + h / 2) + f(a + h * i) / 2 end return h/6 * (f(a) + f(b) + 4*s)
end
rst =
simpson(x -> x ^ 3, 0, 1, 100), simpson(x -> 1 / x, 1, 100, 1000), simpson(x -> x, 0, 5000, 5_000_000), simpson(x -> x, 0, 6000, 6_000_000)
@show rst</lang>
- Output:
rst = (0.25000000000000006, 4.605170384957135, 1.25e7, 1.8e7)
Kotlin
<lang scala>// version 1.1.2
typealias Func = (Double) -> Double
fun integrate(a: Double, b: Double, n: Int, f: Func) {
val h = (b - a) / n val sum = DoubleArray(5) for (i in 0 until n) { val x = a + i * h sum[0] += f(x) sum[1] += f(x + h / 2.0) sum[2] += f(x + h) sum[3] += (f(x) + f(x + h)) / 2.0 sum[4] += (f(x) + 4.0 * f(x + h / 2.0) + f(x + h)) / 6.0 } val methods = listOf("LeftRect ", "MidRect ", "RightRect", "Trapezium", "Simpson ") for (i in 0..4) println("${methods[i]} = ${"%f".format(sum[i] * h)}") println()
}
fun main(args: Array<String>) {
integrate(0.0, 1.0, 100) { it * it * it } integrate(1.0, 100.0, 1_000) { 1.0 / it } integrate(0.0, 5000.0, 5_000_000) { it } integrate(0.0, 6000.0, 6_000_000) { it }
}</lang>
- Output:
LeftRect = 0.245025 MidRect = 0.249988 RightRect = 0.255025 Trapezium = 0.250025 Simpson = 0.250000 LeftRect = 4.654991 MidRect = 4.604763 RightRect = 4.556981 Trapezium = 4.605986 Simpson = 4.605170 LeftRect = 12499997.500000 MidRect = 12500000.000000 RightRect = 12500002.500000 Trapezium = 12500000.000000 Simpson = 12500000.000000 LeftRect = 17999997.000000 MidRect = 18000000.000000 RightRect = 18000003.000000 Trapezium = 18000000.000000 Simpson = 18000000.000000
Liberty BASIC
Running the big loop value would take a VERY long time & seems unnecessary.<lang lb> while 1
read x$ if x$ ="end" then print "**Over**": end
read a, b, N, knownValue
print " Function y ="; x$; " from "; a; " to "; b; " in "; N; " steps" print " Known exact value ="; knownValue
areaLR = IntegralByLeftRectangle( x$, a, b, N) areaRR = IntegralByRightRectangle( x$, a, b, N) areaMR = IntegralByMiddleRectangle( x$, a, b, N) areaTr = IntegralByTrapezium( x$, a, b, N) areaSi = IntegralBySimpsonRule( x$, a, b, N)
print "Left rectangle method "; using( "##########.##########", areaLR); " diff "; knownValue-areaLR; tab(70); (knownValue-areaLR)/knownValue*100;" %" print "Right rectangle method "; using( "##########.##########", areaRR); " diff "; knownValue-areaRR; tab(70); (knownValue-areaRR)/knownValue*100;" %" print "Middle rectangle method "; using( "##########.##########", areaMR); " diff "; knownValue-areaMR; tab(70); (knownValue-areaMR)/knownValue*100;" %" print "Trapezium method "; using( "##########.##########", areaTr); " diff "; knownValue-areaTr; tab(70); (knownValue-areaTr)/knownValue*100;" %" print "Simpson's Rule "; using( "##########.##########", areaSi); " diff "; knownValue-areaSi; tab(70); (knownValue-areaSi)/knownValue*100;" %"
wend
end
'------------------------------------------------------
'we have N sizes, that gives us N+1 points 'point 0 is a 'point N is b 'point i is xi =a +i *h 'Often, precision is (sharper?) then single step area 'So there should be EXACT number of steps, hence loop by integer i.
function IntegralByLeftRectangle( x$, a, b, N)
h = ( b -a) /N s = 0 for i = 0 to N -1 x = a +i *h s = s + h *eval( x$) next IntegralByLeftRectangle = s
end function
function IntegralByRightRectangle( x$, a, b, N)
h =( b -a) /N s = 0 for i =1 to N x = a +i *h s = s + h *eval( x$) next IntegralByRightRectangle = s
end function
function IntegralByMiddleRectangle( x$, a, b, N)
h =( b -a) /N s = 0 for i =0 to N -1 x = a +i *h +h /2 s = s + h *eval( x$) next IntegralByMiddleRectangle = s
end function
function IntegralByTrapezium( x$, a, b, N) 'Formula is h*((f(a)+f(b))/2 + sum_{i=1}^{N-1} (f(x_i)))
h =( b -a) /N x = a fa =eval( x$) x =b fb =eval( x$) s = h *( fa +fb) /2 for i =1 to N -1 x = a +i *h s = s + h *eval( x$) next IntegralByTrapezium = s
end function
function IntegralBySimpsonRule( x$, a, b, N)
'Simpson 'N should be even. if N mod 2 then N =N +1 'It really doesn't look right to double number of points from N to 2N - ' - this method is most accurate of all presented! 'So we use NN as N/2, and N will be 2NN 'Formula is h/6*( f(a)+f(b) + 4*(f(x_1)+f(x_3)+...+f(x_{2NN-1})+ 2*(f(x_2)+f(x_4)+...+f(x_{2NN-2})) ) 'Somehow I messed up h/6, h/3 and what is h, regarding "n=number of double intervals of size 2h" NN =N /2
h =( b -a) /N x =a fa =eval (x$) x =b fb =eval( x$) s = h /3 *( fa +fb) for i =1 to 2 *NN -1 step 2 x = a +i *h s = s + h /3 *4 *eval( x$) 'odd points next for i =2 to 2 *NN -2 step 2 x = a +i *h s = s + h /3 *2 *eval( x$) 'even points next
IntegralBySimpsonRule = s
end function
'======================================================= data "x^3", 0, 1, 100, 0.25 data "x^-1", 1, 100, 1000, 4.605170 data "x", 0, 5000, 1000, 12500000.0 ' should use 5 000 000 steps data "x", 0, 6000, 1000, 18000000.0 ' should use 6 000 000 steps data "end"
end </lang>
Numerical integration Function y =x^3 from 0 to 1 in 100 steps Known exact value =0.25 Left rectangle method 0.2450250000 diff 0.004975 1.99 % Right rectangle method 0.2550250000 diff -0.005025 -2.01 % Middle rectangle method 0.2499875000 diff 0.0000125 0.005 % Trapezium method 0.2500250000 diff -0.000025 -0.01 % Simpson's Rule 0.2500000000 diff 0.0 0.0 %
Function y =x^-1 from 1 to 100 in 1000 steps Known exact value =4.60517 Left rectangle method 4.6549910575 diff -0.49821058e-1 -1.08185056 % Right rectangle method 4.5569810575 diff 0.48188942e-1 1.04640963 % Middle rectangle method 4.6047625487 diff 0.40745132e-3 0.88476934e-2 % Trapezium method 4.6059860575 diff -0.81605751e-3 -0.17720464e-1 % Simpson's Rule 4.6051733163 diff -0.3316273e-5 -0.72011956e-4 %
Function y =x from 0 to 5000 in 1000 steps Known exact value =12500000 Left rectangle method 12487500.0000000000 diff 12500 0.1 % Right rectangle method 12512500.0000000000 diff -12500 -0.1 % Middle rectangle method 12500000.0000000000 diff 0 0 % Trapezium method 12500000.0000000000 diff 0 0 % Simpson's Rule 12500000.0000000000 diff 0 0 %
Function y =x from 0 to 6000 in 1000 steps Known exact value =18000000 Left rectangle method 17982000.0000000000 diff 18000 0.1 % Right rectangle method 18018000.0000000000 diff -18000 -0.1 % Middle rectangle method 18000000.0000000000 diff 0 0 % Trapezium method 18000000.0000000000 diff 0 0 % Simpson's Rule 18000000.0000000000 diff 0 0 %
Logo
<lang logo>to i.left :fn :x :step
output invoke :fn :x
end to i.right :fn :x :step
output invoke :fn :x + :step
end to i.mid :fn :x :step
output invoke :fn :x + :step/2
end to i.trapezium :fn :x :step
output ((i.left :fn :x :step) + (i.right :fn :x :step)) / 2
end to i.simpsons :fn :x :step
output ( (i.left :fn :x :step) + (i.mid :fn :x :step) * 4 + (i.right :fn :x :step) ) / 6
end
to integrate :method :fn :steps :a :b
localmake "step (:b - :a) / :steps localmake "sigma 0 ; for [x :a :b-:step :step] [make "sigma :sigma + apply :method (list :fn :x :step)] repeat :steps [ make "sigma :sigma + (invoke :method :fn :a :step) make "a :a + :step ] output :sigma * :step
end
to fn2 :x
output 2 / (1 + 4 * :x * :x)
end print integrate "i.left "fn2 4 -1 2 ; 2.456897 print integrate "i.right "fn2 4 -1 2 ; 2.245132 print integrate "i.mid "fn2 4 -1 2 ; 2.496091 print integrate "i.trapezium "fn2 4 -1 2 ; 2.351014 print integrate "i.simpsons "fn2 4 -1 2 ; 2.447732</lang>
Lua
<lang lua>function leftRect( f, a, b, n )
local h = (b - a) / n local x = a local sum = 0 for i = 1, 100 do sum = sum + a + f(x) x = x + h end
return sum * h
end
function rightRect( f, a, b, n )
local h = (b - a) / n local x = b local sum = 0 for i = 1, 100 do sum = sum + a + f(x) x = x - h end return sum * h
end
function midRect( f, a, b, n )
local h = (b - a) / n local x = a + h/2 local sum = 0 for i = 1, 100 do sum = sum + a + f(x) x = x + h end
return sum * h
end
function trapezium( f, a, b, n )
local h = (b - a) / n local x = a local sum = 0 for i = 1, 100 do sum = sum + f(x)*2 x = x + h end
return (b - a) * sum / (2 * n)
end
function simpson( f, a, b, n )
local h = (b - a) / n local sum1 = f(a + h/2) local sum2 = 0
for i = 1, n-1 do sum1 = sum1 + f(a + h * i + h/2) sum2 = sum2 + f(a + h * i) end
return (h/6) * (f(a) + f(b) + 4*sum1 + 2*sum2)
end
int_methods = { leftRect, rightRect, midRect, trapezium, simpson }
for i = 1, 5 do
print( int_methods[i]( function(x) return x^3 end, 0, 1, 100 ) ) print( int_methods[i]( function(x) return 1/x end, 1, 100, 1000 ) ) print( int_methods[i]( function(x) return x end, 0, 5000, 5000000 ) ) print( int_methods[i]( function(x) return x end, 0, 6000, 6000000 ) )
end</lang>
Mathematica
<lang Mathematica>leftRect[f_, a_Real, b_Real, N_Integer] :=
Module[{sum = 0, dx = (b - a)/N, x = a, n = N} , For[n = N, n > 0, n--, x += dx; sum += f[x];]; Return [ sum*dx ]]
rightRect[f_, a_Real, b_Real, N_Integer] :=
Module[{sum = 0, dx = (b - a)/N, x = a + (b - a)/N, n = N} , For[n = N, n > 0, n--, x += dx; sum += f[x];]; Return [ sum*dx ]]
midRect[f_, a_Real, b_Real, N_Integer] :=
Module[{sum = 0, dx = (b - a)/N, x = a + (b - a)/(2 N), n = N} , For[n = N, n > 0, n--, x += dx; sum += f[x];]; Return [ sum*dx ]]
trapezium[f_, a_Real, b_Real, N_Integer] :=
Module[{sum = f[a], dx = (b - a)/N, x = a, n = N} , For[n = 1, n < N, n++, x += dx; sum += 2 f[x];]; sum += f[b]; Return [ 0.5*sum*dx ]]
simpson[f_, a_Real, b_Real, N_Integer] :=
Module[{sum1 = f[a + (b - a)/(2 N)], sum2 = 0, dx = (b - a)/N, x = a, n = N} , For[n = 1, n < N, n++, sum1 += f[a + dx*n + dx/2]; sum2 += f[a + dx*n];]; Return [(dx/6)*(f[a] + f[b] + 4*sum1 + 2*sum2)]]</lang>
f[x_] := x^3 g[x_] := 1/x h[x_] := x Compare[t_] := Apply[ #1, t] & /@ {leftRect, rightRect, midRect, trapezium, simpson} AccountingForm[ Compare /@ {{f, 0., 1., 100}, {g, 1., 100., 1000}, {h, 0., 5000., 5000000}, {h, 0., 6000., 6000000}}] -> {{0.255025, 0.265328, 0.260138, 0.250025, 0.25}, {4.55698, 4.46789, 4.51142, 4.60599, 4.60517}, {12500003., 12500008., 12500005., 12500000., 12500000.}, {18000003., 18000009., 18000006., 18000000., 18000000.}}
MATLAB / Octave
For all of the examples given, the function that is passed to the method as parameter f is a function handle.
Function for performing left rectangular integration: leftRectIntegration.m <lang MATLAB>function integral = leftRectIntegration(f,a,b,n)
format long; width = (b-a)/n; %calculate the width of each devision x = linspace(a,b,n); %define x-axis integral = width * sum( f(x(1:n-1)) );
end</lang>
Function for performing right rectangular integration: rightRectIntegration.m <lang MATLAB>function integral = rightRectIntegration(f,a,b,n)
format long; width = (b-a)/n; %calculate the width of each devision x = linspace(a,b,n); %define x-axis integral = width * sum( f(x(2:n)) );
end</lang>
Function for performing mid-point rectangular integration: midPointRectIntegration.m <lang MATLAB>function integral = midPointRectIntegration(f,a,b,n)
format long; width = (b-a)/n; %calculate the width of each devision x = linspace(a,b,n); %define x-axis integral = width * sum( f( (x(1:n-1)+x(2:n))/2 ) );
end</lang>
Function for performing trapezoidal integration: trapezoidalIntegration.m <lang MATLAB>function integral = trapezoidalIntegration(f,a,b,n)
format long; x = linspace(a,b,n); %define x-axis integral = trapz( x,f(x) );
end</lang>
Simpson's rule for numerical integration is already included in MATLAB as "quad()". It is not the same as the above examples, instead of specifying the amount of points to divide the x-axis into, the programmer passes the acceptable error tolerance for the calculation (parameter "tol"). <lang MATLAB>integral = quad(f,a,b,tol)</lang>
Using anonymous functions
<lang MATLAB>trapezoidalIntegration(@(x)( exp(-(x.^2)) ),0,10,100000)
ans =
0.886226925452753</lang>
Using predefined functions
Built-in MATLAB function sin(x): <lang MATLAB>quad(@sin,0,pi,1/1000000000000)
ans =
2.000000000000000</lang>
User defined scripts and functions: fermiDirac.m <lang MATLAB>function answer = fermiDirac(x)
k = 8.617343e-5; %Boltazmann's Constant in eV/K answer = 1./( 1+exp( (x)/(k*2000) ) ); %Fermi-Dirac distribution with mu = 0 and T = 2000K
end</lang>
<lang MATLAB> rightRectIntegration(@fermiDirac,-1,1,1000000)
ans =
0.999998006023282</lang>
Maxima
<lang maxima>right_rect(e, x, a, b, n) := block([h: (b - a) / n, s: 0],
for i from 1 thru n do s: s + subst(x = a + i * h, e), s * h)$
left_rect(e, x, a, b, n) := block([h: (b - a) / n, s: 0],
for i from 1 thru n do s: s + subst(x = a + (i - 1) * h, e), s * h)$
mid_rect(e, x, a, b, n) := block([h: (b - a) / n, s: 0],
for i from 1 thru n do s: s + subst(x = a + (i - 1/2) * h, e), s * h)$
trapezium(e, x, a, b, n) := block([h: (b - a) / n, s: 0],
for i from 1 thru n - 1 do s: s + subst(x = a + i * h, e), ((subst(x = a, e) + subst(x = b, e)) / 2 + s) * h)$
simpson(e, x, a, b, n) := block([h: (b - a) / n, s: 0],
for i from 1 thru n do s: s + subst(x = a + i * h, e) + 2 * subst(x = a + (i - 1/2) * h, e), (subst(x = a, e) - subst(x = b, e) + 2 * s) * h / 6)$
/* some tests */
simpson(log(x), x, 1, 2, 20), bfloat; 2 * log(2) - 1 - %, bfloat;
trapezium(1/x, x, 1, 100, 10000) - log(100), bfloat;</lang>
Nim
<lang nim>type Function = proc(x: float): float type Rule = proc(f: Function; x, h: float): float
proc leftRect(f: Function; x, h: float): float =
f(x)
proc midRect(f: Function; x, h: float): float =
f(x + h/2.0)
proc rightRect(f: Function; x, h: float): float =
f(x + h)
proc trapezium(f: Function; x, h: float): float =
(f(x) + f(x+h)) / 2.0
proc simpson(f: Function, x, h: float): float =
(f(x) + 4.0*f(x+h/2.0) + f(x+h)) / 6.0
proc cube(x: float): float =
x * x *x
proc reciprocal(x: float): float =
1.0 / x
proc identity(x: float): float =
x
proc integrate(f: Function; a, b: float; steps: int; meth: Rule): float =
let h = (b-a) / float(steps) for i in 0 .. <steps: result += meth(f, a+float(i)*h, h) result = h * result
for fName, a, b, steps, fun in items(
[("cube", 0, 1, 100, cube), ("reciprocal", 1, 100, 1000, reciprocal), ("identity", 0, 5000, 5_000_000, identity), ("identity", 0, 6000, 6_000_000, identity)]):
for rName, rule in items({"leftRect": leftRect, "midRect": midRect, "rightRect": rightRect, "trapezium": trapezium, "simpson": simpson}):
echo fName, " integrated using ", rName echo " from ", a, " to ", b, " (", steps, " steps) = ", integrate(fun, float(a), float(b), steps, rule)</lang>
Output:
cube integrated using leftRect from 0 to 1 (100 steps) = 2.4502500000000005e-01 cube integrated using midRect from 0 to 1 (100 steps) = 2.4998750000000006e-01 cube integrated using rightRect from 0 to 1 (100 steps) = 2.5502500000000006e-01 cube integrated using trapezium from 0 to 1 (100 steps) = 2.5002500000000000e-01 cube integrated using simpson from 0 to 1 (100 steps) = 2.5000000000000000e-01 reciprocal integrated using leftRect from 1 to 100 (1000 steps) = 4.6549910575146800e+00 reciprocal integrated using midRect from 1 to 100 (1000 steps) = 4.6047625486783756e+00 reciprocal integrated using rightRect from 1 to 100 (1000 steps) = 4.5569810575146796e+00 reciprocal integrated using trapezium from 1 to 100 (1000 steps) = 4.6059860575146763e+00 reciprocal integrated using simpson from 1 to 100 (1000 steps) = 4.6051703849571330e+00 identity integrated using leftRect from 0 to 5000 (5000000 steps) = 1.2499997500000000e+07 identity integrated using midRect from 0 to 5000 (5000000 steps) = 1.2500000000000000e+07 identity integrated using rightRect from 0 to 5000 (5000000 steps) = 1.2500002500000000e+07 identity integrated using trapezium from 0 to 5000 (5000000 steps) = 1.2500000000000000e+07 identity integrated using simpson from 0 to 5000 (5000000 steps) = 1.2500000000000000e+07 identity integrated using leftRect from 0 to 6000 (6000000 steps) = 1.7999997000000004e+07 identity integrated using midRect from 0 to 6000 (6000000 steps) = 1.7999999999999993e+07 identity integrated using rightRect from 0 to 6000 (6000000 steps) = 1.8000003000000004e+07 identity integrated using trapezium from 0 to 6000 (6000000 steps) = 1.7999999999999993e+07 identity integrated using simpson from 0 to 6000 (6000000 steps) = 1.7999999999999993e+07
OCaml
The problem can be described as integrating using each of a set of methods, over a set of functions, so let us just build the solution in this modular way. First define the integration function:<lang ocaml>let integrate f a b steps meth =
let h = (b -. a) /. float_of_int steps in let rec helper i s = if i >= steps then s else helper (succ i) (s +. meth f (a +. h *. float_of_int i) h) in h *. helper 0 0.</lang>Then list the methods:<lang ocaml>let methods = [ ( "rect_l", fun f x _ -> f x); ( "rect_m", fun f x h -> f (x +. h /. 2.) ); ( "rect_r", fun f x h -> f (x +. h) ); ( "trap", fun f x h -> (f x +. f (x +. h)) /. 2. ); ( "simp", fun f x h -> (f x +. 4. *. f (x +. h /. 2.) +. f (x +. h)) /. 6. )
]</lang> and functions (with limits and steps)<lang ocaml>let functions = [
( "cubic", (fun x -> x*.x*.x), 0.0, 1.0, 100); ( "recip", (fun x -> 1.0/.x), 1.0, 100.0, 1000); ( "x to 5e3", (fun x -> x), 0.0, 5000.0, 5_000_000); ( "x to 6e3", (fun x -> x), 0.0, 6000.0, 6_000_000)
]</lang>and finally iterate the integration over both lists:<lang ocaml>let () =
List.iter (fun (s,f,lo,hi,n) -> Printf.printf "Testing function %s:\n" s; List.iter (fun (name,meth) -> Printf.printf " method %s gives %.15g\n" name (integrate f lo hi n meth) ) methods ) functions</lang>Giving the output:
Testing function cubic: method rect_l gives 0.245025 method rect_m gives 0.2499875 method rect_r gives 0.255025 method trap gives 0.250025 method simp gives 0.25 Testing function recip: method rect_l gives 4.65499105751468 method rect_m gives 4.60476254867838 method rect_r gives 4.55698105751468 method trap gives 4.60598605751468 method simp gives 4.60517038495713 Testing function x to 5e3: method rect_l gives 12499997.5 method rect_m gives 12500000 method rect_r gives 12500002.5 method trap gives 12500000 method simp gives 12500000 Testing function x to 6e3: method rect_l gives 17999997 method rect_m gives 18000000 method rect_r gives 18000003 method trap gives 18000000 method simp gives 18000000
PARI/GP
Note also that double exponential integration is available as intnum(x=a,b,f(x))
and Romberg integration is available as intnumromb(x=a,b,f(x))
.
<lang parigp>rectLeft(f, a, b, n)={
sum(i=0,n-1,f(a+(b-a)*i/n), 0.)*(b-a)/n
}; rectMid(f, a, b, n)={
sum(i=1,n,f(a+(b-a)*(i-.5)/n), 0.)*(b-a)/n
}; rectRight(f, a, b, n)={
sum(i=1,n,f(a+(b-a)*i/n), 0.)*(b-a)/n
}; trapezoidal(f, a, b, n)={
sum(i=1,n-1,f(a+(b-a)*i/n), f(a)/2+f(b)/2.)*(b-a)/n
}; Simpson(f, a, b, n)={
my(h=(b - a)/n, s); s = 2*sum(i=1,n-1, 2*f(a + h * (i+1/2)) + f(a + h * i) , 0.) + 4*f(a + h/2) + f(a) + f(b); s * h / 6
}; test(f, a, b, n)={
my(v=[rectLeft, rectMid, rectRight, trapezoidal, Simpson]); print("Testing function "f" on ",[a,b]," with "n" intervals:"); for(i=1,#v, print("\t"v[i](f, a, b, n)))
};
- \\ Turn on timer
test(x->x^3, 0, 1, 100) test(x->1/x, 1, 100, 1000) test(x->x, 0, 5000, 5000000) test(x->x, 0, 6000, 6000000)</lang>
Results:
Testing function (x)->x^3 on [0, 1] with 100 intervals: 0.2450249999999999998 0.2499874999999999998 0.2550249999999999998 0.2500249999999999998 0.2499999999999999999 time = 0 ms. Testing function (x)->1/x on [1, 100] with 1000 intervals: 4.654991057514676000 4.604762548678375026 4.556981057514676011 4.605986057514676146 4.605170384957142170 time = 15 ms. Testing function (x)->x on [0, 5000] with 5000000 intervals: 12499997.49999919783 12499999.99999917123 12500002.49999919783 12499999.99999919783 12499999.99999923745 time = 29,141 ms. Testing function (x)->x on [0, 6000] with 6000000 intervals: 17999996.99999869563 17999999.99999864542 18000002.99999869563 17999999.99999869563 17999999.99999863097 time = 34,820 ms.
Pascal
<lang pascal>function RectLeft(function f(x: real): real; xl, xr: real): real;
begin RectLeft := f(xl) end;
function RectMid(function f(x: real): real; xl, xr: real) : real;
begin RectMid := f((xl+xr)/2) end;
function RectRight(function f(x: real): real; xl, xr: real): real;
begin RectRight := f(xr) end;
function Trapezium(function f(x: real): real; xl, xr: real): real;
begin Trapezium := (f(xl) + f(xr))/2 end;
function Simpson(function f(x: real): real; xl, xr: real): real;
begin Simpson := (f(xl) + 4*f((xl+xr)/2) + f(xr))/6 end;
function integrate(function method(function f(x: real): real; xl, xr: real): real;
function f(x: real): real; a, b: real; n: integer); var integral, h: real; k: integer; begin integral := 0; h := (b-a)/n; for k := 0 to n-1 do begin integral := integral + method(f, a + k*h, a + (k+1)*h) end; integrate := integral end;</lang>
Perl
<lang perl>use feature 'say';
sub leftrect {
my($func, $a, $b, $n) = @_; my $h = ($b - $a) / $n; my $sum = 0; for ($_ = $a; $_ < $b; $_ += $h) { $sum += $func->($_) } $h * $sum
}
sub rightrect {
my($func, $a, $b, $n) = @_; my $h = ($b - $a) / $n; my $sum = 0; for ($_ = $a+$h; $_ < $b+$h; $_ += $h) { $sum += $func->($_) } $h * $sum
}
sub midrect {
my($func, $a, $b, $n) = @_; my $h = ($b - $a) / $n; my $sum = 0; for ($_ = $a + $h/2; $_ < $b; $_ += $h) { $sum += $func->($_) } $h * $sum
}
sub trapez {
my($func, $a, $b, $n) = @_; my $h = ($b - $a) / $n; my $sum = $func->($a) + $func->($b); for ($_ = $a+$h; $_ < $b; $_ += $h) { $sum += 2 * $func->($_) } $h/2 * $sum
} sub simpsons {
my($func, $a, $b, $n) = @_; my $h = ($b - $a) / $n; my $h2 = $h/2; my $sum1 = $func->($a + $h2); my $sum2 = 0;
for ($_ = $a+$h; $_ < $b; $_ += $h) { $sum1 += $func->($_ + $h2); $sum2 += $func->($_); } $h/6 * ($func->($a) + $func->($b) + 4*$sum1 + 2*$sum2)
}
- round where needed, display in a reasonable format
sub sig {
my($value) = @_; my $rounded; if ($value < 10) { $rounded = sprintf '%.6f', $value; $rounded =~ s/(\.\d*[1-9])0+$/$1/; $rounded =~ s/\.0+$//; } else { $rounded = sprintf "%.1f", $value; $rounded =~ s/\.0+$//; } return $rounded;
}
sub integrate {
my($func, $a, $b, $n, $exact) = @_;
my $f = sub { local $_ = shift; eval $func };
my @res; push @res, "$func\n in [$a..$b] / $n"; push @res, ' exact result: ' . rnd($exact); push @res, ' rectangle method left: ' . rnd( leftrect($f, $a, $b, $n)); push @res, ' rectangle method right: ' . rnd(rightrect($f, $a, $b, $n)); push @res, ' rectangle method mid: ' . rnd( midrect($f, $a, $b, $n)); push @res, 'composite trapezoidal rule: ' . rnd( trapez($f, $a, $b, $n)); push @res, ' quadratic simpsons rule: ' . rnd( simpsons($f, $a, $b, $n)); @res;
} say for integrate('$_ ** 3', 0, 1, 100, 0.25); say ; say for integrate('1 / $_', 1, 100, 1000, log(100)); say ; say for integrate('$_', 0, 5_000, 5_000_000, 12_500_000); say ; say for integrate('$_', 0, 6_000, 6_000_000, 18_000_000);</lang>
- Output:
$_ ** 3 in [0..1] / 100 exact result: 0.25 rectangle method left: 0.245025 rectangle method right: 0.255025 rectangle method mid: 0.249988 composite trapezoidal rule: 0.250025 quadratic simpsons rule: 0.25 1 / $_ in [1..100] / 1000 exact result: 4.60517 rectangle method left: 4.654991 rectangle method right: 4.556981 rectangle method mid: 4.604763 composite trapezoidal rule: 4.605986 quadratic simpsons rule: 4.60517 $_ in [0..5000] / 5000000 exact result: 12500000 rectangle method left: 12499997.5 rectangle method right: 12500002.5 rectangle method mid: 12500000 composite trapezoidal rule: 12500000 quadratic simpsons rule: 12500000 $_ in [0..6000] / 6000000 exact result: 18000000 rectangle method left: 17999997 rectangle method right: 18000003 rectangle method mid: 18000000 composite trapezoidal rule: 18000000 quadratic simpsons rule: 18000000
Perl 6
The addition of Promise/await allows for concurrent computation, and brings a significant speed-up in running time. Which is not to say that it makes this code fast, but it does make it less slow.
Note that these integrations are done with rationals rather than floats, so should be fairly precise (though of course with so few iterations they are not terribly accurate (except when they are)). Some of the sums do overflow into Num (floating point)--currently Rakudo allows 64-bit denominators--but at least all of the interval arithmetic is exact.
<lang perl6>use MONKEY-SEE-NO-EVAL;
sub leftrect(&f, $a, $b, $n) {
my $h = ($b - $a) / $n; $h * [+] do f($_) for $a, $a+$h ... $b-$h;
}
sub rightrect(&f, $a, $b, $n) {
my $h = ($b - $a) / $n; $h * [+] do f($_) for $a+$h, $a+$h+$h ... $b;
}
sub midrect(&f, $a, $b, $n) {
my $h = ($b - $a) / $n; $h * [+] do f($_) for $a+$h/2, $a+$h+$h/2 ... $b-$h/2;
}
sub trapez(&f, $a, $b, $n) {
my $h = ($b - $a) / $n; my $partial-sum += f($_) * 2 for $a+$h, $a+$h+$h ... $b-$h; $h / 2 * [+] f($a), f($b), $partial-sum;
}
sub simpsons(&f, $a, $b, $n) {
my $h = ($b - $a) / $n; my $h2 = $h/2; my $sum1 = f($a + $h2); my $sum2 = 0; for $a+$h, *+$h ... $b-$h { $sum1 += f($_ + $h2); $sum2 += f($_); } ($h / 6) * (f($a) + f($b) + 4*$sum1 + 2*$sum2);
}
sub integrate($f, $a, $b, $n, $exact) {
my @r0; my $e = 0.000001; @r0.push: "$f\n in [$a..$b] / $n\n"; @r0.push: ' exact result: '~ $exact.round($e);
my (@r1,@r2,@r3,@r4,@r5); my &f; EVAL "&f = $f"; my $p1 = Promise.start( { @r1.push: ' rectangle method left: '~ leftrect(&f, $a, $b, $n).round($e) } ); my $p2 = Promise.start( { @r2.push: ' rectangle method right: '~ rightrect(&f, $a, $b, $n).round($e) } ); my $p3 = Promise.start( { @r3.push: ' rectangle method mid: '~ midrect(&f, $a, $b, $n).round($e) } ); my $p4 = Promise.start( { @r4.push: 'composite trapezoidal rule: '~ trapez(&f, $a, $b, $n).round($e) } ); my $p5 = Promise.start( { @r5.push: ' quadratic simpsons rule: '~ simpsons(&f, $a, $b, $n).round($e) } );
await $p1, $p2, $p3, $p4, $p5; @r0, @r1, @r2, @r3, @r4, @r5;
}
.say for integrate '{ $_ ** 3 }', 0, 1, 100, 0.25; say ; .say for integrate '1 / *', 1, 100, 1000, log(100); say ; .say for integrate '*.self', 0, 5_000, 5_000_000, 12_500_000; say ; .say for integrate '*.self', 0, 6_000, 6_000_000, 18_000_000;</lang>
- Output:
{ $_ ** 3 } in [0..1] / 100 exact result: 0.25 rectangle method left: 0.245025 rectangle method right: 0.255025 rectangle method mid: 0.249988 composite trapezoidal rule: 0.250025 quadratic simpsons rule: 0.25 1 / * in [1..100] / 1000 exact result: 4.60517 rectangle method left: 4.654991 rectangle method right: 4.556981 rectangle method mid: 4.604763 composite trapezoidal rule: 4.605986 quadratic simpsons rule: 4.60517 *.self in [0..5000] / 5000000 exact result: 12500000 rectangle method left: 12499997.5 rectangle method right: 12500002.5 rectangle method mid: 12500000 composite trapezoidal rule: 12500000 quadratic simpsons rule: 12500000 *.self in [0..6000] / 6000000 exact result: 18000000 rectangle method left: 17999997 rectangle method right: 18000003 rectangle method mid: 18000000 composite trapezoidal rule: 18000000 quadratic simpsons rule: 18000000
Phix
<lang Phix>function rect_left(integer rid, atom x, atom h)
if atom(h) then end if -- suppress warning return call_func(rid,{x})
end function
function rect_mid(integer rid, atom x, atom h)
return call_func(rid,{x+h/2})
end function
function rect_right(integer rid, atom x, atom h)
return call_func(rid,{x+h})
end function
function trapezium(integer rid, atom x, atom h)
return (call_func(rid,{x})+call_func(rid,{x+h}))/2
end function
function simpson(integer rid, atom x, atom h)
return (call_func(rid,{x})+4*call_func(rid,{x+h/2})+call_func(rid,{x+h}))/6
end function
function cubed(atom x)
return power(x,3)
end function
function recip(atom x)
return 1/x
end function
function ident(atom x)
return x
end function
function integrate(integer m_id, integer f_id, atom a, atom b, integer steps) atom accum = 0,
h = (b-a)/steps for i=0 to steps-1 do accum += call_func(m_id,{f_id,a+h*i,h}) end for return h*accum
end function
function smartp(atom N) string res
if N=floor(N) then return sprintf("%d",N) end if res = sprintf("%12f",round(N,1000000)) if find('.',res) then res = trim_tail(res,"0") res = trim_tail(res,".") end if return res
end function
procedure test(sequence tests) string name atom a, b, steps, rid
printf(1,"Function Range Iterations L-Rect M-Rect R-Rect Trapeze Simpson\n") for i=1 to length(tests) do {name,a,b,steps,rid} = tests[i] printf(1," %-5s %6d - %-5d %10d %12s %12s %12s %12s %12s\n",{name,a,b,steps, smartp(integrate(routine_id("rect_left"), rid,a,b,steps)), smartp(integrate(routine_id("rect_mid"), rid,a,b,steps)), smartp(integrate(routine_id("rect_right"), rid,a,b,steps)), smartp(integrate(routine_id("trapezium"), rid,a,b,steps)), smartp(integrate(routine_id("simpson"), rid,a,b,steps))}) end for
end procedure
constant tests = {{"x^3", 0, 1, 100, routine_id("cubed")},
{"1/x", 1, 100, 1000, routine_id("recip")}, {"x", 0, 5000, 5000000, routine_id("ident")}, {"x", 0, 6000, 6000000, routine_id("ident")}}
test(tests)</lang>
- Output:
Function Range Iterations L-Rect M-Rect R-Rect Trapeze Simpson x^3 0 - 1 100 0.245025 0.249988 0.255025 0.250025 0.25 1/x 1 - 100 1000 4.654991 4.604763 4.556981 4.605986 4.60517 x 0 - 5000 5000000 12499997.5 12500000 12500002.5 12500000 12500000 x 0 - 6000 6000000 17999997 18000000 18000003 18000000 18000000
PL/I
<lang PL/I> integrals: procedure options (main);
/* The function to be integrated */ f: procedure (x) returns (float);
declare x float; return (3*x**2 + 2*x);
end f;
declare (a, b) float; declare (rect_area, trap_area, Simpson) float; declare (d, dx) fixed decimal (10,2); declare (l, r) float; declare (S1, S2) float;
l = 0; r = 5; a = 0; b = 5; /* bounds of integration */ dx = 0.05;
/* Rectangle method */ rect_area = 0; do d = a to b by dx; rect_area = rect_area + dx*f(d); end; put skip data (rect_area);
/* trapezoid method */ trap_area = 0; do d = a to b by dx; trap_area = trap_area + dx*(f(d) + f(d+dx))/2; end; put skip data (trap_area);
/* Simpson's */ S1 = f(a+dx/2); S2 = 0; do d = a to b by dx; S1 = S1 + f(d+dx+dx/2); S2 = S2 + f(d+dx); end; Simpson = dx * (f(a) + f(b) + 4*S1 + 2*S2) / 6; put skip data (Simpson);
end integrals; </lang>
PicoLisp
<lang PicoLisp>(scl 6)
(de leftRect (Fun X)
(Fun X) )
(de rightRect (Fun X H)
(Fun (+ X H)) )
(de midRect (Fun X H)
(Fun (+ X (/ H 2))) )
(de trapezium (Fun X H)
(/ (+ (Fun X) (Fun (+ X H))) 2) )
(de simpson (Fun X H)
(*/ (+ (Fun X) (* 4 (Fun (+ X (/ H 2)))) (Fun (+ X H)) ) 6 ) )
(de square (X)
(*/ X X 1.0) )
(de integrate (Fun From To Steps Meth)
(let (H (/ (- To From) Steps) Sum 0) (for (X From (>= (- To H) X) (+ X H)) (inc 'Sum (Meth Fun X H)) ) (*/ H Sum 1.0) ) )
(prinl (round (integrate square 3.0 7.0 30 simpson)))</lang> Output:
105.333
PureBasic
<lang PureBasic>Prototype.d TestFunction(Arg.d)
Procedure.d LeftIntegral(Start, Stop, Steps, *func.TestFunction)
Protected.d n=(Stop-Start)/Steps, sum, x=Start While x <= Stop-n sum + n * *func(x) x + n Wend ProcedureReturn sum
EndProcedure
Procedure.d MidIntegral(Start, Stop, Steps, *func.TestFunction)
Protected.d n=(Stop-Start)/Steps, sum, x=Start While x <= Stop-n sum + n * *func(x+n/2) x + n Wend ProcedureReturn sum
EndProcedure
Procedure.d RightIntegral(Start, Stop, Steps, *func.TestFunction)
Protected.d n=(Stop-Start)/Steps, sum, x=Start While x < Stop x + n sum + n * *func(x) Wend ProcedureReturn sum
EndProcedure
Procedure.d Trapezium(Start, Stop, Steps, *func.TestFunction)
Protected.d n=(Stop-Start)/Steps, sum, x=Start While x<=Stop sum + n * (*func(x) + *func(x+n))/2 x+n Wend ProcedureReturn sum
EndProcedure
Procedure.d Simpson(Start, Stop, Steps, *func.TestFunction)
Protected.d n=(Stop-Start)/Steps, sum1, sum2, x=Start Protected i For i=0 To steps-1 sum1+ *func(Start+n*i+n/2) Next For i=1 To Steps-1 sum2+ *func(Start+n*i) Next ProcedureReturn n * (*func(Start)+ *func(Stop)+4*sum1+2*sum2) / 6
EndProcedure
- - Set up functions to integrate
Procedure.d Test1(n.d)
ProcedureReturn n*n*n
EndProcedure
Procedure.d Test2(n.d)
ProcedureReturn 1/n
EndProcedure
- This function should be integrated as a integer function, but for
- comparably this will stay as a float.
Procedure.d Test3(n.d)
ProcedureReturn n
EndProcedure
- - Test the code & present the results
CompilerIf #PB_Compiler_Debugger
MessageRequester("Notice!","Running this program in Debug-mode will be slow")
CompilerEndIf
- = 0.25
Define Answer$ Answer$="Left ="+StrD(LeftIntegral (0,1,100,@Test1()))+#CRLF$ Answer$+"Mid ="+StrD(MidIntegral (0,1,100,@Test1()))+#CRLF$ Answer$+"Right ="+StrD(RightIntegral(0,1,100,@Test1()))+#CRLF$ Answer$+"Trapezium="+StrD(Trapezium (0,1,100,@Test1()))+#CRLF$ Answer$+"Simpson ="+StrD(Simpson (0,1,100,@Test1())) MessageRequester("Answer should be 1/4",Answer$)
- = Ln(100) e.g. ~4.60517019...
Answer$="Left ="+StrD(LeftIntegral (1,100,1000,@Test2()))+#CRLF$ Answer$+"Mid ="+StrD(MidIntegral (1,100,1000,@Test2()))+#CRLF$ Answer$+"Right ="+StrD(RightIntegral (1,100,1000,@Test2()))+#CRLF$ Answer$+"Trapezium="+StrD(Trapezium (1,100,1000,@Test2()))+#CRLF$ Answer$+"Simpson ="+StrD(Simpson (1,100,1000,@Test2())) MessageRequester("Answer should be Ln(100), e.g. ~4.60517019",Answer$)
- 12,500,000
Answer$="Left ="+StrD(LeftIntegral (0,5000,5000000,@Test3()))+#CRLF$ Answer$+"Mid ="+StrD(MidIntegral (0,5000,5000000,@Test3()))+#CRLF$ Answer$+"Right ="+StrD(RightIntegral (0,5000,5000000,@Test3()))+#CRLF$ Answer$+"Trapezium="+StrD(Trapezium (0,5000,5000000,@Test3()))+#CRLF$ Answer$+"Simpson ="+StrD(Simpson (0,5000,5000000,@Test3())) MessageRequester("Answer should be 12,500,000",Answer$)
- 18,000,000
Answer$="Left ="+StrD(LeftIntegral (0,6000,6000000,@Test3()))+#CRLF$ Answer$+"Mid ="+StrD(MidIntegral (0,6000,6000000,@Test3()))+#CRLF$ Answer$+"Right ="+StrD(RightIntegral (0,6000,6000000,@Test3()))+#CRLF$ Answer$+"Trapezium="+StrD(Trapezium (0,6000,6000000,@Test3()))+#CRLF$ Answer$+"Simpson ="+StrD(Simpson (0,6000,6000000,@Test3())) MessageRequester("Answer should be 18,000,000",Answer$) </lang>
Left =0.2353220100 Mid =0.2401367513 Right =0.2550250000 Trapezium=0.2500250000 Simpson =0.2500000000 Left =4.6540000764 Mid =4.6037720584 Right =4.5569810575 Trapezium=4.6059860575 Simpson =4.6051703850 Left =12499992.5007297550 Mid =12499995.0007292630 Right =12500002.5007287540 Trapezium=12500000.0007287620 Simpson =12500000.0000000000 Left =17999991.0013914930 Mid =17999994.0013910230 Right =18000003.0013904940 Trapezium=18000000.0013905240 Simpson =17999999.9999999960
Python
Answers are first given using floating point arithmatic, then using fractions, only converted to floating point on output. <lang python>from fractions import Fraction
def left_rect(f,x,h):
return f(x)
def mid_rect(f,x,h):
return f(x + h/2)
def right_rect(f,x,h):
return f(x+h)
def trapezium(f,x,h):
return (f(x) + f(x+h))/2.0
def simpson(f,x,h):
return (f(x) + 4*f(x + h/2) + f(x+h))/6.0
def cube(x):
return x*x*x
def reciprocal(x):
return 1/x
def identity(x):
return x
def integrate( f, a, b, steps, meth):
h = (b-a)/steps ival = h * sum(meth(f, a+i*h, h) for i in range(steps)) return ival
- Tests
for a, b, steps, func in ((0., 1., 100, cube), (1., 100., 1000, reciprocal)):
for rule in (left_rect, mid_rect, right_rect, trapezium, simpson): print('%s integrated using %s\n from %r to %r (%i steps) = %r' % (func.__name__, rule.__name__, a, b, steps, integrate( func, a, b, steps, rule))) a, b = Fraction.from_float(a), Fraction.from_float(b) for rule in (left_rect, mid_rect, right_rect, trapezium, simpson): print('%s integrated using %s\n from %r to %r (%i steps and fractions) = %r' % (func.__name__, rule.__name__, a, b, steps, float(integrate( func, a, b, steps, rule))))
- Extra tests (compute intensive)
for a, b, steps, func in ((0., 5000., 5000000, identity),
(0., 6000., 6000000, identity)): for rule in (left_rect, mid_rect, right_rect, trapezium, simpson): print('%s integrated using %s\n from %r to %r (%i steps) = %r' % (func.__name__, rule.__name__, a, b, steps, integrate( func, a, b, steps, rule))) a, b = Fraction.from_float(a), Fraction.from_float(b) for rule in (left_rect, mid_rect, right_rect, trapezium, simpson): print('%s integrated using %s\n from %r to %r (%i steps and fractions) = %r' % (func.__name__, rule.__name__, a, b, steps, float(integrate( func, a, b, steps, rule))))</lang>
Tests <lang python>for a, b, steps, func in ((0., 1., 100, cube), (1., 100., 1000, reciprocal)):
for rule in (left_rect, mid_rect, right_rect, trapezium, simpson): print('%s integrated using %s\n from %r to %r (%i steps) = %r' % (func.__name__, rule.__name__, a, b, steps, integrate( func, a, b, steps, rule))) a, b = Fraction.from_float(a), Fraction.from_float(b) for rule in (left_rect, mid_rect, right_rect, trapezium, simpson): print('%s integrated using %s\n from %r to %r (%i steps and fractions) = %r' % (func.__name__, rule.__name__, a, b, steps, float(integrate( func, a, b, steps, rule))))
- Extra tests (compute intensive)
for a, b, steps, func in ((1., 5000., 5000000, identity),
(1., 6000., 6000000, identity)): for rule in (left_rect, mid_rect, right_rect, trapezium, simpson): print('%s integrated using %s\n from %r to %r (%i steps) = %r' % (func.__name__, rule.__name__, a, b, steps, integrate( func, a, b, steps, rule))) a, b = Fraction.from_float(a), Fraction.from_float(b) for rule in (left_rect, mid_rect, right_rect, trapezium, simpson): print('%s integrated using %s\n from %r to %r (%i steps and fractions) = %r' % (func.__name__, rule.__name__, a, b, steps, float(integrate( func, a, b, steps, rule))))</lang>
Sample test Output
cube integrated using left_rect from 0.0 to 1.0 (100 steps) = 0.24502500000000005 cube integrated using mid_rect from 0.0 to 1.0 (100 steps) = 0.24998750000000006 cube integrated using right_rect from 0.0 to 1.0 (100 steps) = 0.25502500000000006 cube integrated using trapezium from 0.0 to 1.0 (100 steps) = 0.250025 cube integrated using simpson from 0.0 to 1.0 (100 steps) = 0.25 cube integrated using left_rect from Fraction(0, 1) to Fraction(1, 1) (100 steps and fractions) = 0.245025 cube integrated using mid_rect from Fraction(0, 1) to Fraction(1, 1) (100 steps and fractions) = 0.2499875 cube integrated using right_rect from Fraction(0, 1) to Fraction(1, 1) (100 steps and fractions) = 0.255025 cube integrated using trapezium from Fraction(0, 1) to Fraction(1, 1) (100 steps and fractions) = 0.250025 cube integrated using simpson from Fraction(0, 1) to Fraction(1, 1) (100 steps and fractions) = 0.25 reciprocal integrated using left_rect from 1.0 to 100.0 (1000 steps) = 4.65499105751468 reciprocal integrated using mid_rect from 1.0 to 100.0 (1000 steps) = 4.604762548678376 reciprocal integrated using right_rect from 1.0 to 100.0 (1000 steps) = 4.55698105751468 reciprocal integrated using trapezium from 1.0 to 100.0 (1000 steps) = 4.605986057514676 reciprocal integrated using simpson from 1.0 to 100.0 (1000 steps) = 4.605170384957133 reciprocal integrated using left_rect from Fraction(1, 1) to Fraction(100, 1) (1000 steps and fractions) = 4.654991057514676 reciprocal integrated using mid_rect from Fraction(1, 1) to Fraction(100, 1) (1000 steps and fractions) = 4.604762548678376 reciprocal integrated using right_rect from Fraction(1, 1) to Fraction(100, 1) (1000 steps and fractions) = 4.556981057514676 reciprocal integrated using trapezium from Fraction(1, 1) to Fraction(100, 1) (1000 steps and fractions) = 4.605986057514677 reciprocal integrated using simpson from Fraction(1, 1) to Fraction(100, 1) (1000 steps and fractions) = 4.605170384957134 identity integrated using left_rect from 0.0 to 5000.0 (5000000 steps) = 12499997.5 identity integrated using mid_rect from 0.0 to 5000.0 (5000000 steps) = 12500000.0 identity integrated using right_rect from 0.0 to 5000.0 (5000000 steps) = 12500002.5 identity integrated using trapezium from 0.0 to 5000.0 (5000000 steps) = 12500000.0 identity integrated using simpson from 0.0 to 5000.0 (5000000 steps) = 12500000.0 identity integrated using left_rect from Fraction(0, 1) to Fraction(5000, 1) (5000000 steps and fractions) = 12499997.5 identity integrated using mid_rect from Fraction(0, 1) to Fraction(5000, 1) (5000000 steps and fractions) = 12500000.0 identity integrated using right_rect from Fraction(0, 1) to Fraction(5000, 1) (5000000 steps and fractions) = 12500002.5 identity integrated using trapezium from Fraction(0, 1) to Fraction(5000, 1) (5000000 steps and fractions) = 12500000.0 identity integrated using simpson from Fraction(0, 1) to Fraction(5000, 1) (5000000 steps and fractions) = 12500000.0 identity integrated using left_rect from 0.0 to 6000.0 (6000000 steps) = 17999997.000000004 identity integrated using mid_rect from 0.0 to 6000.0 (6000000 steps) = 17999999.999999993 identity integrated using right_rect from 0.0 to 6000.0 (6000000 steps) = 18000003.000000004 identity integrated using trapezium from 0.0 to 6000.0 (6000000 steps) = 17999999.999999993 identity integrated using simpson from 0.0 to 6000.0 (6000000 steps) = 17999999.999999993 identity integrated using left_rect from Fraction(0, 1) to Fraction(6000, 1) (6000000 steps and fractions) = 17999997.0 identity integrated using mid_rect from Fraction(0, 1) to Fraction(6000, 1) (6000000 steps and fractions) = 18000000.0 identity integrated using right_rect from Fraction(0, 1) to Fraction(6000, 1) (6000000 steps and fractions) = 18000003.0 identity integrated using trapezium from Fraction(0, 1) to Fraction(6000, 1) (6000000 steps and fractions) = 17999999.999999993 identity integrated using simpson from Fraction(0, 1) to Fraction(6000, 1) (6000000 steps and fractions) = 17999999.999999993
A faster Simpson's rule integrator is <lang python>def faster_simpson(f, a, b, steps):
h = (b-a)/float(steps) a1 = a+h/2 s1 = sum( f(a1+i*h) for i in range(0,steps)) s2 = sum( f(a+i*h) for i in range(1,steps)) return (h/6.0)*(f(a)+f(b)+4.0*s1+2.0*s2)</lang>
R
These presume that f can take a vector argument.
<lang R>integrate.rect <- function(f, a, b, n, k=0) {
#k = 0 for left, 1 for right, 0.5 for midpoint h <- (b-a)/n x <- seq(a, b, len=n+1) sum(f(x[-1]-h*(1-k)))*h
}
integrate.trapezoid <- function(f, a, b, n) {
h <- (b-a)/n x <- seq(a, b, len=n+1) fx <- f(x) sum(fx[-1] + fx[-length(x)])*h/2
}
integrate.simpsons <- function(f, a, b, n) {
h <- (b-a)/n x <- seq(a, b, len=n+1) fx <- f(x) sum(fx[-length(x)] + 4*f(x[-1]-h/2) + fx[-1]) * h/6
}
f1 <- (function(x) {x^3}) f2 <- (function(x) {1/x}) f3 <- (function(x) {x}) f4 <- (function(x) {x})
integrate.simpsons(f1,0,1,100) #0.25 integrate.simpsons(f2,1,100,1000) # 4.60517 integrate.simpsons(f3,0,5000,5000000) # 12500000 integrate.simpsons(f4,0,6000,6000000) # 1.8e+07
integrate.rect(f1,0,1,100,0) #TopLeft 0.245025 integrate.rect(f1,0,1,100,0.5) #Mid 0.2499875 integrate.rect(f1,0,1,100,1) #TopRight 0.255025
integrate.trapezoid(f1,0,1,100) # 0.250025</lang>
Racket
<lang racket>
- lang racket
(define (integrate f a b steps meth)
(define h (/ (- b a) steps)) (* h (for/sum ([i steps]) (meth f (+ a (* h i)) h))))
(define (left-rect f x h) (f x)) (define (mid-rect f x h) (f (+ x (/ h 2)))) (define (right-rect f x h)(f (+ x h))) (define (trapezium f x h) (/ (+ (f x) (f (+ x h))) 2)) (define (simpson f x h) (/ (+ (f x) (* 4 (f (+ x (/ h 2)))) (f (+ x h))) 6))
(define (test f a b s n)
(displayln n) (for ([meth (list left-rect mid-rect right-rect trapezium simpson)] [name '( left-rect mid-rect right-rect trapezium simpson)]) (displayln (~a name ":\t" (integrate f a b s meth)))) (newline))
(test (λ(x) (* x x x)) 0. 1. 100 "CUBED") (test (λ(x) (/ x)) 1. 100. 1000 "RECIPROCAL") (test (λ(x) x) 0. 5000. 5000000 "IDENTITY") (test (λ(x) x) 0. 6000. 6000000 "IDENTITY") </lang> Output: <lang racket> CUBED left-rect: 0.24502500000000005 mid-rect: 0.24998750000000006 right-rect: 0.25502500000000006 trapezium: 0.250025 simpson: 0.25
RECIPROCAL left-rect: 4.65499105751468 mid-rect: 4.604762548678376 right-rect: 4.55698105751468 trapezium: 4.605986057514676 simpson: 4.605170384957133
IDENTITY left-rect: 12499997.5 mid-rect: 12500000.0 right-rect: 12500002.5 trapezium: 12500000.0 simpson: 12500000.0
IDENTITY left-rect: 17999997.000000004 mid-rect: 17999999.999999993 right-rect: 18000003.000000004 trapezium: 17999999.999999993 simpson: 17999999.999999993 </lang>
REXX
Note: there was virtually no difference between numeric digits 9 (the default) and numeric digits 20. <lang rexx>/*REXX pgm performs numerical integration using 5 different algorithms and show results.*/ numeric digits 20 /*use twenty decimal digits precision. */
do test=1 for 4 /*perform the 4 different test suites. */ if test==1 then do; L=0; H= 1; i= 100; end if test==2 then do; L=1; H= 100; i= 1000; end if test==3 then do; L=0; H=5000; i=5000000; end if test==4 then do; L=0; H=6000; i=5000000; end say say center('test' test,65,'─') /*display a header for the test suite. */ say ' left rectangular('L", "H', 'i") ──► " left_rect(L, H, i) say ' midpoint rectangular('L", "H', 'i") ──► " midpoint_rect(L, H, i) say ' right rectangular('L", "H', 'i") ──► " right_rect(L, H, i) say ' Simpson('L", "H', 'i") ──► " Simpson(L, H, i) say ' trapezium('L", "H', 'i") ──► " trapezium(L, H, i) end /*test*/
exit /*stick a fork in it, we're all done. */ /*──────────────────────────────────────────────────────────────────────────────────────*/ f: if test==1 then return arg(1)**3 /*choose the cube function. */
if test==2 then return 1/arg(1) /* " " reciprocal " */ return arg(1) /* " " "as-is" " */
/*──────────────────────────────────────────────────────────────────────────────────────*/ left_rect: procedure expose test; parse arg a,b,n; h=(b-a)/n
$=0 do x=a by h for n; $=$+f(x); end /*x*/ return $*h/1
/*──────────────────────────────────────────────────────────────────────────────────────*/ midpoint_rect: procedure expose test; parse arg a,b,n; h=(b-a)/n
$=0 do x=a+h/2 by h for n; $=$+f(x); end /*x*/ return $*h/1
/*──────────────────────────────────────────────────────────────────────────────────────*/ right_rect: procedure expose test; parse arg a,b,n; h=(b-a)/n
$=0 do x=a+h by h for n; $=$+f(x); end /*x*/ return $*h/1
/*──────────────────────────────────────────────────────────────────────────────────────*/ Simpson: procedure expose test; parse arg a,b,n; h=(b-a)/n
$=f(a+h/2) @=0; do x=1 for n-1; $=$+f(a+h*x+h*.5); @=@+f(a+x*h); end /*x*/ return h*(f(a) + f(b) + 4*$ + 2*@) / 6
/*──────────────────────────────────────────────────────────────────────────────────────*/ trapezium: procedure expose test; parse arg a,b,n; h=(b-a)/n
$=0 do x=a by h for n; $=$+(f(x)+f(x+h)); end /*x*/ return $*h/2</lang>
output
─────────────────────────────test 1────────────────────────────── left rectangular(0, 1, 100) ──► 0.245025 midpoint rectangular(0, 1, 100) ──► 0.2499875 right rectangular(0, 1, 100) ──► 0.255025 Simpson(0, 1, 100) ──► 0.25 trapezium(0, 1, 100) ──► 0.250025 ─────────────────────────────test 2────────────────────────────── left rectangular(1, 100, 1000) ──► 4.6549910575146761473 midpoint rectangular(1, 100, 1000) ──► 4.604762548678375185 right rectangular(1, 100, 1000) ──► 4.5569810575146761472 Simpson(1, 100, 1000) ──► 4.6051703849571421725 trapezium(1, 100, 1000) ──► 4.605986057514676146 ─────────────────────────────test 3────────────────────────────── left rectangular(0, 5000, 5000000) ──► 12499997.5 midpoint rectangular(0, 5000, 5000000) ──► 12500000 right rectangular(0, 5000, 5000000) ──► 12500002.5 Simpson(0, 5000, 5000000) ──► 12500000 trapezium(0, 5000, 5000000) ──► 12500000 ─────────────────────────────test 4────────────────────────────── left rectangular(0, 6000, 5000000) ──► 17999996.4 midpoint rectangular(0, 6000, 5000000) ──► 18000000 right rectangular(0, 6000, 5000000) ──► 18000003.6 Simpson(0, 6000, 5000000) ──► 18000000 trapezium(0, 6000, 5000000) ──► 18000000
Ring
<lang ring>
- Project : Numerical integration
decimals(8) data = [["pow(x,3)",0,1,100], ["1/x",1, 100,1000], ["x",0,5000,5000000], ["x",0,6000,6000000]] see "Function Range L-Rect R-Rect M-Rect Trapeze Simpson" + nl for p = 1 to 4
d1 = data[p][1] d2 = data[p][2] d3 = data[p][3] d4 = data[p][4] see "" + d1 + " " + d2 + " - " + d3 + " " + lrect(d1, d2, d3, d4) + " " + rrect(d1, d2, d3, d4) see " " + mrect(d1, d2, d3, d4) + " " + trapeze(d1, d2, d3, d4) + " " + simpson(d1, d2, d3, d4) + nl
next
func lrect(x2, a, b, n)
s = 0 d = (b - a) / n x = a for i = 1 to n eval("result = " + x2) s = s + d * result x = x + d next return s
func rrect(x2, a, b, n)
s = 0 d = (b - a) / n x = a for i = 1 to n x = x + d eval("result = " + x2) s = s + d *result next return s
func mrect(x2, a, b, n)
s = 0 d = (b - a) / n x = a for i = 1 to n x = x + d/2 eval("result = " + x2) s = s + d * result x = x +d/2 next return s
func trapeze(x2, a, b, n)
s = 0 d = (b - a) / n x = b eval("result = " + x2) f = result x = a eval("result = " + x2) s = d * (f + result) / 2 for i = 1 to n-1 x = x + d eval("result = " + x2) s = s + d * result next return s
func simpson(x2, a, b, n)
s1 = 0 s = 0 d = (b - a) / n x = b eval("result = " + x2) f = result x = a + d/2 eval("result = " + x2) s1 = result for i = 1 to n-1 x = x + d/2 eval("result = " + x2) s = s + result x = x + d/2 eval("result = " + x2) s1 = s1 + result next x = a eval("result = " + x2) return (d / 6) * (f + result + 4 * s1 + 2 * s)
</lang> Output:
Function Range L-Rect R-Rect M-Rect Trapeze Simpson pow(x,3) 0 - 1 0.245025 0.255025 0.2499875 0.250025 0.25 1/x 1 - 100 4.65499106 4.55698106 4.60476255 4.60598606 4.60517038 x 0 - 5000 12499997.5 12500002.5 12500000 12500000 12500000 x 0 - 6000 17999997 18000003 18000000 18000000 18000000
Ruby
<lang ruby>def leftrect(f, left, right)
f.call(left)
end
def midrect(f, left, right)
f.call((left+right)/2.0)
end
def rightrect(f, left, right)
f.call(right)
end
def trapezium(f, left, right)
(f.call(left) + f.call(right)) / 2.0
end
def simpson(f, left, right)
(f.call(left) + 4*f.call((left+right)/2.0) + f.call(right)) / 6.0
end
def integrate(f, a, b, steps, method)
delta = 1.0 * (b - a) / steps total = 0.0 steps.times do |i| left = a + i*delta right = left + delta total += delta * send(method, f, left, right) end total
end
def square(x)
x**2
end
def def_int(f, a, b)
l = case f.to_s when /sin>/ lambda {|x| -Math.cos(x)} when /square>/ lambda {|x| (x**3)/3.0} end l.call(b) - l.call(a)
end
a = 0 b = Math::PI steps = 10
for func in [method(:square), Math.method(:sin)]
puts "integral of #{func} from #{a} to #{b} in #{steps} steps" actual = def_int(func, a, b) for method in [:leftrect, :midrect, :rightrect, :trapezium, :simpson] int = integrate(func, a, b, steps, method) diff = (int - actual) * 100.0 / actual printf " %-10s %s\t(%.1f%%)\n", method, int, diff end
end</lang> outputs
integral of #<Method: Object#square> from 0 to 3.14159265358979 in 10 steps leftrect 8.83678885388545 (-14.5%) midrect 10.3095869961997 (-0.2%) rightrect 11.9374165219154 (15.5%) trapezium 10.3871026879004 (0.5%) simpson 10.3354255600999 (0.0%) integral of #<Method: Math.sin> from 0 to 3.14159265358979 in 10 steps leftrect 1.98352353750945 (-0.8%) midrect 2.00824840790797 (0.4%) rightrect 1.98352353750945 (-0.8%) trapezium 1.98352353750945 (-0.8%) simpson 2.0000067844418 (0.0%)
Rust
This is a partial solution and only implements trapezium integration. <lang rust>fn integral<F>(f: F, range: std::ops::Range<f64>, n_steps: u32) -> f64
where F: Fn(f64) -> f64
{
let step_size = (range.end - range.start)/n_steps as f64;
let mut integral = (f(range.start) + f(range.end))/2.; let mut pos = range.start + step_size; while pos < range.end { integral += f(pos); pos += step_size; } integral * step_size
}
fn main() {
println!("{}", integral(|x| x.powi(3), 0.0..1.0, 100)); println!("{}", integral(|x| 1.0/x, 1.0..100.0, 1000)); println!("{}", integral(|x| x, 0.0..5000.0, 5_000_000)); println!("{}", integral(|x| x, 0.0..6000.0, 6_000_000));
}</lang>
- Output:
0.2500250000000004 4.605986057514688 12500000.000728702 18000000.001390498
Scala
<lang scala>object NumericalIntegration {
def leftRect(f:Double=>Double, a:Double, b:Double)=f(a) def midRect(f:Double=>Double, a:Double, b:Double)=f((a+b)/2) def rightRect(f:Double=>Double, a:Double, b:Double)=f(b) def trapezoid(f:Double=>Double, a:Double, b:Double)=(f(a)+f(b))/2 def simpson(f:Double=>Double, a:Double, b:Double)=(f(a)+4*f((a+b)/2)+f(b))/6;
def fn1(x:Double)=x*x*x def fn2(x:Double)=1/x def fn3(x:Double)=x type Method = (Double=>Double, Double, Double) => Double def integrate(f:Double=>Double, a:Double, b:Double, steps:Double, m:Method)={ val delta:Double=(b-a)/steps delta*(a until b by delta).foldLeft(0.0)((s,x) => s+m(f, x, x+delta)) }
def print(f:Double=>Double, a:Double, b:Double, steps:Double)={ println("rectangular left : %f".format(integrate(f, a, b, steps, leftRect))) println("rectangular middle : %f".format(integrate(f, a, b, steps, midRect))) println("rectangular right : %f".format(integrate(f, a, b, steps, rightRect))) println("trapezoid : %f".format(integrate(f, a, b, steps, trapezoid))) println("simpson : %f".format(integrate(f, a, b, steps, simpson))) } def main(args: Array[String]): Unit = { print(fn1, 0, 1, 100) println("------") print(fn2, 1, 100, 1000) println("------") print(fn3, 0, 5000, 5000000) println("------") print(fn3, 0, 6000, 6000000) }
}</lang> Output:
rectangular left : 0,245025 rectangular middle : 0,249988 rectangular right : 0,255025 trapezoid : 0,250025 simpson : 0,250000 ------ rectangular left : 4,654991 rectangular middle : 4,604763 rectangular right : 4,556981 trapezoid : 4,605986 simpson : 4,605170 ------ rectangular left : 12499997,500729 rectangular middle : 12500000,000729 rectangular right : 12500002,500729 trapezoid : 12500000,000729 simpson : 12500000,000729 ------ rectangular left : 17999997,001390 rectangular middle : 18000000,001391 rectangular right : 18000003,001390 trapezoid : 18000000,001391 simpson : 18000000,001391
Scheme
<lang scheme>(define (integrate f a b steps meth)
(define h (/ (- b a) steps)) (* h (let loop ((i 0) (s 0)) (if (>= i steps) s (loop (+ i 1) (+ s (meth f (+ a (* h i)) h)))))))
(define (left-rect f x h) (f x)) (define (mid-rect f x h) (f (+ x (/ h 2)))) (define (right-rect f x h) (f (+ x h))) (define (trapezium f x h) (/ (+ (f x) (f (+ x h))) 2)) (define (simpson f x h) (/ (+ (f x) (* 4 (f (+ x (/ h 2)))) (f (+ x h))) 6))
(define (square x) (* x x))
(define rl (integrate square 0 1 10 left-rect)) (define rm (integrate square 0 1 10 mid-rect)) (define rr (integrate square 0 1 10 right-rect)) (define t (integrate square 0 1 10 trapezium)) (define s (integrate square 0 1 10 simpson))</lang>
Sidef
<lang ruby>func sum(f, start, from, to) {
var s = 0; RangeNum(start, to, from-start).each { |i| s += f(i); } return s
}
func leftrect(f, a, b, n) {
var h = ((b - a) / n); h * sum(f, a, a+h, b-h);
}
func rightrect(f, a, b, n) {
var h = ((b - a) / n); h * sum(f, a+h, a + 2*h, b);
}
func midrect(f, a, b, n) {
var h = ((b - a) / n); h * sum(f, a + h/2, a + h + h/2, b - h/2)
}
func trapez(f, a, b, n) {
var h = ((b - a) / n); h/2 * (f(a) + f(b) + sum({ f(_)*2 }, a+h, a + 2*h, b-h));
}
func simpsons(f, a, b, n) {
var h = ((b - a) / n); var h2 = h/2;
var sum1 = f(a + h2); var sum2 = 0;
sum({|i| sum1 += f(i + h2); sum2 += f(i); 0 }, a+h, a+h+h, b-h); h/6 * (f(a) + f(b) + 4*sum1 + 2*sum2);
}
func tryem(label, f, a, b, n, exact) {
say "\n#{label}\n in [#{a}..#{b}] / #{n}";
say(' exact result: ', exact); say(' rectangle method left: ', leftrect(f, a, b, n)); say(' rectangle method right: ', rightrect(f, a, b, n)); say(' rectangle method mid: ', midrect(f, a, b, n)); say('composite trapezoidal rule: ', trapez(f, a, b, n)); say(' quadratic simpsons rule: ', simpsons(f, a, b, n));
}
tryem('x^3', { _ ** 3 }, 0, 1, 100, 0.25); tryem('1/x', { 1 / _ }, 1, 100, 1000, log(100)); tryem('x', { _ }, 0, 5_000, 5_000_000, 12_500_000); tryem('x', { _ }, 0, 6_000, 6_000_000, 18_000_000);</lang>
SequenceL
<lang sequencel>import <Utilities/Conversion.sl>; import <Utilities/Sequence.sl>;
integrateLeft(f, a, b, n) :=
let h := (b - a) / n; vals[x] := f(x) foreach x within (0 ... (n-1)) * h + a; in h * sum(vals);
integrateRight(f, a, b, n) :=
let h := (b - a) / n; vals[x] := f(x+h) foreach x within (0 ... (n-1)) * h + a; in h * sum(vals);
integrateMidpoint(f, a, b, n) :=
let h := (b - a) / n; vals[x] := f(x+h/2.0) foreach x within (0 ... (n-1)) * h + a; in h * sum(vals);
integrateTrapezium(f, a, b, n) :=
let h := (b - a) / n; vals[i] := 2.0 * f(a + i * h) foreach i within 1 ... n-1; in h * (sum(vals) + f(a) + f(b)) / 2.0;
integrateSimpsons(f, a, b, n) :=
let h := (b - a) / n; vals1[i] := f(a + h * i + h / 2.0) foreach i within 0 ... n-1; vals2[i] := f(a + h * i) foreach i within 1 ... n-1; in h / 6.0 * (f(a) + f(b) + 4.0 * sum(vals1) + 2.0 * sum(vals2));
xCubed(x) := x^3; xInverse(x) := 1/x; identity(x) := x;
tests[method] :=
[method(xCubed, 0.0, 1.0, 100), method(xInverse, 1.0, 100.0, 1000), method(identity, 0.0, 5000.0, 5000000), method(identity, 0.0, 6000.0, 6000000)] foreach method within [integrateLeft, integrateRight, integrateMidpoint, integrateTrapezium, integrateSimpsons];
//String manipulation for ouput display. main :=
let heading := "Func", "Range\t", "L-Rect\t", "R-Rect\t", "M-Rect\t", "Trapezium", "Simpson"; ranges := "0 - 1\t", "1 - 100\t", "0 - 5000", "0 - 6000"; funcs := "x^3", "1/x", "x", "x"; in delimit(delimit(heading ++ transpose(funcs ++ ranges ++ trimEndZeroes(floatToString(tests, 8))), '\t'), '\n');
trimEndZeroes(x(1)) := x when size(x) = 0 else x when x[size(x)] /= '0' else trimEndZeroes(x[1...size(x)-1]);</lang>
- Output:
"Func Range L-Rect R-Rect M-Rect Trapezium Simpson x^3 0 - 1 0.245025 0.255025 0.2499875 0.250025 0.25 1/x 1 - 100 4.65499106 4.55698106 4.60476255 4.60598606 4.60517038 x 0 - 5000 12499997.5 12500002.5 12500000. 12500000. 12500000. x 0 - 6000 17999997. 18000003. 18000000. 18000000. 18000000."
Standard ML
<lang sml>fun integrate (f, a, b, steps, meth) = let
val h = (b - a) / real steps fun helper (i, s) = if i >= steps then s else helper (i+1, s + meth (f, a + h * real i, h))
in
h * helper (0, 0.0)
end
fun leftRect (f, x, _) = f x fun midRect (f, x, h) = f (x + h / 2.0) fun rightRect (f, x, h) = f (x + h) fun trapezium (f, x, h) = (f x + f (x + h)) / 2.0 fun simpson (f, x, h) = (f x + 4.0 * f (x + h / 2.0) + f (x + h)) / 6.0
fun square x = x * x
val rl = integrate (square, 0.0, 1.0, 10, left_rect )
val rm = integrate (square, 0.0, 1.0, 10, mid_rect )
val rr = integrate (square, 0.0, 1.0, 10, right_rect)
val t = integrate (square, 0.0, 1.0, 10, trapezium )
val s = integrate (square, 0.0, 1.0, 10, simpson )</lang>
Stata
<lang>mata function integrate(f,a,b,n,u,v) { s = 0 h = (b-a)/n m = length(u) for (i=0; i<n; i++) { x = a+i*h for (j=1; j<=m; j++) s = s+v[j]*(*f)(x+h*u[j]) } return(s*h) }
function log_(x) { return(log(x)) }
function id(x) { return(x) }
function cube(x) { return(x*x*x) }
function inv(x) { return(1/x) }
function test(f,a,b,n) { return(integrate(f,a,b,n,(0,1),(1,0)), integrate(f,a,b,n,(0,1),(0,1)), integrate(f,a,b,n,(0.5),(1)), integrate(f,a,b,n,(0,1),(0.5,0.5)), integrate(f,a,b,n,(0,1/2,1),(1/6,4/6,1/6))) }
test(&cube(),0,1,100) test(&inv(),1,100,1000) test(&id(),0,5000,5000000) test(&id(),0,6000,6000000) end</lang>
Output
1 2 3 4 5 +--------------------------------------------------------+ 1 | .245025 .255025 .2499875 .250025 .25 | +--------------------------------------------------------+ 1 2 3 4 5 +-----------------------------------------------------------------------+ 1 | 4.654991058 4.556981058 4.604762549 4.605986058 4.605170385 | +-----------------------------------------------------------------------+ 1 2 3 4 5 +------------------------------------------------------------------+ 1 | 12499997.5 12500002.5 12500000 12500000 12500000 | +------------------------------------------------------------------+ 1 2 3 4 5 +--------------------------------------------------------+ 1 | 17999997 18000003 18000000 18000000 18000000 | +--------------------------------------------------------+
Swift
<lang swift>public enum IntegrationType : CaseIterable {
case rectangularLeft case rectangularRight case rectangularMidpoint case trapezium case simpson
}
public func integrate(
from: Double, to: Double, n: Int, using: IntegrationType = .simpson, f: (Double) -> Double
) -> Double {
let integrationFunc: (Double, Double, Int, (Double) -> Double) -> Double
switch using { case .rectangularLeft: integrationFunc = integrateRectL case .rectangularRight: integrationFunc = integrateRectR case .rectangularMidpoint: integrationFunc = integrateRectMid case .trapezium: integrationFunc = integrateTrapezium case .simpson: integrationFunc = integrateSimpson }
return integrationFunc(from, to, n, f)
}
private func integrateRectL(from: Double, to: Double, n: Int, f: (Double) -> Double) -> Double {
let h = (to - from) / Double(n) var x = from var sum = 0.0
while x <= to - h { sum += f(x) x += h }
return h * sum
}
private func integrateRectR(from: Double, to: Double, n: Int, f: (Double) -> Double) -> Double {
let h = (to - from) / Double(n) var x = from var sum = 0.0
while x <= to - h { sum += f(x + h) x += h }
return h * sum
}
private func integrateRectMid(from: Double, to: Double, n: Int, f: (Double) -> Double) -> Double {
let h = (to - from) / Double(n) var x = from var sum = 0.0
while x <= to - h { sum += f(x + h / 2.0) x += h }
return h * sum
}
private func integrateTrapezium(from: Double, to: Double, n: Int, f: (Double) -> Double) -> Double {
let h = (to - from) / Double(n) var sum = f(from) + f(to)
for i in 1..<n { sum += 2 * f(from + Double(i) * h) }
return h * sum / 2
}
private func integrateSimpson(from: Double, to: Double, n: Int, f: (Double) -> Double) -> Double {
let h = (to - from) / Double(n) var sum1 = 0.0 var sum2 = 0.0
for i in 0..<n { sum1 += f(from + h * Double(i) + h / 2.0) }
for i in 1..<n { sum2 += f(from + h * Double(i)) }
return h / 6.0 * (f(from) + f(to) + 4.0 * sum1 + 2.0 * sum2)
}
let types = IntegrationType.allCases
print("f(x) = x^3:", types.map({ integrate(from: 0, to: 1, n: 100, using: $0, f: { pow($0, 3) }) })) print("f(x) = 1 / x:", types.map({ integrate(from: 1, to: 100, n: 1000, using: $0, f: { 1 / $0 }) })) print("f(x) = x, 0 -> 5_000:", types.map({ integrate(from: 0, to: 5_000, n: 5_000_000, using: $0, f: { $0 }) })) print("f(x) = x, 0 -> 6_000:", types.map({ integrate(from: 0, to: 6_000, n: 6_000_000, using: $0, f: { $0 }) }))</lang>
- Output:
f(x) = x^3: [0.2450250000000004, 0.23532201000000041, 0.2401367512500004, 0.25002500000000005, 0.25000000000000006] f(x) = 1 / x: [4.55599105751469, 4.654000076443428, 4.603772058385689, 4.60598605751468, 4.605170384957145] f(x) = x, 0 -> 5_000: [12499997.500728704, 12499992.500729704, 12499995.000729209, 12500000.000000002, 12500000.0] f(x) = x, 0 -> 6_000: [17999997.001390498, 17999991.0013915, 17999994.001391016, 18000000.000000004, 17999999.999999993]
Tcl
<lang tcl>package require Tcl 8.5
proc leftrect {f left right} {
$f $left
} proc midrect {f left right} {
set mid [expr {($left + $right) / 2.0}] $f $mid
} proc rightrect {f left right} {
$f $right
} proc trapezium {f left right} {
expr {([$f $left] + [$f $right]) / 2.0}
} proc simpson {f left right} {
set mid [expr {($left + $right) / 2.0}] expr {([$f $left] + 4*[$f $mid] + [$f $right]) / 6.0}
}
proc integrate {f a b steps method} {
set delta [expr {1.0 * ($b - $a) / $steps}] set total 0.0 for {set i 0} {$i < $steps} {incr i} { set left [expr {$a + $i * $delta}] set right [expr {$left + $delta}] set total [expr {$total + $delta * [$method $f $left $right]}] } return $total
}
interp alias {} sin {} ::tcl::mathfunc::sin proc square x {expr {$x*$x}} proc def_int {f a b} {
switch -- $f { sin {set lambda {x {expr {-cos($x)}}}} square {set lambda {x {expr {$x**3/3.0}}}} } return [expr {[apply $lambda $b] - [apply $lambda $a]}]
}
set a 0 set b [expr {4*atan(1)}] set steps 10
foreach func {square sin} {
puts "integral of ${func}(x) from $a to $b in $steps steps" set actual [def_int $func $a $b] foreach method {leftrect midrect rightrect trapezium simpson} { set int [integrate $func $a $b $steps $method] set diff [expr {($int - $actual) * 100.0 / $actual}] puts [format " %-10s %s\t(%.1f%%)" $method $int $diff] }
}</lang>
integral of square(x) from 0 to 3.141592653589793 in 10 steps leftrect 8.836788853885448 (-14.5%) midrect 10.30958699619969 (-0.2%) rightrect 11.93741652191543 (15.5%) trapezium 10.387102687900438 (0.5%) simpson 10.335425560099939 (0.0%) integral of sin(x) from 0 to 3.141592653589793 in 10 steps leftrect 1.9835235375094544 (-0.8%) midrect 2.0082484079079745 (0.4%) rightrect 1.9835235375094544 (-0.8%) trapezium 1.9835235375094546 (-0.8%) simpson 2.0000067844418012 (0.0%)
TI-89 BASIC
TI-89 BASIC has built-in numerical integration with the ∫ operator, but no control over the method used is available so it doesn't really correspond to this task.
An explicit numerical integration program should be written here.
Ursala
A higher order function parameterized by a method returns a function that integrates by that method. The method is meant to specify whether it's rectangular, trapezoidal, etc.. The integrating function constructed from a given method takes a quadruple containing the integrand , the bounds , and the number of intervals .
<lang Ursala>#import std
- import nat
- import flo
(integral_by "m") ("f","a","b","n") =
iprod ^(* ! div\float"n" minus/"b" "a",~&) ("m" "f")*ytp (ari successor "n")/"a" "b"</lang> An alternative way of defining this function shown below prevents redundant evaluations of the integrand at the cost of building a table-driven finite map in advance. <lang Ursala>(integral_by "m") ("f","a","b","n") =
iprod ^(* ! div\float"n" minus/"b" "a",~&) ^H(*+ "m"+ -:"f"+ * ^/~& "f",~&ytp) (ari successor "n")/"a" "b"</lang>
As mentioned in the Haskell solution, the latter choice is preferable if evaluating the integrand
is expensive.
An integrating function is defined for each method as follows.
<lang Ursala>left = integral_by "f". ("l","r"). "f" "l"
right = integral_by "f". ("l","r"). "f" "r"
midpoint = integral_by "f". ("l","r"). "f" div\2. plus/"l" "r"
trapezium = integral_by "f". ("l","r"). div\2. plus "f"~~/"l" "r"
simpson = integral_by "f". ("l","r"). div\6. plus:-0. <"f" "l",times/4. "f" div\2. plus/"l" "r","f" "r"></lang>
As shown above, the method passed to the integral_by
function
is itself a higher order function taking an integrand as an argument and
returning a function that operates on the pair of left and right interval endpoints.
Here is a test program showing the results of integrating the square from zero to in ten intervals
by all five methods.
<lang Ursala>#cast %eL
examples = <.left,midpoint,rignt,trapezium,simpson> (sqr,0.,pi,10)</lang> output:
< 8.836789e+00, 1.030959e+01, 1.193742e+01, 1.038710e+01, 1.033543e+01>
(The GNU Scientific Library integration routines are also callable in Ursala, and are faster and more accurate.)
VBA
The following program does not follow the task requirement on two points: first, the same function is used for all quadrature methods, as they are really the same thing with different parameters (abscissas and weights). And since it's getting rather slow for a large number of intervals, the last two are integrated with resp. 50,000 and 60,000 intervals. It does not make sense anyway to use more, for such a simple function (and if really it were difficult to integrate, one would rely one more sophistcated methods).
<lang vb>Option Explicit Option Base 1
Function Quad(ByVal f As String, ByVal a As Double, _
ByVal b As Double, ByVal n As Long, _ ByVal u As Variant, ByVal v As Variant) As Double Dim m As Long, h As Double, x As Double, s As Double, i As Long, j As Long m = UBound(u) h = (b - a) / n s = 0# For i = 1 To n x = a + (i - 1) * h For j = 1 To m s = s + v(j) * Application.Run(f, x + h * u(j)) Next Next Quad = s * h
End Function
Function f1fun(x As Double) As Double
f1fun = x ^ 3
End Function
Function f2fun(x As Double) As Double
f2fun = 1 / x
End Function
Function f3fun(x As Double) As Double
f3fun = x
End Function
Sub Test()
Dim fun, f, coef, c Dim i As Long, j As Long, s As Double
fun = Array(Array("f1fun", 0, 1, 100, 1 / 4), _ Array("f2fun", 1, 100, 1000, Log(100)), _ Array("f3fun", 0, 5000, 50000, 5000 ^ 2 / 2), _ Array("f3fun", 0, 6000, 60000, 6000 ^ 2 / 2))
coef = Array(Array("Left rect. ", Array(0, 1), Array(1, 0)), _ Array("Right rect. ", Array(0, 1), Array(0, 1)), _ Array("Midpoint ", Array(0.5), Array(1)), _ Array("Trapez. ", Array(0, 1), Array(0.5, 0.5)), _ Array("Simpson ", Array(0, 0.5, 1), Array(1 / 6, 4 / 6, 1 / 6))) For i = 1 To UBound(fun) f = fun(i) Debug.Print f(1) For j = 1 To UBound(coef) c = coef(j) s = Quad(f(1), f(2), f(3), f(4), c(2), c(3)) Debug.Print " " + c(1) + ": ", s, (s - f(5)) / f(5) Next j Next i
End Sub</lang>
XPL0
<lang XPL0>include c:\cxpl\codes; \intrinsic 'code' declarations
func real Func(FN, X); \Return F(X) for function number FN int FN; real X; [case FN of
1: return X*X*X; 2: return 1.0/X; 3: return X
other return 0.0; ];
func Integrate(A, B, FN, N); \Display area under curve for function FN real A, B; int FN, N; \limits A, B, and number of slices N real DX, X, Area; \delta X int I; [DX:= (B-A)/float(N); X:= A; Area:= 0.0; \rectangular left for I:= 1 to N do
[Area:= Area + Func(FN,X)*DX; X:= X+DX];
RlOut(0, Area); X:= A; Area:= 0.0; \rectangular right for I:= 1 to N do
[X:= X+DX; Area:= Area + Func(FN,X)*DX];
RlOut(0, Area); X:= A+DX/2.0; Area:= 0.0; \rectangular mid point for I:= 1 to N do
[Area:= Area + Func(FN,X)*DX; X:= X+DX];
RlOut(0, Area); X:= A; Area:= 0.0; \trapezium for I:= 1 to N do
[Area:= Area + (Func(FN,X)+Func(FN,X+DX))/2.0*DX; X:= X+DX];
RlOut(0, Area); X:= A; Area:= 0.0; \Simpson's rule for I:= 1 to N do
[Area:= Area + DX/6.0*(Func(FN,X) + 4.0*Func(FN,(X+X+DX)/2.0) + Func(FN,X+DX)); X:= X+DX];
RlOut(0, Area); CrLf(0); ];
[Format(9,6); Integrate(0.0, 1.0, 1, 100); Integrate(1.0, 100.0, 2, 1000); Integrate(0.0, 5000.0, 3, 5_000_000); Integrate(0.0, 6000.0, 3, 6_000_000); ]</lang>
Interestingly, the small rounding errors creep in when millions of approximations are done. If the five and six millions are changed to five and six thousands then the rounding errors disappear. (They could have been hidden by using scientific notation for the output format.)
- Output:
0.245025 0.255025 0.249988 0.250025 0.250000 4.654991 4.556981 4.604763 4.605986 4.605170 12499997.500729 12500002.500729 12500000.000729 12500000.000729 12500000.000729 17999997.001391 18000003.001391 18000000.001391 18000000.001391 18000000.001391
zkl
<lang zkl>fcn integrate(F,f,a,b,steps){
h:=(b - a) / steps; h*(0).reduce(steps,'wrap(s,i){ F(f, h*i + a, h) + s },0.0);
}
fcn rectangularLeft(f,x) { f(x) } fcn rectangularMiddle(f,x,h){ f(x+h/2) } fcn rectangularRight(f,x,h) { f(x+h) } fcn trapezium(f,x,h) { (f(x) + f(x+h))/2 } fcn simpson(f,x,h) { (f(x) + 4.0*f(x+h/2) + f(x+h))/6 }
args:=T( T(fcn(x){ x.pow(3) }, 0.0, 1.0, 10),
T(fcn(x){ 1.0 / x }, 1.0, 100.0, 1000), T(fcn(x){ x }, 0.0, 5000.0, 0d5_000_000), T(fcn(x){ x }, 0.0, 6000.0, 0d6_000_000) );
fs:=T(rectangularLeft,rectangularMiddle,rectangularRight,
trapezium,simpson);
names:=fs.pump(List,"name",'+(":"),"%-18s".fmt);
foreach a in (args){
names.zipWith('wrap(nm,f){ "%s %f".fmt(nm,integrate(f,a.xplode())).println() }, fs); println();
}</lang>
- Output:
rectangularLeft: 0.202500 rectangularMiddle: 0.248750 rectangularRight: 0.302500 trapezium: 0.252500 simpson: 0.250000 rectangularLeft: 4.654991 rectangularMiddle: 4.604763 rectangularRight: 4.556981 trapezium: 4.605986 simpson: 4.605170 rectangularLeft: 12499997.500000 rectangularMiddle: 12500000.000000 rectangularRight: 12500002.500000 trapezium: 12500000.000000 simpson: 12500000.000000 rectangularLeft: 17999997.000000 rectangularMiddle: 18000000.000000 rectangularRight: 18000003.000000 trapezium: 18000000.000000 simpson: 18000000.000000
- Programming Tasks
- Arithmetic operations
- ActionScript
- Ada
- ALGOL 68
- AutoHotkey
- BASIC
- BBC BASIC
- C
- C sharp
- C++
- Chapel
- CoffeeScript
- Common Lisp
- D
- E
- Elixir
- Euphoria
- Factor
- Forth
- Fortran
- FreeBASIC
- Go
- Groovy
- Haskell
- J
- Java
- Julia
- Kotlin
- Liberty BASIC
- Logo
- Lua
- Mathematica
- MATLAB
- Octave
- Maxima
- Nim
- OCaml
- PARI/GP
- Pascal
- Perl
- Perl 6
- Phix
- PL/I
- PicoLisp
- PureBasic
- Python
- R
- Racket
- REXX
- Ring
- Ruby
- Rust
- Scala
- Scheme
- Sidef
- SequenceL
- Standard ML
- Stata
- Swift
- Tcl
- TI-89 BASIC
- TI-89 BASIC examples needing attention
- Ursala
- VBA
- XPL0
- Zkl
- GUISS/Omit
- M4/Omit
- Arithmetic
- Mathematics